Library PointsETC

Require Export ConwayNotations.
Require Export PointsType.

Section Triangle.

Context `{M:triangle_theory}.

Definition cPointh h := cTriple (h a b c) (h b c a) (h c a b).


Definition cPointhb h := cTriple ((h a b c)*b×c) ((h b c a)*a×c) ((h c a b)*a×b).

Definition X_1 :=
        let h_x_1 a b c := a in
        cPointhb h_x_1.
Definition X_2 :=
        let h_x_2 a b c := 1 in
        cPointhb h_x_2.
Definition X_3 :=
        let h_x_3 a b c := a^2*(a^2-b^2-c^2) in
        cPointhb h_x_3.
Definition X_4 :=
        let h_x_4 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4.
Definition X_5 :=
        let h_x_5 a b c := a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_5.
Definition X_6 :=
        let h_x_6 a b c := a^2 in
        cPointhb h_x_6.
Definition X_7 :=
        let h_x_7 a b c := (a+b-c)*(a-b+c) in
        cPointhb h_x_7.
Definition X_8 :=
        let h_x_8 a b c := b+c-a in
        cPointhb h_x_8.
Definition X_9 :=
        let h_x_9 a b c := a*(b+c-a) in
        cPointhb h_x_9.
Definition X_10 :=
        let h_x_10 a b c := b+c in
        cPointhb h_x_10.
Definition X_11 :=
        let h_x_11 a b c := (b+c-a)*(b-c)^2 in
        cPointhb h_x_11.
Definition X_12 :=
        let h_x_12 a b c := (a+b-c)*(a-b+c)*(b+c)^2 in
        cPointhb h_x_12.
Definition X_13 :=
        let h_x_13 a b c := a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4+4×sqrt(3)×a^2*(DeltaMaj a b c) in
        cPointhb h_x_13.
Definition X_14 :=
        let h_x_14 a b c := a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4-4×sqrt(3)×a^2*(DeltaMaj a b c) in
        cPointhb h_x_14.
Definition X_15 :=
        let h_x_15 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c)) in
        cPointhb h_x_15.
Definition X_16 :=
        let h_x_16 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)+4*(DeltaMaj a b c)) in
        cPointhb h_x_16.
Definition X_17 :=
        let h_x_17 a b c := (a^2+b^2-c^2+4×sqrt(3)*(DeltaMaj a b c))*(a^2-b^2+c^2+4×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_17.
Definition X_18 :=
        let h_x_18 a b c := (a^2+b^2-c^2-4×sqrt(3)*(DeltaMaj a b c))*(a^2-b^2+c^2-4×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_18.
Definition X_19 :=
        let h_x_19 a b c := a*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_19.
Definition X_20 :=
        let h_x_20 a b c := 3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_20.
Definition X_21 :=
        let h_x_21 a b c := a*(a+b)*(a+c)*(-a+b+c) in
        cPointhb h_x_21.
Definition X_22 :=
        let h_x_22 a b c := a^2*(-a^4+b^4+c^4) in
        cPointhb h_x_22.
Definition X_23 :=
        let h_x_23 a b c := a^2*(-a^4+b^4+c^4-b^2×c^2) in
        cPointhb h_x_23.
Definition X_24 :=
        let h_x_24 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4) in
        cPointhb h_x_24.
Definition X_25 :=
        let h_x_25 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_25.
Definition X_26 :=
        let h_x_26 a b c := a^2*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2+2×b^6×c^2-2×b^4×c^4+2×a^2×c^6+2×b^2×c^6-c^8) in
        cPointhb h_x_26.
Definition X_27 :=
        let h_x_27 a b c := (a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_27.
Definition X_28 :=
        let h_x_28 a b c := a*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_28.
Definition X_29 :=
        let h_x_29 a b c := (a+b)*(a-b-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_29.
Definition X_30 :=
        let h_x_30 a b c := 2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_30.
Definition X_31 :=
        let h_x_31 a b c := a^3 in
        cPointhb h_x_31.
Definition X_32 :=
        let h_x_32 a b c := a^4 in
        cPointhb h_x_32.
Definition X_33 :=
        let h_x_33 a b c := a*(a-b-c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_33.
Definition X_34 :=
        let h_x_34 a b c := a*(a+b-c)*(a-b+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_34.
Definition X_35 :=
        let h_x_35 a b c := a^2*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_35.
Definition X_36 :=
        let h_x_36 a b c := a^2*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_36.
Definition X_37 :=
        let h_x_37 a b c := a*(b+c) in
        cPointhb h_x_37.
Definition X_38 :=
        let h_x_38 a b c := a*(b^2+c^2) in
        cPointhb h_x_38.
Definition X_39 :=
        let h_x_39 a b c := a^2*(b^2+c^2) in
        cPointhb h_x_39.
Definition X_40 :=
        let h_x_40 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_40.
Definition X_41 :=
        let h_x_41 a b c := a^3*(b+c-a) in
        cPointhb h_x_41.
Definition X_42 :=
        let h_x_42 a b c := a^2*(b+c) in
        cPointhb h_x_42.
Definition X_43 :=
        let h_x_43 a b c := a*(a×b-b×c+c×a) in
        cPointhb h_x_43.
Definition X_44 :=
        let h_x_44 a b c := a*(b+c-2×a) in
        cPointhb h_x_44.
Definition X_45 :=
        let h_x_45 a b c := a*(2×b+2×c-a) in
        cPointhb h_x_45.
Definition X_46 :=
        let h_x_46 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_46.
Definition X_47 :=
        let h_x_47 a b c := a^3*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4) in
        cPointhb h_x_47.
Definition X_48 :=
        let h_x_48 a b c := a^3*(a^2-b^2-c^2) in
        cPointhb h_x_48.
Definition X_49 :=
        let h_x_49 a b c := a^4*(a^2-b^2-c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_49.
Definition X_50 :=
        let h_x_50 a b c := a^4*(a^2-b^2-b×c-c^2)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_50.
Definition X_51 :=
        let h_x_51 a b c := a^2*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_51.
Definition X_52 :=
        let h_x_52 a b c := (a^2*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2))/(((SB a b c)^2-4×(DeltaMaj a b c)^2)*(-(SC a b c)^2+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_52.
Definition X_53 :=
        let h_x_53 a b c := (SB a b c)*(SC a b c)*(4×(DeltaMaj a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_53.
Definition X_55 :=
        let h_x_55 a b c := a^2*(b+c-a) in
        cPointhb h_x_55.
Definition X_54 :=
        let h_x_54 a b c := a^2/((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_54.
Definition X_56 :=
        let h_x_56 a b c := a^2/(-a+b+c) in
        cPointhb h_x_56.
Definition X_57 :=
        let h_x_57 a b c := a/(-a+b+c) in
        cPointhb h_x_57.
Definition X_58 :=
        let h_x_58 a b c := a^2/(b+c) in
        cPointhb h_x_58.
Definition X_59 :=
        let h_x_59 a b c := a^2/((b-c)^2*(-a+b+c)) in
        cPointhb h_x_59.
Definition X_60 :=
        let h_x_60 a b c := a^2×(a+b)^2*(a-b-c)*(a+c)^2 in
        cPointhb h_x_60.
Definition X_61 :=
        let h_x_61 a b c := a^2*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_61.
Definition X_62 :=
        let h_x_62 a b c := a^2*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_62.
Definition X_63 :=
        let h_x_63 a b c := a*(SA a b c) in
        cPointhb h_x_63.
Definition X_64 :=
        let h_x_64 a b c := a^2/(a^2*(SA a b c)-(SB a b c)*(SC a b c)) in
        cPointhb h_x_64.
Definition X_65 :=
        let h_x_65 a b c := (a*(b+c))/(b+c-a) in
        cPointhb h_x_65.
Definition X_66 :=
        let h_x_66 a b c := 1/(-a^4+b^4+c^4) in
        cPointhb h_x_66.
Definition X_67 :=
        let h_x_67 a b c := 1/(-a^4+b^4-b^2×c^2+c^4) in
        cPointhb h_x_67.
Definition X_68 :=
        let h_x_68 a b c := (SA a b c)*((SB a b c)^2-4×(DeltaMaj a b c)^2)*((SC a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_68.
Definition X_69 :=
        let h_x_69 a b c := (SA a b c) in
        cPointhb h_x_69.
Definition X_70 :=
        let h_x_70 a b c := 1/(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2+2×b^6×c^2-2×b^4×c^4+2×a^2×c^6+2×b^2×c^6-c^8) in
        cPointhb h_x_70.
Definition X_71 :=
        let h_x_71 a b c := a^2*(b+c)*(SA a b c) in
        cPointhb h_x_71.
Definition X_72 :=
        let h_x_72 a b c := a*(b+c)*(SA a b c) in
        cPointhb h_x_72.
Definition X_73 :=
        let h_x_73 a b c := a^2*(a+b-c)*(a-b+c)*(b+c)*(SA a b c) in
        cPointhb h_x_73.
Definition X_74 :=
        let h_x_74 a b c := a^2*(-2*(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-2*(SA a b c)*(SC a b c)) in
        cPointhb h_x_74.
Definition X_75 :=
        let h_x_75 a b c := b×c in
        cPointhb h_x_75.
Definition X_76 :=
        let h_x_76 a b c := b^2×c^2 in
        cPointhb h_x_76.
Definition X_77 :=
        let h_x_77 a b c := a*(a+b-c)*(a-b+c)*(SA a b c) in
        cPointhb h_x_77.
Definition X_78 :=
        let h_x_78 a b c := a*(-a+b+c)*(SA a b c) in
        cPointhb h_x_78.
Definition X_79 :=
        let h_x_79 a b c := 1/(b×c+2*(SA a b c)) in
        cPointhb h_x_79.
Definition X_80 :=
        let h_x_80 a b c := 1/(b×c-2*(SA a b c)) in
        cPointhb h_x_80.
Definition X_81 :=
        let h_x_81 a b c := a/(b+c) in
        cPointhb h_x_81.
Definition X_82 :=
        let h_x_82 a b c := a/(b^2+c^2) in
        cPointhb h_x_82.
Definition X_83 :=
        let h_x_83 a b c := 1/(b^2+c^2) in
        cPointhb h_x_83.
Definition X_84 :=
        let h_x_84 a b c := a/(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_84.
Definition X_85 :=
        let h_x_85 a b c := 1/(a*(-a+b+c)) in
        cPointhb h_x_85.
Definition X_86 :=
        let h_x_86 a b c := 1/(b+c) in
        cPointhb h_x_86.
Definition X_87 :=
        let h_x_87 a b c := a/(a×b+a×c-b×c) in
        cPointhb h_x_87.
Definition X_88 :=
        let h_x_88 a b c := a/(-2×a+b+c) in
        cPointhb h_x_88.
Definition X_89 :=
        let h_x_89 a b c := a/(-a+2×b+2×c) in
        cPointhb h_x_89.
Definition X_90 :=
        let h_x_90 a b c := a/(a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_90.
Definition X_91 :=
        let h_x_91 a b c := 1/(a*((SA a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_91.
Definition X_92 :=
        let h_x_92 a b c := 1/(a*(SA a b c)) in
        cPointhb h_x_92.
Definition X_93 :=
        let h_x_93 a b c := 1/(a^2*(SA a b c)*((SA a b c)^2-12×(DeltaMaj a b c)^2)) in
        cPointhb h_x_93.
Definition X_94 :=
        let h_x_94 a b c := 1/(a^2*(b^2×c^2-4×(SA a b c)^2)) in
        cPointhb h_x_94.
Definition X_95 :=
        let h_x_95 a b c := 1/((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_95.
Definition X_96 :=
        let h_x_96 a b c := (((SB a b c)^2-4×(DeltaMaj a b c)^2)*(-(SC a b c)^2+4×(DeltaMaj a b c)^2))/((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_96.
Definition X_97 :=
        let h_x_97 a b c := a^2/((SB a b c)*(SC a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_97.
Definition X_98 :=
        let h_x_98 a b c := ((SB a b c)^2-(SA a b c)*(SC a b c))*((SA a b c)*(SB a b c)-(SC a b c)^2) in
        cPointhb h_x_98.
Definition X_99 :=
        let h_x_99 a b c := 1/(b^2-c^2) in
        cPointhb h_x_99.
Definition X_100 :=
        let h_x_100 a b c := a/(b-c) in
        cPointhb h_x_100.
Definition X_101 :=
        let h_x_101 a b c := a^2/(b-c) in
        cPointhb h_x_101.
Definition X_102 :=
        let h_x_102 a b c := a^2/(a^3*(SA a b c)-(b+c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_102.
Definition X_103 :=
        let h_x_103 a b c := a^2/(2×a^3-a^2*(b+c)-(b-c)^2*(b+c)) in
        cPointhb h_x_103.
Definition X_104 :=
        let h_x_104 a b c := a/(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_104.
Definition X_105 :=
        let h_x_105 a b c := a*(a^2+b^2-(a+b)*c)*(a^2-a×b+c*(-b+c)) in
        cPointhb h_x_105.
Definition X_106 :=
        let h_x_106 a b c := a^2/(2×a-b-c) in
        cPointhb h_x_106.
Definition X_107 :=
        let h_x_107 a b c := (SB a b c)^2*(-(SA a b c)+(SB a b c))*((SA a b c)-(SC a b c))*(SC a b c)^2 in
        cPointhb h_x_107.
Definition X_108 :=
        let h_x_108 a b c := (a*(SB a b c)*(SC a b c))/((a-b-c)*(b-c)) in
        cPointhb h_x_108.
Definition X_109 :=
        let h_x_109 a b c := a^2/((a-b-c)*(b-c)) in
        cPointhb h_x_109.
Definition X_110 :=
        let h_x_110 a b c := a^2/(b^2-c^2) in
        cPointhb h_x_110.
Definition X_111 :=
        let h_x_111 a b c := a^2/(2×a^2-b^2-c^2) in
        cPointhb h_x_111.
Definition X_112 :=
        let h_x_112 a b c := a^2/((b^2-c^2)*(b^2+c^2-a^2)) in
        cPointhb h_x_112.
Definition X_113 :=
        let h_x_113 a b c := c^2/(-2*(SA a b c)*(SB a b c)+c^2*(SC a b c))+b^2/(b^2*(SB a b c)-2*(SA a b c)*(SC a b c)) in
        cPointhb h_x_113.
Definition X_114 :=
        let h_x_114 a b c := ((SA a b c)^2-(SB a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)^2-(SC a b c)^2) in
        cPointhb h_x_114.
Definition X_115 :=
        let h_x_115 a b c := (b^2-c^2)^2 in
        cPointhb h_x_115.
Definition X_116 :=
        let h_x_116 a b c := (b-c)^2*(-a×b-a×c+b^2+b×c+c^2) in
        cPointhb h_x_116.
Definition X_117 :=
        let h_x_117 a b c := (2×a^4-a^3×b-a^2×b^2+a×b^3-b^4-a^3×c+2×a^2×b×c-a×b^2×c-a^2×c^2-a×b×c^2+2×b^2×c^2+a×c^3-c^4)*(a^4×b^2-2×a^2×b^4+b^6-a^3×b^2×c+a^2×b^3×c+a×b^4×c-b^5×c+a^4×c^2-a^3×b×c^2+2×a^2×b^2×c^2-a×b^3×c^2-b^4×c^2+a^2×b×c^3-a×b^2×c^3+2×b^3×c^3-2×a^2×c^4+a×b×c^4-b^2×c^4-b×c^5+c^6) in
        cPointhb h_x_117.
Definition X_118 :=
        let h_x_118 a b c := a^2/((b-c)*(a^2/(b-c)+c^2/(a-b)+b^2/(-a+c)))+((SB a b c)*(SC a b c))/(4×(DeltaMaj a b c)^2) in
        cPointhb h_x_118.
Definition X_119 :=
        let h_x_119 a b c := a/((b-c)*(a/(b-c)+c/(a-b)+b/(-a+c)))+((SB a b c)*(SC a b c))/(4×(DeltaMaj a b c)^2) in
        cPointhb h_x_119.
Definition X_120 :=
        let h_x_120 a b c := (a×b-b^2+a×c-c^2)*(a^2×b+b^3+a^2×c-2×a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_120.
Definition X_121 :=
        let h_x_121 a b c := (-2×a+b+c)*(b^3+c^3-2×b×c*(b+c)+a*(b^2+c^2)) in
        cPointhb h_x_121.
Definition X_122 :=
        let h_x_122 a b c := (SA a b c)^2×((SB a b c)-(SC a b c))^2*((SB a b c)*(SC a b c)-2×(DeltaMaj a b c)^2) in
        cPointhb h_x_122.
Definition X_123 :=
        let h_x_123 a b c := (b-c)^2*(-a+b+c)*(SA a b c)*(-a^2×b×c+a×b^2×c+a×b×c^2-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_123.
Definition X_124 :=
        let h_x_124 a b c := (b-c)^2*(-a+b+c)*(a×b×c+(b+c)*(-b×c+2*(SA a b c))) in
        cPointhb h_x_124.
Definition X_125 :=
        let h_x_125 a b c := (b^2-c^2)^2*(SA a b c) in
        cPointhb h_x_125.
Definition X_126 :=
        let h_x_126 a b c := (2*(SA a b c)-a^2)*((SA a b c)^2-(SB a b c)^2+(SB a b c)*(SC a b c)-(SC a b c)^2) in
        cPointhb h_x_126.
Definition X_127 :=
        let h_x_127 a b c := (b^2-c^2)^2*(SA a b c)*(-a^4+b^4+c^4) in
        cPointhb h_x_127.
Definition X_128 :=
        let h_x_128 a b c := (b^2×c^2-4×(SA a b c)^2)*((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+2*(SB a b c)*(SC a b c))*(3×(SA a b c)^2×(SB a b c)^2-3*(SA a b c)*(SB a b c)^3+6×(SA a b c)^2*(SB a b c)*(SC a b c)-(SA a b c)*(SB a b c)^2*(SC a b c)-3×(SB a b c)^3*(SC a b c)+3×(SA a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)*(SC a b c)^2+2×(SB a b c)^2×(SC a b c)^2-3*(SA a b c)*(SC a b c)^3-3*(SB a b c)*(SC a b c)^3) in
        cPointhb h_x_128.
Definition X_129 :=
        let h_x_129 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^8-2×a^6×b^2+a^4×b^4-2×a^6×c^2+a^4×b^2×c^2+b^6×c^2+a^4×c^4-2×b^4×c^4+b^2×c^6)*(a^8×b^4-4×a^6×b^6+6×a^4×b^8-4×a^2×b^10+b^12-2×a^4×b^6×c^2+4×a^2×b^8×c^2-2×b^10×c^2+a^8×c^4-2×a^4×b^4×c^4+b^8×c^4-4×a^6×c^6-2×a^4×b^2×c^6+6×a^4×c^8+4×a^2×b^2×c^8+b^4×c^8-4×a^2×c^10-2×b^2×c^10+c^12) in
        cPointhb h_x_129.
Definition X_130 :=
        let h_x_130 a b c := a^2×(SA a b c)^2×((SB a b c)-(SC a b c))^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2+3*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_130.
Definition X_131 :=
        let h_x_131 a b c := (SA a b c)*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c)))*(a^4×(SA a b c)^2-(SB a b c)*((SB a b c)-(SC a b c))^2*(SC a b c)-a^2*(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_131.
Definition X_132 :=
        let h_x_132 a b c := (SB a b c)*(SC a b c)*(-(SA a b c)^2+(SB a b c)*(SC a b c))*(-a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_132.
Definition X_133 :=
        let h_x_133 a b c := (SB a b c)*(SC a b c)*((SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2))*(3*(SB a b c)*(SC a b c)-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_133.
Definition X_134 :=
        let h_x_134 a b c := a^2×(b-c)^2×(b+c)^2*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4)^2*(a^12-4×a^10×b^2+6×a^8×b^4-4×a^6×b^6+a^4×b^8-4×a^10×c^2+5×a^8×b^2×c^2+2×a^6×b^4×c^2-4×a^4×b^6×c^2+2×a^2×b^8×c^2-b^10×c^2+6×a^8×c^4+2×a^6×b^2×c^4+2×a^4×b^4×c^4-2×a^2×b^6×c^4+4×b^8×c^4-4×a^6×c^6-4×a^4×b^2×c^6-2×a^2×b^4×c^6-6×b^6×c^6+a^4×c^8+2×a^2×b^2×c^8+4×b^4×c^8-b^2×c^10) in
        cPointhb h_x_134.
Definition X_135 :=
        let h_x_135 a b c := (SB a b c)*((SB a b c)-(SC a b c))^2*(SC a b c)*((a^2-(SA a b c))*(SA a b c)+(SB a b c)*(SC a b c))*(a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c))+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_135.
Definition X_136 :=
        let h_x_136 a b c := (SB a b c)*(SC a b c)*((SB a b c)-(SC a b c))^2*((SA a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_136.
Definition X_137 :=
        let h_x_137 a b c := ((SB a b c)-(SC a b c))^2*(4×(DeltaMaj a b c)^2+(SB a b c)*(SC a b c))*(-(SA a b c)^2+12×(DeltaMaj a b c)^2) in
        cPointhb h_x_137.
Definition X_138 :=
        let h_x_138 a b c := (SB a b c)*(SC a b c)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*((SB a b c)^2×(SC a b c)^2+(SA a b c)*(SB a b c)*(SC a b c)*(c^2+(SC a b c))-2×(SA a b c)^2*((SB a b c)^2+(SC a b c)^2))*(2×a^2*(SA a b c)*(SB a b c)*(SC a b c)+2×(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+4*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_138.
Definition X_139 :=
        let h_x_139 a b c := (SB a b c)*((SB a b c)-(SC a b c))^2*(SC a b c)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*((SA a b c)^3*(-a^4*(SA a b c)+(SB a b c)^3)+2×(SA a b c)^2×(SB a b c)^3*(SC a b c)+(SA a b c)*(2×a^2+(SA a b c))*(SB a b c)^2×(SC a b c)^2+((SA a b c)^3+2×(SA a b c)^2*(SB a b c)+(SB a b c)^3)*(SC a b c)^3)*((SA a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_139.
Definition X_140 :=
        let h_x_140 a b c := 12×(DeltaMaj a b c)^2-(SB a b c)*(SC a b c) in
        cPointhb h_x_140.
Definition X_141 :=
        let h_x_141 a b c := b^2+c^2 in
        cPointhb h_x_141.
Definition X_142 :=
        let h_x_142 a b c := a×b+a×c-(b-c)^2 in
        cPointhb h_x_142.
Definition X_143 :=
        let h_x_143 a b c := a^2*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)*(-(SA a b c)^2+12×(DeltaMaj a b c)^2) in
        cPointhb h_x_143.
Definition X_144 :=
        let h_x_144 a b c := 1/(a-b-c)+1/(a-b+c)+1/(a+b-c) in
        cPointhb h_x_144.
Definition X_145 :=
        let h_x_145 a b c := 3×a-b-c in
        cPointhb h_x_145.
Definition X_146 :=
        let h_x_146 a b c := a^4×(SA a b c)^3-8*(SA a b c)*(SB a b c)^2×(SC a b c)^2+a^2*(3×(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*(-3×(SB a b c)^2+5*(SB a b c)*(SC a b c)-3×(SC a b c)^2)) in
        cPointhb h_x_146.
Definition X_147 :=
        let h_x_147 a b c := a^2*(SA a b c)*((SA a b c)^2-(SB a b c)^2-(SC a b c)^2)-(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)+(SB a b c)*(SC a b c)*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_147.
Definition X_148 :=
        let h_x_148 a b c := a^4-(b^2-c^2)^2+b^2×c^2-a^2×b^2-a^2×c^2 in
        cPointhb h_x_148.
Definition X_149 :=
        let h_x_149 a b c := b^3+c^3-a^3+(a^2-b×c)*(b+c)+a*(b×c-b^2-c^2) in
        cPointhb h_x_149.
Definition X_150 :=
        let h_x_150 a b c := a^4-a^3×b+a×b^3-b^4-a^3×c+a^2×b×c-a×b^2×c+b^3×c-a×b×c^2+a×c^3+b×c^3-c^4 in
        cPointhb h_x_150.
Definition X_151 :=
        let h_x_151 a b c := 1-(2×a^2)/((a-b-c)*(b-c)*(a^2/((a-b-c)*(b-c))+c^2/((-a+b)*(a+b-c))+b^2/((a-c)*(a-b+c))))-((SB a b c)*(SC a b c))/(2×(DeltaMaj a b c)^2) in
        cPointhb h_x_151.
Definition X_152 :=
        let h_x_152 a b c := 1-(2×a^2)/((b-c)*(a^2/(b-c)+c^2/(a-b)+b^2/(-a+c)))-((SB a b c)*(SC a b c))/(2×(DeltaMaj a b c)^2) in
        cPointhb h_x_152.
Definition X_153 :=
        let h_x_153 a b c := 1-(2×a)/((b-c)*(a/(b-c)+c/(a-b)+b/(-a+c)))-((SB a b c)*(SC a b c))/(2×(DeltaMaj a b c)^2) in
        cPointhb h_x_153.
Definition X_154 :=
        let h_x_154 a b c := a^2*((SB a b c)*(SC a b c)-2×(DeltaMaj a b c)^2) in
        cPointhb h_x_154.
Definition X_155 :=
        let h_x_155 a b c := a^2*(SA a b c)*(a^2*((SA a b c)^2-(SB a b c)*(SC a b c))-(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_155.
Definition X_156 :=
        let h_x_156 a b c := a^2*(a^2×(SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c)*(a^2+4*(SA a b c))+2×(SB a b c)^2×(SC a b c)^2-3×(SA a b c)^2*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_156.
Definition X_157 :=
        let h_x_157 a b c := a^2*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_157.
Definition X_158 :=
        let h_x_158 a b c := 1/(a×(SA a b c)^2) in
        cPointhb h_x_158.
Definition X_159 :=
        let h_x_159 a b c := a^2*(a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c))-(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_159.
Definition X_160 :=
        let h_x_160 a b c := a^4*(-(SA a b c)*(a^2+3*(SA a b c))+(SB a b c)*(SC a b c)) in
        cPointhb h_x_160.
Definition X_161 :=
        let h_x_161 a b c := a^2*(-a^4×(SA a b c)^3+a^2×(SB a b c)^2×(SC a b c)^2+4*(SA a b c)*(SB a b c)^2×(SC a b c)^2-a^2×(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_161.
Definition X_162 :=
        let h_x_162 a b c := a/(2*(SA a b c)*((SB a b c)-(SC a b c))) in
        cPointhb h_x_162.
Definition X_163 :=
        let h_x_163 a b c := a^3/(b^2-c^2) in
        cPointhb h_x_163.
Definition X_164 :=
        let h_x_164 a b c := a*(sqrt(((sa a b c)*(sb a b c))/(a×b))+sqrt(((sa a b c)*(sc a b c))/(a×c))-sqrt(((sb a b c)*(sc a b c))/(b×c))) in
        cPointhb h_x_164.
Definition X_165 :=
        let h_x_165 a b c := a*(-a^2-b×c+a*(b+c)+SA a b c) in
        cPointhb h_x_165.
Definition X_166 :=
        let h_x_166 a b c := a*(1/((sc a b c)*(sqrt(a*(s a b c)*(sa a b c))+sqrt(b*(s a b c)*(sb a b c))-sqrt(c*(s a b c)*(sc a b c))))+1/((sb a b c)*(sqrt(a*(s a b c)*(sa a b c))-sqrt(b*(s a b c)*(sb a b c))+sqrt(c*(s a b c)*(sc a b c))))-1/((sa a b c)*(-sqrt(a*(s a b c)*(sa a b c))+sqrt(b*(s a b c)*(sb a b c))+sqrt(c*(s a b c)*(sc a b c))))) in
        cPointhb h_x_166.
Definition X_167 :=
        let h_x_167 a b c := a*(-c*(a×sqrt(((sa a b c)*(sc a b c))/(a×c))-b×sqrt(((sb a b c)*(sc a b c))/(b×c)))*(2*(-a+c)*(sb a b c)*sqrt(((sa a b c)*(sc a b c))/(a×c))+2*(sa a b c)*(sc a b c)*(-sqrt((((sa a b c)*(sb a b c))/(a×b)))+sqrt(((sb a b c)*(sc a b c))/(b×c))))+b*(-a×sqrt(((sa a b c)*(sb a b c))/(a×b))+c×sqrt(((sb a b c)*(sc a b c))/(b×c)))*(2*(a-b)*sqrt(((sa a b c)*(sb a b c))/(a×b))*(sc a b c)+ (- a×b+ (SC a b c))*(-sqrt((((sa a b c)*(sc a b c))/(a×c)))+sqrt(((sb a b c)*(sc a b c))/(b×c))))) in
        cPointhb h_x_167.
Definition X_168 :=
        let h_x_168 a b c := a*(-a*(c×sqrt(((s a b c)*(sb a b c))/(a×c))*((sa a b c)-(sc a b c))+b*(c×sqrt(((s a b c)*(sa a b c))/(b×c))+((sa a b c)-(sb a b c))*sqrt(((s a b c)*(sc a b c))/(a×b))))+2*(sa a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_168.
Definition X_169 :=
        let h_x_169 a b c := a*(a^3-a^2×b+a×b^2-b^3-a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_169.
Definition X_170 :=
        let h_x_170 a b c := a*(a^5×b-4×a^4×b^2+6×a^3×b^3-4×a^2×b^4+a×b^5+a^5×c-a^4×b×c-2×a^3×b^2×c+2×a^2×b^3×c+a×b^4×c-b^5×c-4×a^4×c^2-2×a^3×b×c^2+4×a^2×b^2×c^2-2×a×b^3×c^2+4×b^4×c^2+6×a^3×c^3+2×a^2×b×c^3-2×a×b^2×c^3-6×b^3×c^3-4×a^2×c^4+a×b×c^4+4×b^2×c^4+a×c^5-b×c^5) in
        cPointhb h_x_170.
Definition X_171 :=
        let h_x_171 a b c := a^3+a×b×c in
        cPointhb h_x_171.
Definition X_172 :=
        let h_x_172 a b c := a^4+a^2×b×c in
        cPointhb h_x_172.
Definition X_173 :=
        let h_x_173 a b c := a*(-sqrt((((s a b c)*(sa a b c))/(b×c)))+sqrt(((s a b c)*(sb a b c))/(a×c))+sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_173.
Definition X_174 :=
        let h_x_174 a b c := sqrt(((sb a b c)*(sc a b c))/(b×c)) in
        cPointhb h_x_174.
Definition X_175 :=
        let h_x_175 a b c := (sb a b c)*(sc a b c)*(a×sa a b c-DeltaMaj a b c) in
        cPointhb h_x_175.
Definition X_176 :=
        let h_x_176 a b c := (sb a b c)*(sc a b c)*(a*(sa a b c)+(DeltaMaj a b c)) in
        cPointhb h_x_176.
Definition X_177 :=
        let h_x_177 a b c := sqrt(a)*(sqrt(c*(s a b c)*(sb a b c))*(sc a b c)+(sb a b c)*sqrt(b*(s a b c)*(sc a b c))) in
        cPointhb h_x_177.
Definition X_178 :=
        let h_x_178 a b c := sqrt(((s a b c)*(sb a b c))/(a×c))+sqrt(((s a b c)*(sc a b c))/(a×b)) in
        cPointhb h_x_178.
Definition X_179 :=
        let h_x_179 a b c := sec((A a b c)/4)^4*(sin(A a b c)) in
        cPointhb h_x_179.
Definition X_180 :=
        let h_x_180 a b c := (1/(-1-2×cos((B a b c)/4)^2×cos((C a b c)/4)^2×sec((A a b c)/4)^2)+1/(1+2×cos((A a b c)/4)^2×cos((C a b c)/4)^2×sec((B a b c)/4)^2)+1/(1+2×cos((A a b c)/4)^2×cos((B a b c)/4)^2×sec((C a b c)/4)^2))*(sin(A a b c)) in
        cPointhb h_x_180.
Definition X_181 :=
        let h_x_181 a b c := a^2*(a+b-c)*(a-b+c)*(b+c)^2 in
        cPointhb h_x_181.
Definition X_182 :=
        let h_x_182 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_182.
Definition X_183 :=
        let h_x_183 a b c := a^4-a^2×b^2-a^2×c^2-2×b^2×c^2 in
        cPointhb h_x_183.
Definition X_184 :=
        let h_x_184 a b c := a^4*(SA a b c) in
        cPointhb h_x_184.
Definition X_185 :=
        let h_x_185 a b c := a^2*(SA a b c)*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_185.
Definition X_186 :=
        let h_x_186 a b c := a^2*(b^2×c^2-4×(SA a b c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_186.
Definition X_187 :=
        let h_x_187 a b c := a^2*(2×a^2-b^2-c^2) in
        cPointhb h_x_187.
Definition X_188 :=
        let h_x_188 a b c := a×sqrt((b×c)/((sb a b c)*(sc a b c))) in
        cPointhb h_x_188.
Definition X_189 :=
        let h_x_189 a b c := 1/(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_189.
Definition X_190 :=
        let h_x_190 a b c := 1/(b-c) in
        cPointhb h_x_190.
Definition X_191 :=
        let h_x_191 a b c := a*(-a^3+b^3+c^3+(-a+b+c)*(a×b+a×c+b×c)) in
        cPointhb h_x_191.
Definition X_192 :=
        let h_x_192 a b c := c×a+a×b-b×c in
        cPointhb h_x_192.
Definition X_193 :=
        let h_x_193 a b c := -(SA a b c)+(SB a b c)+(SC a b c) in
        cPointhb h_x_193.
Definition X_194 :=
        let h_x_194 a b c := a^2×b^2+a^2×c^2-b^2×c^2 in
        cPointhb h_x_194.
Definition X_195 :=
        let h_x_195 a b c := a^2*(-3×(SA a b c)^3*(SB a b c)+5×(SA a b c)^2×(SB a b c)^2-3×(SA a b c)^3*(SC a b c)+6×(SA a b c)^2*(SB a b c)*(SC a b c)+9*(SA a b c)*(SB a b c)^2*(SC a b c)+5×(SA a b c)^2×(SC a b c)^2+9*(SA a b c)*(SB a b c)*(SC a b c)^2+4×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_195.
Definition X_196 :=
        let h_x_196 a b c := (a+b-c)*(a-b+c)*(SB a b c)*(SC a b c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_196.
Definition X_197 :=
        let h_x_197 a b c := a^2*(a×b×c*(a-b-c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_197.
Definition X_198 :=
        let h_x_198 a b c := a^2*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_198.
Definition X_199 :=
        let h_x_199 a b c := a^2*(-a^4-a^3×b+a×b^3+b^4-a^3×c-a^2×b×c+a×b^2×c+b^3×c+a×b×c^2+a×c^3+b×c^3+c^4) in
        cPointhb h_x_199.
Definition X_200 :=
        let h_x_200 a b c := a×(-a+b+c)^2 in
        cPointhb h_x_200.
Definition X_201 :=
        let h_x_201 a b c := a*(a+b-c)*(a-b+c)*(b+c)^2*(SA a b c) in
        cPointhb h_x_201.
Definition X_202 :=
        let h_x_202 a b c := a^2*(2×b×c-(SA a b c)+2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_202.
Definition X_203 :=
        let h_x_203 a b c := a^2*(2×b×c-(SA a b c)-2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_203.
Definition X_204 :=
        let h_x_204 a b c := a*(SB a b c)*(SC a b c)*(-a^2*(SA a b c)+(SB a b c)*(SC a b c)) in
        cPointhb h_x_204.
Definition X_205 :=
        let h_x_205 a b c := a^3*(a×b*(a-b-c)*c+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_205.
Definition X_206 :=
        let h_x_206 a b c := a^4*(-a^4+b^4+c^4) in
        cPointhb h_x_206.
Definition X_207 :=
        let h_x_207 a b c := a*(b×c-(SA a b c))*(SB a b c)*(SC a b c)*(a×b*(SA a b c)*(SB a b c)+a×c*(SA a b c)*(SC a b c)-b×c*(SB a b c)*(SC a b c)-(SA a b c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_207.
Definition X_208 :=
        let h_x_208 a b c := (a*(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)))/((a-b-c)*(SA a b c)) in
        cPointhb h_x_208.
Definition X_209 :=
        let h_x_209 a b c := a^2*(b+c)*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_209.
Definition X_210 :=
        let h_x_210 a b c := a*(b+c)*(b+c-a) in
        cPointhb h_x_210.
Definition X_211 :=
        let h_x_211 a b c := a^4*(a^2+2*(SA a b c))*((a^2-(SA a b c))*(SA a b c)+3*(SB a b c)*(SC a b c)) in
        cPointhb h_x_211.
Definition X_212 :=
        let h_x_212 a b c := a^3*(a-b-c)*(SA a b c) in
        cPointhb h_x_212.
Definition X_213 :=
        let h_x_213 a b c := a^3*(b+c) in
        cPointhb h_x_213.
Definition X_214 :=
        let h_x_214 a b c := a*(2×a-b-c)*(b×c-2*(SA a b c)) in
        cPointhb h_x_214.
Definition X_215 :=
        let h_x_215 a b c := a^4*(a-b-c)*(b×c-2*(SA a b c))^2 in
        cPointhb h_x_215.
Definition X_216 :=
        let h_x_216 a b c := a^2*(SA a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_216.
Definition X_217 :=
        let h_x_217 a b c := a^4*(SA a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_217.
Definition X_218 :=
        let h_x_218 a b c := a^2*(a^2+b^2+c^2-2×a*(b+c)) in
        cPointhb h_x_218.
Definition X_219 :=
        let h_x_219 a b c := a^2*(a-b-c)*(SA a b c) in
        cPointhb h_x_219.
Definition X_220 :=
        let h_x_220 a b c := a^2×(a-b-c)^2 in
        cPointhb h_x_220.
Definition X_221 :=
        let h_x_221 a b c := a^2*(a+b-c)*(a-b+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_221.
Definition X_222 :=
        let h_x_222 a b c := a^2*(a+b-c)*(a-b+c)*(SA a b c) in
        cPointhb h_x_222.
Definition X_223 :=
        let h_x_223 a b c := a*(-a+b-c)*(-a-b+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_223.
Definition X_224 :=
        let h_x_224 a b c := a*(SA a b c)*(a^3×b-a×b^3+a^3×c+a^2×b×c-a×c^3-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_224.
Definition X_225 :=
        let h_x_225 a b c := ((b+c)*(SB a b c)*(SC a b c))/(a-b-c) in
        cPointhb h_x_225.
Definition X_226 :=
        let h_x_226 a b c := (b+c)/(b+c-a) in
        cPointhb h_x_226.
Definition X_227 :=
        let h_x_227 a b c := a*(-a+b-c)*(-a-b+c)*(b+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_227.
Definition X_228 :=
        let h_x_228 a b c := a^3*(b+c)*(SA a b c) in
        cPointhb h_x_228.
Definition X_229 :=
        let h_x_229 a b c := a*(a+b)*(a+c)*(a^2×b×c+a×b^2×c+a×b×c^2+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_229.
Definition X_230 :=
        let h_x_230 a b c := a^2*(SA a b c)-(SB a b c)^2-(SC a b c)^2 in
        cPointhb h_x_230.
Definition X_231 :=
        let h_x_231 a b c := 6×a^4×(SA a b c)^2-2×a^2*(SA a b c)*(3×(SB a b c)^2-2*(SB a b c)*(SC a b c)+3×(SC a b c)^2)-2*(SB a b c)*(SC a b c)*(3×(SB a b c)^2-2*(SB a b c)*(SC a b c)+3×(SC a b c)^2) in
        cPointhb h_x_231.
Definition X_232 :=
        let h_x_232 a b c := a^2*(SB a b c)*(SC a b c)*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_232.
Definition X_233 :=
        let h_x_233 a b c := ((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)*(-(SB a b c)*(SC a b c)+12×(DeltaMaj a b c)^2) in
        cPointhb h_x_233.
Definition X_234 :=
        let h_x_234 a b c := (s a b c)^2*(sb a b c)*(sc a b c)*(sqrt(((s a b c)*(sb a b c))/(a×c))+sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_234.
Definition X_235 :=
        let h_x_235 a b c := (SB a b c)*(SC a b c)*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_235.
Definition X_236 :=
        let h_x_236 a b c := sqrt(((s a b c)*(sa a b c))/(b×c))*(sqrt(((s a b c)*(sa a b c))/(b×c))-sqrt(((s a b c)*(sb a b c))/(a×c))-sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_236.
Definition X_237 :=
        let h_x_237 a b c := a^4*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_237.
Definition X_238 :=
        let h_x_238 a b c := a^3-a×b×c in
        cPointhb h_x_238.
Definition X_239 :=
        let h_x_239 a b c := a^2-b×c in
        cPointhb h_x_239.
Definition X_240 :=
        let h_x_240 a b c := a*(SB a b c)*(SC a b c)*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_240.
Definition X_241 :=
        let h_x_241 a b c := (a*(a×b-b^2+a×c-c^2))/(2*(a-b-c)) in
        cPointhb h_x_241.
Definition X_242 :=
        let h_x_242 a b c := (a^2-b×c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_242.
Definition X_243 :=
        let h_x_243 a b c := (a-b-c)*(SB a b c)*(SC a b c)*(a^2×b×c-b×c*(b^2+c^2)+2*((SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_243.
Definition X_244 :=
        let h_x_244 a b c := a×(b-c)^2 in
        cPointhb h_x_244.
Definition X_245 :=
        let h_x_245 a b c := a×(b-c)^2*(b+c)*(a^7-2×a^5×b^2+a^4×b^3+a^3×b^4-2×a^2×b^5+b^7-a^5×b×c+a^4×b^2×c+a^3×b^3×c-2×a^2×b^4×c+b^6×c-2×a^5×c^2+a^4×b×c^2+3×a^3×b^2×c^2-a×b^4×c^2+a^4×c^3+a^3×b×c^3-a×b^3×c^3+a^3×c^4-2×a^2×b×c^4-a×b^2×c^4-2×a^2×c^5+b×c^6+c^7) in
        cPointhb h_x_245.
Definition X_246 :=
        let h_x_246 a b c := 2×a^2×((SB a b c)-(SC a b c))^2*(3×(SA a b c)^4-(SB a b c)^2×(SC a b c)^2+a^2*(-3×(SA a b c)^3+(SA a b c)*(SB a b c)*(SC a b c))+2×(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_246.
Definition X_247 :=
        let h_x_247 a b c := ((SB a b c)-(SC a b c))^2*(-a^2*((SA a b c)^4+2×(SA a b c)^2*(SB a b c)*(SC a b c)-(SB a b c)^2×(SC a b c)^2)+(SA a b c)*((SB a b c)*(SC a b c)*((SB a b c)^2-4*(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^2*((SB a b c)^2+4*(SB a b c)*(SC a b c)+(SC a b c)^2))) in
        cPointhb h_x_247.
Definition X_248 :=
        let h_x_248 a b c := a^2*(SA a b c)*(-(SB a b c)^2+(SA a b c)*(SC a b c))*((SA a b c)*(SB a b c)-(SC a b c)^2) in
        cPointhb h_x_248.
Definition X_249 :=
        let h_x_249 a b c := a^2/(b^2-c^2)^2 in
        cPointhb h_x_249.
Definition X_250 :=
        let h_x_250 a b c := a^2*(SB a b c)*(-(SA a b c)+(SB a b c))^2×((SA a b c)-(SC a b c))^2*(SC a b c) in
        cPointhb h_x_250.
Definition X_251 :=
        let h_x_251 a b c := a^2/(b^2+c^2) in
        cPointhb h_x_251.
Definition X_252 :=
        let h_x_252 a b c := 1/(((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)*(-(SA a b c)^2+12×(DeltaMaj a b c)^2)) in
        cPointhb h_x_252.
Definition X_253 :=
        let h_x_253 a b c := 1/((SB a b c)*(SC a b c)-2×(DeltaMaj a b c)^2) in
        cPointhb h_x_253.
Definition X_254 :=
        let h_x_254 a b c := 1/((SA a b c)*(a^2*((SA a b c)^2-(SB a b c)*(SC a b c))-(SA a b c)*((SB a b c)^2+(SC a b c)^2))) in
        cPointhb h_x_254.
Definition X_255 :=
        let h_x_255 a b c := a^3×(SA a b c)^2 in
        cPointhb h_x_255.
Definition X_256 :=
        let h_x_256 a b c := a/(a^2+b×c) in
        cPointhb h_x_256.
Definition X_257 :=
        let h_x_257 a b c := 1/(a^2+b×c) in
        cPointhb h_x_257.
Definition X_258 :=
        let h_x_258 a b c := a/(sqrt(((s a b c)*(sa a b c))/(b×c))-sqrt(((s a b c)*(sb a b c))/(a×c))-sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_258.
Definition X_259 :=
        let h_x_259 a b c := a^2×sqrt((b×c)/((sb a b c)*(sc a b c))) in
        cPointhb h_x_259.
Definition X_260 :=
        let h_x_260 a b c := (a^2×sqrt((b×c)/((sb a b c)*(sc a b c))))/(sqrt(((s a b c)*(sb a b c))/(a×c))+sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_260.
Definition X_261 :=
        let h_x_261 a b c := (-a+b+c)/(b+c)^2 in
        cPointhb h_x_261.
Definition X_262 :=
        let h_x_262 a b c := 1/(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_262.
Definition X_263 :=
        let h_x_263 a b c := a^2/(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_263.
Definition X_264 :=
        let h_x_264 a b c := 1/(a^2*(SA a b c)) in
        cPointhb h_x_264.
Definition X_265 :=
        let h_x_265 a b c := (SA a b c)/(b^2×c^2-4×(SA a b c)^2) in
        cPointhb h_x_265.
Definition X_266 :=
        let h_x_266 a b c := a×sqrt(((sb a b c)*(sc a b c))/(b×c)) in
        cPointhb h_x_266.
Definition X_267 :=
        let h_x_267 a b c := a/(-a^3+b^3+c^3+(-a+b+c)*(a×b+a×c+b×c)) in
        cPointhb h_x_267.
Definition X_268 :=
        let h_x_268 a b c := ( a^2*(a-b-c)*(SA a b c))/(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a×(b+c)^2) in
        cPointhb h_x_268.
Definition X_269 :=
        let h_x_269 a b c := a/(-a+b+c)^2 in
        cPointhb h_x_269.
Definition X_270 :=
        let h_x_270 a b c := (a*(-a+b+c))/((b+c)^2*(SA a b c)) in
        cPointhb h_x_270.
Definition X_271 :=
        let h_x_271 a b c := (a*(a-b-c)*(SA a b c))/(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_271.
Definition X_272 :=
        let h_x_272 a b c := 1/((b+c)*(a^2×b-b^3+a^2×c+a×b×c-c^3)) in
        cPointhb h_x_272.
Definition X_273 :=
        let h_x_273 a b c := 1/(a*(a-b-c)*(SA a b c)) in
        cPointhb h_x_273.
Definition X_274 :=
        let h_x_274 a b c := 1/(a*(b+c)) in
        cPointhb h_x_274.
Definition X_275 :=
        let h_x_275 a b c := ((SB a b c)*(SC a b c))/((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_275.
Definition X_276 :=
        let h_x_276 a b c := 1/(a^2*(SA a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_276.
Definition X_277 :=
        let h_x_277 a b c := 1/(a^2+b^2+c^2-2×a*(b+c)) in
        cPointhb h_x_277.
Definition X_278 :=
        let h_x_278 a b c := 1/((-a+b+c)*(SA a b c)) in
        cPointhb h_x_278.
Definition X_279 :=
        let h_x_279 a b c := 1/(a-b-c)^2 in
        cPointhb h_x_279.
Definition X_280 :=
        let h_x_280 a b c := (-a+b+c)/(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_280.
Definition X_281 :=
        let h_x_281 a b c := 1/((a+b-c)*(a-b+c)*(SA a b c)) in
        cPointhb h_x_281.
Definition X_282 :=
        let h_x_282 a b c := (a*(a-b-c))/(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_282.
Definition X_283 :=
        let h_x_283 a b c := (a^2*(a-b-c))/((b+c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_283.
Definition X_284 :=
        let h_x_284 a b c := (a^2*(-a+b+c))/(b+c) in
        cPointhb h_x_284.
Definition X_285 :=
        let h_x_285 a b c := (a*(a-b-c))/((b+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_285.
Definition X_286 :=
        let h_x_286 a b c := 1/(a*(b+c)*(SA a b c)) in
        cPointhb h_x_286.
Definition X_287 :=
        let h_x_287 a b c := (SA a b c)/((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_287.
Definition X_288 :=
        let h_x_288 a b c := a^2/(((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)*(-(SB a b c)*(SC a b c)+12×(DeltaMaj a b c)^2)) in
        cPointhb h_x_288.
Definition X_289 :=
        let h_x_289 a b c := a^2/(sqrt(((s a b c)*(sa a b c))/(b×c))*(sqrt(((s a b c)*(sa a b c))/(b×c))-sqrt(((s a b c)*(sb a b c))/(a×c))-sqrt(((s a b c)*(sc a b c))/(a×b)))) in
        cPointhb h_x_289.
Definition X_290 :=
        let h_x_290 a b c := 1/(a^2*(a^2×b^2-b^4+a^2×c^2-c^4)) in
        cPointhb h_x_290.
Definition X_291 :=
        let h_x_291 a b c := a/(a^2-b×c) in
        cPointhb h_x_291.
Definition X_292 :=
        let h_x_292 a b c := a^2/(a^2-b×c) in
        cPointhb h_x_292.
Definition X_293 :=
        let h_x_293 a b c := a/((SA a b c)^2*(SB a b c)*(SC a b c)-(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_293.
Definition X_294 :=
        let h_x_294 a b c := (2×a*(a-b-c))/(a×b-b^2+a×c-c^2) in
        cPointhb h_x_294.
Definition X_295 :=
        let h_x_295 a b c := (a^2*(SA a b c))/(a^2-b×c) in
        cPointhb h_x_295.
Definition X_296 :=
        let h_x_296 a b c := (a^2*(SA a b c))/((a-b-c)*(b*(a+b-c)*c*(a-b+c)-2×a^2*(SA a b c))) in
        cPointhb h_x_296.
Definition X_297 :=
        let h_x_297 a b c := (SB a b c)*(SC a b c)*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_297.
Definition X_298 :=
        let h_x_298 a b c := 1/(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_298.
Definition X_299 :=
        let h_x_299 a b c := 1/(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_299.
Definition X_300 :=
        let h_x_300 a b c := 1/(a^2*(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))) in
        cPointhb h_x_300.
Definition X_301 :=
        let h_x_301 a b c := 1/(a^2*(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c))) in
        cPointhb h_x_301.
Definition X_302 :=
        let h_x_302 a b c := (SA a b c)+2×sqrt(3)*(DeltaMaj a b c) in
        cPointhb h_x_302.
Definition X_303 :=
        let h_x_303 a b c := (SA a b c)-2×sqrt(3)*(DeltaMaj a b c) in
        cPointhb h_x_303.
Definition X_304 :=
        let h_x_304 a b c := b×c*(SA a b c) in
        cPointhb h_x_304.
Definition X_305 :=
        let h_x_305 a b c := b^2×c^2*(SA a b c) in
        cPointhb h_x_305.
Definition X_306 :=
        let h_x_306 a b c := (b+c)*(SA a b c) in
        cPointhb h_x_306.
Definition X_307 :=
        let h_x_307 a b c := ((b+c)*(SA a b c))/(-a+b+c) in
        cPointhb h_x_307.
Definition X_308 :=
        let h_x_308 a b c := 1/(a^2*(b^2+c^2)) in
        cPointhb h_x_308.
Definition X_309 :=
        let h_x_309 a b c := 1/(a^2*(SA a b c)-a×b*(SB a b c)+b×c*(SB a b c)-a×c*(SC a b c)+b×c*(SC a b c)) in
        cPointhb h_x_309.
Definition X_310 :=
        let h_x_310 a b c := 1/(a^2*(b+c)) in
        cPointhb h_x_310.
Definition X_311 :=
        let h_x_311 a b c := b^2×c^2*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_311.
Definition X_312 :=
        let h_x_312 a b c := b×c*(-a+b+c) in
        cPointhb h_x_312.
Definition X_313 :=
        let h_x_313 a b c := b^2×c^2*(b+c) in
        cPointhb h_x_313.
Definition X_314 :=
        let h_x_314 a b c := (-a+b+c)/(a*(b+c)) in
        cPointhb h_x_314.
Definition X_315 :=
        let h_x_315 a b c := -a^4+b^4+c^4 in
        cPointhb h_x_315.
Definition X_316 :=
        let h_x_316 a b c := -a^4+b^4-b^2×c^2+c^4 in
        cPointhb h_x_316.
Definition X_317 :=
        let h_x_317 a b c := (SB a b c)*(SC a b c)*((SA a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_317.
Definition X_318 :=
        let h_x_318 a b c := b×c*(-a+b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_318.
Definition X_319 :=
        let h_x_319 a b c := b×c+2*(SA a b c) in
        cPointhb h_x_319.
Definition X_320 :=
        let h_x_320 a b c := b×c-2*(SA a b c) in
        cPointhb h_x_320.
Definition X_321 :=
        let h_x_321 a b c := b×c*(b+c) in
        cPointhb h_x_321.
Definition X_322 :=
        let h_x_322 a b c := b×c*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_322.
Definition X_323 :=
        let h_x_323 a b c := a^2*(b^2×c^2-4×(SA a b c)^2) in
        cPointhb h_x_323.
Definition X_324 :=
        let h_x_324 a b c := b^2×c^2*(SB a b c)*(SC a b c)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_324.
Definition X_325 :=
        let h_x_325 a b c := (SA a b c)^2-(SB a b c)*(SC a b c) in
        cPointhb h_x_325.
Definition X_326 :=
        let h_x_326 a b c := a×(SA a b c)^2 in
        cPointhb h_x_326.
Definition X_327 :=
        let h_x_327 a b c := 1/(a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2)) in
        cPointhb h_x_327.
Definition X_328 :=
        let h_x_328 a b c := 1/(a^2*(b^2×c^2-4×(SA a b c)^2)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_328.
Definition X_329 :=
        let h_x_329 a b c := a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c) in
        cPointhb h_x_329.
Definition X_330 :=
        let h_x_330 a b c := 1/(a×b+a×c-b×c) in
        cPointhb h_x_330.
Definition X_331 :=
        let h_x_331 a b c := 1/(a^2*(a-b-c)*(SA a b c)) in
        cPointhb h_x_331.
Definition X_332 :=
        let h_x_332 a b c := ((a-b-c)*(SA a b c))/(b+c) in
        cPointhb h_x_332.
Definition X_333 :=
        let h_x_333 a b c := (-a+b+c)/(b+c) in
        cPointhb h_x_333.
Definition X_334 :=
        let h_x_334 a b c := 1/(a^3-a×b×c) in
        cPointhb h_x_334.
Definition X_335 :=
        let h_x_335 a b c := 1/(a^2-b×c) in
        cPointhb h_x_335.
Definition X_336 :=
        let h_x_336 a b c := (SA a b c)/(a*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_336.
Definition X_337 :=
        let h_x_337 a b c := (SA a b c)/(a^2-b×c) in
        cPointhb h_x_337.
Definition X_338 :=
        let h_x_338 a b c := b^2×c^2×(b^2-c^2)^2 in
        cPointhb h_x_338.
Definition X_339 :=
        let h_x_339 a b c := b^2×c^2*(SA a b c)*((SB a b c)-(SC a b c))^2 in
        cPointhb h_x_339.
Definition X_340 :=
        let h_x_340 a b c := (b^2×c^2-4×(SA a b c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_340.
Definition X_341 :=
        let h_x_341 a b c := b×c×(-a+b+c)^2 in
        cPointhb h_x_341.
Definition X_342 :=
        let h_x_342 a b c := (a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c))/(a*(a-b-c)*(SA a b c)) in
        cPointhb h_x_342.
Definition X_343 :=
        let h_x_343 a b c := (SA a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_343.
Definition X_344 :=
        let h_x_344 a b c := a^2+b^2+c^2-2×a*(b+c) in
        cPointhb h_x_344.
Definition X_345 :=
        let h_x_345 a b c := (-a+b+c)*(SA a b c) in
        cPointhb h_x_345.
Definition X_346 :=
        let h_x_346 a b c := (a-b-c)^2 in
        cPointhb h_x_346.
Definition X_347 :=
        let h_x_347 a b c := (a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))/(-a+b+c) in
        cPointhb h_x_347.
Definition X_348 :=
        let h_x_348 a b c := (a+b-c)*(a-b+c)*(SA a b c) in
        cPointhb h_x_348.
Definition X_349 :=
        let h_x_349 a b c := (b+c)/(a^2*(-a+b+c)) in
        cPointhb h_x_349.
Definition X_350 :=
        let h_x_350 a b c := -a^2×b×c+b^2×c^2 in
        cPointhb h_x_350.
Definition X_351 :=
        let h_x_351 a b c := a^2*(b^2-c^2)*(b^2+c^2-2×a^2) in
        cPointhb h_x_351.
Definition X_352 :=
        let h_x_352 a b c := a^2*(a^4-4×a^2×b^2+b^4-4×a^2×c^2+5×b^2×c^2+c^4) in
        cPointhb h_x_352.
Definition X_353 :=
        let h_x_353 a b c := a^2*(4×a^4-4×a^2×b^2-2×b^4-4×a^2×c^2-b^2×c^2-2×c^4) in
        cPointhb h_x_353.
Definition X_354 :=
        let h_x_354 a b c := a*(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_354.
Definition X_355 :=
        let h_x_355 a b c := a^3*(SA a b c)-(b+c)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_355.
Definition X_356 :=
        let h_x_356 a b c := (sin(A a b c))*(cos((A a b c)/3)+2×cos((B a b c)/3)×cos((C a b c)/3)) in
        cPointhb h_x_356.
Definition X_357 :=
        let h_x_357 a b c := (sin(A a b c))*sec((A a b c)/3) in
        cPointhb h_x_357.
Definition X_358 :=
        let h_x_358 a b c := (sin(A a b c))*cos((A a b c)/3) in
        cPointhb h_x_358.
Definition X_359 :=
        let h_x_359 a b c := a^2/(A a b c) in
        cPointhb h_x_359.
Definition X_360 :=
        let h_x_360 a b c := A a b c in
        cPointhb h_x_360.
Definition X_361 :=
        let h_x_361 a b c := a*(sqrt((a×b)/((sa a b c)*(sb a b c)))+sqrt((a×c)/((sa a b c)*(sc a b c)))-sqrt((b×c)/((sb a b c)*(sc a b c)))) in
        cPointhb h_x_361.
Definition X_362 :=
        let h_x_362 a b c := a*(-a×sqrt(((s a b c)*(sa a b c))/(b×c))+b×sqrt(((s a b c)*(sb a b c))/(a×c))+c×sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_362.
Definition X_363 :=
        let h_x_363 a b c := a*(c/(1+sqrt(((sa a b c)*(sb a b c))/(a×b)))+b/(1+sqrt(((sa a b c)*(sc a b c))/(a×c)))-a/(1+sqrt(((sb a b c)*(sc a b c))/(b×c)))) in
        cPointhb h_x_363.
Definition X_364 :=
        let h_x_364 a b c := a*(sqrt(b)+sqrt(c)-sqrt(a)) in
        cPointhb h_x_364.
Definition X_365 :=
        let h_x_365 a b c := Rpower a (3/2) in
        cPointhb h_x_365.
Definition X_366 :=
        let h_x_366 a b c := sqrt(a) in
        cPointhb h_x_366.
Definition X_367 :=
        let h_x_367 a b c := a*(sqrt(b)+sqrt(c)) in
        cPointhb h_x_367.
Definition X_371 :=
        let h_x_371 a b c := a^2*((SA a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_371.
Definition X_372 :=
        let h_x_372 a b c := a^2*((SA a b c)-2*(DeltaMaj a b c)) in
        cPointhb h_x_372.
Definition X_373 :=
        let h_x_373 a b c := a^2*(3×a^2*(SA a b c)+2×(SA a b c)^2+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_373.
Definition X_374 :=
        let h_x_374 a b c := a*(a^3×b+a^2×b^2-a×b^3-b^4+a^3×c-6×a^2×b×c+5×a×b^2×c+a^2×c^2+5×a×b×c^2+2×b^2×c^2-a×c^3-c^4) in
        cPointhb h_x_374.
Definition X_375 :=
        let h_x_375 a b c := a^2*(b×c*(b^2+c^2-a*(b+c))+4×a^2*(SA a b c)+2×(SA a b c)^2+6*(SB a b c)*(SC a b c)) in
        cPointhb h_x_375.
Definition X_376 :=
        let h_x_376 a b c := 2×a^2*(SA a b c)-(SB a b c)*(SC a b c) in
        cPointhb h_x_376.
Definition X_377 :=
        let h_x_377 a b c := a×b×c*(a+b+c)+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_377.
Definition X_378 :=
        let h_x_378 a b c := a^2*(SB a b c)*(SC a b c)*(3×(SA a b c)^2+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_378.
Definition X_379 :=
        let h_x_379 a b c := a^5-a×b^4+a^2×b^2×c-b^4×c+a^2×b×c^2+2×a×b^2×c^2+b^3×c^2+b^2×c^3-a×c^4-b×c^4 in
        cPointhb h_x_379.
Definition X_380 :=
        let h_x_380 a b c := a*(a^4-4×a×b×c*(b+c)-4×a^2*(b×c+(SA a b c))-((SB a b c)-(SC a b c))^2) in
        cPointhb h_x_380.
Definition X_381 :=
        let h_x_381 a b c := a^2*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_381.
Definition X_382 :=
        let h_x_382 a b c := a^2*(SA a b c)-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_382.
Definition X_383 :=
        let h_x_383 a b c := (c^2+(SC a b c))*(a^2*(SA a b c)+(SB a b c)*(SC a b c))*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c))-2×sqrt(3)*((SA a b c)^2×(SB a b c)^2+c^2*(SA a b c)*(SC a b c)*(3*(SB a b c)+(SC a b c))+(SB a b c)*(SC a b c)*((SC a b c)^2+c^2*((SB a b c)+3*(SC a b c))))*(DeltaMaj a b c) in
        cPointhb h_x_383.
Definition X_384 :=
        let h_x_384 a b c := a^4+b^2×c^2 in
        cPointhb h_x_384.
Definition X_385 :=
        let h_x_385 a b c := a^4-b^2×c^2 in
        cPointhb h_x_385.
Definition X_386 :=
        let h_x_386 a b c := a^2*((a+b)*(a+c)+2*(SA a b c)) in
        cPointhb h_x_386.
Definition X_387 :=
        let h_x_387 a b c := a^2*(a+c)*(b+c)+(SC a b c)^2 in
        cPointhb h_x_387.
Definition X_388 :=
        let h_x_388 a b c := (a^2+b^2+2×b×c+c^2)/(a-b-c) in
        cPointhb h_x_388.
Definition X_389 :=
        let h_x_389 a b c := a^4×b^2×c^2*(SA a b c)+a^2*((SB a b c)*(SC a b c)-(SA a b c)^2)*4×(DeltaMaj a b c)^2 in
        cPointhb h_x_389.
Definition X_390 :=
        let h_x_390 a b c := (a-b-c)*(3×a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_390.
Definition X_391 :=
        let h_x_391 a b c := (a-b-c)*(3×a+b+c) in
        cPointhb h_x_391.
Definition X_392 :=
        let h_x_392 a b c := a*(a^2×b-b^3+a^2×c-4×a×b×c-b^2×c-b×c^2-c^3) in
        cPointhb h_x_392.
Definition X_393 :=
        let h_x_393 a b c := (SB a b c)^2×(SC a b c)^2 in
        cPointhb h_x_393.
Definition X_394 :=
        let h_x_394 a b c := a^2×(SA a b c)^2 in
        cPointhb h_x_394.
Definition X_395 :=
        let h_x_395 a b c := sqrt(3)×a^2-4*(DeltaMaj a b c) in
        cPointhb h_x_395.
Definition X_396 :=
        let h_x_396 a b c := sqrt(3)×a^2+4*(DeltaMaj a b c) in
        cPointhb h_x_396.
Definition X_397 :=
        let h_x_397 a b c := (SB a b c)*(SC a b c)+sqrt(3)×a^2*(DeltaMaj a b c) in
        cPointhb h_x_397.
Definition X_398 :=
        let h_x_398 a b c := (SB a b c)*(SC a b c)-sqrt(3)×a^2*(DeltaMaj a b c) in
        cPointhb h_x_398.
Definition X_399 :=
        let h_x_399 a b c := a^2*(b^2×c^2*(5×a^2*(SA a b c)-4*(SB a b c)*(SC a b c))-32×(SA a b c)^2×(DeltaMaj a b c)^2) in
        cPointhb h_x_399.
Definition X_400 :=
        let h_x_400 a b c := (sin(A a b c))*csc((A a b c)/4)^4 in
        cPointhb h_x_400.
Definition X_401 :=
        let h_x_401 a b c := a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_401.
Definition X_402 :=
        let h_x_402 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(a^2*(SA a b c)*(SB a b c)*(SC a b c)-(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2-3*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_402.
Definition X_403 :=
        let h_x_403 a b c := (SB a b c)*(SC a b c)*((SA a b c)*((SB a b c)-(SC a b c))^2+a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_403.
Definition X_404 :=
        let h_x_404 a b c := a*(b×c*(a+b+c)-2×a*(SA a b c)) in
        cPointhb h_x_404.
Definition X_405 :=
        let h_x_405 a b c := a*(b×c*(a+b+c)+a*(SA a b c)) in
        cPointhb h_x_405.
Definition X_406 :=
        let h_x_406 a b c := (SB a b c)*(b^3+c^3+2×a*(b×c+(SA a b c))+c*((SA a b c)-(SB a b c))+b*((SA a b c)-(SC a b c)))*(SC a b c) in
        cPointhb h_x_406.
Definition X_407 :=
        let h_x_407 a b c := (b+c)*(a^2+2×b×c+a*(b+c)-2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_407.
Definition X_408 :=
        let h_x_408 a b c := a^3*(b+c)*(-a^2+b^2+c^2)^2*(-a^4×b-a^3×b^2+a^2×b^3+a×b^4-a^4×c-a^2×b^2×c+2×b^4×c-a^3×c^2-a^2×b×c^2-2×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3+a×c^4+2×b×c^4) in
        cPointhb h_x_408.
Definition X_409 :=
        let h_x_409 a b c := a*(a+b)*(a+c)*((a+b-c)*(a-b+c)*(b+c)^2+(a+b)*(a+c)*(-a+b+c)^2) in
        cPointhb h_x_409.
Definition X_410 :=
        let h_x_410 a b c := (a+b)*(a+c)*(SB a b c)*(SC a b c)*(a^2*(a+b-c)*(a-b+c)*(b+c)^2×(SA a b c)^2+b*(a+b)*c*(a+c)*(-a+b+c)^2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_410.
Definition X_411 :=
        let h_x_411 a b c := a*(a^4×b×c+a^5*(b+c)-b×c×(b^2-c^2)^2+a×(b-c)^2*(b+c)*(b^2+c^2)-2×a^3*(b^3+c^3)-4×a^2×(SA a b c)^2) in
        cPointhb h_x_411.
Definition X_412 :=
        let h_x_412 a b c := (-a^5*(b+c)+2×a^3*(b^3+c^3)+a*(-b^5+b^4×c+b×c^4-c^5)+b×c*(a^4-(b-c)^2×(b+c)^2)-4×a^2×(SA a b c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_412.
Definition X_413 :=
        let h_x_413 a b c := a*(a+b)*(a-b-c)^3*(a+c)*(a^4+a^2×b×c+a^3*(b+c)+a×(b-c)^2*(b+c)+(b-c)^2*(b^2+b×c+c^2)) in
        cPointhb h_x_413.
Definition X_414 :=
        let h_x_414 a b c := (a+b)*(a+c)*(sa a b c)^3*(SB a b c)*(SC a b c)*(b^2×(a+c)^2×(SB a b c)^2×(sc a b c)^2-b*(a+b)*c*(a+c)*(sb a b c)*(SB a b c)*(sc a b c)*(SC a b c)+(a+b)^2×c^2×(sb a b c)^2×(SC a b c)^2) in
        cPointhb h_x_414.
Definition X_415 :=
        let h_x_415 a b c := (a+b)*(a+c)*(a^3-2×a^2×b+b^3-2×a^2×c+a×b×c+c^3)*(SB a b c)*(SC a b c) in
        cPointhb h_x_415.
Definition X_416 :=
        let h_x_416 a b c := a*(a+b)*(a+c)*(-a^2×(b+c)^2×(SA a b c)^2*(sb a b c)*(sc a b c)+b*(a+b)*c*(a+c)*(sa a b c)^2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_416.
Definition X_417 :=
        let h_x_417 a b c := a^4×(SA a b c)^3*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_417.
Definition X_418 :=
        let h_x_418 a b c := a^4×(SA a b c)^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_418.
Definition X_419 :=
        let h_x_419 a b c := (a^4-b^2×c^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_419.
Definition X_420 :=
        let h_x_420 a b c := (SB a b c)*(SC a b c)*(-(SA a b c)*(a^2+3*(SA a b c))+(SB a b c)^2+3*(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_420.
Definition X_421 :=
        let h_x_421 a b c := (SB a b c)*(SC a b c)*(a^2*(SA a b c)*((SB a b c)^2+(SC a b c)^2)+(SB a b c)*(SC a b c)*((SB a b c)^2+(SC a b c)^2)-(SA a b c)^2*((SB a b c)^2+4*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_421.
Definition X_422 :=
        let h_x_422 a b c := (a+b)*(a+c)*(a^3+a×b×c-b×c*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_422.
Definition X_423 :=
        let h_x_423 a b c := (a+b)*(a+c)*(a×b+a×c-b×c-2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_423.
Definition X_424 :=
        let h_x_424 a b c := (b+c)*(a^3×b+a^2×b^2-a×b^3-b^4+a^3×c+a^2×c^2-a×c^3-c^4)*(SB a b c)*(SC a b c) in
        cPointhb h_x_424.
Definition X_425 :=
        let h_x_425 a b c := (a+b)*(a+c)*(SB a b c)*(SC a b c)*(-a^6+a^5×b+a^4×b^2-a^3×b^3+a^5×c-a^4×b×c-a^3×b^2×c+b^5×c+a^4×c^2-a^3×b×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2-a^3×c^3+2×a×b^2×c^3-2×b^3×c^3+b×c^5) in
        cPointhb h_x_425.
Definition X_426 :=
        let h_x_426 a b c := a^2×(SA a b c)^3*((SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_426.
Definition X_427 :=
        let h_x_427 a b c := (a^2+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_427.
Definition X_428 :=
        let h_x_428 a b c := (3×a^2+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_428.
Definition X_429 :=
        let h_x_429 a b c := (b+c)*(a*(a+b+c)+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_429.
Definition X_430 :=
        let h_x_430 a b c := (b+c)*(2×a+b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_430.
Definition X_431 :=
        let h_x_431 a b c := (a^4×b-2×a^2×b^3+b^5+a^4×c+2×a^3×b×c+2×a^2×b^2×c-b^4×c+2×a^2×b×c^2-2×a^2×c^3-b×c^4+c^5)/((a+b)*(a+c)*(a^2-b^2-c^2)) in
        cPointhb h_x_431.
Definition X_432 :=
        let h_x_432 a b c := (SB a b c)*(SC a b c)*(b^2×(SB a b c)^2×(b^2*((SB a b c)^2-(SA a b c)*(SC a b c))-(SB a b c)*((SA a b c)^2+(SC a b c)^2))^2+c^2×(SC a b c)^2×((-(SA a b c)^2-(SB a b c)^2)*(SC a b c)+c^2*(-(SA a b c)*(SB a b c)+(SC a b c)^2))^2) in
        cPointhb h_x_432.
Definition X_433 :=
        let h_x_433 a b c := (SB a b c)*(SC a b c)*(c^2×(-((SA a b c)^2+(SB a b c)^2)*(SC a b c)+c^2*((SA a b c)*(SB a b c)-(SC a b c)^2))^2+b^2×(b^2*(-(SB a b c)^2+(SA a b c)*(SC a b c))-(SB a b c)*((SA a b c)^2+(SC a b c)^2))^2) in
        cPointhb h_x_433.
Definition X_434 :=
        let h_x_434 a b c := (SB a b c)*(SC a b c)*(b^2×(5×(SA a b c)^2×(SB a b c)^2-3*(SA a b c)*(SB a b c)^3+9×(SA a b c)^2*(SB a b c)*(SC a b c)+6*(SA a b c)*(SB a b c)^2*(SC a b c)-3×(SB a b c)^3*(SC a b c)+4×(SA a b c)^2×(SC a b c)^2+9*(SA a b c)*(SB a b c)*(SC a b c)^2+5×(SB a b c)^2×(SC a b c)^2)^2+c^2×(4×(SA a b c)^2×(SB a b c)^2+9×(SA a b c)^2*(SB a b c)*(SC a b c)+9*(SA a b c)*(SB a b c)^2*(SC a b c)+5×(SA a b c)^2×(SC a b c)^2+6*(SA a b c)*(SB a b c)*(SC a b c)^2+5×(SB a b c)^2×(SC a b c)^2-3*(SA a b c)*(SC a b c)^3-3*(SB a b c)*(SC a b c)^3)^2) in
        cPointhb h_x_434.
Definition X_435 :=
        let h_x_435 a b c := (SB a b c)*(SC a b c)*(b^2×(-a^2×(SA a b c)^2*(5*(SB a b c)-4*(SC a b c))+a^2*(SA a b c)*(SB a b c)*(3*(SB a b c)-(SC a b c))+(SB a b c)^2*(3*(SB a b c)-5*(SC a b c))*(SC a b c))^2+c^2×((SA a b c)*(SC a b c)^2*(-5*(SA a b c)+3*(SC a b c))+b^2*(SB a b c)*(SC a b c)*(-(SA a b c)+3*(SC a b c))-b^2×(SB a b c)^2*(-4*(SA a b c)+5*(SC a b c)))^2) in
        cPointhb h_x_435.
Definition X_436 :=
        let h_x_436 a b c := (SB a b c)*(SC a b c)*(a^4×(SA a b c)^2+b^2×c^2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_436.
Definition X_437 :=
        let h_x_437 a b c := (SB a b c)*((2×a-b-c)^2×(b×c-2*(SA a b c))^2+(-a+2×b-c)*(-a-b+2×c)*(a×c-2*(SB a b c))*(a×b-2*(SC a b c)))*(SC a b c) in
        cPointhb h_x_437.
Definition X_438 :=
        let h_x_438 a b c := a*((SA a b c)^2*(SB a b c)*(SC a b c)*((SA a b c)*(SB a b c)-c^2*(SC a b c))*(-b^2*(SB a b c)+(SA a b c)*(SC a b c))+(SB a b c)^2×(SC a b c)^2×(-a^2*(SA a b c)+(SB a b c)*(SC a b c))^2)*sqrt((SA a b c)^2+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_438.
Definition X_439 :=
        let h_x_439 a b c := (3×a^2-b^2-c^2)^2 in
        cPointhb h_x_439.
Definition X_440 :=
        let h_x_440 a b c := (b+c)*(SA a b c)*(2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_440.
Definition X_441 :=
        let h_x_441 a b c := (SA a b c)*(-a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_441.
Definition X_442 :=
        let h_x_442 a b c := (b+c)*(a^2×b-b^3+a^2×c+2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_442.
Definition X_443 :=
        let h_x_443 a b c := a×b×c*(a+b+c)+(SB a b c)*(SC a b c) in
        cPointhb h_x_443.
Definition X_444 :=
        let h_x_444 a b c := a*(a^2+b×c)*(a*(a+b+c)+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_444.
Definition X_445 :=
        let h_x_445 a b c := (2×a×b×c+a^2*(b+c)-(b-c)^2*(b+c))*(b×c+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_445.
Definition X_446 :=
        let h_x_446 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-c^4)*(a^8×b^2-2×a^6×b^4+a^4×b^6+a^8×c^2+2×a^2×b^6×c^2+b^8×c^2-2×a^6×c^4-4×a^2×b^4×c^4-b^6×c^4+a^4×c^6+2×a^2×b^2×c^6-b^4×c^6+b^2×c^8) in
        cPointhb h_x_446.
Definition X_447 :=
        let h_x_447 a b c := (a+b)*(a+c)*(SB a b c)*(SC a b c)*(a^4-a^3×b+a×b^3-b^4-a^3×c+a^2×b×c+a×b^2×c-b^3×c+a×b×c^2+a×c^3-b×c^3-c^4) in
        cPointhb h_x_447.
Definition X_448 :=
        let h_x_448 a b c := -b*(a+b)*(a+b-c)*c*(a+c)*(a-b+c)*(b+c)^2+a^2×(a+b)^2×(a+c)^2×(-a+b+c)^2 in
        cPointhb h_x_448.
Definition X_449 :=
        let h_x_449 a b c := (a-b-c)^2×(3×a^3+3×a^2×b+a×b^2+b^3+3×a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2+c^3)^2-(-a+b-c)*(-a-b+c)*(a^3+a^2×b+3×a×b^2+3×b^3-a^2×c+2×a×b×c+3×b^2×c-a×c^2+b×c^2+c^3)*(a^3-a^2×b-a×b^2+b^3+a^2×c+2×a×b×c+b^2×c+3×a×c^2+3×b×c^2+3×c^3) in
        cPointhb h_x_449.
Definition X_450 :=
        let h_x_450 a b c := -a^4×(SA a b c)^4*(SB a b c)*(SC a b c)+b^2×c^2×(SB a b c)^3×(SC a b c)^3 in
        cPointhb h_x_450.
Definition X_451 :=
        let h_x_451 a b c := (SB a b c)*(SC a b c)*(-a^3-a^2×b+a×b^2+b^3-a^2×c+a×b×c+b^2×c+a×c^2+b×c^2+c^3) in
        cPointhb h_x_451.
Definition X_452 :=
        let h_x_452 a b c := (a-b-c)*(3×a^3+3×a^2×b+a×b^2+b^3+3×a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_452.
Definition X_453 :=
        let h_x_453 a b c := a*(a+b)*(a+c)*(b+c-a)*(b*(SB a b c)+c*(SC a b c)-a*(SA a b c))^2 in
        cPointhb h_x_453.
Definition X_454 :=
        let h_x_454 a b c := a^2*(SA a b c)*(a^2*((SA a b c)^2-(SB a b c)*(SC a b c))-(SA a b c)*((SB a b c)^2+(SC a b c)^2))^2 in
        cPointhb h_x_454.
Definition X_455 :=
        let h_x_455 a b c := a^2*(SB a b c)*(SC a b c)*(a^2*((SA a b c)^2-(SB a b c)*(SC a b c))+(SA a b c)*((SB a b c)^2+(SC a b c)^2))^2 in
        cPointhb h_x_455.
Definition X_456 :=
        let h_x_456 a b c := a^2*(SB a b c)*(SC a b c)*((SA a b c)^2*(3*(SA a b c)-5*(SB a b c))*(SB a b c)+3×c^2*(SA a b c)*((SA a b c)-3*(SB a b c))*(SC a b c)-c^2*(5*(SA a b c)+4*(SB a b c))*(SC a b c)^2)^2 in
        cPointhb h_x_456.
Definition X_457 :=
        let h_x_457 a b c := a^2*(SB a b c)*(SC a b c)*(-3×(SA a b c)^3*(SB a b c)-4×c^2*(SB a b c)*(SC a b c)^2+c^2*(SA a b c)*(SC a b c)*((SB a b c)+5*(SC a b c))+(SA a b c)^2*(5×(SB a b c)^2-3×c^2*(SC a b c)))^2 in
        cPointhb h_x_457.
Definition X_458 :=
        let h_x_458 a b c := (SB a b c)*(SC a b c)*(2×a^2*(SA a b c)+(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_458.
Definition X_459 :=
        let h_x_459 a b c := 1/((SA a b c)*((SS a b c)^2-2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_459.
Definition X_460 :=
        let h_x_460 a b c := (SB a b c)*(SC a b c)*(-a^2*(SA a b c)+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_460.
Definition X_461 :=
        let h_x_461 a b c := (-a+b+c)*(3×a+b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_461.
Definition X_462 :=
        let h_x_462 a b c := (SB a b c)*(SC a b c)*(sqrt(3)×a^2-4*(DeltaMaj a b c)) in
        cPointhb h_x_462.
Definition X_463 :=
        let h_x_463 a b c := (SB a b c)*(SC a b c)*(sqrt(3)×a^2+4*(DeltaMaj a b c)) in
        cPointhb h_x_463.
Definition X_464 :=
        let h_x_464 a b c := (SA a b c)*(a^2*(a+c)*(b+c)+(SC a b c)^2) in
        cPointhb h_x_464.
Definition X_465 :=
        let h_x_465 a b c := (SA a b c)*((SB a b c)*(SC a b c)+sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_465.
Definition X_466 :=
        let h_x_466 a b c := (SA a b c)*((SB a b c)*(SC a b c)-sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_466.
Definition X_467 :=
        let h_x_467 a b c := (SB a b c)*(SC a b c)*((a^2-(SA a b c))*(SA a b c)+(SB a b c)*(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_467.
Definition X_468 :=
        let h_x_468 a b c := (SB a b c)*(SC a b c)*(a^2-2*(SA a b c)) in
        cPointhb h_x_468.
Definition X_469 :=
        let h_x_469 a b c := (a^2+a×b+a×c+b×c+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_469.
Definition X_470 :=
        let h_x_470 a b c := (SB a b c)*(SC a b c)*(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_470.
Definition X_471 :=
        let h_x_471 a b c := (SB a b c)*(SC a b c)*(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c)) in
        cPointhb h_x_471.
Definition X_472 :=
        let h_x_472 a b c := (SB a b c)*(SC a b c)*(2×sqrt(3)*(DeltaMaj a b c) - (SA a b c)) in
        cPointhb h_x_472.
Definition X_473 :=
        let h_x_473 a b c := (SB a b c)*(SC a b c)*(2×sqrt(3)*(DeltaMaj a b c) + (SA a b c)) in
        cPointhb h_x_473.
Definition X_474 :=
        let h_x_474 a b c := a*(b×c*(a+b+c)-a×SA a b c) in
        cPointhb h_x_474.
Definition X_475 :=
        let h_x_475 a b c := (a^3+a^2×b-a×b^2-b^3+a^2×c+2×a×b×c-b^2×c-a×c^2-b×c^2-c^3)*(SB a b c)*(SC a b c) in
        cPointhb h_x_475.
Definition X_476 :=
        let h_x_476 a b c := 1/((-a^2×b+b^3)^2-a^4×c^2+2×a^2×c^4-c^6) in
        cPointhb h_x_476.
Definition X_477 :=
        let h_x_477 a b c := 1/(2×(SB a b c)^2×(SC a b c)^2+a^2*(SA a b c)*((SA a b c)^2-(SB a b c)*(SC a b c))+(SA a b c)^2*(-3×(SB a b c)^2+4*(SB a b c)*(SC a b c)-3×(SC a b c)^2)) in
        cPointhb h_x_477.
Definition X_478 :=
        let h_x_478 a b c := a^2*(a+b-c)*(a-b+c)*(a×b*(a-b-c)*c+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_478.
Definition X_479 :=
        let h_x_479 a b c := 1/(b+c-a)^3 in
        cPointhb h_x_479.
Definition X_480 :=
        let h_x_480 a b c := a^2×(-a+b+c)^3 in
        cPointhb h_x_480.
Definition X_481 :=
        let h_x_481 a b c := a-(4*(DeltaMaj a b c))/(-a+b+c) in
        cPointhb h_x_481.
Definition X_482 :=
        let h_x_482 a b c := a+(4*(DeltaMaj a b c))/(-a+b+c) in
        cPointhb h_x_482.
Definition X_483 :=
        let h_x_483 a b c := sec((A a b c)/4)^2*(sin(A a b c)) in
        cPointhb h_x_483.
Definition X_484 :=
        let h_x_484 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c-a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_484.
Definition X_485 :=
        let h_x_485 a b c := ((SB a b c)+2*(DeltaMaj a b c))*((SC a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_485.
Definition X_486 :=
        let h_x_486 a b c := ((SB a b c)-2*(DeltaMaj a b c))*((SC a b c)-2*(DeltaMaj a b c)) in
        cPointhb h_x_486.
Definition X_487 :=
        let h_x_487 a b c := a^2*(SA a b c)-(SB a b c)*(SC a b c)-4*(DeltaMaj a b c)*((SA a b c)-(DeltaMaj a b c)) in
        cPointhb h_x_487.
Definition X_488 :=
        let h_x_488 a b c := a^2*(SA a b c)-(SB a b c)*(SC a b c)+4*(DeltaMaj a b c)*((SA a b c)+(DeltaMaj a b c)) in
        cPointhb h_x_488.
Definition X_489 :=
        let h_x_489 a b c := a^2*(SA a b c)-(SB a b c)*(SC a b c)-2*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_489.
Definition X_490 :=
        let h_x_490 a b c := a^2*(SA a b c)-(SB a b c)*(SC a b c)+2*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_490.
Definition X_491 :=
        let h_x_491 a b c := (SA a b c)-2*(DeltaMaj a b c) in
        cPointhb h_x_491.
Definition X_492 :=
        let h_x_492 a b c := (SA a b c)+2*(DeltaMaj a b c) in
        cPointhb h_x_492.
Definition X_493 :=
        let h_x_493 a b c := a^2/(a^2+2*(DeltaMaj a b c)) in
        cPointhb h_x_493.
Definition X_494 :=
        let h_x_494 a b c := a^2/(a^2-2*(DeltaMaj a b c)) in
        cPointhb h_x_494.
Definition X_495 :=
        let h_x_495 a b c := a^2×b^2-b^4+4×a^2×b×c+a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_495.
Definition X_496 :=
        let h_x_496 a b c := a^2×b^2-b^4-4×a^2×b×c+a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_496.
Definition X_497 :=
        let h_x_497 a b c := (a-b-c)*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_497.
Definition X_498 :=
        let h_x_498 a b c := a^4-2×a^2×b^2+b^4-2×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_498.
Definition X_499 :=
        let h_x_499 a b c := a^4-2×a^2×b^2+b^4+2×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_499.
Definition X_500 :=
        let h_x_500 a b c := a^2*(a^2-b^2-b×c-c^2)*(a^2×b-b^3+a^2×c+2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_500.
Definition X_501 :=
        let h_x_501 a b c := a^2*(a+b)*(a+c)*(a^3+a^2×b-a×b^2-b^3+a^2×c-a×b×c-b^2×c-a×c^2-b×c^2-c^3) in
        cPointhb h_x_501.
Definition X_502 :=
        let h_x_502 a b c := 1/((a+b)*(a+c)*(a^3+a^2×b-a×b^2-b^3+a^2×c-a×b×c-b^2×c-a×c^2-b×c^2-c^3)) in
        cPointhb h_x_502.
Definition X_503 :=
        let h_x_503 a b c := a*(-sqrt(((b×c)/((s a b c)*(sa a b c))))+sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c)))) in
        cPointhb h_x_503.
Definition X_504 :=
        let h_x_504 a b c := a*(c×sqrt(((sa a b c)*(sb a b c))/(a×b))+b×sqrt(((sa a b c)*(sc a b c))/(a×c))-a×sqrt(((sb a b c)*(sc a b c))/(b×c))) in
        cPointhb h_x_504.
Definition X_505 :=
        let h_x_505 a b c := a/(sqrt(((sa a b c)*(sb a b c))/(a×b))+sqrt(((sa a b c)*(sc a b c))/(a×c))-sqrt(((sb a b c)*(sc a b c))/(b×c))) in
        cPointhb h_x_505.
Definition X_506 :=
        let h_x_506 a b c := (Rpower a (2/3))/((Rpower (s a b c) (1/3))*(Rpower (sa a b c) (1/3))) in
        cPointhb h_x_506.
Definition X_507 :=
        let h_x_507 a b c := (Rpower a (3/4))/((Rpower (s a b c) (1/4))*(Rpower (sa a b c) (1/4))) in
        cPointhb h_x_507.
Definition X_508 :=
        let h_x_508 a b c := sqrt(1/((s a b c)*(sa a b c))) in
        cPointhb h_x_508.
Definition X_509 :=
        let h_x_509 a b c := a×sqrt(1/((s a b c)*(sa a b c))) in
        cPointhb h_x_509.
Definition X_510 :=
        let h_x_510 a b c := a*(Rpower b (3/2))+(Rpower c (3/2))-(Rpower a (3/2)) in
        cPointhb h_x_510.
Definition X_511 :=
        let h_x_511 a b c := a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_511.
Definition X_512 :=
        let h_x_512 a b c := a^2*(b^2-c^2) in
        cPointhb h_x_512.
Definition X_513 :=
        let h_x_513 a b c := a*(b-c) in
        cPointhb h_x_513.
Definition X_514 :=
        let h_x_514 a b c := b-c in
        cPointhb h_x_514.
Definition X_515 :=
        let h_x_515 a b c := a^3*(SA a b c)-(b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_515.
Definition X_516 :=
        let h_x_516 a b c := 2×a^3-a^2*(b+c)-(b-c)^2*(b+c) in
        cPointhb h_x_516.
Definition X_517 :=
        let h_x_517 a b c := a*(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_517.
Definition X_518 :=
        let h_x_518 a b c := a*(a×b+a×c-b^2-c^2) in
        cPointhb h_x_518.
Definition X_519 :=
        let h_x_519 a b c := 2×a-b-c in
        cPointhb h_x_519.
Definition X_520 :=
        let h_x_520 a b c := a^2×(SA a b c)^2*(-(SB a b c)+(SC a b c)) in
        cPointhb h_x_520.
Definition X_521 :=
        let h_x_521 a b c := a*(a-b-c)*(b-c)*(SA a b c) in
        cPointhb h_x_521.
Definition X_522 :=
        let h_x_522 a b c := (a-b-c)*(b-c) in
        cPointhb h_x_522.
Definition X_523 :=
        let h_x_523 a b c := b^2-c^2 in
        cPointhb h_x_523.
Definition X_524 :=
        let h_x_524 a b c := 2×a^2-b^2-c^2 in
        cPointhb h_x_524.
Definition X_525 :=
        let h_x_525 a b c := (b^2-c^2)*(SA a b c) in
        cPointhb h_x_525.
Definition X_526 :=
        let h_x_526 a b c := a^2*((-a^2×b+b^3)^2-a^4×c^2+2×a^2×c^4-c^6) in
        cPointhb h_x_526.
Definition X_527 :=
        let h_x_527 a b c := a^2+2×b×c-a*(b+c)-2*(SA a b c) in
        cPointhb h_x_527.
Definition X_528 :=
        let h_x_528 a b c := 2×a^3-2×a^2×b+a×b^2-b^3-2×a^2×c+b^2×c+a×c^2+b×c^2-c^3 in
        cPointhb h_x_528.
Definition X_529 :=
        let h_x_529 a b c := a*(-b×c*(-2×a+b+c)-a*(SA a b c))+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_529.
Definition X_530 :=
        let h_x_530 a b c := 3*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))+2×sqrt(3)*(2*(SA a b c)-a^2)*(DeltaMaj a b c) in
        cPointhb h_x_530.
Definition X_531 :=
        let h_x_531 a b c := 3*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))-2×sqrt(3)*(2*(SA a b c)-a^2)*(DeltaMaj a b c) in
        cPointhb h_x_531.
Definition X_532 :=
        let h_x_532 a b c := a^2*(SA a b c)-2*(SB a b c)*(SC a b c)+2×sqrt(3)*(-a^2+2*(SA a b c))*(DeltaMaj a b c) in
        cPointhb h_x_532.
Definition X_533 :=
        let h_x_533 a b c := a^2*(SA a b c)-2*(SB a b c)*(SC a b c)-2×sqrt(3)*(-a^2+2*(SA a b c))*(DeltaMaj a b c) in
        cPointhb h_x_533.
Definition X_534 :=
        let h_x_534 a b c := -2×a^5+b^5+c^5-c×((SA a b c)-(SB a b c))^2-b×((SA a b c)-(SC a b c))^2+2×a×((SB a b c)-(SC a b c))^2 in
        cPointhb h_x_534.
Definition X_535 :=
        let h_x_535 a b c := a*(b×c*(-2×a+b+c)+2×a*(SA a b c))-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_535.
Definition X_536 :=
        let h_x_536 a b c := a×b+a×c-2×b×c in
        cPointhb h_x_536.
Definition X_537 :=
        let h_x_537 a b c := 2×a^3-b^3-c^3+4×a*(SA a b c)-2×b*(SB a b c)-2×c*(SC a b c) in
        cPointhb h_x_537.
Definition X_538 :=
        let h_x_538 a b c := -2×(SA a b c)^2+(SB a b c)^2+(SC a b c)^2 in
        cPointhb h_x_538.
Definition X_539 :=
        let h_x_539 a b c := (SA a b c)*(3×a^4×(SA a b c)^2+(SB a b c)*(SC a b c)*(-3×(SB a b c)^2+2*(SB a b c)*(SC a b c)-3×(SC a b c)^2)-a^2*(SA a b c)*(3×(SB a b c)^2-2*(SB a b c)*(SC a b c)+3×(SC a b c)^2)) in
        cPointhb h_x_539.
Definition X_540 :=
        let h_x_540 a b c := -2×a^4-2×a^3×b+a×b^3+b^4-2×a^3×c-2×a^2×b×c+a×b^2×c+b^3×c+a×b×c^2+a×c^3+b×c^3+c^4 in
        cPointhb h_x_540.
Definition X_541 :=
        let h_x_541 a b c := -a^4×(SA a b c)^3+(SA a b c)*(SB a b c)*(SC a b c)*((SB a b c)^2+10*(SB a b c)*(SC a b c)+(SC a b c)^2)+a^2*(5×(SA a b c)^2×((SB a b c)-(SC a b c))^2-4×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_541.
Definition X_542 :=
        let h_x_542 a b c := -a^2*((SA a b c)^2+(SB a b c)*(SC a b c))+2*(SA a b c)*((SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_542.
Definition X_543 :=
        let h_x_543 a b c := 2*(a^2-(SA a b c))*(SA a b c)+(SB a b c)^2-4*(SB a b c)*(SC a b c)+(SC a b c)^2 in
        cPointhb h_x_543.
Definition X_544 :=
        let h_x_544 a b c := 2×a^4-2×a^3×b+a×b^3-b^4-2×a^3×c+2×a^2×b×c-a×b^2×c+b^3×c-a×b×c^2+a×c^3+b×c^3-c^4 in
        cPointhb h_x_544.
Definition X_545 :=
        let h_x_545 a b c := (a-2×b)*(a-2×c)-2*(SA a b c) in
        cPointhb h_x_545.
Definition X_546 :=
        let h_x_546 a b c := a^2*(SA a b c)+6*(SB a b c)*(SC a b c) in
        cPointhb h_x_546.
Definition X_547 :=
        let h_x_547 a b c := 7×a^2*(SA a b c)+10*(SB a b c)*(SC a b c) in
        cPointhb h_x_547.
Definition X_548 :=
        let h_x_548 a b c := 5×a^2*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_548.
Definition X_549 :=
        let h_x_549 a b c := 5×a^2*(SA a b c)+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_549.
Definition X_550 :=
        let h_x_550 a b c := 3×a^2*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_550.
Definition X_551 :=
        let h_x_551 a b c := 4×a+b+c in
        cPointhb h_x_551.
Definition X_552 :=
        let h_x_552 a b c := 1/((b+c)^2*(-a+b+c)) in
        cPointhb h_x_552.
Definition X_553 :=
        let h_x_553 a b c := (2×a+b+c)/(b+c-a) in
        cPointhb h_x_553.
Definition X_554 :=
        let h_x_554 a b c := 1/((sa a b c)*((sb a b c)*(sc a b c)+sqrt(3)*(DeltaMaj a b c))) in
        cPointhb h_x_554.
Definition X_555 :=
        let h_x_555 a b c := 1/(sqrt(a)*(Rpower (s a b c) (3/2))*(Rpower (sa a b c) (3/2))) in
        cPointhb h_x_555.
Definition X_556 :=
        let h_x_556 a b c := sqrt((b×c)/((sb a b c)*(sc a b c))) in
        cPointhb h_x_556.
Definition X_557 :=
        let h_x_557 a b c := cos((A a b c)/4)^2 in
        cPointhb h_x_557.
Definition X_558 :=
        let h_x_558 a b c := sin((A a b c)/4)^2 in
        cPointhb h_x_558.
Definition X_559 :=
        let h_x_559 a b c := a*(b×c-(SA a b c)+2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_559.
Definition X_560 :=
        let h_x_560 a b c := a^5 in
        cPointhb h_x_560.
Definition X_561 :=
        let h_x_561 a b c := 1/a^3 in
        cPointhb h_x_561.
Definition X_562 :=
        let h_x_562 a b c := (b^2×c^2-4×(SA a b c)^2)/((SA a b c)*((SA a b c)^2-12×(DeltaMaj a b c)^2)) in
        cPointhb h_x_562.
Definition X_563 :=
        let h_x_563 a b c := a^5*(SA a b c)*((SA a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_563.
Definition X_564 :=
        let h_x_564 a b c := b×c*(a^4×(SA a b c)^2-a^2*(SA a b c)*((SB a b c)-(SC a b c))^2+(SB a b c)*(SC a b c)*(-((SB a b c)-(SC a b c))^2+16×(DeltaMaj a b c)^2)) in
        cPointhb h_x_564.
Definition X_565 :=
        let h_x_565 a b c := b^2×c^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*(a^4×(SA a b c)^2-a^2*(SA a b c)*((SB a b c)-3*(SC a b c))*(3*(SB a b c)-(SC a b c))-(SB a b c)*((SB a b c)-3*(SC a b c))*(3*(SB a b c)-(SC a b c))*(SC a b c)) in
        cPointhb h_x_565.
Definition X_566 :=
        let h_x_566 a b c := a^2*(a^2*(5×(SA a b c)^2+(SB a b c)*(SC a b c))+(SA a b c)*((SB a b c)^2+10*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_566.
Definition X_567 :=
        let h_x_567 a b c := a^2*(a^8-3×a^6×b^2+3×a^4×b^4-a^2×b^6-3×a^6×c^2+3×a^4×b^2×c^2+2×a^2×b^4×c^2-2×b^6×c^2+3×a^4×c^4+2×a^2×b^2×c^4+4×b^4×c^4-a^2×c^6-2×b^2×c^6) in
        cPointhb h_x_567.
Definition X_568 :=
        let h_x_568 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-a^4×b^2×c^2-2×a^2×b^4×c^2+2×b^6×c^2-3×a^4×c^4-2×a^2×b^2×c^4-2×b^4×c^4+3×a^2×c^6+2×b^2×c^6-c^8) in
        cPointhb h_x_568.
Definition X_569 :=
        let h_x_569 a b c := a^2*(a^8-3×a^6×b^2+3×a^4×b^4-a^2×b^6-3×a^6×c^2+2×a^4×b^2×c^2+3×a^2×b^4×c^2-2×b^6×c^2+3×a^4×c^4+3×a^2×b^2×c^4+4×b^4×c^4-a^2×c^6-2×b^2×c^6) in
        cPointhb h_x_569.
Definition X_570 :=
        let h_x_570 a b c := a^2*(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2-2×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_570.
Definition X_571 :=
        let h_x_571 a b c := a^4*(SA a b c)*(a^4×(SA a b c)^2-b^4×(SB a b c)^2-c^4×(SC a b c)^2) in
        cPointhb h_x_571.
Definition X_572 :=
        let h_x_572 a b c := a^2*(-b×c*(-a+b+c)-2×a*(SA a b c)) in
        cPointhb h_x_572.
Definition X_573 :=
        let h_x_573 a b c := a^2*(a^2×b-b^3+a^2×c-a×b×c-c^3) in
        cPointhb h_x_573.
Definition X_574 :=
        let h_x_574 a b c := a^2*(2×b^2+2×c^2-a^2) in
        cPointhb h_x_574.
Definition X_575 :=
        let h_x_575 a b c := a^2*(4×a^2*(SA a b c)+(SA a b c)^2+3*(SB a b c)*(SC a b c)) in
        cPointhb h_x_575.
Definition X_576 :=
        let h_x_576 a b c := a^2*(a^4-3×a^2×b^2+2×b^4-3×a^2×c^2-2×b^2×c^2+2×c^4) in
        cPointhb h_x_576.
Definition X_577 :=
        let h_x_577 a b c := a^4×(SA a b c)^2 in
        cPointhb h_x_577.
Definition X_578 :=
        let h_x_578 a b c := a^2*(a^8-3×a^6×b^2+3×a^4×b^4-a^2×b^6-3×a^6×c^2+4×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2+3×a^4×c^4+a^2×b^2×c^4+4×b^4×c^4-a^2×c^6-2×b^2×c^6) in
        cPointhb h_x_578.
Definition X_579 :=
        let h_x_579 a b c := a^2*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_579.
Definition X_580 :=
        let h_x_580 a b c := a^2*(a^5-2×a^3×b^2+a×b^4-a^3×b×c-a^2×b^2×c+a×b^3×c+b^4×c-2×a^3×c^2-a^2×b×c^2-b^3×c^2+a×b×c^3-b^2×c^3+a×c^4+b×c^4) in
        cPointhb h_x_580.
Definition X_581 :=
        let h_x_581 a b c := a^2*(a^4×b-2×a^2×b^3+b^5+a^4×c+a^3×b×c-a^2×b^2×c-a×b^3×c-a^2×b×c^2-2×a×b^2×c^2-b^3×c^2-2×a^2×c^3-a×b×c^3-b^2×c^3+c^5) in
        cPointhb h_x_581.
Definition X_582 :=
        let h_x_582 a b c := a^2*(a^5-2×a^3×b^2+a×b^4-2×a^3×b×c-a^2×b^2×c+2×a×b^3×c+b^4×c-2×a^3×c^2-a^2×b×c^2-b^3×c^2+2×a×b×c^3-b^2×c^3+a×c^4+b×c^4) in
        cPointhb h_x_582.
Definition X_583 :=
        let h_x_583 a b c := a^2*(a^2×b-b^3+a^2×c+2×a×b×c-c^3) in
        cPointhb h_x_583.
Definition X_584 :=
        let h_x_584 a b c := a^2*(a^3-a×b^2-2×a×b×c-b^2×c-a×c^2-b×c^2) in
        cPointhb h_x_584.
Definition X_585 :=
        let h_x_585 a b c := -a+b+c+2*(-(1/a)+1/b+1/c)*(DeltaMaj a b c) in
        cPointhb h_x_585.
Definition X_586 :=
        let h_x_586 a b c := -a+b+c-2*(-(1/a)+1/b+1/c)*(DeltaMaj a b c) in
        cPointhb h_x_586.
Definition X_587 :=
        let h_x_587 a b c := (SB a b c)*(SC a b c)*(b^3+c^3+2×a*(SA a b c)+b*(SA a b c)+c*(SA a b c)-c*(SB a b c)-b*(SC a b c))+(2×a-2*(b+c))*(SB a b c)*(SC a b c)*(DeltaMaj a b c) in
        cPointhb h_x_587.
Definition X_588 :=
        let h_x_588 a b c := a^2/(a^2+4*(DeltaMaj a b c)) in
        cPointhb h_x_588.
Definition X_589 :=
        let h_x_589 a b c := a^2/(a^2-4*(DeltaMaj a b c)) in
        cPointhb h_x_589.
Definition X_590 :=
        let h_x_590 a b c := a^2+4*(DeltaMaj a b c) in
        cPointhb h_x_590.
Definition X_591 :=
        let h_x_591 a b c := 2×a^2-b^2-c^2-4*(DeltaMaj a b c) in
        cPointhb h_x_591.
Definition X_592 :=
        let h_x_592 a b c := a^2/(2*(SB a b c)*(a^2+(SB a b c))*(SC a b c)*(a^2+(SC a b c))+a^2*(SA a b c)*((SA a b c)^2+3×(SB a b c)^2+17*(SB a b c)*(SC a b c)+3×(SC a b c)^2)+(SA a b c)^2*(7×(SB a b c)^2+16*(SB a b c)*(SC a b c)+7×(SC a b c)^2)) in
        cPointhb h_x_592.
Definition X_593 :=
        let h_x_593 a b c := (a/(b+c))^2 in
        cPointhb h_x_593.
Definition X_594 :=
        let h_x_594 a b c := (b+c)^2 in
        cPointhb h_x_594.
Definition X_595 :=
        let h_x_595 a b c := a^2*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_595.
Definition X_596 :=
        let h_x_596 a b c := 1/(a^2+a×b+a×c-b×c) in
        cPointhb h_x_596.
Definition X_597 :=
        let h_x_597 a b c := 4×a^2+b^2+c^2 in
        cPointhb h_x_597.
Definition X_598 :=
        let h_x_598 a b c := 1/(a^2-2×b^2-2×c^2) in
        cPointhb h_x_598.
Definition X_599 :=
        let h_x_599 a b c := a^2-2×b^2-2×c^2 in
        cPointhb h_x_599.
Definition X_600 :=
        let h_x_600 a b c := a^2*(b×c+2*(SS a b c))*(a×b*(a-b-c)*c+2*(a^2-b^2-c^2)*(SS a b c)) in
        cPointhb h_x_600.
Definition X_601 :=
        let h_x_601 a b c := a^3*(b×c*(SA a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_601.
Definition X_602 :=
        let h_x_602 a b c := a^3*(b×c*(SA a b c)-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_602.
Definition X_603 :=
        let h_x_603 a b c := a^3*(a+b-c)*(a-b+c)*(SA a b c) in
        cPointhb h_x_603.
Definition X_604 :=
        let h_x_604 a b c := a^3*(a+b-c)*(a-b+c) in
        cPointhb h_x_604.
Definition X_605 :=
        let h_x_605 a b c := a^3*(b×c+2*(DeltaMaj a b c)) in
        cPointhb h_x_605.
Definition X_606 :=
        let h_x_606 a b c := a^3*(b×c-2*(DeltaMaj a b c)) in
        cPointhb h_x_606.
Definition X_607 :=
        let h_x_607 a b c := a^2*(a-b-c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_607.
Definition X_608 :=
        let h_x_608 a b c := a^2*(a+b-c)*(a-b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_608.
Definition X_609 :=
        let h_x_609 a b c := a^2*(2×a^2+b×c) in
        cPointhb h_x_609.
Definition X_610 :=
        let h_x_610 a b c := a*(-a^2*(SA a b c)+(SB a b c)*(SC a b c)) in
        cPointhb h_x_610.
Definition X_611 :=
        let h_x_611 a b c := a^2*(b×c*(a^2+b^2+c^2)+8×(DeltaMaj a b c)^2) in
        cPointhb h_x_611.
Definition X_612 :=
        let h_x_612 a b c := a*(a^2+b^2+c^2+2×b×c) in
        cPointhb h_x_612.
Definition X_613 :=
        let h_x_613 a b c := a^2*(b×c*(a^2+b^2+c^2)-8×(DeltaMaj a b c)^2) in
        cPointhb h_x_613.
Definition X_614 :=
        let h_x_614 a b c := a*(a^2+b^2+c^2-2×b×c) in
        cPointhb h_x_614.
Definition X_615 :=
        let h_x_615 a b c := a^2-4*(DeltaMaj a b c) in
        cPointhb h_x_615.
Definition X_616 :=
        let h_x_616 a b c := (SB a b c)*(SC a b c)-2*(SA a b c)*(a^2+sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_616.
Definition X_617 :=
        let h_x_617 a b c := (SB a b c)*(SC a b c)-2*(SA a b c)*(a^2-sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_617.
Definition X_618 :=
        let h_x_618 a b c := 5×a^2*(SA a b c)+2*(SB a b c)*(SC a b c)+2×sqrt(3)*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_618.
Definition X_619 :=
        let h_x_619 a b c := 5×a^2*(SA a b c)+2*(SB a b c)*(SC a b c)-2×sqrt(3)*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_619.
Definition X_620 :=
        let h_x_620 a b c := b^4+c^4-4×a^2*(SA a b c) in
        cPointhb h_x_620.
Definition X_621 :=
        let h_x_621 a b c := sqrt(3)*(SB a b c)*(SC a b c)+2*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_621.
Definition X_622 :=
        let h_x_622 a b c := sqrt(3)*(SB a b c)*(SC a b c)-2*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_622.
Definition X_623 :=
        let h_x_623 a b c := sqrt(3)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))+2*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_623.
Definition X_624 :=
        let h_x_624 a b c := sqrt(3)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))-2*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_624.
Definition X_625 :=
        let h_x_625 a b c := a^2*(b^2+c^2)-2*(b^4-b^2×c^2+c^4) in
        cPointhb h_x_625.
Definition X_626 :=
        let h_x_626 a b c := b^4+c^4 in
        cPointhb h_x_626.
Definition X_627 :=
        let h_x_627 a b c := (SB a b c)*(SC a b c)+2*(SA a b c)*(a^2+sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_627.
Definition X_628 :=
        let h_x_628 a b c := (SB a b c)*(SC a b c)+2*(SA a b c)*(a^2-sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_628.
Definition X_629 :=
        let h_x_629 a b c := 7×a^2*(SA a b c)+6*(SB a b c)*(SC a b c)+2×sqrt(3)*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_629.
Definition X_630 :=
        let h_x_630 a b c := 7×a^2*(SA a b c)+6*(SB a b c)*(SC a b c)-2×sqrt(3)*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_630.
Definition X_631 :=
        let h_x_631 a b c := 2×a^2*(SA a b c)+(SB a b c)*(SC a b c) in
        cPointhb h_x_631.
Definition X_632 :=
        let h_x_632 a b c := 7×a^2*(SA a b c)+6*(SB a b c)*(SC a b c) in
        cPointhb h_x_632.
Definition X_633 :=
        let h_x_633 a b c := (SB a b c)*(SC a b c)+2×sqrt(3)*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_633.
Definition X_634 :=
        let h_x_634 a b c := (SB a b c)*(SC a b c)-2×sqrt(3)*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_634.
Definition X_635 :=
        let h_x_635 a b c := a^2*(SA a b c)+2*(SB a b c)*(SC a b c)+2×sqrt(3)*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_635.
Definition X_636 :=
        let h_x_636 a b c := a^2*(SA a b c)+2*(SB a b c)*(SC a b c)-2×sqrt(3)*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_636.
Definition X_637 :=
        let h_x_637 a b c := (SB a b c)*(SC a b c)+2*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_637.
Definition X_638 :=
        let h_x_638 a b c := (SB a b c)*(SC a b c)-2*(SA a b c)*(DeltaMaj a b c) in
        cPointhb h_x_638.
Definition X_639 :=
        let h_x_639 a b c := a^2*(SA a b c)+2*(SB a b c)*(SC a b c)+2*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_639.
Definition X_640 :=
        let h_x_640 a b c := a^2*(SA a b c)+2*(SB a b c)*(SC a b c)-2*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_640.
Definition X_641 :=
        let h_x_641 a b c := 2*(SB a b c)*(SC a b c)+3×a^2*(SA a b c)+2*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_641.
Definition X_642 :=
        let h_x_642 a b c := 3×a^2*(SA a b c)+2*(SB a b c)*(SC a b c)-2*(b^2+c^2)*(DeltaMaj a b c) in
        cPointhb h_x_642.
Definition X_643 :=
        let h_x_643 a b c := (a*(-a+b+c))/(b^2-c^2) in
        cPointhb h_x_643.
Definition X_644 :=
        let h_x_644 a b c := (a*(-a+b+c))/(b-c) in
        cPointhb h_x_644.
Definition X_645 :=
        let h_x_645 a b c := (b+c-a)/(b^2-c^2) in
        cPointhb h_x_645.
Definition X_646 :=
        let h_x_646 a b c := (b+c-a)/(a*(b-c)) in
        cPointhb h_x_646.
Definition X_647 :=
        let h_x_647 a b c := a^2*(b^2-c^2)*(SA a b c) in
        cPointhb h_x_647.
Definition X_648 :=
        let h_x_648 a b c := (-(SA a b c)+(SB a b c))*((SA a b c)-(SC a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_648.
Definition X_649 :=
        let h_x_649 a b c := a^2*(b-c) in
        cPointhb h_x_649.
Definition X_650 :=
        let h_x_650 a b c := a*(b-c)*(b+c-a) in
        cPointhb h_x_650.
Definition X_651 :=
        let h_x_651 a b c := a/((b-c)*(-a+b+c)) in
        cPointhb h_x_651.
Definition X_652 :=
        let h_x_652 a b c := a^2*(a-b-c)*(b-c)*(SA a b c) in
        cPointhb h_x_652.
Definition X_653 :=
        let h_x_653 a b c := 1/((a-b-c)*(b-c)*(SA a b c)) in
        cPointhb h_x_653.
Definition X_654 :=
        let h_x_654 a b c := a^2*(a-b-c)*(b-c)*(b×c-2*(SA a b c)) in
        cPointhb h_x_654.
Definition X_655 :=
        let h_x_655 a b c := 1/((a-b-c)*(b-c)*(b×c-2*(SA a b c))) in
        cPointhb h_x_655.
Definition X_656 :=
        let h_x_656 a b c := a*(SA a b c)*((SB a b c)-(SC a b c)) in
        cPointhb h_x_656.
Definition X_657 :=
        let h_x_657 a b c := a^2×(a-b-c)^2*(b-c) in
        cPointhb h_x_657.
Definition X_658 :=
        let h_x_658 a b c := 1/((a-b-c)^2*(b-c)) in
        cPointhb h_x_658.
Definition X_659 :=
        let h_x_659 a b c := a*(a^2-b×c)*(b-c) in
        cPointhb h_x_659.
Definition X_660 :=
        let h_x_660 a b c := a/((b-c)*(a^2-b×c)) in
        cPointhb h_x_660.
Definition X_661 :=
        let h_x_661 a b c := a*(b^2-c^2) in
        cPointhb h_x_661.
Definition X_662 :=
        let h_x_662 a b c := a/(b^2-c^2) in
        cPointhb h_x_662.
Definition X_663 :=
        let h_x_663 a b c := a^2*(b-c)*(-a+b+c) in
        cPointhb h_x_663.
Definition X_664 :=
        let h_x_664 a b c := 1/((a-b-c)*(b-c)) in
        cPointhb h_x_664.
Definition X_665 :=
        let h_x_665 a b c := a^2*((a-b)^2*(a+b-c)-(-a+c)^2*(a-b+c)) in
        cPointhb h_x_665.
Definition X_666 :=
        let h_x_666 a b c := (a-b)*(a-c)*(a^2+b^2-a×c-b×c)*(a^2-a×b-b×c+c^2) in
        cPointhb h_x_666.
Definition X_667 :=
        let h_x_667 a b c := a^3*(b-c) in
        cPointhb h_x_667.
Definition X_668 :=
        let h_x_668 a b c := 1/(a*(b-c)) in
        cPointhb h_x_668.
Definition X_669 :=
        let h_x_669 a b c := a^4*(b^2-c^2) in
        cPointhb h_x_669.
Definition X_670 :=
        let h_x_670 a b c := 1/(a^2*(b^2-c^2)) in
        cPointhb h_x_670.
Definition X_671 :=
        let h_x_671 a b c := 1/(2×a^2-b^2-c^2) in
        cPointhb h_x_671.
Definition X_672 :=
        let h_x_672 a b c := a^2*(b^2+c^2-a*(b+c)) in
        cPointhb h_x_672.
Definition X_673 :=
        let h_x_673 a b c := 1/(b^2+c^2-a*(b+c)) in
        cPointhb h_x_673.
Definition X_674 :=
        let h_x_674 a b c := a^2*(b^3+c^3-a*(b^2+c^2)) in
        cPointhb h_x_674.
Definition X_675 :=
        let h_x_675 a b c := 1/(b^3+c^3-a*(b^2+c^2)) in
        cPointhb h_x_675.
Definition X_676 :=
        let h_x_676 a b c := (b-c)*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_676.
Definition X_677 :=
        let h_x_677 a b c := a^2/((b-c)*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)) in
        cPointhb h_x_677.
Definition X_678 :=
        let h_x_678 a b c := a×(b+c-2×a)^2 in
        cPointhb h_x_678.
Definition X_679 :=
        let h_x_679 a b c := a/(-2×a+b+c)^2 in
        cPointhb h_x_679.
Definition X_680 :=
        let h_x_680 a b c := a^3×(SA a b c)^2*(-b^3×(SB a b c)^2+c^3×(SC a b c)^2) in
        cPointhb h_x_680.
Definition X_681 :=
        let h_x_681 a b c := 1/(a×(SA a b c)^2*(-b^3×(SB a b c)^2+c^3×(SC a b c)^2)) in
        cPointhb h_x_681.
Definition X_682 :=
        let h_x_682 a b c := a^4*(SA a b c)*(a^2*(SA a b c)+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_682.
Definition X_683 :=
        let h_x_683 a b c := b^2×c^2*(SB a b c)*(SC a b c)*((SA a b c)*((SA a b c)+(SB a b c))+a^2*(SC a b c))*(a^2*(SB a b c)+(SA a b c)*((SA a b c)+(SC a b c))) in
        cPointhb h_x_683.
Definition X_684 :=
        let h_x_684 a b c := a^2*(b^2+c^2+c^4/(-a^2+b^2)+b^4/(-a^2+c^2)) in
        cPointhb h_x_684.
Definition X_685 :=
        let h_x_685 a b c := 1/((-b^2+c^2)*(SA a b c)*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_685.
Definition X_686 :=
        let h_x_686 a b c := a^2*(SA a b c)*((SB a b c)-(SC a b c))*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_686.
Definition X_687 :=
        let h_x_687 a b c := 1/((SA a b c)*((SB a b c)-(SC a b c))*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c)))) in
        cPointhb h_x_687.
Definition X_688 :=
        let h_x_688 a b c := a^4*(b^4-c^4) in
        cPointhb h_x_688.
Definition X_689 :=
        let h_x_689 a b c := 1/(a^2*(b^4-c^4)) in
        cPointhb h_x_689.
Definition X_690 :=
        let h_x_690 a b c := (b^2-c^2)*(2×a^2-b^2-c^2) in
        cPointhb h_x_690.
Definition X_691 :=
        let h_x_691 a b c := a^2/((2×a^2-b^2-c^2)*(b^2-c^2)) in
        cPointhb h_x_691.
Definition X_692 :=
        let h_x_692 a b c := a^3/(b-c) in
        cPointhb h_x_692.
Definition X_693 :=
        let h_x_693 a b c := (b-c)/a in
        cPointhb h_x_693.
Definition X_694 :=
        let h_x_694 a b c := a^2/(a^4-b^2×c^2) in
        cPointhb h_x_694.
Definition X_695 :=
        let h_x_695 a b c := a^2/(a^4+b^2×c^2) in
        cPointhb h_x_695.
Definition X_696 :=
        let h_x_696 a b c := a×b^4-b^4×c+a×c^4-b×c^4 in
        cPointhb h_x_696.
Definition X_697 :=
        let h_x_697 a b c := a^2/(a×b^4-b^4×c+a×c^4-b×c^4) in
        cPointhb h_x_697.
Definition X_698 :=
        let h_x_698 a b c := a^2×b^4-b^4×c^2+a^2×c^4-b^2×c^4 in
        cPointhb h_x_698.
Definition X_699 :=
        let h_x_699 a b c := a^2/(a^2×b^4-b^4×c^2+a^2×c^4-b^2×c^4) in
        cPointhb h_x_699.
Definition X_700 :=
        let h_x_700 a b c := a^3×b^4-b^4×c^3+a^3×c^4-b^3×c^4 in
        cPointhb h_x_700.
Definition X_701 :=
        let h_x_701 a b c := a^2/(a^3×b^4-b^4×c^3+a^3×c^4-b^3×c^4) in
        cPointhb h_x_701.
Definition X_702 :=
        let h_x_702 a b c := 2/a^4-1/b^4-1/c^4 in
        cPointhb h_x_702.
Definition X_703 :=
        let h_x_703 a b c := a^2/(a^4×b^4+a^4×c^4-2×b^4×c^4) in
        cPointhb h_x_703.
Definition X_704 :=
        let h_x_704 a b c := a^5×b^4+a^5×c^4-b^5×c^4-b^4×c^5 in
        cPointhb h_x_704.
Definition X_705 :=
        let h_x_705 a b c := a^2/(a^5×b^4+a^5×c^4-b^5×c^4-b^4×c^5) in
        cPointhb h_x_705.
Definition X_706 :=
        let h_x_706 a b c := a^6×b^4+a^6×c^4-b^6×c^4-b^4×c^6 in
        cPointhb h_x_706.
Definition X_707 :=
        let h_x_707 a b c := a^2/(a^6×b^4+a^6×c^4-b^6×c^4-b^4×c^6) in
        cPointhb h_x_707.
Definition X_708 :=
        let h_x_708 a b c := a^7×b^4+a^7×c^4-b^7×c^4-b^4×c^7 in
        cPointhb h_x_708.
Definition X_709 :=
        let h_x_709 a b c := a^2/(a^7×b^4+a^7×c^4-b^7×c^4-b^4×c^7) in
        cPointhb h_x_709.
Definition X_710 :=
        let h_x_710 a b c := (a^2-b×c)*(a^2+b×c)*(a^4+b^2×c^2)*(b^4+c^4) in
        cPointhb h_x_710.
Definition X_711 :=
        let h_x_711 a b c := a^2/((a^2-b×c)*(a^2+b×c)*(a^4+b^2×c^2)*(b^4+c^4)) in
        cPointhb h_x_711.
Definition X_712 :=
        let h_x_712 a b c := a×b^3-b^3×c+a×c^3-b×c^3 in
        cPointhb h_x_712.
Definition X_713 :=
        let h_x_713 a b c := a^2/(a×b^3-b^3×c+a×c^3-b×c^3) in
        cPointhb h_x_713.
Definition X_714 :=
        let h_x_714 a b c := (b+c)*(a^2×b^2-a^2×b×c+a^2×c^2-b^2×c^2) in
        cPointhb h_x_714.
Definition X_715 :=
        let h_x_715 a b c := a^2/((b+c)*(a^2×b^2-a^2×b×c+a^2×c^2-b^2×c^2)) in
        cPointhb h_x_715.
Definition X_716 :=
        let h_x_716 a b c := 2/a^3-1/b^3-1/c^3 in
        cPointhb h_x_716.
Definition X_717 :=
        let h_x_717 a b c := a^2/(a^3×b^3+a^3×c^3-2×b^3×c^3) in
        cPointhb h_x_717.
Definition X_718 :=
        let h_x_718 a b c := (b+c)*(a^4×b^2-a^4×b×c+a^4×c^2-b^3×c^3) in
        cPointhb h_x_718.
Definition X_719 :=
        let h_x_719 a b c := a^2/((b+c)*(a^4×b^2-a^4×b×c+a^4×c^2-b^3×c^3)) in
        cPointhb h_x_719.
Definition X_720 :=
        let h_x_720 a b c := a^5×b^3+a^5×c^3-b^5×c^3-b^3×c^5 in
        cPointhb h_x_720.
Definition X_721 :=
        let h_x_721 a b c := a^2/(a^5×b^3+a^5×c^3-b^5×c^3-b^3×c^5) in
        cPointhb h_x_721.
Definition X_722 :=
        let h_x_722 a b c := (b+c)*(a^2-b×c)*(b^2-b×c+c^2)*(a^4+a^2×b×c+b^2×c^2) in
        cPointhb h_x_722.
Definition X_723 :=
        let h_x_723 a b c := a^2/((b+c)*(a^2-b×c)*(b^2-b×c+c^2)*(a^4+a^2×b×c+b^2×c^2)) in
        cPointhb h_x_723.
Definition X_724 :=
        let h_x_724 a b c := a^7×b^3+a^7×c^3-b^7×c^3-b^3×c^7 in
        cPointhb h_x_724.
Definition X_725 :=
        let h_x_725 a b c := a^2/(a^7×b^3+a^7×c^3-b^7×c^3-b^3×c^7) in
        cPointhb h_x_725.
Definition X_726 :=
        let h_x_726 a b c := a×b^2-b^2×c+a×c^2-b×c^2 in
        cPointhb h_x_726.
Definition X_727 :=
        let h_x_727 a b c := a^2/(a×b^2-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_727.
Definition X_728 :=
        let h_x_728 a b c := a×(b+c-a)^3 in
        cPointhb h_x_728.
Definition X_729 :=
        let h_x_729 a b c := a^2/(a^2×b^2+a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_729.
Definition X_730 :=
        let h_x_730 a b c := a^3×b^2+a^3×c^2-b^3×c^2-b^2×c^3 in
        cPointhb h_x_730.
Definition X_731 :=
        let h_x_731 a b c := a^2/(a^3×b^2+a^3×c^2-b^3×c^2-b^2×c^3) in
        cPointhb h_x_731.
Definition X_732 :=
        let h_x_732 a b c := (a^2-b×c)*(a^2+b×c)*(b^2+c^2) in
        cPointhb h_x_732.
Definition X_733 :=
        let h_x_733 a b c := a^2/((a^2-b×c)*(a^2+b×c)*(b^2+c^2)) in
        cPointhb h_x_733.
Definition X_734 :=
        let h_x_734 a b c := a^5×b^2+a^5×c^2-b^5×c^2-b^2×c^5 in
        cPointhb h_x_734.
Definition X_735 :=
        let h_x_735 a b c := a^2/(a^5×b^2+a^5×c^2-b^5×c^2-b^2×c^5) in
        cPointhb h_x_735.
Definition X_736 :=
        let h_x_736 a b c := a^6×b^2+a^6×c^2-b^6×c^2-b^2×c^6 in
        cPointhb h_x_736.
Definition X_737 :=
        let h_x_737 a b c := a^2/(a^6×b^2+a^6×c^2-b^6×c^2-b^2×c^6) in
        cPointhb h_x_737.
Definition X_738 :=
        let h_x_738 a b c := a/(-a+b+c)^3 in
        cPointhb h_x_738.
Definition X_739 :=
        let h_x_739 a b c := a^2/(a×b+a×c-2×b×c) in
        cPointhb h_x_739.
Definition X_740 :=
        let h_x_740 a b c := (b+c)*(a^2-b×c) in
        cPointhb h_x_740.
Definition X_741 :=
        let h_x_741 a b c := a^2/((b+c)*(a^2-b×c)) in
        cPointhb h_x_741.
Definition X_742 :=
        let h_x_742 a b c := a^3×b+a^3×c-b^3×c-b×c^3 in
        cPointhb h_x_742.
Definition X_743 :=
        let h_x_743 a b c := a^2/(a^3×b+a^3×c-b^3×c-b×c^3) in
        cPointhb h_x_743.
Definition X_744 :=
        let h_x_744 a b c := (b+c)*(a^4-b^3×c+b^2×c^2-b×c^3) in
        cPointhb h_x_744.
Definition X_745 :=
        let h_x_745 a b c := a^2/((b+c)*(a^4-b^3×c+b^2×c^2-b×c^3)) in
        cPointhb h_x_745.
Definition X_746 :=
        let h_x_746 a b c := a^5×b+a^5×c-b^5×c-b×c^5 in
        cPointhb h_x_746.
Definition X_747 :=
        let h_x_747 a b c := a^2/(a^5×b+a^5×c-b^5×c-b×c^5) in
        cPointhb h_x_747.
Definition X_748 :=
        let h_x_748 a b c := a^3-2×a×b×c in
        cPointhb h_x_748.
Definition X_749 :=
        let h_x_749 a b c := a^2/(a^3-2×a×b×c) in
        cPointhb h_x_749.
Definition X_750 :=
        let h_x_750 a b c := a^3+2×a×b×c in
        cPointhb h_x_750.
Definition X_751 :=
        let h_x_751 a b c := a^2/(a^3+2×a×b×c) in
        cPointhb h_x_751.
Definition X_752 :=
        let h_x_752 a b c := 2×a^3-b^3-c^3 in
        cPointhb h_x_752.
Definition X_753 :=
        let h_x_753 a b c := a^2/(2×a^3-b^3-c^3) in
        cPointhb h_x_753.
Definition X_754 :=
        let h_x_754 a b c := 2×a^4-b^4-c^4 in
        cPointhb h_x_754.
Definition X_755 :=
        let h_x_755 a b c := a^2/(2×a^4-b^4-c^4) in
        cPointhb h_x_755.
Definition X_756 :=
        let h_x_756 a b c := a×(b+c)^2 in
        cPointhb h_x_756.
Definition X_757 :=
        let h_x_757 a b c := a/(b+c)^2 in
        cPointhb h_x_757.
Definition X_758 :=
        let h_x_758 a b c := a^3*(b+c)-a*(b^3+c^3) in
        cPointhb h_x_758.
Definition X_759 :=
        let h_x_759 a b c := a^2/(a^3*(b+c)-a*(b^3+c^3)) in
        cPointhb h_x_759.
Definition X_760 :=
        let h_x_760 a b c := a^4*(b+c)-a*(b^4+c^4) in
        cPointhb h_x_760.
Definition X_761 :=
        let h_x_761 a b c := a^2/(a^4*(b+c)-a*(b^4+c^4)) in
        cPointhb h_x_761.
Definition X_762 :=
        let h_x_762 a b c := a×(b+c)^3 in
        cPointhb h_x_762.
Definition X_763 :=
        let h_x_763 a b c := a/(b+c)^3 in
        cPointhb h_x_763.
Definition X_764 :=
        let h_x_764 a b c := a×(b-c)^3 in
        cPointhb h_x_764.
Definition X_765 :=
        let h_x_765 a b c := a/(b-c)^2 in
        cPointhb h_x_765.
Definition X_766 :=
        let h_x_766 a b c := a^4*(b^3+c^3)-a^3*(b^4+c^4) in
        cPointhb h_x_766.
Definition X_767 :=
        let h_x_767 a b c := a^2/(a^4*(b^3+c^3)-a^3*(b^4+c^4)) in
        cPointhb h_x_767.
Definition X_768 :=
        let h_x_768 a b c := (b-c)*(a×b^3+a×b^2×c+b^3×c+a×b×c^2+b^2×c^2+a×c^3+b×c^3) in
        cPointhb h_x_768.
Definition X_769 :=
        let h_x_769 a b c := a^2/((b-c)*(a×b^3+a×b^2×c+b^3×c+a×b×c^2+b^2×c^2+a×c^3+b×c^3)) in
        cPointhb h_x_769.
Definition X_770 :=
        let h_x_770 a b c := a*(a-b-c)*(b-c)*(a^4×b×c-b×(b-c)^2×c×(b+c)^2+4×a^2*(SB a b c)*(SC a b c)+4*(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_770.
Definition X_771 :=
        let h_x_771 a b c := a/((a-b-c)*(b-c)*(a^4×b×c-b×(b-c)^2×c×(b+c)^2+4×a^2*(SB a b c)*(SC a b c)+4*(SA a b c)*((SB a b c)^2+(SC a b c)^2))) in
        cPointhb h_x_771.
Definition X_772 :=
        let h_x_772 a b c := (b-c)*(a^3×b^3+a^3×b^2×c+a^3×b×c^2+a^3×c^3+b^3×c^3) in
        cPointhb h_x_772.
Definition X_773 :=
        let h_x_773 a b c := a^2/((b-c)*(a^3×b^3+a^3×b^2×c+a^3×b×c^2+a^3×c^3+b^3×c^3)) in
        cPointhb h_x_773.
Definition X_774 :=
        let h_x_774 a b c := a*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_774.
Definition X_775 :=
        let h_x_775 a b c := a/(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_775.
Definition X_776 :=
        let h_x_776 a b c := (b-c)*(a^5×b^3+a^5×b^2×c+a^5×b×c^2+a^5×c^3-b^4×c^4) in
        cPointhb h_x_776.
Definition X_777 :=
        let h_x_777 a b c := a^2/((b-c)*(a^5×b^3+a^5×b^2×c+a^5×b×c^2+a^5×c^3-b^4×c^4)) in
        cPointhb h_x_777.
Definition X_778 :=
        let h_x_778 a b c := (b-c)*(b+c)*(a^6×b^2+a^6×c^2-b^4×c^4) in
        cPointhb h_x_778.
Definition X_779 :=
        let h_x_779 a b c := a^2/((b-c)*(b+c)*(a^6×b^2+a^6×c^2-b^4×c^4)) in
        cPointhb h_x_779.
Definition X_780 :=
        let h_x_780 a b c := (b-c)*(a^7×b^3+a^7×b^2×c+a^7×b×c^2+a^7×c^3-b^6×c^4-b^5×c^5-b^4×c^6) in
        cPointhb h_x_780.
Definition X_781 :=
        let h_x_781 a b c := a^2/((b-c)*(a^7×b^3+a^7×b^2×c+a^7×b×c^2+a^7×c^3-b^6×c^4-b^5×c^5-b^4×c^6)) in
        cPointhb h_x_781.
Definition X_782 :=
        let h_x_782 a b c := (a^4-b^2×c^2)*(a^4+b^2×c^2)*(b^4-c^4) in
        cPointhb h_x_782.
Definition X_783 :=
        let h_x_783 a b c := a^2/((a^4-b^2×c^2)*(a^4+b^2×c^2)*(b^4-c^4)) in
        cPointhb h_x_783.
Definition X_784 :=
        let h_x_784 a b c := (b-c)*(a×b^2+a×b×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_784.
Definition X_785 :=
        let h_x_785 a b c := a^2/((b-c)*(a×b^2+a×b×c+b^2×c+a×c^2+b×c^2)) in
        cPointhb h_x_785.
Definition X_786 :=
        let h_x_786 a b c := (b-c)*(a^2×b^2+a^2×b×c+a^2×c^2+b^2×c^2) in
        cPointhb h_x_786.
Definition X_787 :=
        let h_x_787 a b c := a^2/((b-c)*(a^2×b^2+a^2×b×c+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_787.
Definition X_788 :=
        let h_x_788 a b c := 1/b^3-1/c^3 in
        cPointhb h_x_788.
Definition X_789 :=
        let h_x_789 a b c := 1/(a*(b-c)*(b^2+b×c+c^2)) in
        cPointhb h_x_789.
Definition X_790 :=
        let h_x_790 a b c := (b-c)*(a^4×b^2+a^4×b×c+a^4×c^2-b^3×c^3) in
        cPointhb h_x_790.
Definition X_791 :=
        let h_x_791 a b c := a^2/((b-c)*(a^4×b^2+a^4×b×c+a^4×c^2-b^3×c^3)) in
        cPointhb h_x_791.
Definition X_792 :=
        let h_x_792 a b c := (b-c)*(a^5×b^2+a^5×b×c+a^5×c^2-b^4×c^3-b^3×c^4) in
        cPointhb h_x_792.
Definition X_793 :=
        let h_x_793 a b c := a^2/((b-c)*(a^5×b^2+a^5×b×c+a^5×c^2-b^4×c^3-b^3×c^4)) in
        cPointhb h_x_793.
Definition X_794 :=
        let h_x_794 a b c := (b-c)*(a^2-b×c)*(b^2+b×c+c^2)*(a^4+a^2×b×c+b^2×c^2) in
        cPointhb h_x_794.
Definition X_795 :=
        let h_x_795 a b c := a^2/((b-c)*(a^2-b×c)*(b^2+b×c+c^2)*(a^4+a^2×b×c+b^2×c^2)) in
        cPointhb h_x_795.
Definition X_796 :=
        let h_x_796 a b c := (b-c)*(a^7×b^2+a^7×b×c+a^7×c^2-b^6×c^3-b^5×c^4-b^4×c^5-b^3×c^6) in
        cPointhb h_x_796.
Definition X_797 :=
        let h_x_797 a b c := a^2/((b-c)*(a^7×b^2+a^7×b×c+a^7×c^2-b^6×c^3-b^5×c^4-b^4×c^5-b^3×c^6)) in
        cPointhb h_x_797.
Definition X_798 :=
        let h_x_798 a b c := a^3*(b^2-c^2) in
        cPointhb h_x_798.
Definition X_799 :=
        let h_x_799 a b c := 1/(a*(b^2-c^2)) in
        cPointhb h_x_799.
Definition X_800 :=
        let h_x_800 a b c := a^2*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_800.
Definition X_801 :=
        let h_x_801 a b c := 1/(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_801.
Definition X_802 :=
        let h_x_802 a b c := (b-c)*(a^3×b+a^3×c-b^2×c^2) in
        cPointhb h_x_802.
Definition X_803 :=
        let h_x_803 a b c := a^2/((b-c)*(a^3×b+a^3×c-b^2×c^2)) in
        cPointhb h_x_803.
Definition X_804 :=
        let h_x_804 a b c := (b^2-c^2)*(a^4-b^2×c^2) in
        cPointhb h_x_804.
Definition X_805 :=
        let h_x_805 a b c := a^2/((b^2-c^2)*(a^4-b^2×c^2)) in
        cPointhb h_x_805.
Definition X_806 :=
        let h_x_806 a b c := (b-c)*(a^5×b+a^5×c-b^4×c^2-b^3×c^3-b^2×c^4) in
        cPointhb h_x_806.
Definition X_807 :=
        let h_x_807 a b c := a^2/((b-c)*(a^5×b+a^5×c-b^4×c^2-b^3×c^3-b^2×c^4)) in
        cPointhb h_x_807.
Definition X_808 :=
        let h_x_808 a b c := (b^2-c^2)*(a^6-b^4×c^2-b^2×c^4) in
        cPointhb h_x_808.
Definition X_809 :=
        let h_x_809 a b c := a^2/((b^2-c^2)*(a^6-b^4×c^2-b^2×c^4)) in
        cPointhb h_x_809.
Definition X_810 :=
        let h_x_810 a b c := a^3*(b^2-c^2)*(SA a b c) in
        cPointhb h_x_810.
Definition X_811 :=
        let h_x_811 a b c := 1/(a*(b^2-c^2)*(SA a b c)) in
        cPointhb h_x_811.
Definition X_812 :=
        let h_x_812 a b c := (b-c)*(a^2-b×c) in
        cPointhb h_x_812.
Definition X_813 :=
        let h_x_813 a b c := a^2/((b-c)*(a^2-b×c)) in
        cPointhb h_x_813.
Definition X_814 :=
        let h_x_814 a b c := (b-c)*(a^3-b^2×c-b×c^2) in
        cPointhb h_x_814.
Definition X_815 :=
        let h_x_815 a b c := a^2/((b-c)*(a^3-b^2×c-b×c^2)) in
        cPointhb h_x_815.
Definition X_816 :=
        let h_x_816 a b c := (b-c)*(a^4-b^3×c-b^2×c^2-b×c^3) in
        cPointhb h_x_816.
Definition X_817 :=
        let h_x_817 a b c := a^2/((b-c)*(a^4-b^3×c-b^2×c^2-b×c^3)) in
        cPointhb h_x_817.
Definition X_818 :=
        let h_x_818 a b c := (b-c)*(a^5-b^4×c-b^3×c^2-b^2×c^3-b×c^4) in
        cPointhb h_x_818.
Definition X_819 :=
        let h_x_819 a b c := a^2/((b-c)*(a^5-b^4×c-b^3×c^2-b^2×c^3-b×c^4)) in
        cPointhb h_x_819.
Definition X_820 :=
        let h_x_820 a b c := a^3×(SA a b c)^2*(b^2×(SB a b c)^2+c^2×(SC a b c)^2) in
        cPointhb h_x_820.
Definition X_821 :=
        let h_x_821 a b c := 1/(a×(SA a b c)^2*(b^2×(SB a b c)^2+c^2×(SC a b c)^2)) in
        cPointhb h_x_821.
Definition X_822 :=
        let h_x_822 a b c := a^3*(b^2-c^2)*(SA a b c)^2 in
        cPointhb h_x_822.
Definition X_823 :=
        let h_x_823 a b c := 1/(a*(b^2-c^2)*(SA a b c)^2) in
        cPointhb h_x_823.
Definition X_824 :=
        let h_x_824 a b c := b^3-c^3 in
        cPointhb h_x_824.
Definition X_825 :=
        let h_x_825 a b c := a^2/(b^3-c^3) in
        cPointhb h_x_825.
Definition X_826 :=
        let h_x_826 a b c := b^4-c^4 in
        cPointhb h_x_826.
Definition X_827 :=
        let h_x_827 a b c := a^2/(b^4-c^4) in
        cPointhb h_x_827.
Definition X_828 :=
        let h_x_828 a b c := a^3×(SA a b c)^2*(b^3×(SB a b c)^2+c^3×(SC a b c)^2) in
        cPointhb h_x_828.
Definition X_829 :=
        let h_x_829 a b c := 1/(a×(SA a b c)^2*(b^3×(SB a b c)^2+c^3×(SC a b c)^2)) in
        cPointhb h_x_829.
Definition X_830 :=
        let h_x_830 a b c := a*(b-c)*(a^2+b^2+b×c+c^2) in
        cPointhb h_x_830.
Definition X_831 :=
        let h_x_831 a b c := a/((b-c)*(a^2+b^2+b×c+c^2)) in
        cPointhb h_x_831.
Definition X_832 :=
        let h_x_832 a b c := a^4*(b-c)+a*(b^4-c^4) in
        cPointhb h_x_832.
Definition X_833 :=
        let h_x_833 a b c := a^2/(a^4*(b-c)+a*(b^4-c^4)) in
        cPointhb h_x_833.
Definition X_834 :=
        let h_x_834 a b c := a^3*(b^2-c^2)+a^2*(b^3-c^3) in
        cPointhb h_x_834.
Definition X_835 :=
        let h_x_835 a b c := a^2/(a^3*(b^2-c^2)+a^2*(b^3-c^3)) in
        cPointhb h_x_835.
Definition X_836 :=
        let h_x_836 a b c := a^2×(SA a b c)^2*(b×(SB a b c)^2+c×(SC a b c)^2) in
        cPointhb h_x_836.
Definition X_837 :=
        let h_x_837 a b c := 1/((SA a b c)^2*(b×(SB a b c)^2+c×(SC a b c)^2)) in
        cPointhb h_x_837.
Definition X_838 :=
        let h_x_838 a b c := a^4*(b^3-c^3)+a^3*(b^4-c^4) in
        cPointhb h_x_838.
Definition X_839 :=
        let h_x_839 a b c := a^2/(a^4*(b^3-c^3)+a^3*(b^4-c^4)) in
        cPointhb h_x_839.
Definition X_840 :=
        let h_x_840 a b c := a^2/(2×a^3-2×a^2×b+a×b^2-b^3-2×a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_840.
Definition X_841 :=
        let h_x_841 a b c := a^2/(-a^4×(SA a b c)^3+(SA a b c)*(SB a b c)*(SC a b c)*((SB a b c)^2+10*(SB a b c)*(SC a b c)+(SC a b c)^2)+a^2*(5×(SA a b c)^2×((SB a b c)-(SC a b c))^2-4×(SB a b c)^2×(SC a b c)^2)) in
        cPointhb h_x_841.
Definition X_842 :=
        let h_x_842 a b c := a^2/(-a^2*((SA a b c)^2+(SB a b c)*(SC a b c))+2*(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_842.
Definition X_843 :=
        let h_x_843 a b c := a^2/(2*(a^2-(SA a b c))*(SA a b c)+(SB a b c)^2-4*(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_843.
Definition X_844 :=
        let h_x_844 a b c := a*((sa a b c)*(sb a b c)*sqrt((a×b)/((s a b c)*(sc a b c)))+(sa a b c)*sqrt((a×c)/((s a b c)*(sb a b c)))*(sc a b c)-sqrt((b×c)/((s a b c)*(sa a b c)))*(sb a b c)*(sc a b c)) in
        cPointhb h_x_844.
Definition X_845 :=
        let h_x_845 a b c := a*(sqrt(((sa a b c)^3×(sb a b c)^3)/(a×b))+sqrt(((sa a b c)^3×(sc a b c)^3)/(a×c))-sqrt(((sb a b c)^3×(sc a b c)^3)/(b×c))) in
        cPointhb h_x_845.
Definition X_846 :=
        let h_x_846 a b c := a*(a×b+a×c+b×c+2*(SA a b c)) in
        cPointhb h_x_846.
Definition X_847 :=
        let h_x_847 a b c := (b^2×c^2)/((SA a b c)*((SA a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_847.
Definition X_848 :=
        let h_x_848 a b c := 1/(cot(A a b c)-cot((2×a×PI)/(a+b+c))) in
        cPointhb h_x_848.
Definition X_849 :=
        let h_x_849 a b c := a^3/(b+c)^2 in
        cPointhb h_x_849.
Definition X_850 :=
        let h_x_850 a b c := (b^2-c^2)/a^2 in
        cPointhb h_x_850.
Definition X_851 :=
        let h_x_851 a b c := a*(b+c)*(a^4-a^2×b^2+a^2×b×c-b^3×c-a^2×c^2+2×b^2×c^2-b×c^3) in
        cPointhb h_x_851.
Definition X_852 :=
        let h_x_852 a b c := a^2*(SA a b c)*((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_852.
Definition X_853 :=
        let h_x_853 a b c := a^2*(a-b-c)*(a^5×b^2-a^4×b^3-a^3×b^4+a^2×b^5+a^4×b^2×c-a^2×b^4×c+a^5×c^2+a^4×b×c^2-2×b^5×c^2-a^4×c^3+2×b^4×c^3-a^3×c^4-a^2×b×c^4+2×b^3×c^4+a^2×c^5-2×b^2×c^5) in
        cPointhb h_x_853.
Definition X_854 :=
        let h_x_854 a b c := -((a^2×c^2*(-a^2*(SA a b c)+b^2*(SB a b c)))/((a+b-c)*(-a+b+c)))+(a^2×b^2*(a^2*(SA a b c)-c^2*(SC a b c)))/((a-b+c)*(-a+b+c)) in
        cPointhb h_x_854.
Definition X_855 :=
        let h_x_855 a b c := -((a×c*(-a^2*(SA a b c)+b^2*(SB a b c)))/((a+b-c)*(-a+b+c)))+(a×b*(a^2*(SA a b c)-c^2*(SC a b c)))/((a-b+c)*(-a+b+c)) in
        cPointhb h_x_855.
Definition X_856 :=
        let h_x_856 a b c := a*(SA a b c)*(-b×c*(b+c)*(SB a b c)*(SC a b c)+a^2*(SA a b c)*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_856.
Definition X_857 :=
        let h_x_857 a b c := a^2*(b+c)*(SA a b c)-b^3*(SB a b c)-c^3*(SC a b c) in
        cPointhb h_x_857.
Definition X_858 :=
        let h_x_858 a b c := c^2*(a^4-a^2×b^2+b^4-c^4)+b^2*(a^4-b^4-a^2×c^2+c^4) in
        cPointhb h_x_858.
Definition X_859 :=
        let h_x_859 a b c := a^2*(a+b)*(a+c)*(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_859.
Definition X_860 :=
        let h_x_860 a b c := (b+c)*(b×c-2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_860.
Definition X_861 :=
        let h_x_861 a b c := a*(-a+b+c)*((a+b-c)*c*(-a^2*(SA a b c)+b^2*(SB a b c))-b*(a-b+c)*(a^2*(SA a b c)-c^2*(SC a b c))) in
        cPointhb h_x_861.
Definition X_862 :=
        let h_x_862 a b c := a*(b+c)*(-a^2+b×c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_862.
Definition X_863 :=
        let h_x_863 a b c := a^2*(-((SA a b c)/b^3)-(SA a b c)/c^3)+(SB a b c)/b+(SC a b c)/c in
        cPointhb h_x_863.
Definition X_864 :=
        let h_x_864 a b c := a^2*(-((SA a b c)/b^4)-(SA a b c)/c^4)+(SB a b c)/b^2+(SC a b c)/c^2 in
        cPointhb h_x_864.
Definition X_865 :=
        let h_x_865 a b c := a^2×((SB a b c)-(SC a b c))^2*(a^2*(SB a b c)*(SC a b c)-(SA a b c)*((SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_865.
Definition X_866 :=
        let h_x_866 a b c := a*(b-c)*(a^3*(b-c)*(SA a b c)-b^3×c*(SB a b c)+b×c^3*(SC a b c)+a×b×c*(b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_866.
Definition X_867 :=
        let h_x_867 a b c := (b-c)*(a^2*(-b+c)*(SA a b c)+b^3*(SB a b c)-c^3*(SC a b c)+a*(-b^2*(SB a b c)+c^2*(SC a b c))) in
        cPointhb h_x_867.
Definition X_868 :=
        let h_x_868 a b c := ((SB a b c)-(SC a b c))^2*((SB a b c)*(SC a b c)-(SA a b c)^2) in
        cPointhb h_x_868.
Definition X_869 :=
        let h_x_869 a b c := a^3*(b^2+c^2+b×c) in
        cPointhb h_x_869.
Definition X_870 :=
        let h_x_870 a b c := 1/(a*(b^2+b×c+c^2)) in
        cPointhb h_x_870.
Definition X_871 :=
        let h_x_871 a b c := 1/(a^3*(b^2+b×c+c^2)) in
        cPointhb h_x_871.
Definition X_872 :=
        let h_x_872 a b c := a×(a*(b+c))^2 in
        cPointhb h_x_872.
Definition X_873 :=
        let h_x_873 a b c := 1/(a×(b+c)^2) in
        cPointhb h_x_873.
Definition X_874 :=
        let h_x_874 a b c := (a^2-b×c)/(a×b-a×c) in
        cPointhb h_x_874.
Definition X_875 :=
        let h_x_875 a b c := (a^2*(a×b-a×c))/(a^2-b×c) in
        cPointhb h_x_875.
Definition X_876 :=
        let h_x_876 a b c := (a×b-a×c)/(a^2-b×c) in
        cPointhb h_x_876.
Definition X_877 :=
        let h_x_877 a b c := ((SA a b c)-(SB a b c))*(SB a b c)*((SA a b c)-(SC a b c))*(SC a b c)*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_877.
Definition X_878 :=
        let h_x_878 a b c := (a^2*(SA a b c)*((SB a b c)-(SC a b c)))/((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_878.
Definition X_879 :=
        let h_x_879 a b c := ((SA a b c)*((SB a b c)-(SC a b c)))/((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_879.
Definition X_880 :=
        let h_x_880 a b c := (a^4-b^2×c^2)/(a^2*(b^2-c^2)) in
        cPointhb h_x_880.
Definition X_881 :=
        let h_x_881 a b c := (a^4*(b^2-c^2))/(a^4-b^2×c^2) in
        cPointhb h_x_881.
Definition X_882 :=
        let h_x_882 a b c := (a^2*(b^2-c^2))/(a^4-b^2×c^2) in
        cPointhb h_x_882.
Definition X_883 :=
        let h_x_883 a b c := (b^2+c^2-a*(b+c))/((a-b-c)*(b-c)) in
        cPointhb h_x_883.
Definition X_884 :=
        let h_x_884 a b c := (a^2*(a-b-c)*(b-c))/(b^2+c^2-a*(b+c)) in
        cPointhb h_x_884.
Definition X_885 :=
        let h_x_885 a b c := ((a-b-c)*(b-c))/(b^2+c^2-a*(b+c)) in
        cPointhb h_x_885.
Definition X_886 :=
        let h_x_886 a b c := 1/(a^2*(b^2-c^2)*(-2×b^2×c^2+a^2*(b^2+c^2))) in
        cPointhb h_x_886.
Definition X_887 :=
        let h_x_887 a b c := a^4*(b^2-c^2)*(-2×b^2×c^2+a^2*(b^2+c^2)) in
        cPointhb h_x_887.
Definition X_888 :=
        let h_x_888 a b c := a^2*(b^2-c^2)*(-2×b^2×c^2+a^2*(b^2+c^2)) in
        cPointhb h_x_888.
Definition X_889 :=
        let h_x_889 a b c := 1/(a*(b-c)*(-2×b×c+a*(b+c))) in
        cPointhb h_x_889.
Definition X_890 :=
        let h_x_890 a b c := a^3*(b-c)*(-2×b×c+a*(b+c)) in
        cPointhb h_x_890.
Definition X_891 :=
        let h_x_891 a b c := a*(b-c)*(-2×b×c+a*(b+c)) in
        cPointhb h_x_891.
Definition X_892 :=
        let h_x_892 a b c := 1/((b^2-c^2)*(-2×a^2+b^2+c^2)) in
        cPointhb h_x_892.
Definition X_893 :=
        let h_x_893 a b c := 1/(b^2×c^2*(a^2+b×c)) in
        cPointhb h_x_893.
Definition X_894 :=
        let h_x_894 a b c := a^2+b×c in
        cPointhb h_x_894.
Definition X_895 :=
        let h_x_895 a b c := a^2/((SB a b c)*(SC a b c)*(-2*(SA a b c)+a^2)) in
        cPointhb h_x_895.
Definition X_896 :=
        let h_x_896 a b c := a*(2×a^2-b^2-c^2) in
        cPointhb h_x_896.
Definition X_897 :=
        let h_x_897 a b c := a/(2×a^2-b^2-c^2) in
        cPointhb h_x_897.
Definition X_898 :=
        let h_x_898 a b c := a/((b-c)*(-2×b×c+a*(b+c))) in
        cPointhb h_x_898.
Definition X_899 :=
        let h_x_899 a b c := a*(-(2/a)+1/b+1/c) in
        cPointhb h_x_899.
Definition X_900 :=
        let h_x_900 a b c := (b-c)*(-2×a+b+c) in
        cPointhb h_x_900.
Definition X_901 :=
        let h_x_901 a b c := a^2/((b-c)*(-2×a+b+c)) in
        cPointhb h_x_901.
Definition X_902 :=
        let h_x_902 a b c := a^2*(-2×a+b+c) in
        cPointhb h_x_902.
Definition X_903 :=
        let h_x_903 a b c := 1/(-2×a+b+c) in
        cPointhb h_x_903.
Definition X_904 :=
        let h_x_904 a b c := a^3/(a^2+b×c) in
        cPointhb h_x_904.
Definition X_905 :=
        let h_x_905 a b c := a*(b-c)*(SA a b c) in
        cPointhb h_x_905.
Definition X_906 :=
        let h_x_906 a b c := (2×a^3*(SA a b c))/(b-c) in
        cPointhb h_x_906.
Definition X_907 :=
        let h_x_907 a b c := a^2/((b^2-c^2)*(3×a^2+b^2+c^2)) in
        cPointhb h_x_907.
Definition X_908 :=
        let h_x_908 a b c := a×b×c-b*(SB a b c)-c*(SC a b c) in
        cPointhb h_x_908.
Definition X_909 :=
        let h_x_909 a b c := a^2/(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_909.
Definition X_910 :=
        let h_x_910 a b c := a*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_910.
Definition X_911 :=
        let h_x_911 a b c := a^3/(2×a^3-a^2*(b+c)-(b-c)^2*(b+c)) in
        cPointhb h_x_911.
Definition X_912 :=
        let h_x_912 a b c := a*(SA a b c)*(a*((a+b-c)*(a-b+c)*(b+c)-2×a*(SA a b c))-4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_912.
Definition X_913 :=
        let h_x_913 a b c := a^2/(2×a*(SA a b c)*((a+b-c)*(a-b+c)*(b+c)-2×a*(SA a b c))-8*(SA a b c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_913.
Definition X_914 :=
        let h_x_914 a b c := 2×a*(SA a b c)*((a+b-c)*(a-b+c)*(b+c)-2×a*(SA a b c))-8*(SA a b c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_914.
Definition X_915 :=
        let h_x_915 a b c := a/((SA a b c)*(a*((a+b-c)*(a-b+c)*(b+c)-2×a*(SA a b c))-4*(SB a b c)*(SC a b c))) in
        cPointhb h_x_915.
Definition X_916 :=
        let h_x_916 a b c := a^2*(SA a b c)*(a^5+2×a^3*(SA a b c)-a×((SB a b c)-(SC a b c))^2-2*(b^3*(SB a b c)+c^3*(SC a b c))) in
        cPointhb h_x_916.
Definition X_917 :=
        let h_x_917 a b c := 1/((SA a b c)*(a^5+2×a^3*(SA a b c)-a×((SB a b c)-(SC a b c))^2-2*(b^3*(SB a b c)+c^3*(SC a b c)))) in
        cPointhb h_x_917.
Definition X_918 :=
        let h_x_918 a b c := (b-c)*(b^2+c^2-a*(b+c)) in
        cPointhb h_x_918.
Definition X_919 :=
        let h_x_919 a b c := a^2/((b-c)*(b^2+c^2-a*(b+c))) in
        cPointhb h_x_919.
Definition X_920 :=
        let h_x_920 a b c := a*(-a^2×(SA a b c)^2+b^2×(SB a b c)^2+c^2×(SC a b c)^2) in
        cPointhb h_x_920.
Definition X_921 :=
        let h_x_921 a b c := a/(-a^2×(SA a b c)^2+b^2×(SB a b c)^2+c^2×(SC a b c)^2) in
        cPointhb h_x_921.
Definition X_922 :=
        let h_x_922 a b c := a^3*(2×a^2-b^2-c^2) in
        cPointhb h_x_922.
Definition X_923 :=
        let h_x_923 a b c := a^3/(2×a^2-b^2-c^2) in
        cPointhb h_x_923.
Definition X_924 :=
        let h_x_924 a b c := a^2*((SB a b c)-(SC a b c))*((SA a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_924.
Definition X_925 :=
        let h_x_925 a b c := 1/(((SB a b c)-(SC a b c))*((SA a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_925.
Definition X_926 :=
        let h_x_926 a b c := a^2*(a-b-c)*(b-c)*(-b^2-c^2+a*(b+c)) in
        cPointhb h_x_926.
Definition X_927 :=
        let h_x_927 a b c := 1/((a-b-c)*(b-c)*(-b^2-c^2+a*(b+c))) in
        cPointhb h_x_927.
Definition X_928 :=
        let h_x_928 a b c := a^2*(b-c)*(-2×a^2×b×c+a^3*(b+c)-a×(b-c)^2*(b+c)+2*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_928.
Definition X_929 :=
        let h_x_929 a b c := 1/((b-c)*(-2×a^2×b×c+a^3*(b+c)-a×(b-c)^2*(b+c)+2*((SA a b c)^2-(SB a b c)*(SC a b c)))) in
        cPointhb h_x_929.
Definition X_930 :=
        let h_x_930 a b c := 1/((b^2-c^2)*(-(SA a b c)^2+12×(DeltaMaj a b c)^2)) in
        cPointhb h_x_930.
Definition X_931 :=
        let h_x_931 a b c := a/((a^2+a×b+a×c+2×b×c)*(b^2-c^2)) in
        cPointhb h_x_931.
Definition X_932 :=
        let h_x_932 a b c := (a*(a-b)*(a-c))/(a×b+a×c-b×c) in
        cPointhb h_x_932.
Definition X_933 :=
        let h_x_933 a b c := a^2/((SA a b c)*((SB a b c)-(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_933.
Definition X_934 :=
        let h_x_934 a b c := a*(a-b)*(a+b-c)^2*(-a+c)*(a-b+c)^2 in
        cPointhb h_x_934.
Definition X_935 :=
        let h_x_935 a b c := ((SB a b c)*(SC a b c))/(((SB a b c)-(SC a b c))*((SA a b c)*(a^2+(SA a b c))-3*(SB a b c)*(SC a b c))) in
        cPointhb h_x_935.
Definition X_936 :=
        let h_x_936 a b c := a*(a^3-a^2×b-a×b^2+b^3-a^2×c+2×a×b×c+3×b^2×c-a×c^2+3×b×c^2+c^3) in
        cPointhb h_x_936.
Definition X_937 :=
        let h_x_937 a b c := a/(a^3-a^2×b-a×b^2+b^3-a^2×c+2×a×b×c+3×b^2×c-a×c^2+3×b×c^2+c^3) in
        cPointhb h_x_937.
Definition X_938 :=
        let h_x_938 a b c := (a-b)^3*(a+b)-2×a×(a+b)^2×c-2*(a-b)*b×c^2+2×a×c^3-c^4 in
        cPointhb h_x_938.
Definition X_939 :=
        let h_x_939 a b c := a^2/((a-b)^3*(a+b)-2×a×(a+b)^2×c-2*(a-b)*b×c^2+2×a×c^3-c^4) in
        cPointhb h_x_939.
Definition X_940 :=
        let h_x_940 a b c := a*(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_940.
Definition X_941 :=
        let h_x_941 a b c := a/(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_941.
Definition X_942 :=
        let h_x_942 a b c := b*(a+c)*(SB a b c)+(a+b)*c*(SC a b c) in
        cPointhb h_x_942.
Definition X_943 :=
        let h_x_943 a b c := a^2/(b*(a+c)*(SB a b c)+(a+b)*c*(SC a b c)) in
        cPointhb h_x_943.
Definition X_944 :=
        let h_x_944 a b c := a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+2*(SA a b c))-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_944.
Definition X_945 :=
        let h_x_945 a b c := a^2/(a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+2*(SA a b c))-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_945.
Definition X_946 :=
        let h_x_946 a b c := a^3*(b+c)-a×(b-c)^2*(b+c)-2×a^2*(b×c-(SA a b c))+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_946.
Definition X_947 :=
        let h_x_947 a b c := a^2/(a^3*(b+c)-a×(b-c)^2*(b+c)-2×a^2*(b×c-(SA a b c))+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_947.
Definition X_948 :=
        let h_x_948 a b c := (a+b-c)*(a-b+c)*(a^3-a^2*(b+c)-(b-c)^2*(b+c)+a×(b+c)^2) in
        cPointhb h_x_948.
Definition X_949 :=
        let h_x_949 a b c := a^2/((a+b-c)*(a-b+c)*(a^3-a^2*(b+c)-(b-c)^2*(b+c)+a×(b+c)^2)) in
        cPointhb h_x_949.
Definition X_950 :=
        let h_x_950 a b c := (a-b-c)*(2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_950.
Definition X_951 :=
        let h_x_951 a b c := a^2/((a-b-c)*(2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3)) in
        cPointhb h_x_951.
Definition X_952 :=
        let h_x_952 a b c := a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+(SA a b c))-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_952.
Definition X_953 :=
        let h_x_953 a b c := a^2/(a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+(SA a b c))-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_953.
Definition X_954 :=
        let h_x_954 a b c := a*(a^5-a×((SB a b c)-(SC a b c))^2+2*(b^5+c^5-c×((SA a b c)-(SB a b c))^2+2×b^3*(SB a b c)-b×((SA a b c)-(SC a b c))^2+2×c^3*(SC a b c))) in
        cPointhb h_x_954.
Definition X_955 :=
        let h_x_955 a b c := a/(a^5-a×((SB a b c)-(SC a b c))^2+2*(b^5+c^5-c×((SA a b c)-(SB a b c))^2+2×b^3*(SB a b c)-b×((SA a b c)-(SC a b c))^2+2×c^3*(SC a b c))) in
        cPointhb h_x_955.
Definition X_956 :=
        let h_x_956 a b c := a×b×c*(-a+b+c)+a^2*(SA a b c) in
        cPointhb h_x_956.
Definition X_957 :=
        let h_x_957 a b c := a^2/(a×b×c*(-a+b+c)+a^2*(SA a b c)) in
        cPointhb h_x_957.
Definition X_958 :=
        let h_x_958 a b c := a*(a-b-c)*(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_958.
Definition X_959 :=
        let h_x_959 a b c := a/((a-b-c)*(a^2+a×b+a×c+2×b×c)) in
        cPointhb h_x_959.
Definition X_960 :=
        let h_x_960 a b c := a*(-a+b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_960.
Definition X_961 :=
        let h_x_961 a b c := a/((-a+b+c)*(a×b+b^2+a×c+c^2)) in
        cPointhb h_x_961.
Definition X_962 :=
        let h_x_962 a b c := (a-b)*(a+b)^3+2×a×(a-b)^2×c+2×b*(a+b)*c^2-2×a×c^3-c^4 in
        cPointhb h_x_962.
Definition X_963 :=
        let h_x_963 a b c := a^2/((a-b)*(a+b)^3+2×a×(a-b)^2×c+2×b*(a+b)*c^2-2×a×c^3-c^4) in
        cPointhb h_x_963.
Definition X_964 :=
        let h_x_964 a b c := a^4+a^3*(b+c)+a^2×(b+c)^2+b×c×(b+c)^2+a*(b+c)*(b^2+b×c+c^2) in
        cPointhb h_x_964.
Definition X_965 :=
        let h_x_965 a b c := a*(a^4-a^3*(b+c)+2×b×c×(b+c)^2+a×(b+c)^3-a^2*(b^2+c^2)) in
        cPointhb h_x_965.
Definition X_966 :=
        let h_x_966 a b c := b×c+a*(b+c)+(SA a b c) in
        cPointhb h_x_966.
Definition X_967 :=
        let h_x_967 a b c := a^2/(b×c+a*(b+c)+(SA a b c)) in
        cPointhb h_x_967.
Definition X_968 :=
        let h_x_968 a b c := a*(a^2-2×a*(b+c)-(b+c)^2) in
        cPointhb h_x_968.
Definition X_969 :=
        let h_x_969 a b c := a/(a^2-2×a*(b+c)-(b+c)^2) in
        cPointhb h_x_969.
Definition X_970 :=
        let h_x_970 a b c := a^2*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4)) in
        cPointhb h_x_970.
Definition X_971 :=
        let h_x_971 a b c := a*(a^4*(b+c)-(b-c)^2×(b+c)^3-2×a^3*(b^2-b×c+c^2)+2×a×(b-c)^2*(b^2+b×c+c^2)) in
        cPointhb h_x_971.
Definition X_972 :=
        let h_x_972 a b c := a/(a^4*(b+c)-(b-c)^2×(b+c)^3-2×a^3*(b^2-b×c+c^2)+2×a×(b-c)^2*(b^2+b×c+c^2)) in
        cPointhb h_x_972.
Definition X_973 :=
        let h_x_973 a b c := a^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*((SA a b c)*(SB a b c)*((SA a b c)^2+7*(SA a b c)*(SB a b c)+2×(SB a b c)^2)*(SC a b c)+c^4×(SC a b c)^3+c^2*((SA a b c)^2×(SB a b c)^2+((SA a b c)^2+6*(SA a b c)*(SB a b c)+(SB a b c)^2)*(SC a b c)^2)) in
        cPointhb h_x_973.
Definition X_974 :=
        let h_x_974 a b c := a^2*(SA a b c)*(c^4×(SC a b c)^4+(SB a b c)^3*(SC a b c)*(-2×(SA a b c)^2+2*(SA a b c)*(SB a b c)-3*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))+c^2*(SA a b c)*((SA a b c)*(SB a b c)^3+((SA a b c)-3*(SB a b c))*(SC a b c)^3)) in
        cPointhb h_x_974.
Definition X_975 :=
        let h_x_975 a b c := a*(a^3+a^2*(b+c)+(b+c)^3+a*(b^2+4×b×c+c^2)) in
        cPointhb h_x_975.
Definition X_976 :=
        let h_x_976 a b c := a*(a^3+(b+c)*(b^2+c^2)) in
        cPointhb h_x_976.
Definition X_977 :=
        let h_x_977 a b c := a/(a^3+(b+c)*(b^2+c^2)) in
        cPointhb h_x_977.
Definition X_978 :=
        let h_x_978 a b c := a*(a^2*(b+c)-b×c*(b+c)+a*(b^2-b×c+c^2)) in
        cPointhb h_x_978.
Definition X_979 :=
        let h_x_979 a b c := a/(a^2*(b+c)-b×c*(b+c)+a*(b^2-b×c+c^2)) in
        cPointhb h_x_979.
Definition X_980 :=
        let h_x_980 a b c := a*((a×b+a×c+b×c)*(b^2+c^2)+a^2*(b^2+b×c+c^2)) in
        cPointhb h_x_980.
Definition X_981 :=
        let h_x_981 a b c := a/((a×b+a×c+b×c)*(b^2+c^2)+a^2*(b^2+b×c+c^2)) in
        cPointhb h_x_981.
Definition X_982 :=
        let h_x_982 a b c := a*(b^2-b×c+c^2) in
        cPointhb h_x_982.
Definition X_983 :=
        let h_x_983 a b c := a/(b^2-b×c+c^2) in
        cPointhb h_x_983.
Definition X_984 :=
        let h_x_984 a b c := a*(b^2+b×c+c^2) in
        cPointhb h_x_984.
Definition X_985 :=
        let h_x_985 a b c := a/(b^2+b×c+c^2) in
        cPointhb h_x_985.
Definition X_986 :=
        let h_x_986 a b c := a*(b^3+c^3+a*(b^2+b×c+c^2)) in
        cPointhb h_x_986.
Definition X_987 :=
        let h_x_987 a b c := a/(b^3+c^3+a*(b^2+b×c+c^2)) in
        cPointhb h_x_987.
Definition X_988 :=
        let h_x_988 a b c := a*(a^3-a^2*(b+c)-(3×a+b+c)*(b^2+c^2)) in
        cPointhb h_x_988.
Definition X_989 :=
        let h_x_989 a b c := a/(a^3-a^2*(b+c)-(3×a+b+c)*(b^2+c^2)) in
        cPointhb h_x_989.
Definition X_990 :=
        let h_x_990 a b c := a*(a^5-2×a^3×b×c-a^4*(b+c)+(b-c)^2×(b+c)^3-a×(b-c)^2*(b^2+c^2)) in
        cPointhb h_x_990.
Definition X_991 :=
        let h_x_991 a b c := a^2*(a^3*(b+c)-a*(b+c)*(b^2+c^2)-a^2*(b^2-b×c+c^2)+(b-c)*(b^3-c^3)) in
        cPointhb h_x_991.
Definition X_992 :=
        let h_x_992 a b c := a*(a^3*(b+c)-a×b×c*(b+c)-b×c×(b+c)^2+a^2*(b^2+c^2)) in
        cPointhb h_x_992.
Definition X_993 :=
        let h_x_993 a b c := a*(a^3-b×c*(b+c)-a*(b^2+c^2)) in
        cPointhb h_x_993.
Definition X_994 :=
        let h_x_994 a b c := a/(a^3-b×c*(b+c)-a*(b^2+c^2)) in
        cPointhb h_x_994.
Definition X_995 :=
        let h_x_995 a b c := a^2*(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_995.
Definition X_996 :=
        let h_x_996 a b c := 1/(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_996.
Definition X_997 :=
        let h_x_997 a b c := a*(a^3-a×(b-c)^2-a^2*(b+c)+(b+c)*(b^2+c^2)) in
        cPointhb h_x_997.
Definition X_998 :=
        let h_x_998 a b c := a/(a^3-a×(b-c)^2-a^2*(b+c)+(b+c)*(b^2+c^2)) in
        cPointhb h_x_998.
Definition X_999 :=
        let h_x_999 a b c := a^2*(2×b×c-(SA a b c)) in
        cPointhb h_x_999.
Definition X_1000 :=
        let h_x_1000 a b c := 1/(2×b×c-(SA a b c)) in
        cPointhb h_x_1000.
Definition X_1001 :=
        let h_x_1001 a b c := a*(a^2-2×b×c-a*(b+c)) in
        cPointhb h_x_1001.
Definition X_1002 :=
        let h_x_1002 a b c := a/(a^2-2×b×c-a*(b+c)) in
        cPointhb h_x_1002.
Definition X_1003 :=
        let h_x_1003 a b c := 3×a^4-a^2×b^2-a^2×c^2+2×b^2×c^2 in
        cPointhb h_x_1003.
Definition X_1004 :=
        let h_x_1004 a b c := a*(a^5-2×a^4*(b+c)+2×b×(b-c)^2×c*(b+c)-a×(b^2+c^2)^2+2×a^2*(b^3+c^3)) in
        cPointhb h_x_1004.
Definition X_1005 :=
        let h_x_1005 a b c := a*(c*(2+a/(b-c)+c/(-a+b))*(-a^2*(SA a b c)+b^2*(SB a b c))-b*(2+b/(-a+c)+a/(-b+c))*(a^2*(SA a b c)-c^2*(SC a b c))) in
        cPointhb h_x_1005.
Definition X_1006 :=
        let h_x_1006 a b c := (-a^3×b*(a-b+c)*(SA a b c)+a×b^3*(-a+b+c)*(SB a b c))*(a^2*(SA a b c)-c^2*(SC a b c))-(-a^2*(SA a b c)+b^2*(SB a b c))*(a^3*(a+b-c)*c*(SA a b c)-a×c^3*(-a+b+c)*(SC a b c)) in
        cPointhb h_x_1006.
Definition X_1007 :=
        let h_x_1007 a b c := (a^2-(SA a b c))*(SA a b c)+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1007.
Definition X_1008 :=
        let h_x_1008 a b c := b^2*(a^3-c^3)*(-a^2*(SA a b c)+b^2*(SB a b c))+(a^3-b^3)*c^2*(a^2*(SA a b c)-c^2*(SC a b c)) in
        cPointhb h_x_1008.
Definition X_1009 :=
        let h_x_1009 a b c := a*(a^4×b-a^2×b^3+a^4×c+2×a^3×b×c+b^4×c+b^3×c^2-a^2×c^3+b^2×c^3+b×c^4) in
        cPointhb h_x_1009.
Definition X_1010 :=
        let h_x_1010 a b c := (a+b)*(a+c)*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_1010.
Definition X_1011 :=
        let h_x_1011 a b c := (-a^3×c^2+a^2×c^3)*(-a^2*(SA a b c)+b^2*(SB a b c))-(a^3×b^2-a^2×b^3)*(a^2*(SA a b c)-c^2*(SC a b c)) in
        cPointhb h_x_1011.
Definition X_1012 :=
        let h_x_1012 a b c := a*(a^6-2×a^4×(b-c)^2-a^5*(b+c)-2×b×c×(b^2-c^2)^2+a^2×(b-c)^2*(b^2+c^2)-a×(b-c)^2*(b+c)*(b^2+c^2)+2×a^3*(b^3+c^3)) in
        cPointhb h_x_1012.
Definition X_1013 :=
        let h_x_1013 a b c := a*(SB a b c)*(SC a b c)*((SA a b c)*(a*(b+c)+(SA a b c))+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1013.
Definition X_1014 :=
        let h_x_1014 a b c := a/((b+c)*(-a+b+c)) in
        cPointhb h_x_1014.
Definition X_1015 :=
        let h_x_1015 a b c := a^2×(b-c)^2 in
        cPointhb h_x_1015.
Definition X_1016 :=
        let h_x_1016 a b c := 1/(b-c)^2 in
        cPointhb h_x_1016.
Definition X_1017 :=
        let h_x_1017 a b c := a^2×(-2×a+b+c)^2 in
        cPointhb h_x_1017.
Definition X_1018 :=
        let h_x_1018 a b c := (a*(b+c))/(b-c) in
        cPointhb h_x_1018.
Definition X_1019 :=
        let h_x_1019 a b c := (a*(b-c))/(b+c) in
        cPointhb h_x_1019.
Definition X_1020 :=
        let h_x_1020 a b c := (a×(a+b-c)^2×(a-b+c)^2*(b+c))/(b-c) in
        cPointhb h_x_1020.
Definition X_1021 :=
        let h_x_1021 a b c := (a*(b-c))/((a+b-c)^2×(a-b+c)^2*(b+c)) in
        cPointhb h_x_1021.
Definition X_1022 :=
        let h_x_1022 a b c := (a*(b-c))/(2×a-b-c) in
        cPointhb h_x_1022.
Definition X_1023 :=
        let h_x_1023 a b c := (a*(2×a-b-c))/(b-c) in
        cPointhb h_x_1023.
Definition X_1024 :=
        let h_x_1024 a b c := (a*(a-b-c)*(b-c))/(a×b-b^2+a×c-c^2) in
        cPointhb h_x_1024.
Definition X_1025 :=
        let h_x_1025 a b c := (a*(a×b-b^2+a×c-c^2))/((a-b-c)*(b-c)) in
        cPointhb h_x_1025.
Definition X_1026 :=
        let h_x_1026 a b c := (a*(b^2+c^2-a*(b+c)))/(b-c) in
        cPointhb h_x_1026.
Definition X_1027 :=
        let h_x_1027 a b c := (a*(b-c))/(b^2+c^2-a*(b+c)) in
        cPointhb h_x_1027.
Definition X_1028 :=
        let h_x_1028 a b c := a/(A a b c)^2 in
        cPointhb h_x_1028.
Definition X_1029 :=
        let h_x_1029 a b c := 1/(-c*(a+c)*(b+c)+(a-b)*(a+b)*(a+b+c)) in
        cPointhb h_x_1029.
Definition X_1030 :=
        let h_x_1030 a b c := a^2*(-c*(a+c)*(b+c)+(a-b)*(a+b)*(a+b+c)) in
        cPointhb h_x_1030.
Definition X_1031 :=
        let h_x_1031 a b c := 1/(a^4-a^2×b^2-b^4-a^2×c^2-b^2×c^2-c^4) in
        cPointhb h_x_1031.
Definition X_1032 :=
        let h_x_1032 a b c := (SA a b c)/((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1032.
Definition X_1033 :=
        let h_x_1033 a b c := a^2*(SB a b c)*(SC a b c)*((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1033.
Definition X_1034 :=
        let h_x_1034 a b c := 1/((sb a b c)*(sc a b c)*((sa a b c)*(SA a b c)*(sb a b c)*(SB a b c)+(sa a b c)*(SA a b c)*(sc a b c)*(SC a b c)-(sb a b c)*(SB a b c)*(sc a b c)*(SC a b c))) in
        cPointhb h_x_1034.
Definition X_1035 :=
        let h_x_1035 a b c := a^2*(sb a b c)*(sc a b c)*((sa a b c)*(SA a b c)*(sb a b c)*(SB a b c)+(sa a b c)*(SA a b c)*(sc a b c)*(SC a b c)-(sb a b c)*(SB a b c)*(sc a b c)*(SC a b c)) in
        cPointhb h_x_1035.
Definition X_1036 :=
        let h_x_1036 a b c := (a^2*(a-b-c))/(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_1036.
Definition X_1037 :=
        let h_x_1037 a b c := a^2/((a-b-c)*(a^2+b^2-2×b×c+c^2)) in
        cPointhb h_x_1037.
Definition X_1038 :=
        let h_x_1038 a b c := a*(sb a b c)*(sc a b c)*(SA a b c)*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_1038.
Definition X_1039 :=
        let h_x_1039 a b c := a/((a^2+b^2+2×b×c+c^2)*(SA a b c)*(sb a b c)*(sc a b c)) in
        cPointhb h_x_1039.
Definition X_1040 :=
        let h_x_1040 a b c := a*(sa a b c)*(SA a b c)*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_1040.
Definition X_1041 :=
        let h_x_1041 a b c := a/((a^2+b^2-2×b×c+c^2)*(sa a b c)*(SA a b c)) in
        cPointhb h_x_1041.
Definition X_1042 :=
        let h_x_1042 a b c := (a^2*(b+c))/(a-b-c)^2 in
        cPointhb h_x_1042.
Definition X_1043 :=
        let h_x_1043 a b c := (a-b-c)^2/(b+c) in
        cPointhb h_x_1043.
Definition X_1044 :=
        let h_x_1044 a b c := a*(b×c*(a^2*(SA a b c)-(SB a b c)*(SC a b c))-a*(b×c-(SA a b c))*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1044.
Definition X_1045 :=
        let h_x_1045 a b c := a*(a^2×b^2+a^2×b×c+a×b^2×c+a^2×c^2+a×b×c^2-b^2×c^2) in
        cPointhb h_x_1045.
Definition X_1046 :=
        let h_x_1046 a b c := a*(a^3-b^3+a×b×c-c^3+2×a^2*(b+c)) in
        cPointhb h_x_1046.
Definition X_1047 :=
        let h_x_1047 a b c := a*(a^2×b^2×(SA a b c)^2×(SB a b c)^2+a^2×b×c×(SA a b c)^2*(SB a b c)*(SC a b c)+a×b^2×c*(SA a b c)*(SB a b c)^2*(SC a b c)+a^2×c^2×(SA a b c)^2×(SC a b c)^2+a×b×c^2*(SA a b c)*(SB a b c)*(SC a b c)^2-b^2×c^2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1047.
Definition X_1048 :=
        let h_x_1048 a b c := a*(a^2×b^2×(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))^2+a^2×b×c*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))+a^2×c^2×(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))^2+a×b^2×c*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))+a×b×c^2*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))-b^2×c^2×(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))^2) in
        cPointhb h_x_1048.
Definition X_1049 :=
        let h_x_1049 a b c := a*(A a b c) in
        cPointhb h_x_1049.
Definition X_1050 :=
        let h_x_1050 a b c := a*(a^3*(b-2×c)*(2×b-c)*(b+c)-b^2×c^2×(b+c)^2+a×b×c*(b+c)*(b^2+c^2)+a^4*(b^2+b×c+c^2)+a^2*(b^4-3×b^3×c+7×b^2×c^2-3×b×c^3+c^4)) in
        cPointhb h_x_1050.
Definition X_1051 :=
        let h_x_1051 a b c := a*(3×a^2+b^2+b×c+c^2+5×a*(b+c)) in
        cPointhb h_x_1051.
Definition X_1052 :=
        let h_x_1052 a b c := a*(a×(a-b)^2×b×(b-c)^2×c-a×(a-b)^2×b×c×(-a+c)^2+a×b×(b-c)^2×c×(-a+c)^2) in
        cPointhb h_x_1052.
Definition X_1053 :=
        let h_x_1053 a b c := a*(a^6-2×a^5*(b+c)+2×a×(b-c)^4*(b+c)+2×a^4*(b^2+b×c+c^2)+a^2×b×c*(4×b^2-7×b×c+4×c^2)-2×a^3*(b^3+c^3)-(b-c)^2*(b^4-b^2×c^2+c^4)) in
        cPointhb h_x_1053.
Definition X_1054 :=
        let h_x_1054 a b c := a*(-3×b×c+a*(b+c)+2*(SA a b c)) in
        cPointhb h_x_1054.
Definition X_1055 :=
        let h_x_1055 a b c := a^2*(-2×a^2+a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_1055.
Definition X_1056 :=
        let h_x_1056 a b c := 2×a^2×b×c+(SB a b c)*(SC a b c) in
        cPointhb h_x_1056.
Definition X_1057 :=
        let h_x_1057 a b c := a^2/(2×a^2×b×c+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1057.
Definition X_1058 :=
        let h_x_1058 a b c := 2×a^2×b×c-(SB a b c)*(SC a b c) in
        cPointhb h_x_1058.
Definition X_1059 :=
        let h_x_1059 a b c := a^2/(2×a^2×b×c-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1059.
Definition X_1060 :=
        let h_x_1060 a b c := a*(SA a b c)*(a^2×b×c+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1060.
Definition X_1061 :=
        let h_x_1061 a b c := a/((SA a b c)*(a^2×b×c+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1061.
Definition X_1062 :=
        let h_x_1062 a b c := a*(SA a b c)*(a^2×b×c-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1062.
Definition X_1063 :=
        let h_x_1063 a b c := a/((SA a b c)*(a^2×b×c-2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1063.
Definition X_1064 :=
        let h_x_1064 a b c := a^2*(a×b^2×c^2+b*(SA a b c)*(SB a b c)+c*(SA a b c)*(SC a b c)) in
        cPointhb h_x_1064.
Definition X_1065 :=
        let h_x_1065 a b c := 1/(a×b^2×c^2+b*(SA a b c)*(SB a b c)+c*(SA a b c)*(SC a b c)) in
        cPointhb h_x_1065.
Definition X_1066 :=
        let h_x_1066 a b c := a^2*(a×b^2×c^2-b*(SA a b c)*(SB a b c)-c*(SA a b c)*(SC a b c)) in
        cPointhb h_x_1066.
Definition X_1067 :=
        let h_x_1067 a b c := 1/(a×b^2×c^2-b*(SA a b c)*(SB a b c)-c*(SA a b c)*(SC a b c)) in
        cPointhb h_x_1067.
Definition X_1068 :=
        let h_x_1068 a b c := (SB a b c)*(SC a b c)*(-a*(SA a b c)+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1068.
Definition X_1069 :=
        let h_x_1069 a b c := a^2/((SB a b c)*(SC a b c)*(-a*(SA a b c)+b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1069.
Definition X_1070 :=
        let h_x_1070 a b c := a^3×b^2×c^2+b×(SB a b c)^2*(SC a b c)+c*(SB a b c)*(SC a b c)^2 in
        cPointhb h_x_1070.
Definition X_1071 :=
        let h_x_1071 a b c := a*(a^2-b^2-c^2)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c+2×a^2×b×c+a×b^2×c-a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_1071.
Definition X_1072 :=
        let h_x_1072 a b c := a^3×b^2×c^2-b×(SB a b c)^2*(SC a b c)-c*(SB a b c)*(SC a b c)^2 in
        cPointhb h_x_1072.
Definition X_1073 :=
        let h_x_1073 a b c := a^2/((SB a b c)*(SC a b c)*(-a^2*(SA a b c)+(SB a b c)*(SC a b c))) in
        cPointhb h_x_1073.
Definition X_1074 :=
        let h_x_1074 a b c := a^3×b×c*(SA a b c)+b×(SB a b c)^2*(SC a b c)+c*(SB a b c)*(SC a b c)^2 in
        cPointhb h_x_1074.
Definition X_1075 :=
        let h_x_1075 a b c := (SB a b c)*(SC a b c)*(a^2×b^2×(SA a b c)^2×(SB a b c)^2+a^2×c^2×(SA a b c)^2×(SC a b c)^2-b^2×c^2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1075.
Definition X_1076 :=
        let h_x_1076 a b c := a^3×b×c*(SA a b c)-b×(SB a b c)^2*(SC a b c)-c*(SB a b c)*(SC a b c)^2 in
        cPointhb h_x_1076.
Definition X_1077 :=
        let h_x_1077 a b c := a/(A a b c) in
        cPointhb h_x_1077.
Definition X_1078 :=
        let h_x_1078 a b c := a^4-a^2×b^2-a^2×c^2-b^2×c^2 in
        cPointhb h_x_1078.
Definition X_1079 :=
        let h_x_1079 a b c := a×(a*(SA a b c)-b*(SB a b c)-c*(SC a b c))^2 in
        cPointhb h_x_1079.
Definition X_1080 :=
        let h_x_1080 a b c := (c^2+(SC a b c))*(a^2*(SA a b c)+(SB a b c)*(SC a b c))*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c))+2×sqrt(3)*((SA a b c)^2×(SB a b c)^2+c^2*(SA a b c)*(SC a b c)*(3*(SB a b c)+(SC a b c))+(SB a b c)*(SC a b c)*((SC a b c)^2+c^2*((SB a b c)+3*(SC a b c))))*(DeltaMaj a b c) in
        cPointhb h_x_1080.
Definition X_1081 :=
        let h_x_1081 a b c := 1/(sqrt(3)*(s a b c)*(sa a b c)-(DeltaMaj a b c)) in
        cPointhb h_x_1081.
Definition X_1082 :=
        let h_x_1082 a b c := a*(b×c-(SA a b c)-2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_1082.
Definition X_1083 :=
        let h_x_1083 a b c := a*(a^4-a^3×b-a^3×c-a^2×b×c+2×a×b^2×c-b^3×c+2×a×b×c^2-b×c^3) in
        cPointhb h_x_1083.
Definition X_1084 :=
        let h_x_1084 a b c := a^4×(b^2-c^2)^2 in
        cPointhb h_x_1084.
Definition X_1085 :=
        let h_x_1085 a b c := a×(A a b c)^2 in
        cPointhb h_x_1085.
Definition X_1086 :=
        let h_x_1086 a b c := (b-c)^2 in
        cPointhb h_x_1086.
Definition X_1087 :=
        let h_x_1087 a b c := b×c×(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))^2 in
        cPointhb h_x_1087.
Definition X_1088 :=
        let h_x_1088 a b c := 1/(a×(-a+b+c)^2) in
        cPointhb h_x_1088.
Definition X_1089 :=
        let h_x_1089 a b c := (b+c)^2/a in
        cPointhb h_x_1089.
Definition X_1090 :=
        let h_x_1090 a b c := b×c×(b-c)^4×(-a+b+c)^2 in
        cPointhb h_x_1090.
Definition X_1091 :=
        let h_x_1091 a b c := (b+c)^4/(a×(-a+b+c)^2) in
        cPointhb h_x_1091.
Definition X_1092 :=
        let h_x_1092 a b c := a^4×(SA a b c)^3 in
        cPointhb h_x_1092.
Definition X_1093 :=
        let h_x_1093 a b c := 1/(a^2×(SA a b c)^3) in
        cPointhb h_x_1093.
Definition X_1094 :=
        let h_x_1094 a b c := a^3*(3×(SA a b c)^2+4×sqrt(3)*(SA a b c)*(DeltaMaj a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1094.
Definition X_1095 :=
        let h_x_1095 a b c := a^3*(3×(SA a b c)^2-4×sqrt(3)*(SA a b c)*(DeltaMaj a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1095.
Definition X_1096 :=
        let h_x_1096 a b c := a/(SA a b c)^2 in
        cPointhb h_x_1096.
Definition X_1097 :=
        let h_x_1097 a b c := b×c×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2 in
        cPointhb h_x_1097.
Definition X_1098 :=
        let h_x_1098 a b c := a/(b*(SB a b c)+c*(SC a b c))^2 in
        cPointhb h_x_1098.
Definition X_1099 :=
        let h_x_1099 a b c := b×c×(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))^2 in
        cPointhb h_x_1099.
Definition X_1100 :=
        let h_x_1100 a b c := 2×a^2+a×b+a×c in
        cPointhb h_x_1100.
Definition X_1101 :=
        let h_x_1101 a b c := a^3/((SB a b c)-(SC a b c))^2 in
        cPointhb h_x_1101.
Definition X_1102 :=
        let h_x_1102 a b c := a×(SA a b c)^3 in
        cPointhb h_x_1102.
Definition X_1103 :=
        let h_x_1103 a b c := a×(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c))^2 in
        cPointhb h_x_1103.
Definition X_1104 :=
        let h_x_1104 a b c := a*(a+c)*(SB a b c)+a*(a+b)*(SC a b c) in
        cPointhb h_x_1104.
Definition X_1105 :=
        let h_x_1105 a b c := 1/((SA a b c)*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2))) in
        cPointhb h_x_1105.
Definition X_1106 :=
        let h_x_1106 a b c := a^3×(b×c-(SA a b c))^2 in
        cPointhb h_x_1106.
Definition X_1107 :=
        let h_x_1107 a b c := a*(b×c*(b+c)+a*(b^2+c^2)) in
        cPointhb h_x_1107.
Definition X_1108 :=
        let h_x_1108 a b c := a*(a*(b+c)*(b×c-(SA a b c))-(b-c)*(b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_1108.
Definition X_1109 :=
        let h_x_1109 a b c := b×c×((SB a b c)-(SC a b c))^2 in
        cPointhb h_x_1109.
Definition X_1110 :=
        let h_x_1110 a b c := a^3×(a-b)^2×(a-c)^2 in
        cPointhb h_x_1110.
Definition X_1111 :=
        let h_x_1111 a b c := (b-c)^2/a in
        cPointhb h_x_1111.
Definition X_1112 :=
        let h_x_1112 a b c := a^2*(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2-2×a^2×c^4+c^6)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1112.
Definition X_1113 :=
        let h_x_1113 a b c := a^2*(1-(J a b c))*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1113.
Definition X_1114 :=
        let h_x_1114 a b c := a^2*(1+(J a b c))*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1114.
Definition X_1115 :=
        let h_x_1115 a b c := PI-(A a b c) in
        cPointhb h_x_1115.
Definition X_1116 :=
        let h_x_1116 a b c := (b^2-c^2)*(5×a^4×(SA a b c)^2+(SB a b c)*((SB a b c)-3*(SC a b c))*(3*(SB a b c)-(SC a b c))*(SC a b c)+a^2*(SA a b c)*(3×(SB a b c)^2+3×(SC a b c)^2-6×(SA a b c)^2-8*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1116.
Definition X_1117 :=
        let h_x_1117 a b c := (-4×(SB a b c)^2×(SC a b c)^2+a^2*(-3×(SA a b c)^3+(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(5×(SB a b c)^2-2*(SB a b c)*(SC a b c)+5×(SC a b c)^2))/((b^2×c^2-4×(SA a b c)^2)*((SA a b c)*(5*(SA a b c)-3*(SB a b c))*(SB a b c)+c^2*(-3×a^2+5*(SA a b c))*(SC a b c))) in
        cPointhb h_x_1117.
Definition X_1118 :=
        let h_x_1118 a b c := (sb a b c)*(SB a b c)^2*(sc a b c)*(SC a b c)^2 in
        cPointhb h_x_1118.
Definition X_1119 :=
        let h_x_1119 a b c := (sb a b c)^2*(SB a b c)*(sc a b c)^2*(SC a b c) in
        cPointhb h_x_1119.
Definition X_1120 :=
        let h_x_1120 a b c := 1/(a×b+b^2+a×c-4×b×c+c^2) in
        cPointhb h_x_1120.
Definition X_1121 :=
        let h_x_1121 a b c := 1/(a*(sa a b c)-2*(sb a b c)*(sc a b c)) in
        cPointhb h_x_1121.
Definition X_1122 :=
        let h_x_1122 a b c := (a*((b-c)^2+a*(b+c)))/(-a+b+c) in
        cPointhb h_x_1122.
Definition X_1123 :=
        let h_x_1123 a b c := 1/(b×c+2*(DeltaMaj a b c)) in
        cPointhb h_x_1123.
Definition X_1124 :=
        let h_x_1124 a b c := a^2*(b×c+2*(DeltaMaj a b c)) in
        cPointhb h_x_1124.
Definition X_1125 :=
        let h_x_1125 a b c := 2×a+b+c in
        cPointhb h_x_1125.
Definition X_1126 :=
        let h_x_1126 a b c := a^2/(2×a+b+c) in
        cPointhb h_x_1126.
Definition X_1127 :=
        let h_x_1127 a b c := 1/(b×c+2×sqrt(b×c*(s a b c)*(sa a b c))) in
        cPointhb h_x_1127.
Definition X_1128 :=
        let h_x_1128 a b c := 1/(b×c+2×sqrt(b×c*(sb a b c)*(sc a b c))) in
        cPointhb h_x_1128.
Definition X_1129 :=
        let h_x_1129 a b c := a*(1+2×sqrt(((s a b c)*(sa a b c))/(b×c))) in
        cPointhb h_x_1129.
Definition X_1130 :=
        let h_x_1130 a b c := a*(1+2×sqrt(((sb a b c)*(sc a b c))/(b×c))) in
        cPointhb h_x_1130.
Definition X_1131 :=
        let h_x_1131 a b c := 1/((SA a b c)+(DeltaMaj a b c)) in
        cPointhb h_x_1131.
Definition X_1132 :=
        let h_x_1132 a b c := 1/((SA a b c)-(DeltaMaj a b c)) in
        cPointhb h_x_1132.
Definition X_1133 :=
        let h_x_1133 a b c := csc((A a b c)/3+PI/3)*(sin(A a b c))*sin((A a b c)/3-PI/3) in
        cPointhb h_x_1133.
Definition X_1134 :=
        let h_x_1134 a b c := sec(1/3*((A a b c)+2×PI))*(sin(A a b c)) in
        cPointhb h_x_1134.
Definition X_1135 :=
        let h_x_1135 a b c := cos(1/3*((A a b c)+2×PI))*(sin(A a b c)) in
        cPointhb h_x_1135.
Definition X_1136 :=
        let h_x_1136 a b c := sec(1/3*((A a b c)+4×PI))*(sin(A a b c)) in
        cPointhb h_x_1136.
Definition X_1137 :=
        let h_x_1137 a b c := cos(1/3*((A a b c)+4×PI))*(sin(A a b c)) in
        cPointhb h_x_1137.
Definition X_1138 :=
        let h_x_1138 a b c := 1/(b^2×c^2*(5×a^2*(SA a b c)-4*(SB a b c)*(SC a b c))-32×(SA a b c)^2×(DeltaMaj a b c)^2) in
        cPointhb h_x_1138.
Definition X_1139 :=
        let h_x_1139 a b c := 1/(5*(SA a b c)+2×sqrt(5*(5-2×sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_1139.
Definition X_1140 :=
        let h_x_1140 a b c := 1/(5*(SA a b c)-2×sqrt(5*(5-2×sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_1140.
Definition X_1141 :=
        let h_x_1141 a b c := 1/((-(b^2-c^2)^2+a^2*(b^2+c^2))*(-b^2×c^2+4×(SA a b c)^2)) in
        cPointhb h_x_1141.
Definition X_1142 :=
        let h_x_1142 a b c := 2*(a+b+c)*(1+tan((A a b c)/4))^2-(b+c)*(1+tan((A a b c)/4))*(1+tan((B a b c)/4))*(1+tan((C a b c)/4)) in
        cPointhb h_x_1142.
Definition X_1143 :=
        let h_x_1143 a b c := tan((A a b c)/4) in
        cPointhb h_x_1143.
Definition X_1145 :=
        let h_x_1145 a b c := (-2×a+b+c)*(2×a×b×c-a^2*(b+c)+(b-c)^2*(b+c)) in
        cPointhb h_x_1145.
Definition X_1146 :=
        let h_x_1146 a b c := (b-c)^2×(-a+b+c)^2 in
        cPointhb h_x_1146.
Definition X_1147 :=
        let h_x_1147 a b c := a^4*(SA a b c)*((SA a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1147.
Definition X_1148 :=
        let h_x_1148 a b c := (SB a b c)*(SC a b c)*(-a×b*(SA a b c)*(SB a b c)-a×c*(SA a b c)*(SC a b c)+b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1148.
Definition X_1149 :=
        let h_x_1149 a b c := a^2*(a×b+b^2+a×c-4×b×c+c^2) in
        cPointhb h_x_1149.
Definition X_1150 :=
        let h_x_1150 a b c := (a^3-a×b^2-b^2×c-a×c^2-b×c^2) in
        cPointhb h_x_1150.
Definition X_1151 :=
        let h_x_1151 a b c := a^2*((SA a b c)+(DeltaMaj a b c)) in
        cPointhb h_x_1151.
Definition X_1152 :=
        let h_x_1152 a b c := a^2*((SA a b c)-(DeltaMaj a b c)) in
        cPointhb h_x_1152.
Definition X_1153 :=
        let h_x_1153 a b c := 28×a^2*(SA a b c)+2×(SA a b c)^2-(SB a b c)^2+16*(SB a b c)*(SC a b c)-(SC a b c)^2 in
        cPointhb h_x_1153.
Definition X_1154 :=
        let h_x_1154 a b c := a^2*(-(b^2-c^2)^2+a^2*(b^2+c^2))*(-b^2×c^2+4×(SA a b c)^2) in
        cPointhb h_x_1154.
Definition X_1155 :=
        let h_x_1155 a b c := a*((b-c)^2+a*(-2×a+b+c)) in
        cPointhb h_x_1155.
Definition X_1156 :=
        let h_x_1156 a b c := a/((b-c)^2+a*(-2×a+b+c)) in
        cPointhb h_x_1156.
Definition X_1157 :=
        let h_x_1157 a b c := (4*(SA a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)-a^2*(b^2×c^2-2×(SA a b c)^2+8×(DeltaMaj a b c)^2))/(b^2×c^2*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1157.
Definition X_1158 :=
        let h_x_1158 a b c := (sb a b c)*(a^2*(SA a b c)*(-a×c+(SB a b c))-b*(a-c)*(SB a b c)^2)-(a-b)*c*(sc a b c)*(SC a b c)^2 in
        cPointhb h_x_1158.
Definition X_1159 :=
        let h_x_1159 a b c := a*(a*(SA a b c)+4×b*(SB a b c)+4×c*(SC a b c)) in
        cPointhb h_x_1159.
Definition X_1160 :=
        let h_x_1160 a b c := a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c)-(SA a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_1160.
Definition X_1161 :=
        let h_x_1161 a b c := a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c)+(SA a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_1161.
Definition X_1162 :=
        let h_x_1162 a b c := (SB a b c)*(SC a b c)*(a^2+(DeltaMaj a b c))*(b^2+c^2+2*(DeltaMaj a b c)) in
        cPointhb h_x_1162.
Definition X_1163 :=
        let h_x_1163 a b c := (SB a b c)*(SC a b c)*(a^2-(DeltaMaj a b c))*(-b^2-c^2+2*(DeltaMaj a b c)) in
        cPointhb h_x_1163.
Definition X_1164 :=
        let h_x_1164 a b c := (SB a b c)*(SC a b c)*(a^2+(DeltaMaj a b c))*(-b^2-c^2+2*(DeltaMaj a b c)) in
        cPointhb h_x_1164.
Definition X_1165 :=
        let h_x_1165 a b c := (SB a b c)*(SC a b c)*(-a^2+(DeltaMaj a b c))*(b^2+c^2+2*(DeltaMaj a b c)) in
        cPointhb h_x_1165.
Definition X_1166 :=
        let h_x_1166 a b c := a^2/((a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*(b^2*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))+c^2*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c)))) in
        cPointhb h_x_1166.
Definition X_1167 :=
        let h_x_1167 a b c := a^2/(b*(sb a b c)*(SB a b c)+c*(sc a b c)*(SC a b c)) in
        cPointhb h_x_1167.
Definition X_1168 :=
        let h_x_1168 a b c := a/((2×a-b-c)*(b×c-2*(SA a b c))) in
        cPointhb h_x_1168.
Definition X_1169 :=
        let h_x_1169 a b c := a^2/((b+c)*(b^2+c^2+a*(b+c))) in
        cPointhb h_x_1169.
Definition X_1170 :=
        let h_x_1170 a b c := a/((sa a b c)*(a^2-2×b×c-a*(b+c)+2*(SA a b c))) in
        cPointhb h_x_1170.
Definition X_1172 :=
        let h_x_1172 a b c := a/((SA a b c)*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1172.
Definition X_1173 :=
        let h_x_1173 a b c := a^2/(a^2*(SA a b c)+8×(DeltaMaj a b c)^2) in
        cPointhb h_x_1173.
Definition X_1174 :=
        let h_x_1174 a b c := a^2/(a×b-(b-c)^2+a×c) in
        cPointhb h_x_1174.
Definition X_1175 :=
        let h_x_1175 a b c := a^2/((b+c)*(a×b×c+b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1175.
Definition X_1176 :=
        let h_x_1176 a b c := (a^2*(SA a b c))/(a^2+2*(SA a b c)) in
        cPointhb h_x_1176.
Definition X_1177 :=
        let h_x_1177 a b c := a^2/(c^2*(a^4-a^2×b^2+b^4-c^4)+b^2*(a^4-b^4-a^2×c^2+c^4)) in
        cPointhb h_x_1177.
Definition X_1178 :=
        let h_x_1178 a b c := a^2/((b+c)*(a^2+b×c)) in
        cPointhb h_x_1178.
Definition X_1179 :=
        let h_x_1179 a b c := 1/(b^2*(SA a b c)*((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)+c^2*(SA a b c)*((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1179.
Definition X_1180 :=
        let h_x_1180 a b c := a^2*(a^2×b^2+b^4+a^2×c^2+b^2×c^2+c^4) in
        cPointhb h_x_1180.
Definition X_1181 :=
        let h_x_1181 a b c := a^2*(SA a b c)*(a^2×b^2×c^2-4*(SA a b c)*(DeltaMaj a b c)^2) in
        cPointhb h_x_1181.
Definition X_1182 :=
        let h_x_1182 a b c := a^2*(b*(SB a b c)*(a*(SA a b c)+b*(SB a b c))+c*(a*(SA a b c)+b*(SB a b c))*(SC a b c)+c^2×(SC a b c)^2) in
        cPointhb h_x_1182.
Definition X_1183 :=
        let h_x_1183 a b c := a*(a-b-c)*(a^5+2×a^4*(b+c)+b×(b-c)^2×c*(b+c)+a^3*(2×b+c)*(b+2×c)+a×(b-c)^2*(b^2+b×c+c^2)+a^2*(b+c)*(2×b^2-b×c+2×c^2)) in
        cPointhb h_x_1183.
Definition X_1184 :=
        let h_x_1184 a b c := a^2*(a^2*(SA a b c)+(SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_1184.
Definition X_1185 :=
        let h_x_1185 a b c := a^3*(a×b^2+a×b×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_1185.
Definition X_1186 :=
        let h_x_1186 a b c := a^4*(a^2×b^4+a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4) in
        cPointhb h_x_1186.
Definition X_1187 :=
        let h_x_1187 a b c := a^2*(b+c)*(b×(a+b)^2*(a^2+b^2)+(a+b)*(a^3+a^2×b+3×a×b^2+b^3)*c+(2×a^3+4×a^2×b+2×a×b^2+b^3)*c^2+(2×a^2+4×a×b+b^2)*c^3+(2×a+b)*c^4+c^5) in
        cPointhb h_x_1187.
Definition X_1188 :=
        let h_x_1188 a b c := a^3*(a-b-c)*(-b×(b-c)^4×c-a×(b-c)^4*(b+c)+a^4*(b^2+b×c+c^2)-a^3*(b+c)*(3×b^2-2×b×c+3×c^2)+a^2×(b-c)^2*(3×b^2+4×b×c+3×c^2)) in
        cPointhb h_x_1188.
Definition X_1189 :=
        let h_x_1189 a b c := a^2*(-b×c+a*(b+c))*(a^4×(b-c)^4+a^3×(b-c)^4*(b+c)-b^3×c^3*(b^2+b×c+c^2)+a×b^2×c^2*(b+c)*(3×b^2-2×b×c+3×c^2)-a^2×b×(b-c)^2×c*(3×b^2+4×b×c+3×c^2)) in
        cPointhb h_x_1189.
Definition X_1190 :=
        let h_x_1190 a b c := a^2*(a-b-c)*(a^3+3×a×(b-c)^2-3×a^2*(b+c)-(b-c)^2*(b+c)) in
        cPointhb h_x_1190.
Definition X_1191 :=
        let h_x_1191 a b c := a^2*(a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_1191.
Definition X_1192 :=
        let h_x_1192 a b c := a^2*((SA a b c)^2×((SB a b c)-(SC a b c))^2+2×a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1192.
Definition X_1193 :=
        let h_x_1193 a b c := a^2*(b^2+c^2+a*(b+c)) in
        cPointhb h_x_1193.
Definition X_1194 :=
        let h_x_1194 a b c := a^2*(a^2×b^2+b^4+a^2×c^2+c^4) in
        cPointhb h_x_1194.
Definition X_1195 :=
        let h_x_1195 a b c := a^2*(a×b*(SA a b c)*(SB a b c)+b^2×(SB a b c)^2+a×c*(SA a b c)*(SC a b c)+c^2×(SC a b c)^2) in
        cPointhb h_x_1195.
Definition X_1196 :=
        let h_x_1196 a b c := a^2*(a^2*(SA a b c)+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_1196.
Definition X_1197 :=
        let h_x_1197 a b c := a^3*(a×b^2+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_1197.
Definition X_1198 :=
        let h_x_1198 a b c := a^2*(-b×c+a*(b+c))*(a^4×(b-c)^4-b^3×c^3*(b^2+c^2)-a^2×b×(b-c)^2×c*(3×b^2+5×b×c+3×c^2)+a^3×(b-c)^2*(b^3+c^3)+3×a×b^2×c^2*(b^3+c^3)) in
        cPointhb h_x_1198.
Definition X_1199 :=
        let h_x_1199 a b c := a^2*(4×(SA a b c)^2×(SB a b c)^2+7×c^2*(SA a b c)*(SB a b c)*(SC a b c)+c^2*(4*(SA a b c)+3*(SB a b c))*(SC a b c)^2) in
        cPointhb h_x_1199.
Definition X_1200 :=
        let h_x_1200 a b c := a^2*(a-b-c)*(a^2×b-2×a×b^2+b^3+a^2×c+4×a×b×c-b^2×c-2×a×c^2-b×c^2+c^3) in
        cPointhb h_x_1200.
Definition X_1201 :=
        let h_x_1201 a b c := a^2*(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_1201.
Definition X_1202 :=
        let h_x_1202 a b c := a^2*(a^3*(b+c)+3×a×(b-c)^2*(b+c)-3×a^2*(b^2+c^2)-(b-c)^2*(b^2+c^2)) in
        cPointhb h_x_1202.
Definition X_1203 :=
        let h_x_1203 a b c := a^2*(a^2+2×a×b+b^2+2×a×c+b×c+c^2) in
        cPointhb h_x_1203.
Definition X_1204 :=
        let h_x_1204 a b c := a^2*(SA a b c)*((SA a b c)*((SB a b c)-(SC a b c))^2+a^2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1204.
Definition X_1205 :=
        let h_x_1205 a b c := a^2*(a^10*(b^2+c^2)-a^8×(b^2+c^2)^2-(b^4-c^4)^2*(b^4+c^4)+2×a^4×(b^2-c^2)^2*(b^4+3×b^2×c^2+c^4)+a^6*(-2×b^6+3×b^4×c^2+3×b^2×c^4-2×c^6)+a^2×(b^2-c^2)^2*(b^6-2×b^4×c^2-2×b^2×c^4+c^6)) in
        cPointhb h_x_1205.
Definition X_1206 :=
        let h_x_1206 a b c := a^2*(a^2×b^2+a^2×b×c+2×a×b^2×c+a^2×c^2+2×a×b×c^2+b^2×c^2) in
        cPointhb h_x_1206.
Definition X_1207 :=
        let h_x_1207 a b c := a^2*((a^2×b^2+a^2×c^2+b^2×c^2)^2-a^4×b^2×c^2) in
        cPointhb h_x_1207.
Definition X_1208 :=
        let h_x_1208 a b c := a^2*(a^7*(b+c)-a×(b-c)^4×(b+c)^3+a^6*(b^2+c^2)-(b-c)^2×(b+c)^4*(b^2+c^2)+a^2×(b-c)^2*(3×b+c)*(b+3×c)*(b^2+c^2)-a^5*(b+c)*(3×b^2-2×b×c+3×c^2)+a^3×(b-c)^2*(b+c)*(3×b^2+2×b×c+3×c^2)-a^4×(b-c)^2*(3×b^2+8×b×c+3×c^2)) in
        cPointhb h_x_1208.
Definition X_1209 :=
        let h_x_1209 a b c := c^2/((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)+b^2/((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1209.
Definition X_1210 :=
        let h_x_1210 a b c := b*(sb a b c)*(SB a b c)+c*(sc a b c)*(SC a b c) in
        cPointhb h_x_1210.
Definition X_1211 :=
        let h_x_1211 a b c := (b+c)*(b^2+c^2+a*(b+c)) in
        cPointhb h_x_1211.
Definition X_1212 :=
        let h_x_1212 a b c := a*(a-b-c)*(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_1212.
Definition X_1213 :=
        let h_x_1213 a b c := (b+c)*(2×a+b+c) in
        cPointhb h_x_1213.
Definition X_1214 :=
        let h_x_1214 a b c := a*(SA a b c)*(b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1214.
Definition X_1215 :=
        let h_x_1215 a b c := (b+c)*(a^2+b×c) in
        cPointhb h_x_1215.
Definition X_1216 :=
        let h_x_1216 a b c := a^2*(b^2*(SA a b c)*((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)+c^2*(SA a b c)*((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1216.
Definition X_1217 :=
        let h_x_1217 a b c := 1/((SA a b c)*(a^2×b^2×c^2-4*(SA a b c)*(DeltaMaj a b c)^2)) in
        cPointhb h_x_1217.
Definition X_1218 :=
        let h_x_1218 a b c := 1/(a*(a×b^2+a×b×c+b^2×c+a×c^2+b×c^2)) in
        cPointhb h_x_1218.
Definition X_1219 :=
        let h_x_1219 a b c := 1/(a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_1219.
Definition X_1220 :=
        let h_x_1220 a b c := 1/(b^2+c^2+a*(b+c)) in
        cPointhb h_x_1220.
Definition X_1221 :=
        let h_x_1221 a b c := 1/(a*(a×b^2+b^2×c+a×c^2+b×c^2)) in
        cPointhb h_x_1221.
Definition X_1222 :=
        let h_x_1222 a b c := 1/(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_1222.
Definition X_1223 :=
        let h_x_1223 a b c := 1/(a^3*(b+c)+3×a×(b-c)^2*(b+c)-3×a^2*(b^2+c^2)-(b-c)^2*(b^2+c^2)) in
        cPointhb h_x_1223.
Definition X_1224 :=
        let h_x_1224 a b c := 1/(a^2+2×a×b+b^2+2×a×c+b×c+c^2) in
        cPointhb h_x_1224.
Definition X_1225 :=
        let h_x_1225 a b c := b^2×c^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))*(b^2*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))+c^2*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))) in
        cPointhb h_x_1225.
Definition X_1226 :=
        let h_x_1226 a b c := b^2×c^2*(b*(sb a b c)*(SB a b c)+c*(sc a b c)*(SC a b c)) in
        cPointhb h_x_1226.
Definition X_1227 :=
        let h_x_1227 a b c := b*(2×a-b-c)*c*(b×c-2*(SA a b c)) in
        cPointhb h_x_1227.
Definition X_1228 :=
        let h_x_1228 a b c := b^2×c^2*(b+c)*(b^2+c^2+a*(b+c)) in
        cPointhb h_x_1228.
Definition X_1229 :=
        let h_x_1229 a b c := b×c*(-a+b+c)*((b-c)^2-a*(b+c)) in
        cPointhb h_x_1229.
Definition X_1230 :=
        let h_x_1230 a b c := b^2×c^2*(b+c)*(2×a+b+c) in
        cPointhb h_x_1230.
Definition X_1231 :=
        let h_x_1231 a b c := b×c*(SA a b c)*(b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1231.
Definition X_1232 :=
        let h_x_1232 a b c := b^2×c^2*(a^2*(SA a b c)+8×(DeltaMaj a b c)^2) in
        cPointhb h_x_1232.
Definition X_1233 :=
        let h_x_1233 a b c := b^2×c^2*(a×b-(b-c)^2+a×c) in
        cPointhb h_x_1233.
Definition X_1234 :=
        let h_x_1234 a b c := b^2×c^2*(b+c)*(a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1234.
Definition X_1235 :=
        let h_x_1235 a b c := b^2×c^2*(a^2+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1235.
Definition X_1236 :=
        let h_x_1236 a b c := b^2×c^2*(c^2*(a^4-a^2×b^2+b^4-c^4)+b^2*(a^4-b^4-a^2×c^2+c^4)) in
        cPointhb h_x_1236.
Definition X_1237 :=
        let h_x_1237 a b c := b^2×c^2*(b+c)*(a^2+b×c) in
        cPointhb h_x_1237.
Definition X_1238 :=
        let h_x_1238 a b c := b^2*(SA a b c)*((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)+c^2*(SA a b c)*((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1238.
Definition X_1239 :=
        let h_x_1239 a b c := 1/(a^2*(a^2×b^2+b^4+a^2×c^2+b^2×c^2+c^4)) in
        cPointhb h_x_1239.
Definition X_1240 :=
        let h_x_1240 a b c := 1/(a^2*(b^2+c^2+a*(b+c))) in
        cPointhb h_x_1240.
Definition X_1241 :=
        let h_x_1241 a b c := 1/(a^2*(a^2×b^2+b^4+a^2×c^2+c^4)) in
        cPointhb h_x_1241.
Definition X_1242 :=
        let h_x_1242 a b c := a/(a^5-2×a^4×b+2×a^2×b^3-a×b^4-2×a^4×c-a^3×b×c+a^2×b^2×c+a×b^3×c+b^4×c+a^2×b×c^2+4×a×b^2×c^2-b^3×c^2+2×a^2×c^3+a×b×c^3-b^2×c^3-a×c^4+b×c^4) in
        cPointhb h_x_1242.
Definition X_1243 :=
        let h_x_1243 a b c := a/(a^6-a^5×b-2×a^4×b^2+2×a^3×b^3+a^2×b^4-a×b^5-a^5×c-a^4×b×c+2×a^2×b^3×c+a×b^4×c-b^5×c-2×a^4×c^2+2×a^2×b^2×c^2+2×a^3×c^3+2×a^2×b×c^3+2×b^3×c^3+a^2×c^4+a×b×c^4-a×c^5-b×c^5) in
        cPointhb h_x_1243.
Definition X_1244 :=
        let h_x_1244 a b c := a/(a^4×b-a^2×b^3+a^4×c+2×a^3×b×c+b^4×c+b^3×c^2-a^2×c^3+b^2×c^3+b×c^4) in
        cPointhb h_x_1244.
Definition X_1245 :=
        let h_x_1245 a b c := (a^2*(b+c))/(a^2+(b+c)^2) in
        cPointhb h_x_1245.
Definition X_1246 :=
        let h_x_1246 a b c := 1/(a^3×b-a×b^3+a^3×c+a^2×b×c-a×b^2×c-b^3×c-a×b×c^2-2×b^2×c^2-a×c^3-b×c^3) in
        cPointhb h_x_1246.
Definition X_1247 :=
        let h_x_1247 a b c := a/(a^3-b^3+a×b×c-c^3+2×a^2*(b+c)) in
        cPointhb h_x_1247.
Definition X_1248 :=
        let h_x_1248 a b c := a/(a×b*(a+c)*(b+c)*(SA a b c)*(SB a b c)*(sc a b c)+a*(a+b)*c*(b+c)*(SA a b c)*(sb a b c)*(SC a b c)-b*(a+b)*c*(a+c)*(sa a b c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1248.
Definition X_1249 :=
        let h_x_1249 a b c := (SB a b c)*(SC a b c)*(-a^2*(SA a b c)+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1249.
Definition X_1250 :=
        let h_x_1250 a b c := a^2*(sqrt(3)*(s a b c)*(sa a b c)-(DeltaMaj a b c)) in
        cPointhb h_x_1250.
Definition X_1251 :=
        let h_x_1251 a b c := a/(b×c-(SA a b c)-2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_1251.
Definition X_1252 :=
        let h_x_1252 a b c := a^2/(b-c)^2 in
        cPointhb h_x_1252.
Definition X_1253 :=
        let h_x_1253 a b c := a^3×(-a+b+c)^2 in
        cPointhb h_x_1253.
Definition X_1254 :=
        let h_x_1254 a b c := a×(b*(SB a b c)+c*(SC a b c))^2 in
        cPointhb h_x_1254.
Definition X_1255 :=
        let h_x_1255 a b c := a^2/(2×a^2+a×b+a×c) in
        cPointhb h_x_1255.
Definition X_1256 :=
        let h_x_1256 a b c := a/(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c))^2 in
        cPointhb h_x_1256.
Definition X_1257 :=
        let h_x_1257 a b c := a^2/(a*(a+c)*(SB a b c)+a*(a+b)*(SC a b c)) in
        cPointhb h_x_1257.
Definition X_1258 :=
        let h_x_1258 a b c := a/(b×c*(b+c)+a*(b^2+c^2)) in
        cPointhb h_x_1258.
Definition X_1259 :=
        let h_x_1259 a b c := a^2/((sb a b c)*(SB a b c)^2*(sc a b c)*(SC a b c)^2) in
        cPointhb h_x_1259.
Definition X_1260 :=
        let h_x_1260 a b c := a^2/((sb a b c)^2*(SB a b c)*(sc a b c)^2*(SC a b c)) in
        cPointhb h_x_1260.
Definition X_1261 :=
        let h_x_1261 a b c := (a*(-a+b+c))/((b-c)^2+a*(b+c)) in
        cPointhb h_x_1261.
Definition X_1262 :=
        let h_x_1262 a b c := a^2/((b-c)^2×(-a+b+c)^2) in
        cPointhb h_x_1262.
Definition X_1263 :=
        let h_x_1263 a b c := (a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)/(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_1263.
Definition X_1264 :=
        let h_x_1264 a b c := 1/((sb a b c)*(SB a b c)^2*(sc a b c)*(SC a b c)^2) in
        cPointhb h_x_1264.
Definition X_1265 :=
        let h_x_1265 a b c := 1/((sb a b c)^2*(SB a b c)*(sc a b c)^2*(SC a b c)) in
        cPointhb h_x_1265.
Definition X_1266 :=
        let h_x_1266 a b c := a×b+b^2+a×c-4×b×c+c^2 in
        cPointhb h_x_1266.
Definition X_1267 :=
        let h_x_1267 a b c := b×c+2*(DeltaMaj a b c) in
        cPointhb h_x_1267.
Definition X_1268 :=
        let h_x_1268 a b c := 1/(2×a+b+c) in
        cPointhb h_x_1268.
Definition X_1269 :=
        let h_x_1269 a b c := b^2×c^2*(2×a+b+c) in
        cPointhb h_x_1269.
Definition X_1270 :=
        let h_x_1270 a b c := (SA a b c)+(DeltaMaj a b c) in
        cPointhb h_x_1270.
Definition X_1271 :=
        let h_x_1271 a b c := (SA a b c)-(DeltaMaj a b c) in
        cPointhb h_x_1271.
Definition X_1272 :=
        let h_x_1272 a b c := b^2×c^2*(5×a^2*(SA a b c)-4*(SB a b c)*(SC a b c))-32×(SA a b c)^2×(DeltaMaj a b c)^2 in
        cPointhb h_x_1272.
Definition X_1273 :=
        let h_x_1273 a b c := (b^2×c^2-4×(SA a b c)^2)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1273.
Definition X_1274 :=
        let h_x_1274 a b c := cot((A a b c)/4) in
        cPointhb h_x_1274.
Definition X_1275 :=
        let h_x_1275 a b c := 1/((b-c)^2×(-a+b+c)^2) in
        cPointhb h_x_1275.
Definition X_1276 :=
        let h_x_1276 a b c := a*(sqrt(3)*(-a*(b×c+(SA a b c))+b*(SB a b c)+c*(SC a b c))+2*(-a+b+c)*(DeltaMaj a b c)) in
        cPointhb h_x_1276.
Definition X_1277 :=
        let h_x_1277 a b c := a*(sqrt(3)*(-a*(b×c+(SA a b c))+b*(SB a b c)+c*(SC a b c))-2*(-a+b+c)*(DeltaMaj a b c)) in
        cPointhb h_x_1277.
Definition X_1278 :=
        let h_x_1278 a b c := a×b+a×c-3×b×c in
        cPointhb h_x_1278.
Definition X_1279 :=
        let h_x_1279 a b c := a*((b-c)^2-a*(-2×a+b+c)) in
        cPointhb h_x_1279.
Definition X_1280 :=
        let h_x_1280 a b c := a/((b-c)^2-a*(-2×a+b+c)) in
        cPointhb h_x_1280.
Definition X_1281 :=
        let h_x_1281 a b c := (a^2-b×c)*(-a^3+b^3-a×b×c+c^3) in
        cPointhb h_x_1281.
Definition X_1282 :=
        let h_x_1282 a b c := a*(a^4+a^3×b-2×a^2×b^2+a×b^3-b^4+a^3×c-3×a^2×b×c+a×b^2×c+b^3×c-2×a^2×c^2+a×b×c^2+a×c^3+b×c^3-c^4) in
        cPointhb h_x_1282.
Definition X_1283 :=
        let h_x_1283 a b c := a^2*(a^4-a^3×b+a×b^3-b^4-a^3×c+b^2×c^2+a×c^3-c^4) in
        cPointhb h_x_1283.
Definition X_1284 :=
        let h_x_1284 a b c := (a*(b+c)*(-a^2+b×c))/(-a+b+c) in
        cPointhb h_x_1284.
Definition X_1285 :=
        let h_x_1285 a b c := (3×a^2+b^2-c^2)*(3×a^2-b^2+c^2) in
        cPointhb h_x_1285.
Definition X_1286 :=
        let h_x_1286 a b c := 1/((b^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2-2×a^2×b^2×c^2+b^4×c^2-a^2×c^4+b^2×c^4+c^6)) in
        cPointhb h_x_1286.
Definition X_1287 :=
        let h_x_1287 a b c := 1/((b^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2-a^2×b^2×c^2+b^4×c^2-a^2×c^4+b^2×c^4+c^6)) in
        cPointhb h_x_1287.
Definition X_1288 :=
        let h_x_1288 a b c := 1/((a^2-b^2-c^2)*(b^2-c^2)*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2+2×b^6×c^2-2×b^4×c^4+2×a^2×c^6+2×b^2×c^6-c^8)) in
        cPointhb h_x_1288.
Definition X_1289 :=
        let h_x_1289 a b c := 1/((a^2-b^2-c^2)*(b^2-c^2)*(a^4-b^4-c^4)) in
        cPointhb h_x_1289.
Definition X_1290 :=
        let h_x_1290 a b c := a/((b-c)*(a^3-a^2×b-a×b^2+b^3-a^2×c-a×b×c+b^2×c-a×c^2+b×c^2+c^3)) in
        cPointhb h_x_1290.
Definition X_1291 :=
        let h_x_1291 a b c := a^2/((b^2-c^2)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)) in
        cPointhb h_x_1291.
Definition X_1292 :=
        let h_x_1292 a b c := a/((b-c)*(a^2-2×a×b+b^2-2×a×c+c^2)) in
        cPointhb h_x_1292.
Definition X_1293 :=
        let h_x_1293 a b c := a^2/((b-c)*(-3×a+b+c)) in
        cPointhb h_x_1293.
Definition X_1294 :=
        let h_x_1294 a b c := 1/(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+4×a^4×b^2×c^2-3×a^2×b^4×c^2-2×b^6×c^2-3×a^4×c^4-3×a^2×b^2×c^4+6×b^4×c^4+3×a^2×c^6-2×b^2×c^6-c^8) in
        cPointhb h_x_1294.
Definition X_1295 :=
        let h_x_1295 a b c := a/(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c+2×a^3×b^2×c-3×a×b^4×c-a^4×c^2+2×a^3×b×c^2-4×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2-2×a^3×c^3+2×a×b^2×c^3+2×a^2×c^4-3×a×b×c^4+b^2×c^4+a×c^5-c^6) in
        cPointhb h_x_1295.
Definition X_1296 :=
        let h_x_1296 a b c := a^2/((5×a^2-b^2-c^2)*(b^2-c^2)) in
        cPointhb h_x_1296.
Definition X_1297 :=
        let h_x_1297 a b c := a^2/(2×a^6-a^4×b^2-b^6-a^4×c^2+b^4×c^2+b^2×c^4-c^6) in
        cPointhb h_x_1297.
Definition X_1298 :=
        let h_x_1298 a b c := a^2/((a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^8-2×a^6×b^2+a^4×b^4-2×a^6×c^2+a^4×b^2×c^2+b^6×c^2+a^4×c^4-2×b^4×c^4+b^2×c^6)) in
        cPointhb h_x_1298.
Definition X_1299 :=
        let h_x_1299 a b c := a^2/((SA a b c)*(a^4×(SA a b c)^2-(SB a b c)*((SB a b c)-(SC a b c))^2*(SC a b c)-a^2*(SA a b c)*((SB a b c)^2+(SC a b c)^2))) in
        cPointhb h_x_1299.
Definition X_1300 :=
        let h_x_1300 a b c := 1/((SA a b c)*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c)))) in
        cPointhb h_x_1300.
Definition X_1301 :=
        let h_x_1301 a b c := (a^2*(SB a b c)*(SC a b c))/((b^2-c^2)*(a^2*(SA a b c)-(SB a b c)*(SC a b c))) in
        cPointhb h_x_1301.
Definition X_1302 :=
        let h_x_1302 a b c := 1/((b^2-c^2)*(3×(SA a b c)^2+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1302.
Definition X_1303 :=
        let h_x_1303 a b c := a^2/((b^2-c^2)*(a^8-2×a^6×b^2+a^4×b^4-2×a^6×c^2+3×a^4×b^2×c^2-b^6×c^2+a^4×c^4+2×b^4×c^4-b^2×c^6)) in
        cPointhb h_x_1303.
Definition X_1304 :=
        let h_x_1304 a b c := (a^2*(SB a b c)*(SC a b c))/((b^2-c^2)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1304.
Definition X_1305 :=
        let h_x_1305 a b c := 1/((a-b-c)*(b-c)*(a^2×b-b^3+a^2×c+a×b×c-c^3)) in
        cPointhb h_x_1305.
Definition X_1306 :=
        let h_x_1306 a b c := a^2/((b^2-c^2)*(a^2+2*(DeltaMaj a b c))) in
        cPointhb h_x_1306.
Definition X_1307 :=
        let h_x_1307 a b c := a^2/((b^2-c^2)*(a^2-2*(DeltaMaj a b c))) in
        cPointhb h_x_1307.
Definition X_1308 :=
        let h_x_1308 a b c := a/((-b+c)*(a^2-2×a×b+b^2-2×a×c+b×c+c^2)) in
        cPointhb h_x_1308.
Definition X_1309 :=
        let h_x_1309 a b c := 1/((b-c)*(SA a b c)*(-a×b×c+b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1309.
Definition X_1310 :=
        let h_x_1310 a b c := a/((b-c)*(a^2+b^2+2×b×c+c^2)) in
        cPointhb h_x_1310.
Definition X_1311 :=
        let h_x_1311 a b c := 1/(a^2×b^2-b^4-a×b^2×c+b^3×c+a^2×c^2-a×b×c^2+b×c^3-c^4) in
        cPointhb h_x_1311.
Definition X_1312 :=
        let h_x_1312 a b c := a^2*(-1+(J a b c))*(SA a b c)+2*(1+(J a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1312.
Definition X_1313 :=
        let h_x_1313 a b c := a^2*(1+(J a b c))*(SA a b c)+2*(-1+(J a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1313.
Definition X_1314 :=
        let h_x_1314 a b c := a*(a×b^2×c^2*(-1+(J a b c)^2)*(s a b c)^2*(a^2*(SA a b c)+(SB a b c)*(SC a b c))+16×(DeltaMaj a b c)^2*(b×c*(s a b c)*(SB a b c)*(SC a b c)+2×a*(SA a b c)*(DeltaMaj a b c)^2))+2*(s a b c)*(SB a b c)*(SC a b c)*sqrt((s a b c)^2×(-b×c+2*(SA a b c))^2×(-a×c+2*(SB a b c))^2×(-a×b+2*(SC a b c))^2-a^3×b^3×c^3×(J a b c)^2*(s a b c)*(a×b×c*(s a b c)-16×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1314.
Definition X_1315 :=
        let h_x_1315 a b c := a*(a×b^2×c^2*(-1+(J a b c)^2)*(s a b c)^2*(a^2*(SA a b c)+(SB a b c)*(SC a b c))+16×(DeltaMaj a b c)^2*(b×c*(s a b c)*(SB a b c)*(SC a b c)+2×a*(SA a b c)*(DeltaMaj a b c)^2))-2*(s a b c)*(SB a b c)*(SC a b c)*sqrt((s a b c)^2×(-b×c+2*(SA a b c))^2×(-a×c+2*(SB a b c))^2×(-a×b+2*(SC a b c))^2-a^3×b^3×c^3×(J a b c)^2*(s a b c)*(a×b×c*(s a b c)-16×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1315.
Definition X_1316 :=
        let h_x_1316 a b c := a^8-a^6×b^2-a^6×c^2+a^4×b^2×c^2+b^6×c^2-2×b^4×c^4+b^2×c^6 in
        cPointhb h_x_1316.
Definition X_1317 :=
        let h_x_1317 a b c := (a+b-c)*(a-b+c)*(-2×a+b+c)^2 in
        cPointhb h_x_1317.
Definition X_1318 :=
        let h_x_1318 a b c := (a^2*(-a+b+c))/(-2×a+b+c)^2 in
        cPointhb h_x_1318.
Definition X_1319 :=
        let h_x_1319 a b c := (a*(-2×a+b+c))/(-a+b+c) in
        cPointhb h_x_1319.
Definition X_1320 :=
        let h_x_1320 a b c := (a*(-a+b+c))/(-2×a+b+c) in
        cPointhb h_x_1320.
Definition X_1321 :=
        let h_x_1321 a b c := ((SA a b c)+(DeltaMaj a b c))/((SA a b c)*((SA a b c)+2*(DeltaMaj a b c))) in
        cPointhb h_x_1321.
Definition X_1322 :=
        let h_x_1322 a b c := ((SA a b c)-(DeltaMaj a b c))/((SA a b c)*((SA a b c)-2*(DeltaMaj a b c))) in
        cPointhb h_x_1322.
Definition X_1323 :=
        let h_x_1323 a b c := (a+b-c)*(a-b+c)*(-2×a^2+(b-c)^2+a*(b+c)) in
        cPointhb h_x_1323.
Definition X_1324 :=
        let h_x_1324 a b c := a^2*(a^5-a^3×b^2+a^2×b^3-b^5+a^3×b×c-a×b^3×c-a^3×c^2+b^3×c^2+a^2×c^3-a×b×c^3+b^2×c^3-c^5) in
        cPointhb h_x_1324.
Definition X_1325 :=
        let h_x_1325 a b c := (a*(a^4-b^4+a^2×b×c-a×b^2×c-a×b×c^2+2×b^2×c^2-c^4))/(b+c) in
        cPointhb h_x_1325.
Definition X_1326 :=
        let h_x_1326 a b c := (a^2*(a×b+a×c-b×c-2*(SA a b c)))/(b+c) in
        cPointhb h_x_1326.
Definition X_1327 :=
        let h_x_1327 a b c := 1/(3*(SA a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_1327.
Definition X_1328 :=
        let h_x_1328 a b c := 1/(3*(SA a b c)-2*(DeltaMaj a b c)) in
        cPointhb h_x_1328.
Definition X_1329 :=
        let h_x_1329 a b c := c^2/(a+b-c)+b^2/(a-b+c) in
        cPointhb h_x_1329.
Definition X_1330 :=
        let h_x_1330 a b c := c^2/(a+b)+b^2/(a+c)-a^2/(b+c) in
        cPointhb h_x_1330.
Definition X_1331 :=
        let h_x_1331 a b c := (a^2*(SA a b c))/(b-c) in
        cPointhb h_x_1331.
Definition X_1332 :=
        let h_x_1332 a b c := (a*(SA a b c))/(b-c) in
        cPointhb h_x_1332.
Definition X_1333 :=
        let h_x_1333 a b c := a^3/(b+c) in
        cPointhb h_x_1333.
Definition X_1334 :=
        let h_x_1334 a b c := a^2*(b+c)*(-a+b+c) in
        cPointhb h_x_1334.
Definition X_1335 :=
        let h_x_1335 a b c := a^2*(b×c-2*(DeltaMaj a b c)) in
        cPointhb h_x_1335.
Definition X_1336 :=
        let h_x_1336 a b c := 1/(b×c-2*(DeltaMaj a b c)) in
        cPointhb h_x_1336.
Definition X_1337 :=
        let h_x_1337 a b c := (a^2*((SS a b c)*(SA a b c)-sqrt(3)*(SB a b c)*(SC a b c)))/(sqrt(3)×a^2+2*(SS a b c)) in
        cPointhb h_x_1337.
Definition X_1338 :=
        let h_x_1338 a b c := (a^2*((SS a b c)*(SA a b c)+sqrt(3)*(SB a b c)*(SC a b c)))/(sqrt(3)×a^2-2*(SS a b c)) in
        cPointhb h_x_1338.
Definition X_1339 :=
        let h_x_1339 a b c := (a*(-2×a+b+c)*(4×b×c*(-a+b+c)-(a+b+c)*(-a^2+b^2+c^2)))/(-3×a+b+c) in
        cPointhb h_x_1339.
Definition X_1340 :=
        let h_x_1340 a b c := a^2*(a^2*(SA a b c)+b^2*(SA a b c)+c^2*(SA a b c)+2×sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*(SA a b c)+8×(DeltaMaj a b c)^2) in
        cPointhb h_x_1340.
Definition X_1341 :=
        let h_x_1341 a b c := a^2*(a^2*(SA a b c)+b^2*(SA a b c)+c^2*(SA a b c)-2×sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*(SA a b c)+8×(DeltaMaj a b c)^2) in
        cPointhb h_x_1341.
Definition X_1342 :=
        let h_x_1342 a b c := a^2*(a^2+b^2+c^2-2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)-2*(SA a b c)) in
        cPointhb h_x_1342.
Definition X_1343 :=
        let h_x_1343 a b c := a^2*(a^2+b^2+c^2+2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)-2*(SA a b c)) in
        cPointhb h_x_1343.
Definition X_1344 :=
        let h_x_1344 a b c := a^2*(1+(J a b c))*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_1344.
Definition X_1345 :=
        let h_x_1345 a b c := a^2*(1-(J a b c))*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_1345.
Definition X_1346 :=
        let h_x_1346 a b c := a^2*(SA a b c)+(4+(J a b c))*(SB a b c)*(SC a b c)+4*(J a b c)*(DeltaMaj a b c)^2 in
        cPointhb h_x_1346.
Definition X_1347 :=
        let h_x_1347 a b c := a^2*(SA a b c)+(4-(J a b c))*(SB a b c)*(SC a b c)-4*(J a b c)*(DeltaMaj a b c)^2 in
        cPointhb h_x_1347.
Definition X_1348 :=
        let h_x_1348 a b c := sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)+a^2*((SA a b c)*((SA a b c)+(SB a b c)+(SC a b c))+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1348.
Definition X_1349 :=
        let h_x_1349 a b c := sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)-a^2*((SA a b c)*((SA a b c)+(SB a b c)+(SC a b c))+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1349.
Definition X_1350 :=
        let h_x_1350 a b c := a^2*((SA a b c)*(a^2+2*(SA a b c))-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1350.
Definition X_1351 :=
        let h_x_1351 a b c := a^2*((a^2-(SA a b c))*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1351.
Definition X_1352 :=
        let h_x_1352 a b c := (SA a b c)^2*(SB a b c)+(SC a b c)*(c^4+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1352.
Definition X_1353 :=
        let h_x_1353 a b c := a^2*((SA a b c)^2-2*(SB a b c)*(SC a b c))-(SA a b c)*(3×(SB a b c)^2+4*(SB a b c)*(SC a b c)+3×(SC a b c)^2) in
        cPointhb h_x_1353.
Definition X_1354 :=
        let h_x_1354 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))^2/(a-b-c) in
        cPointhb h_x_1354.
Definition X_1355 :=
        let h_x_1355 a b c := (a^4×((SA a b c)^2-(SB a b c)*(SC a b c))^2)/(a-b-c) in
        cPointhb h_x_1355.
Definition X_1356 :=
        let h_x_1356 a b c := (a^4×(b^2-c^2)^2)/(-a+b+c) in
        cPointhb h_x_1356.
Definition X_1357 :=
        let h_x_1357 a b c := (a^2×(b-c)^2)/(-a+b+c) in
        cPointhb h_x_1357.
Definition X_1358 :=
        let h_x_1358 a b c := (b-c)^2/(-a+b+c) in
        cPointhb h_x_1358.
Definition X_1359 :=
        let h_x_1359 a b c := (a^3*(SA a b c)-(b+c)*(SB a b c)*(SC a b c))^2/(-a+b+c) in
        cPointhb h_x_1359.
Definition X_1360 :=
        let h_x_1360 a b c := (2×a^3-a^2*(b+c)-(b-c)^2*(b+c))^2/(-a+b+c) in
        cPointhb h_x_1360.
Definition X_1361 :=
        let h_x_1361 a b c := (a^2×(a×b×c-b*(SB a b c)-c*(SC a b c))^2)/(-a+b+c) in
        cPointhb h_x_1361.
Definition X_1362 :=
        let h_x_1362 a b c := (a^2×(-a×b+b^2-a×c+c^2)^2)/(a-b-c) in
        cPointhb h_x_1362.
Definition X_1363 :=
        let h_x_1363 a b c := (a^4×(b^2-c^2)^2×(-a^2+b^2+c^2)^4)/(a-b-c) in
        cPointhb h_x_1363.
Definition X_1364 :=
        let h_x_1364 a b c := a^2*(a-b-c)*(b-c)^2×(SA a b c)^2 in
        cPointhb h_x_1364.
Definition X_1365 :=
        let h_x_1365 a b c := (b^2-c^2)^2/(-a+b+c) in
        cPointhb h_x_1365.
Definition X_1366 :=
        let h_x_1366 a b c := (2×a^2-b^2-c^2)^2/(-a+b+c) in
        cPointhb h_x_1366.
Definition X_1367 :=
        let h_x_1367 a b c := ((b^2-c^2)^2×(-a^2+b^2+c^2)^2)/(-a+b+c) in
        cPointhb h_x_1367.
Definition X_1368 :=
        let h_x_1368 a b c := (SA a b c)*(c^2*(SB a b c)+b^2*(SC a b c)) in
        cPointhb h_x_1368.
Definition X_1369 :=
        let h_x_1369 a b c := c^2/(a^2+b^2)+b^2/(a^2+c^2)-a^2/(b^2+c^2) in
        cPointhb h_x_1369.
Definition X_1370 :=
        let h_x_1370 a b c := -(a^2/(SA a b c))+b^2/(SB a b c)+c^2/(SC a b c) in
        cPointhb h_x_1370.
Definition X_1371 :=
        let h_x_1371 a b c := a+(8*(DeltaMaj a b c))/(3*(-a+b+c)) in
        cPointhb h_x_1371.
Definition X_1372 :=
        let h_x_1372 a b c := a-(8*(DeltaMaj a b c))/(3*(-a+b+c)) in
        cPointhb h_x_1372.
Definition X_1373 :=
        let h_x_1373 a b c := a+(8*(DeltaMaj a b c))/(-a+b+c) in
        cPointhb h_x_1373.
Definition X_1374 :=
        let h_x_1374 a b c := a-(8*(DeltaMaj a b c))/(-a+b+c) in
        cPointhb h_x_1374.
Definition X_1375 :=
        let h_x_1375 a b c := 2×a^3*(SA a b c)+(b-c)*(b^2*(SB a b c)-c^2*(SC a b c))-a*(b^2*(SB a b c)+c^2*(SC a b c)) in
        cPointhb h_x_1375.
Definition X_1376 :=
        let h_x_1376 a b c := a*(b×c*(b+c)-a*(SA a b c)) in
        cPointhb h_x_1376.
Definition X_1377 :=
        let h_x_1377 a b c := a*(b×c*(b+c)+2×a*(DeltaMaj a b c)) in
        cPointhb h_x_1377.
Definition X_1378 :=
        let h_x_1378 a b c := a*(b×c*(b+c)-2×a*(DeltaMaj a b c)) in
        cPointhb h_x_1378.
Definition X_1379 :=
        let h_x_1379 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)-(SA a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1379.
Definition X_1380 :=
        let h_x_1380 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)+(SA a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1380.
Definition X_1381 :=
        let h_x_1381 a b c := a^2*((a×b×c-sqrt(a×b×c*(a×b×c-(a+b-c)*(a-b+c)*(-a+b+c))))*(s a b c)*(SA a b c)-4×b×c×(DeltaMaj a b c)^2) in
        cPointhb h_x_1381.
Definition X_1382 :=
        let h_x_1382 a b c := a^2*((a×b×c+sqrt(a×b×c*(a×b×c-(a+b-c)*(a-b+c)*(-a+b+c))))*(s a b c)*(SA a b c)-4×b×c×(DeltaMaj a b c)^2) in
        cPointhb h_x_1382.
Definition X_1383 :=
        let h_x_1383 a b c := a^2/(a^2-2×b^2-2×c^2) in
        cPointhb h_x_1383.
Definition X_1384 :=
        let h_x_1384 a b c := a^2*(-5×a^2+b^2+c^2) in
        cPointhb h_x_1384.
Definition X_1385 :=
        let h_x_1385 a b c := a*(a×b×c-2×a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1385.
Definition X_1386 :=
        let h_x_1386 a b c := a*(a^2+b^2+c^2+a*(a+b+c)) in
        cPointhb h_x_1386.
Definition X_1387 :=
        let h_x_1387 a b c := a*(a-b-c)*((b-c)^2+a*(b+c))+3×a^2*(SA a b c)+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1387.
Definition X_1388 :=
        let h_x_1388 a b c := (a*(3×a-2×b-2×c))/(-a+b+c) in
        cPointhb h_x_1388.
Definition X_1389 :=
        let h_x_1389 a b c := a/(a×b×c-2×a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1389.
Definition X_1390 :=
        let h_x_1390 a b c := a/(a^2+b^2+c^2+a*(a+b+c)) in
        cPointhb h_x_1390.
Definition X_1391 :=
        let h_x_1391 a b c := a^2/(a*(a-b-c)*((b-c)^2+a*(b+c))+3×a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1391.
Definition X_1392 :=
        let h_x_1392 a b c := (a*(-a+b+c))/(3×a-2×b-2×c) in
        cPointhb h_x_1392.
Definition X_1393 :=
        let h_x_1393 a b c := (a*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1393.
Definition X_1394 :=
        let h_x_1394 a b c := (a*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1394.
Definition X_1395 :=
        let h_x_1395 a b c := a^3/((-a+b+c)*(SA a b c)) in
        cPointhb h_x_1395.
Definition X_1396 :=
        let h_x_1396 a b c := a/((b+c)*(-a+b+c)*(SA a b c)) in
        cPointhb h_x_1396.
Definition X_1397 :=
        let h_x_1397 a b c := a^4/(-a+b+c) in
        cPointhb h_x_1397.
Definition X_1398 :=
        let h_x_1398 a b c := a^2/((-a+b+c)^2*(SA a b c)) in
        cPointhb h_x_1398.
Definition X_1399 :=
        let h_x_1399 a b c := (a^3*(b×c+2*(SA a b c)))/(-a+b+c) in
        cPointhb h_x_1399.
Definition X_1400 :=
        let h_x_1400 a b c := (a^2*(b+c))/(-a+b+c) in
        cPointhb h_x_1400.
Definition X_1401 :=
        let h_x_1401 a b c := (a^2*(b^2+c^2))/(-a+b+c) in
        cPointhb h_x_1401.
Definition X_1402 :=
        let h_x_1402 a b c := (a^3*(b+c))/(-a+b+c) in
        cPointhb h_x_1402.
Definition X_1403 :=
        let h_x_1403 a b c := (a^2*(a×b+a×c-b×c))/(-a+b+c) in
        cPointhb h_x_1403.
Definition X_1404 :=
        let h_x_1404 a b c := (a^2*(-2×a+b+c))/(-a+b+c) in
        cPointhb h_x_1404.
Definition X_1405 :=
        let h_x_1405 a b c := (a^2*(-a+2×b+2×c))/(-a+b+c) in
        cPointhb h_x_1405.
Definition X_1406 :=
        let h_x_1406 a b c := (a^2*(-a*(SA a b c)+b*(SB a b c)+c*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1406.
Definition X_1407 :=
        let h_x_1407 a b c := a^2/(-a+b+c)^2 in
        cPointhb h_x_1407.
Definition X_1408 :=
        let h_x_1408 a b c := a^3/((b+c)*(-a+b+c)) in
        cPointhb h_x_1408.
Definition X_1409 :=
        let h_x_1409 a b c := (a^3*(b+c)*(SA a b c))/(-a+b+c) in
        cPointhb h_x_1409.
Definition X_1410 :=
        let h_x_1410 a b c := a^3×(a+b-c)^2×(a-b+c)^2*(b+c)*(SA a b c) in
        cPointhb h_x_1410.
Definition X_1411 :=
        let h_x_1411 a b c := a/((-a+b+c)*(b×c-2*(SA a b c))) in
        cPointhb h_x_1411.
Definition X_1412 :=
        let h_x_1412 a b c := a^2/((b+c)*(-a+b+c)) in
        cPointhb h_x_1412.
Definition X_1413 :=
        let h_x_1413 a b c := a^2/(a^4+4×a×b×c*(b+c)-2×a^2×(b+c)^2+(b^2-c^2)^2) in
        cPointhb h_x_1413.
Definition X_1414 :=
        let h_x_1414 a b c := a/((-a+b+c)*(b^2-c^2)) in
        cPointhb h_x_1414.
Definition X_1415 :=
        let h_x_1415 a b c := a^3/((b-c)*(-a+b+c)) in
        cPointhb h_x_1415.
Definition X_1416 :=
        let h_x_1416 a b c := (a^2*(a^2+b^2-(a+b)*c)*(a^2-a×b+c*(-b+c)))/(-a+b+c) in
        cPointhb h_x_1416.
Definition X_1417 :=
        let h_x_1417 a b c := a^3/((2×a-b-c)*(-a+b+c)) in
        cPointhb h_x_1417.
Definition X_1418 :=
        let h_x_1418 a b c := (a*(a×b-(b-c)^2+a×c))/(-a+b+c) in
        cPointhb h_x_1418.
Definition X_1419 :=
        let h_x_1419 a b c := (a*(3×a^2-(b-c)^2-2×a*(b+c)))/(a-b-c) in
        cPointhb h_x_1419.
Definition X_1420 :=
        let h_x_1420 a b c := (a*(3×a-b-c))/(-a+b+c) in
        cPointhb h_x_1420.
Definition X_1421 :=
        let h_x_1421 a b c := a*(a^2-a×b+b^2-2×b×c+c^2-(a*(a-b)*b)/(-a+b+c)) in
        cPointhb h_x_1421.
Definition X_1422 :=
        let h_x_1422 a b c := a/(a^4+4×a×b×c*(b+c)-2×a^2×(b+c)^2+(b^2-c^2)^2) in
        cPointhb h_x_1422.
Definition X_1423 :=
        let h_x_1423 a b c := (a*(a×b+a×c-b×c))/(-a+b+c) in
        cPointhb h_x_1423.
Definition X_1424 :=
        let h_x_1424 a b c := (a*(a^2×b^2+a^2×c^2-b^2×c^2))/(-a+b+c) in
        cPointhb h_x_1424.
Definition X_1425 :=
        let h_x_1425 a b c := (a^2×(b+c)^2*(a^2-b^2-c^2))/(-a+b+c)^2 in
        cPointhb h_x_1425.
Definition X_1426 :=
        let h_x_1426 a b c := a×(a+b-c)^2×(a-b+c)^2*(b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1426.
Definition X_1427 :=
        let h_x_1427 a b c := (a*(b+c))/(-a+b+c)^2 in
        cPointhb h_x_1427.
Definition X_1428 :=
        let h_x_1428 a b c := (a*(a^3-a×b×c))/(-a+b+c) in
        cPointhb h_x_1428.
Definition X_1429 :=
        let h_x_1429 a b c := (a*(a^2-b×c))/(-a+b+c) in
        cPointhb h_x_1429.
Definition X_1430 :=
        let h_x_1430 a b c := a*(SB a b c)*(SC a b c)*(a^4-a^2×b^2+a^2×b×c-b^3×c-a^2×c^2+2×b^2×c^2-b×c^3) in
        cPointhb h_x_1430.
Definition X_1431 :=
        let h_x_1431 a b c := a^2/((-a+b+c)*(a^2+b×c)) in
        cPointhb h_x_1431.
Definition X_1432 :=
        let h_x_1432 a b c := a/((-a+b+c)*(a^2+b×c)) in
        cPointhb h_x_1432.
Definition X_1433 :=
        let h_x_1433 a b c := (a^2*(SA a b c))/(-a*(b×c+(SA a b c))+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1433.
Definition X_1434 :=
        let h_x_1434 a b c := 1/((b+c)*(-a+b+c)) in
        cPointhb h_x_1434.
Definition X_1435 :=
        let h_x_1435 a b c := a/((-a+b+c)^2*(SA a b c)) in
        cPointhb h_x_1435.
Definition X_1436 :=
        let h_x_1436 a b c := a^2/(-a*(b×c+(SA a b c))+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1436.
Definition X_1437 :=
        let h_x_1437 a b c := a^3/(-b*(SB a b c)*(SC a b c)-c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1437.
Definition X_1438 :=
        let h_x_1438 a b c := a^2/(b^2+c^2-a*(b+c)) in
        cPointhb h_x_1438.
Definition X_1439 :=
        let h_x_1439 a b c := (a*(b+c)*(SA a b c))/(-a+b+c)^2 in
        cPointhb h_x_1439.
Definition X_1440 :=
        let h_x_1440 a b c := 1/((-a+b+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_1440.
Definition X_1441 :=
        let h_x_1441 a b c := (b+c)/(a*(-a+b+c)) in
        cPointhb h_x_1441.
Definition X_1442 :=
        let h_x_1442 a b c := (a*(b×c+2*(SA a b c)))/(-a+b+c) in
        cPointhb h_x_1442.
Definition X_1443 :=
        let h_x_1443 a b c := (a*(b×c-2*(SA a b c)))/(-a+b+c) in
        cPointhb h_x_1443.
Definition X_1444 :=
        let h_x_1444 a b c := (a*(SA a b c))/(b+c) in
        cPointhb h_x_1444.
Definition X_1445 :=
        let h_x_1445 a b c := (a*(a^2+b^2+c^2-2×a*(b+c)))/(-a+b+c) in
        cPointhb h_x_1445.
Definition X_1446 :=
        let h_x_1446 a b c := (b+c)/(a×(-a+b+c)^2) in
        cPointhb h_x_1446.
Definition X_1447 :=
        let h_x_1447 a b c := (a^2-b×c)/(a-b-c) in
        cPointhb h_x_1447.
Definition X_1448 :=
        let h_x_1448 a b c := (a*(a×b×c*(a+b+c)+2*(SB a b c)*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1448.
Definition X_1449 :=
        let h_x_1449 a b c := a*(3×a+b+c) in
        cPointhb h_x_1449.
Definition X_1450 :=
        let h_x_1450 a b c := (a^2*(a^2×b-b^3+a^2×c-4×a×b×c-b^2×c-b×c^2-c^3))/(-a+b+c) in
        cPointhb h_x_1450.
Definition X_1451 :=
        let h_x_1451 a b c := (a^2*(b×c*(a+b+c)+a*(SA a b c)))/(-a+b+c) in
        cPointhb h_x_1451.
Definition X_1452 :=
        let h_x_1452 a b c := (a*(a^3+a^2*(b+c)-a×(b+c)^2-(b+c)*(b^2+c^2))*(SB a b c)*(SC a b c))/(a-b-c) in
        cPointhb h_x_1452.
Definition X_1453 :=
        let h_x_1453 a b c := a*(3×a^3+3×a^2*(b+c)+(b-c)^2*(b+c)+a×(b+c)^2) in
        cPointhb h_x_1453.
Definition X_1454 :=
        let h_x_1454 a b c := (a^3×b×c+8×a×(DeltaMaj a b c)^2)/(-a+b+c) in
        cPointhb h_x_1454.
Definition X_1455 :=
        let h_x_1455 a b c := (a*(a^3*(SA a b c)-(b+c)*(SB a b c)*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1455.
Definition X_1456 :=
        let h_x_1456 a b c := (a*(2×a^3-a^2*(b+c)-(b-c)^2*(b+c)))/(-a+b+c) in
        cPointhb h_x_1456.
Definition X_1457 :=
        let h_x_1457 a b c := (a^2*(a×b×c-b*(SB a b c)-c*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1457.
Definition X_1458 :=
        let h_x_1458 a b c := (a^2*(a×b-b^2+a×c-c^2))/(-a+b+c) in
        cPointhb h_x_1458.
Definition X_1459 :=
        let h_x_1459 a b c := a^2*(b-c)*(SA a b c) in
        cPointhb h_x_1459.
Definition X_1460 :=
        let h_x_1460 a b c := (a^2*(a^2+(b+c)^2))/(-a+b+c) in
        cPointhb h_x_1460.
Definition X_1461 :=
        let h_x_1461 a b c := a^2/((b-c)*(-a+b+c)^2) in
        cPointhb h_x_1461.
Definition X_1462 :=
        let h_x_1462 a b c := a/((-a+b+c)*(b^2+c^2-a*(b+c))) in
        cPointhb h_x_1462.
Definition X_1463 :=
        let h_x_1463 a b c := (a*(-b×c*(b+c)+a*(b^2+c^2)))/(a-b-c) in
        cPointhb h_x_1463.
Definition X_1464 :=
        let h_x_1464 a b c := (a*(a^3*(b+c)-a*(b^3+c^3)))/(-a+b+c) in
        cPointhb h_x_1464.
Definition X_1465 :=
        let h_x_1465 a b c := (a*(a×b×c-b*(SB a b c)-c*(SC a b c)))/(-a+b+c) in
        cPointhb h_x_1465.
Definition X_1466 :=
        let h_x_1466 a b c := (a^2*(a^3-a×(b-c)^2-a^2*(b+c)+(b+c)^3))/(a-b-c) in
        cPointhb h_x_1466.
Definition X_1467 :=
        let h_x_1467 a b c := (a*((a-b)^3*(a+b)-2×a×(a+b)^2×c-2*(a-b)*b×c^2+2×a×c^3-c^4))/(-a+b+c) in
        cPointhb h_x_1467.
Definition X_1468 :=
        let h_x_1468 a b c := a^2*(a^2+2×b×c+a*(b+c)) in
        cPointhb h_x_1468.
Definition X_1469 :=
        let h_x_1469 a b c := (a^2*(b^2+b×c+c^2))/(-a+b+c) in
        cPointhb h_x_1469.
Definition X_1470 :=
        let h_x_1470 a b c := (a^2*(a^3-a×(b-c)^2-a^2*(b+c)+(b+c)*(b^2+c^2)))/(-a+b+c) in
        cPointhb h_x_1470.
Definition X_1471 :=
        let h_x_1471 a b c := (a^2*(a^2-2×b×c-a*(b+c)))/(-a+b+c) in
        cPointhb h_x_1471.
Definition X_1472 :=
        let h_x_1472 a b c := a^3/(a^2+(b+c)^2) in
        cPointhb h_x_1472.
Definition X_1473 :=
        let h_x_1473 a b c := a^2*(a^2+(b-c)^2)*(SA a b c) in
        cPointhb h_x_1473.
Definition X_1474 :=
        let h_x_1474 a b c := a^2/((b+c)*(SA a b c)) in
        cPointhb h_x_1474.
Definition X_1475 :=
        let h_x_1475 a b c := a^2*(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_1475.
Definition X_1476 :=
        let h_x_1476 a b c := a/((a-b-c)*((b-c)^2+a*(b+c))) in
        cPointhb h_x_1476.
Definition X_1477 :=
        let h_x_1477 a b c := a^2/((a-b-c)*(2×a^2+(b-c)^2-a*(b+c))) in
        cPointhb h_x_1477.
Definition X_1478 :=
        let h_x_1478 a b c := a^2×b×c+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1478.
Definition X_1479 :=
        let h_x_1479 a b c := a^2×b×c-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1479.
Definition X_1480 :=
        let h_x_1480 a b c := a^2*(2×b×c-(SA a b c))*(a*(2×b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1480.
Definition X_1481 :=
        let h_x_1481 a b c := (a^2*(2×b×c-(SA a b c)))/(a*(2×b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1481.
Definition X_1482 :=
        let h_x_1482 a b c := a*(a^3-2×a^2*(b+c)+2×(b-c)^2*(b+c)-a*(b^2-4×b×c+c^2)) in
        cPointhb h_x_1482.
Definition X_1483 :=
        let h_x_1483 a b c := 2×a^3*(b+c)-2×a×(b-c)^2*(b+c)+a^2*(-4×b×c+3*(SA a b c))-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1483.
Definition X_1484 :=
        let h_x_1484 a b c := -(3/4)+a/((b-c)*(a/(b-c)+c/(a-b)+b/(-a+c)))+((SB a b c)*(SC a b c))/(16×(DeltaMaj a b c)^2) in
        cPointhb h_x_1484.
Definition X_1485 :=
        let h_x_1485 a b c := a^2/(-a^4*(SA a b c)+b^4*(SB a b c)+c^4*(SC a b c)) in
        cPointhb h_x_1485.
Definition X_1486 :=
        let h_x_1486 a b c := a^2*(a^2*(sa a b c)-b^2*(sb a b c)-c^2*(sc a b c)) in
        cPointhb h_x_1486.
Definition X_1487 :=
        let h_x_1487 a b c := 1/(((SA a b c)^2-12×(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)-12×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1487.
Definition X_1488 :=
        let h_x_1488 a b c := sqrt(a)/(sqrt(b×c)+sqrt((sb a b c)*(sc a b c))) in
        cPointhb h_x_1488.
Definition X_1489 :=
        let h_x_1489 a b c := 1-sqrt(((s a b c)*(sa a b c))/(b×c))-sqrt(((sb a b c)*(sc a b c))/(b×c)) in
        cPointhb h_x_1489.
Definition X_1490 :=
        let h_x_1490 a b c := a*(-((a-b)^2-c^2)*(SA a b c)*(SB a b c)-(a+b-c)*c*(a×c-b×c-(SA a b c)+(SB a b c))*(SC a b c)) in
        cPointhb h_x_1490.
Definition X_1491 :=
        let h_x_1491 a b c := a*(b^3-c^3) in
        cPointhb h_x_1491.
Definition X_1492 :=
        let h_x_1492 a b c := a/(b^3-c^3) in
        cPointhb h_x_1492.
Definition X_1493 :=
        let h_x_1493 a b c := a^2*((SA a b c)^2-12×(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)-12×(DeltaMaj a b c)^2) in
        cPointhb h_x_1493.
Definition X_1494 :=
        let h_x_1494 a b c := 1/((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1494.
Definition X_1495 :=
        let h_x_1495 a b c := a^2*((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1495.
Definition X_1496 :=
        let h_x_1496 a b c := a^3*(b^2×c^2+(SA a b c)^2) in
        cPointhb h_x_1496.
Definition X_1497 :=
        let h_x_1497 a b c := a^3*(b^2×c^2+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1497.
Definition X_1498 :=
        let h_x_1498 a b c := a^2*((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1498.
Definition X_1499 :=
        let h_x_1499 a b c := (5×a^2-b^2-c^2)*(b^2-c^2) in
        cPointhb h_x_1499.
Definition X_1500 :=
        let h_x_1500 a b c := a^2×(b+c)^2 in
        cPointhb h_x_1500.
Definition X_1501 :=
        let h_x_1501 a b c := a^6 in
        cPointhb h_x_1501.
Definition X_1502 :=
        let h_x_1502 a b c := 1/a^4 in
        cPointhb h_x_1502.
Definition X_1503 :=
        let h_x_1503 a b c := a^2*(SB a b c)*(SC a b c)-(SA a b c)*((SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_1503.
Definition X_1504 :=
        let h_x_1504 a b c := a^2*(b^2+c^2+4*(DeltaMaj a b c)) in
        cPointhb h_x_1504.
Definition X_1505 :=
        let h_x_1505 a b c := a^2*(b^2+c^2-4*(DeltaMaj a b c)) in
        cPointhb h_x_1505.
Definition X_1506 :=
        let h_x_1506 a b c := (b^2-c^2)^2-2×a^2*(b^2+c^2) in
        cPointhb h_x_1506.
Definition X_1507 :=
        let h_x_1507 a b c := (1+2*(-cos((A a b c)/3)+cos((B a b c)/3)+cos((C a b c)/3)))*(sin(A a b c)) in
        cPointhb h_x_1507.
Definition X_1508 :=
        let h_x_1508 a b c := (2-sec((A a b c)/3)+sec((B a b c)/3)+sec((C a b c)/3))*(sin(A a b c)) in
        cPointhb h_x_1508.
Definition X_1509 :=
        let h_x_1509 a b c := 1/(b+c)^2 in
        cPointhb h_x_1509.
Definition X_1510 :=
        let h_x_1510 a b c := a^2*(b^2-c^2)*(-(SA a b c)^2+12×(DeltaMaj a b c)^2) in
        cPointhb h_x_1510.
Definition X_1511 :=
        let h_x_1511 a b c := a^2*(3×(SA a b c)^2-4×(DeltaMaj a b c)^2)*(-3*(SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_1511.
Definition X_1512 :=
        let h_x_1512 a b c := (-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3)*(-a^4+2×a^3×b-2×a×b^3+b^4+2×a^3×c+2×a×b^2×c+2×a×b×c^2-2×b^2×c^2-2×a×c^3+c^4) in
        cPointhb h_x_1512.
Definition X_1513 :=
        let h_x_1513 a b c := (3×a^4+(b^2-c^2)^2)*(-b^4-c^4+a^2*(b^2+c^2)) in
        cPointhb h_x_1513.
Definition X_1514 :=
        let h_x_1514 a b c := (2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^6+a^4×b^2-5×a^2×b^4+3×b^6+a^4×c^2+10×a^2×b^2×c^2-3×b^4×c^2-5×a^2×c^4-3×b^2×c^4+3×c^6) in
        cPointhb h_x_1514.
Definition X_1515 :=
        let h_x_1515 a b c := (SB a b c)*(SC a b c)*(-2×a^2*(SA a b c)+(SB a b c)*(SC a b c))*((SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1515.
Definition X_1516 :=
        let h_x_1516 a b c := (SA a b c)*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c)))*((SB a b c)*(SC a b c)*((SB a b c)^2+(SC a b c)^2)+a^2*(SA a b c)*((SB a b c)^2+3*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1516.
Definition X_1517 :=
        let h_x_1517 a b c := (-a^4×b×c+2×a^5*(b+c)+2×a^3×(b-c)^2*(b+c)+b×(b-c)^2×c×(b+c)^2-4*((SB a b c)^3+(SB a b c)^2*(SC a b c)+(SC a b c)^3+(SB a b c)*(SC a b c)*(-(SA a b c)+(SC a b c))))*(-a×(b-c)^2*(b+c)*(b^2+b×c+c^2)+a^3*(b^3+c^3)-2*(b^3×c^3+(c^2+(SC a b c))*(-(SA a b c)^2+(SB a b c)*(SC a b c)))) in
        cPointhb h_x_1517.
Definition X_1518 :=
        let h_x_1518 a b c := (a^3×b^2+a^2×b^3-a×b^4-b^5-a^2×b^2×c+b^4×c+a^3×c^2-a^2×b×c^2+4×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-a×c^4+b×c^4-c^5)*(5×a^5-a^4×b+4×a^2×b^3-a×b^4+b^5-a^4×c-4×a^2×b^2×c+b^4×c-4×a^2×b×c^2+2×a×b^2×c^2-2×b^3×c^2+4×a^2×c^3-2×b^2×c^3-a×c^4+b×c^4+c^5) in
        cPointhb h_x_1518.
Definition X_1519 :=
        let h_x_1519 a b c := (a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3)*(a^4-2×a^2×b^2+b^4+4×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_1519.
Definition X_1520 :=
        let h_x_1520 a b c := (a^3×b^2+a^2×b^3-a×b^4-b^5+a^3×c^2+2×a×b^2×c^2-b^3×c^2+a^2×c^3-b^2×c^3-a×c^4-c^5)*(4×a^5+a^4×b+2×a^2×b^3+b^5+a^4×c-2×a^2×b^2×c+b^4×c-2×a^2×b×c^2-2×b^3×c^2+2×a^2×c^3-2×b^2×c^3+b×c^4+c^5) in
        cPointhb h_x_1520.
Definition X_1521 :=
        let h_x_1521 a b c := (2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)*(2×a^4-a^3×b-a^2×b^2+a×b^3-b^4-a^3×c+2×a^2×b×c-a×b^2×c-a^2×c^2-a×b×c^2+2×b^2×c^2+a×c^3-c^4)*(a^5×b^2-a^4×b^3-2×a^3×b^4+2×a^2×b^5+a×b^6-b^7-a^4×b^2×c+2×a^3×b^3×c-2×a×b^5×c+b^6×c+a^5×c^2-a^4×b×c^2+2×a^3×b^2×c^2-2×a^2×b^3×c^2+a×b^4×c^2-b^5×c^2-a^4×c^3+2×a^3×b×c^3-2×a^2×b^2×c^3+b^4×c^3-2×a^3×c^4+a×b^2×c^4+b^3×c^4+2×a^2×c^5-2×a×b×c^5-b^2×c^5+a×c^6+b×c^6-c^7) in
        cPointhb h_x_1521.
Definition X_1522 :=
        let h_x_1522 a b c := (2×(SB a b c)^2×(SC a b c)^2+a^2*((SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(-3×(SB a b c)^2+4*(SB a b c)*(SC a b c)-3×(SC a b c)^2))*((SB a b c)*((SB a b c)-(SC a b c))^2*(SC a b c)+a^2*((SA a b c)*((SB a b c)^2+7*(SB a b c)*(SC a b c)+(SC a b c)^2)+8×sqrt(3)×(DeltaMaj a b c)^3)) in
        cPointhb h_x_1522.
Definition X_1524 :=
        let h_x_1524 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(2×sqrt(3)*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2))+((SB a b c)^2+a^2*(4*(SA a b c)-(SB a b c)-(SC a b c))+6*(SB a b c)*(SC a b c)+(SC a b c)^2)*(DeltaMaj a b c)) in
        cPointhb h_x_1524.
Definition X_1526 :=
        let h_x_1526 a b c := (-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4)*(-b^2×c^2+(-a^2+b^2+c^2)^2)*(7×a^8+3×a^4×(b^2-c^2)^2+2×(b^2-c^2)^4-11×a^6*(b^2+c^2)-a^2×(b^2-c^2)^2*(b^2+c^2)-64×sqrt(3)×a^2×(DeltaMaj a b c)^3) in
        cPointhb h_x_1526.
Definition X_1528 :=
        let h_x_1528 a b c := ((a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))*(a×(a+b-c)^2×(a-b+c)^2*(b+c)-4*(SA a b c)*(SB a b c)^2-4×a^2*(SB a b c)*(SC a b c)-4*(SA a b c)*(SC a b c)^2))/(a^2-b^2-c^2) in
        cPointhb h_x_1528.
Definition X_1529 :=
        let h_x_1529 a b c := (SB a b c)*(SC a b c)*(-(SA a b c)*(a^2+2*(SA a b c))+(SB a b c)*(SC a b c))*(-a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_1529.
Definition X_1530 :=
        let h_x_1530 a b c := (-2×a^3+a^2*(b+c)+(b-c)^2*(b+c))*(a^5-a×(b^2-c^2)^2-4*(b^3*(SB a b c)+c^3*(SC a b c))) in
        cPointhb h_x_1530.
Definition X_1531 :=
        let h_x_1531 a b c := (SA a b c)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1531.
Definition X_1532 :=
        let h_x_1532 a b c := (a×b×c-b*(SB a b c)-c*(SC a b c))*(a^3*(b+c)-a×(b-c)^2*(b+c)+2×a^2*(b×c-(SA a b c))-4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1532.
Definition X_1533 :=
        let h_x_1533 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(a^2*((SA a b c)^2+2*(SB a b c)*(SC a b c))+2*(SA a b c)*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1533.
Definition X_1534 :=
        let h_x_1534 a b c := (a^7+3×a^6*(b+c)-5×a^4×(b-c)^2*(b+c)+(b-c)^4×(b+c)^3+3×a×(b-c)^2×(b+c)^4-5×a^3×(b^2-c^2)^2+a^5*(b^2-6×b×c+c^2)+a^2×(b-c)^2*(b+c)*(b^2-6×b×c+c^2))*(a^5*(b+c)-(b-c)^2×(b+c)^4-a^4*(b^2-4×b×c+c^2)+a×(b-c)^2*(b+c)*(b^2-4×b×c+c^2)-2×a^3*(b+c)*(b^2-3×b×c+c^2)+2×a^2×(b+c)^2*(b^2-3×b×c+c^2)) in
        cPointhb h_x_1534.
Definition X_1535 :=
        let h_x_1535 a b c := (a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+2*(SA a b c))-4*(SB a b c)*(SC a b c))*(a^5*(b+c)+2×b×c×(b^2-c^2)^2+a×(b-c)^2*(b+c)*(b^2+c^2)-2×a^3*(b^3+c^3)-2×a^2*(b^3×c+b×c^3-2×(SA a b c)^2)+16*(SA a b c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1535.
Definition X_1536 :=
        let h_x_1536 a b c := (2×a^5+b^5+c^5+4×a^3*(SA a b c)-c×((SA a b c)-(SB a b c))^2-b×((SA a b c)-(SC a b c))^2-2×a×((SB a b c)-(SC a b c))^2)*(2×a^3-b^3-c^3+b*(SA a b c)+c*(SA a b c)-c*(SB a b c)-b*(SC a b c)) in
        cPointhb h_x_1536.
Definition X_1537 :=
        let h_x_1537 a b c := (a×b×c-b*(SB a b c)-c*(SC a b c))*(a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-6×b×c+6*(SA a b c))+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1537.
Definition X_1538 :=
        let h_x_1538 a b c := (a^3-(b-c)^2*(b+c)+a*(-3×b×c+3*(SA a b c)))*(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1538.
Definition X_1539 :=
        let h_x_1539 a b c := (2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^6-3×a^2×b^4+2×b^6+5×a^2×b^2×c^2-2×b^4×c^2-3×a^2×c^4-2×b^2×c^4+2×c^6) in
        cPointhb h_x_1539.
Definition X_1540 :=
        let h_x_1540 a b c := (7×a^2*(SA a b c)*(SB a b c)^2×(SC a b c)^2+3×(SB a b c)^3×(SC a b c)^3+2×a^2×(SA a b c)^3*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^2*(SB a b c)*(SC a b c)*(6×(SB a b c)^2+7*(SB a b c)*(SC a b c)+6×(SC a b c)^2))*(-4*(SA a b c)*(SB a b c)^2×(SC a b c)^2+a^2*(-(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2))) in
        cPointhb h_x_1540.
Definition X_1541 :=
        let h_x_1541 a b c := (2×a^3-b^3-c^3+b*(SA a b c)+c*(SA a b c)-c*(SB a b c)-b*(SC a b c))*(3×a^5+b^5+c^5+4×a^3*(SA a b c)-c×((SA a b c)-(SB a b c))^2-4×b^3*(SB a b c)-b×((SA a b c)-(SC a b c))^2-3×a×((SB a b c)-(SC a b c))^2-4×c^3*(SC a b c)) in
        cPointhb h_x_1541.
Definition X_1542 :=
        let h_x_1542 a b c := (a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+2*(SA a b c))-4*(SB a b c)*(SC a b c))*(b×c*(-a^4+2×a^3*(b+c)-2×a×(b-c)^2*(b+c)+(b-c)^2×(b+c)^2)-4*(SA a b c)*(SB a b c)^2-4*(a^2-(SA a b c))*(SB a b c)*(SC a b c)-4*(SA a b c)*(SC a b c)^2) in
        cPointhb h_x_1542.
Definition X_1543 :=
        let h_x_1543 a b c := (-3×a^4×b×c+a^5*(b+c)-2×a^3×(b-c)^2*(b+c)+a×(b-c)^2×(b+c)^3-b×c×(b^2-c^2)^2-4*(SA a b c)*(SB a b c)*(SC a b c))*(-b^5+2×b^2×c^3-c^5+2×b^3×c*(-a+c)+b*(2×a^3×c-2×a×c^3-(b^2+2*(SB a b c))*((SA a b c)-(SC a b c)))-c*((SA a b c)-(SB a b c))*(c^2+2*(SC a b c))+2×a*(-a^4+2×(SA a b c)^2+(SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_1543.
Definition X_1544 :=
        let h_x_1544 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(-b^5×c-a^5*(b+c)-a×(b-c)^2×(b+c)^3-b×c×(a^2-c^2)^2+2×b^3×c*(a^2+c^2)+2×a^3*(b+c)*(b^2+c^2)+4*(SA a b c)*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1544.
Definition X_1545 :=
        let h_x_1545 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)+8×sqrt(3)×(DeltaMaj a b c)^3) in
        cPointhb h_x_1545.
Definition X_1546 :=
        let h_x_1546 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)-8×sqrt(3)×(DeltaMaj a b c)^3) in
        cPointhb h_x_1546.
Definition X_1547 :=
        let h_x_1547 a b c := (2×a^3-b^3-c^3+b*(SA a b c)+c*(SA a b c)-c*(SB a b c)-b*(SC a b c))*(-2×a^4×b×c+a^5*(b+c)-2×a^3×(b-c)^2*(b+c)+a×(b-c)^4*(b+c)+2×b×c×(b^2-c^2)^2+4*(SA a b c)*(SB a b c)^2+4×a^2*(SB a b c)*(SC a b c)+4*(SA a b c)*(SC a b c)^2) in
        cPointhb h_x_1547.
Definition X_1548 :=
        let h_x_1548 a b c := (a×b×c-b*(SB a b c)-c*(SC a b c))*(b^7+4×a^5×b×c+4×a×b×c×(b^2-c^2)^2+b^5*(-(SA a b c)+(SC a b c))-2×a^2*(b^5+2×b^3*(SB a b c)+2×c^3*(SC a b c))+2×b*(SB a b c)*((SA a b c)^2+2*(SA a b c)*(SB a b c)+4×(SB a b c)^2+6*(SB a b c)*(SC a b c)+3×(SC a b c)^2)+2×c*(SC a b c)*(-c^4+(SA a b c)^2+3×(SB a b c)^2+2*(SA a b c)*(SC a b c)+6*(SB a b c)*(SC a b c)+4×(SC a b c)^2)) in
        cPointhb h_x_1548.
Definition X_1549 :=
        let h_x_1549 a b c := (2×a^4-a^3×b-a^2×b^2+a×b^3-b^4-a^3×c+2×a^2×b×c-a×b^2×c-a^2×c^2-a×b×c^2+2×b^2×c^2+a×c^3-c^4)*(a^8×b-2×a^7×b^2-2×a^6×b^3+6×a^5×b^4-6×a^3×b^6+2×a^2×b^7+2×a×b^8-b^9+a^8×c+2×a^6×b^2×c-4×a^4×b^4×c-2×a^2×b^6×c+3×b^8×c-2×a^7×c^2+2×a^6×b×c^2-4×a^5×b^2×c^2+4×a^4×b^3×c^2+6×a^3×b^4×c^2-6×a^2×b^5×c^2-2×a^6×c^3+4×a^4×b^2×c^3+6×a^2×b^4×c^3-8×b^6×c^3+6×a^5×c^4-4×a^4×b×c^4+6×a^3×b^2×c^4+6×a^2×b^3×c^4-4×a×b^4×c^4+6×b^5×c^4-6×a^2×b^2×c^5+6×b^4×c^5-6×a^3×c^6-2×a^2×b×c^6-8×b^3×c^6+2×a^2×c^7+2×a×c^8+3×b×c^8-c^9) in
        cPointhb h_x_1549.
Definition X_1550 :=
        let h_x_1550 a b c := (a^2*((SA a b c)^2+(SB a b c)*(SC a b c))-2*(SA a b c)*((SB a b c)^2+(SC a b c)^2))*(-(SB a b c)*(SC a b c)*((SB a b c)^2-3*(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)-(SA a b c)*((SB a b c)^3+(SC a b c)^3)) in
        cPointhb h_x_1550.
Definition X_1551 :=
        let h_x_1551 a b c := (a^2*((SA a b c)^2+(SB a b c)*(SC a b c))-2*(SA a b c)*((SB a b c)^2+(SC a b c)^2))*(2×a^2×(SA a b c)^3-(SB a b c)*(SC a b c)*((SB a b c)^2-7*(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^2*((SB a b c)^2-5*(SB a b c)*(SC a b c)+(SC a b c)^2)-a^2*(SA a b c)*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1551.
Definition X_1552 :=
        let h_x_1552 a b c := (4*(SA a b c)*(SB a b c)^2×(SC a b c)^2+a^2*(-(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2-3*(SB a b c)*(SC a b c)+(SC a b c)^2)))/((SA a b c)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1552.
Definition X_1553 :=
        let h_x_1553 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))^2*(2×(SB a b c)^2×(SC a b c)^2+a^2*((SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(-3×(SB a b c)^2+4*(SB a b c)*(SC a b c)-3×(SC a b c)^2)) in
        cPointhb h_x_1553.
Definition X_1554 :=
        let h_x_1554 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*((SA a b c)^2×(SB a b c)^2*((SA a b c)+(SB a b c))-4×(SA a b c)^3*(SB a b c)*(SC a b c)+((SA a b c)^3-(a^2-2*(SA a b c))*(SB a b c)^2)*(SC a b c)^2+(SA a b c)^2×(SC a b c)^3)*(-a^2*(SB a b c)*(SC a b c)+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_1554.
Definition X_1555 :=
        let h_x_1555 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(a^6*(SA a b c)+(SB a b c)*(SC a b c)*((SB a b c)^2+3*(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^2*(2×(SB a b c)^2+(SB a b c)*(SC a b c)+2×(SC a b c)^2)) in
        cPointhb h_x_1555.
Definition X_1556 :=
        let h_x_1556 a b c := (a^2*((SA a b c)^2-3*(SB a b c)*(SC a b c))+2*(SA a b c)*((SB a b c)^2+(SC a b c)^2))*((SB a b c)*(SC a b c)*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)+a^2*(SA a b c)*(2×(SA a b c)^2+(SB a b c)^2+9*(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^2*(3×(SB a b c)^2+13*(SB a b c)*(SC a b c)+3×(SC a b c)^2)) in
        cPointhb h_x_1556.
Definition X_1557 :=
        let h_x_1557 a b c := (a^2*(SA a b c)*((SB a b c)-(SC a b c))^2+2×(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)-(SB a b c)*(SC a b c)*((SB a b c)^2+4*(SB a b c)*(SC a b c)+(SC a b c)^2))*(-(SB a b c)^2×(SC a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)^4*((SB a b c)^2+4*(SB a b c)*(SC a b c)+(SC a b c)^2)+a^2*(SA a b c)*(2×(SA a b c)^2+(SB a b c)*(SC a b c))*((SB a b c)^2+7*(SB a b c)*(SC a b c)+(SC a b c)^2)+3×(SA a b c)^2*(SB a b c)*(SC a b c)*(4×(SB a b c)^2+9*(SB a b c)*(SC a b c)+4×(SC a b c)^2)) in
        cPointhb h_x_1557.
Definition X_1558 :=
        let h_x_1558 a b c := (2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^6-a^5×b+2×a^3×b^3-3×a^2×b^4-a×b^5+2×b^6-a^5×c+a^4×b×c+a×b^4×c-b^5×c+6×a^2×b^2×c^2-2×b^4×c^2+2×a^3×c^3+2×b^3×c^3-3×a^2×c^4+a×b×c^4-2×b^2×c^4-a×c^5-b×c^5+2×c^6) in
        cPointhb h_x_1558.
Definition X_1559 :=
        let h_x_1559 a b c := (SB a b c)*(SC a b c)*(-a^2*(SA a b c)+(SB a b c)*(SC a b c))*((SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1559.
Definition X_1560 :=
        let h_x_1560 a b c := (a^2-2*(SA a b c))*(SB a b c)*(SC a b c)*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_1560.
Definition X_1561 :=
        let h_x_1561 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(-a^2*(SA a b c)*((SB a b c)-(SC a b c))^2-(SB a b c)*(SC a b c)*(-3×(SA a b c)^2+(SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1561.
Definition X_1562 :=
        let h_x_1562 a b c := (SA a b c)*((SB a b c)-(SC a b c))^2*(a^2*(SA a b c)-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1562.
Definition X_1563 :=
        let h_x_1563 a b c := (a^2*(-(SA a b c)^2+(SB a b c)*(SC a b c))-4*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(DeltaMaj a b c))*(-(SA a b c)×(SB a b c)^2*(5*(SA a b c)+(SB a b c))-c^2*(SB a b c)*(9*(SA a b c)+(SB a b c))*(SC a b c)-5×c^4×(SC a b c)^2-c^2×(SC a b c)^3-4*(a^2*((SA a b c)^2+2*(SB a b c)*(SC a b c))+2*(SA a b c)*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2))*(DeltaMaj a b c)) in
        cPointhb h_x_1563.
Definition X_1565 :=
        let h_x_1565 a b c := (b-c)^2*(SA a b c) in
        cPointhb h_x_1565.
Definition X_1566 :=
        let h_x_1566 a b c := (a-b-c)*(b-c)^2*(a×b-b^2+a×c-c^2)*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_1566.
Definition X_1567 :=
        let h_x_1567 a b c := (a^6×b^2-a^4×b^4+a^6×c^2-2×a^4×b^2×c^2+a^2×b^4×c^2-b^6×c^2-a^4×c^4+a^2×b^2×c^4+2×b^4×c^4-b^2×c^6)*(2×a^8×b^4-3×a^6×b^6+a^2×b^10+a^8×b^2×c^2-5×a^4×b^6×c^2+2×a^8×c^4+7×a^4×b^4×c^4+a^2×b^6×c^4+b^8×c^4-3×a^6×c^6-5×a^4×b^2×c^6+a^2×b^4×c^6-2×b^6×c^6+b^4×c^8+a^2×c^10) in
        cPointhb h_x_1567.
Definition X_1568 :=
        let h_x_1568 a b c := (SA a b c)*(a^4×(SA a b c)^2-4×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1568.
Definition X_1569 :=
        let h_x_1569 a b c := b^2×c^2×(b^2-c^2)^2-a^2*(b^2+c^2)*(2×a^4+b^4+c^4-2×a^2*(b^2+c^2)) in
        cPointhb h_x_1569.
Definition X_1570 :=
        let h_x_1570 a b c := a^2*(2×a^4-3×a^2×b^2+3×b^4-3×a^2×c^2-2×b^2×c^2+3×c^4) in
        cPointhb h_x_1570.
Definition X_1571 :=
        let h_x_1571 a b c := a*(a^3+a×b×c+3×a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1571.
Definition X_1572 :=
        let h_x_1572 a b c := a*(a^3-a×b×c+a*(SA a b c)+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1572.
Definition X_1573 :=
        let h_x_1573 a b c := a*(2×b×c*(b+c)+a*(b^2+c^2)) in
        cPointhb h_x_1573.
Definition X_1574 :=
        let h_x_1574 a b c := a*(2×b×c*(b+c)-a*(b^2+c^2)) in
        cPointhb h_x_1574.
Definition X_1575 :=
        let h_x_1575 a b c := a*(a×b^2-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_1575.
Definition X_1576 :=
        let h_x_1576 a b c := a^4/(b^2-c^2) in
        cPointhb h_x_1576.
Definition X_1577 :=
        let h_x_1577 a b c := (b^2-c^2)/a in
        cPointhb h_x_1577.
Definition X_1578 :=
        let h_x_1578 a b c := a^2/((SB a b c)*(SC a b c))+(2*(DeltaMaj a b c))/(b^2×c^2) in
        cPointhb h_x_1578.
Definition X_1579 :=
        let h_x_1579 a b c := a^2/((SB a b c)*(SC a b c))-(2*(DeltaMaj a b c))/(b^2×c^2) in
        cPointhb h_x_1579.
Definition X_1580 :=
        let h_x_1580 a b c := a*(a^4-b^2×c^2) in
        cPointhb h_x_1580.
Definition X_1581 :=
        let h_x_1581 a b c := a/(a^4-b^2×c^2) in
        cPointhb h_x_1581.
Definition X_1582 :=
        let h_x_1582 a b c := a*(a^4+b^2×c^2) in
        cPointhb h_x_1582.
Definition X_1583 :=
        let h_x_1583 a b c := a*((SA a b c)/(b×c)+(b×c)/(2*(DeltaMaj a b c))) in
        cPointhb h_x_1583.
Definition X_1584 :=
        let h_x_1584 a b c := a*((SA a b c)/(b×c)-(b×c)/(2*(DeltaMaj a b c))) in
        cPointhb h_x_1584.
Definition X_1585 :=
        let h_x_1585 a b c := 2/(SA a b c)+1/(DeltaMaj a b c) in
        cPointhb h_x_1585.
Definition X_1586 :=
        let h_x_1586 a b c := 2/(SA a b c)-1/(DeltaMaj a b c) in
        cPointhb h_x_1586.
Definition X_1587 :=
        let h_x_1587 a b c := (SB a b c)*(SC a b c)+2×a^2*(DeltaMaj a b c) in
        cPointhb h_x_1587.
Definition X_1588 :=
        let h_x_1588 a b c := (SB a b c)*(SC a b c)-2×a^2*(DeltaMaj a b c) in
        cPointhb h_x_1588.
Definition X_1589 :=
        let h_x_1589 a b c := (2×a^2)/((SB a b c)*(SC a b c))+1/(DeltaMaj a b c) in
        cPointhb h_x_1589.
Definition X_1590 :=
        let h_x_1590 a b c := (2×a^2)/((SB a b c)*(SC a b c))-1/(DeltaMaj a b c) in
        cPointhb h_x_1590.
Definition X_1591 :=
        let h_x_1591 a b c := a^2×b^2×c^2+2*(SB a b c)*(SC a b c)*(DeltaMaj a b c)+8×(DeltaMaj a b c)^3 in
        cPointhb h_x_1591.
Definition X_1592 :=
        let h_x_1592 a b c := a^2×b^2×c^2-2*(SB a b c)*(SC a b c)*(DeltaMaj a b c)-8×(DeltaMaj a b c)^3 in
        cPointhb h_x_1592.
Definition X_1593 :=
        let h_x_1593 a b c := a*((b×c)/(SA a b c)+(SA a b c)/(b×c)) in
        cPointhb h_x_1593.
Definition X_1594 :=
        let h_x_1594 a b c := (a×b×c)/(SA a b c)+(2*(SB a b c)*(SC a b c)+8×(DeltaMaj a b c)^2)/(a×b×c) in
        cPointhb h_x_1594.
Definition X_1595 :=
        let h_x_1595 a b c := (2×a×b×c)/(SA a b c)+((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)/(a×b×c) in
        cPointhb h_x_1595.
Definition X_1596 :=
        let h_x_1596 a b c := (2×a×b×c)/(SA a b c)-((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)/(a×b×c) in
        cPointhb h_x_1596.
Definition X_1597 :=
        let h_x_1597 a b c := (2×a×b×c)/(SA a b c)-((SB a b c)*(SC a b c)-4×(DeltaMaj a b c)^2)/(a×b×c) in
        cPointhb h_x_1597.
Definition X_1598 :=
        let h_x_1598 a b c := (2×a×b×c)/(SA a b c)+((SB a b c)*(SC a b c)-4×(DeltaMaj a b c)^2)/(a×b×c) in
        cPointhb h_x_1598.
Definition X_1599 :=
        let h_x_1599 a b c := a*((2*(SA a b c))/(b×c)+(b×c)/(2*(DeltaMaj a b c))) in
        cPointhb h_x_1599.
Definition X_1600 :=
        let h_x_1600 a b c := a*((2*(SA a b c))/(b×c)-(b×c)/(2*(DeltaMaj a b c))) in
        cPointhb h_x_1600.
Definition X_1601 :=
        let h_x_1601 a b c := a^2*(c^4/(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))^2+b^4/(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))^2-a^4/(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))^2) in
        cPointhb h_x_1601.
Definition X_1602 :=
        let h_x_1602 a b c := a^2*(-a^4×(sa a b c)^2+b^4×(sb a b c)^2+c^4×(sc a b c)^2) in
        cPointhb h_x_1602.
Definition X_1603 :=
        let h_x_1603 a b c := a^2*(-(a^4/(sa a b c)^2)+b^4/(sb a b c)^2+c^4/(sc a b c)^2) in
        cPointhb h_x_1603.
Definition X_1604 :=
        let h_x_1604 a b c := a^2*(-(a^2/(sa a b c)^2)+b^2/(sb a b c)^2+c^2/(sc a b c)^2) in
        cPointhb h_x_1604.
Definition X_1605 :=
        let h_x_1605 a b c := a^2*(-(a^4/(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))^2)+b^4/(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)+2×sqrt(3)×b^2*(DeltaMaj a b c))^2+c^4/(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c))^2) in
        cPointhb h_x_1605.
Definition X_1606 :=
        let h_x_1606 a b c := a^2*(-(a^4/(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c))^2)+b^4/(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)-2×sqrt(3)×b^2*(DeltaMaj a b c))^2+c^4/(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)-2×sqrt(3)×c^2*(DeltaMaj a b c))^2) in
        cPointhb h_x_1606.
Definition X_1607 :=
        let h_x_1607 a b c := a^2*(c^4/(((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))^2×((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))^2)+b^4/(((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))^2×((SC a b c)+2×sqrt(3)*(DeltaMaj a b c))^2)-a^4/(((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))^2×((SC a b c)+2×sqrt(3)*(DeltaMaj a b c))^2)) in
        cPointhb h_x_1607.
Definition X_1608 :=
        let h_x_1608 a b c := a^2*(c^4/(((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))^2×((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))^2)+b^4/(((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))^2×((SC a b c)-2×sqrt(3)*(DeltaMaj a b c))^2)-a^4/(((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))^2×((SC a b c)-2×sqrt(3)*(DeltaMaj a b c))^2)) in
        cPointhb h_x_1608.
Definition X_1609 :=
        let h_x_1609 a b c := a^2*(-a^2×(SA a b c)^2+b^2×(SB a b c)^2+c^2×(SC a b c)^2) in
        cPointhb h_x_1609.
Definition X_1610 :=
        let h_x_1610 a b c := a^2*(c^2/((a+b-c)^2×(a+c)^2×(b+c)^2)+b^2/((a+b)^2×(a-b+c)^2×(b+c)^2)-a^2/((a+b)^2×(a+c)^2×(-a+b+c)^2)) in
        cPointhb h_x_1610.
Definition X_1611 :=
        let h_x_1611 a b c := a^2*(-(SA a b c)^2+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_1611.
Definition X_1612 :=
        let h_x_1612 a b c := a^2*(-a^2×(b+c)^2×(SA a b c)^2+b^2×(a+c)^2×(SB a b c)^2+(a+b)^2×c^2×(SC a b c)^2) in
        cPointhb h_x_1612.
Definition X_1613 :=
        let h_x_1613 a b c := a^2*(-(1/a^2)+1/b^2+1/c^2) in
        cPointhb h_x_1613.
Definition X_1614 :=
        let h_x_1614 a b c := a^2*(((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)^2+((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)^2-((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)^2) in
        cPointhb h_x_1614.
Definition X_1615 :=
        let h_x_1615 a b c := a^2*(-(1/(sa a b c)^2)+1/(sb a b c)^2+1/(sc a b c)^2) in
        cPointhb h_x_1615.
Definition X_1616 :=
        let h_x_1616 a b c := a^2*((sa a b c)^2-(sb a b c)^2-(sc a b c)^2) in
        cPointhb h_x_1616.
Definition X_1617 :=
        let h_x_1617 a b c := a^2*(-a^2×(sa a b c)^2+b^2×(sb a b c)^2+c^2×(sc a b c)^2) in
        cPointhb h_x_1617.
Definition X_1618 :=
        let h_x_1618 a b c := a^2*(- (b-c)^4×(sa a b c)^2+ (a-c)^4×(sb a b c)^2+ (a-b)^4×(sc a b c)^2) in
        cPointhb h_x_1618.
Definition X_1619 :=
        let h_x_1619 a b c := a^2*(-(a^2/(SA a b c)^2)+b^2/(SB a b c)^2+c^2/(SC a b c)^2) in
        cPointhb h_x_1619.
Definition X_1620 :=
        let h_x_1620 a b c := a^2*((-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2+(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2-(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2) in
        cPointhb h_x_1620.
Definition X_1621 :=
        let h_x_1621 a b c := a*(-a^2+b×c+a*(b+c)) in
        cPointhb h_x_1621.
Definition X_1622 :=
        let h_x_1622 a b c := a^2*(b^2×(a×b×c-a*(SA a b c)+b*(SB a b c)-c*(SC a b c))^2+c^2×(a×b×c-a*(SA a b c)-b*(SB a b c)+c*(SC a b c))^2-a^2×(-a*(b×c+(SA a b c))+b*(SB a b c)+c*(SC a b c))^2) in
        cPointhb h_x_1622.
Definition X_1623 :=
        let h_x_1623 a b c := a^2*((a+b-2×c)^2×c^2+b^2×(a-2×b+c)^2-a^2×(-2×a+b+c)^2) in
        cPointhb h_x_1623.
Definition X_1624 :=
        let h_x_1624 a b c := a^2*(b^2×(SB a b c)^2×((SA a b c)-(SC a b c))^2-a^2×(SA a b c)^2×((SB a b c)-(SC a b c))^2+c^2×((SA a b c)-(SB a b c))^2×(SC a b c)^2) in
        cPointhb h_x_1624.
Definition X_1625 :=
        let h_x_1625 a b c := a^2*((a^2-b^2)^2/c^2-(b^2-c^2)^2/a^2+(-a^2+c^2)^2/b^2) in
        cPointhb h_x_1625.
Definition X_1626 :=
        let h_x_1626 a b c := a^2*(a^3*(sa a b c)-b^3*(sb a b c)-c^3*(sc a b c)) in
        cPointhb h_x_1626.
Definition X_1627 :=
        let h_x_1627 a b c := a^2*((a^2+b^2)^2+(a^2+c^2)^2-(b^2+c^2)^2) in
        cPointhb h_x_1627.
Definition X_1628 :=
        let h_x_1628 a b c := a^2*(b^4×(SB a b c)^2×(b^2*((SB a b c)^2-(SA a b c)*(SC a b c))-(SB a b c)*((SA a b c)^2+(SC a b c)^2))^2+c^4×(SC a b c)^2×(-((SA a b c)^2+(SB a b c)^2)*(SC a b c)+c^2*(-(SA a b c)*(SB a b c)+(SC a b c)^2))^2-a^4×(SA a b c)^2×(a^2*((SA a b c)^2-(SB a b c)*(SC a b c))-(SA a b c)*((SB a b c)^2+(SC a b c)^2))^2) in
        cPointhb h_x_1628.
Definition X_1629 :=
        let h_x_1629 a b c := (SB a b c)^2×(SC a b c)^2*(a^4-a^2×b^2-a^2×c^2-b^2×c^2) in
        cPointhb h_x_1629.
Definition X_1630 :=
        let h_x_1630 a b c := a^2*(-((b+c)^2/(sa a b c)^2)+(a+c)^2/(sb a b c)^2+(a+b)^2/(sc a b c)^2) in
        cPointhb h_x_1630.
Definition X_1631 :=
        let h_x_1631 a b c := a^2*(-a^3+b^3+c^3) in
        cPointhb h_x_1631.
Definition X_1632 :=
        let h_x_1632 a b c := (a^4+(b^2-c^2)^2)/(-b^2+c^2) in
        cPointhb h_x_1632.
Definition X_1633 :=
        let h_x_1633 a b c := a*(a-b)*(a^2+(b-c)^2)*(a-c) in
        cPointhb h_x_1633.
Definition X_1634 :=
        let h_x_1634 a b c := (a^2*(b^2+c^2))/(-b^2+c^2) in
        cPointhb h_x_1634.
Definition X_1635 :=
        let h_x_1635 a b c := a*(b-c)*(-2×a+b+c) in
        cPointhb h_x_1635.
Definition X_1636 :=
        let h_x_1636 a b c := a^2*(b^2-c^2)*(SA a b c)^2*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1636.
Definition X_1637 :=
        let h_x_1637 a b c := (b^2-c^2)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1637.
Definition X_1638 :=
        let h_x_1638 a b c := (b-c)*(-2×a^2+(b-c)^2+a*(b+c)) in
        cPointhb h_x_1638.
Definition X_1639 :=
        let h_x_1639 a b c := (a-b-c)*(2×a-b-c)*(b-c) in
        cPointhb h_x_1639.
Definition X_1640 :=
        let h_x_1640 a b c := (b^2-c^2)*(a^2*((SA a b c)^2+(SB a b c)*(SC a b c))-2*(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_1640.
Definition X_1641 :=
        let h_x_1641 a b c := (-2×a^2+b^2+c^2)*(-2×a^4+2×a^2×b^2+b^4+2×a^2×c^2-4×b^2×c^2+c^4) in
        cPointhb h_x_1641.
Definition X_1642 :=
        let h_x_1642 a b c := a*(a×b-b^2+a×c-c^2)*(2×a^3-2×a^2×b+a×b^2-b^3-2×a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_1642.
Definition X_1643 :=
        let h_x_1643 a b c := a*(b-c)*(2×a^3-2×a^2*(b+c)-(b-c)^2*(b+c)+a*(b^2+c^2)) in
        cPointhb h_x_1643.
Definition X_1644 :=
        let h_x_1644 a b c := (-2×a+b+c)*(-2×a^2+b^2-4×b×c+c^2+2×a*(b+c)) in
        cPointhb h_x_1644.
Definition X_1645 :=
        let h_x_1645 a b c := a^4×(b^2-c^2)^2*(-2×b^2×c^2+a^2*(b^2+c^2)) in
        cPointhb h_x_1645.
Definition X_1646 :=
        let h_x_1646 a b c := a^2×(b-c)^2*(-2×b×c+a*(b+c)) in
        cPointhb h_x_1646.
Definition X_1647 :=
        let h_x_1647 a b c := (b-c)^2*(-2×a+b+c) in
        cPointhb h_x_1647.
Definition X_1648 :=
        let h_x_1648 a b c := (b^2-c^2)^2*(-2×a^2+b^2+c^2) in
        cPointhb h_x_1648.
Definition X_1649 :=
        let h_x_1649 a b c := (b^2-c^2)*(-2×a^2+b^2+c^2)^2 in
        cPointhb h_x_1649.
Definition X_1650 :=
        let h_x_1650 a b c := (b^2-c^2)^2×(-a^2+b^2+c^2)^2*(-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_1650.
Definition X_1651 :=
        let h_x_1651 a b c := (a^2*(SA a b c)-2*(SB a b c)*(SC a b c))*(2×a^2*(SA a b c)*(SB a b c)*(SC a b c)-2×(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2-4*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1651.
Definition X_1652 :=
        let h_x_1652 a b c := a*(sb a b c)*(sc a b c)*((sa a b c)^2+sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_1652.
Definition X_1653 :=
        let h_x_1653 a b c := a*(sb a b c)*(sc a b c)*((sa a b c)^2-sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_1653.
Definition X_1654 :=
        let h_x_1654 a b c := 1/(a+b)+1/(a+c)-1/(b+c) in
        cPointhb h_x_1654.
Definition X_1655 :=
        let h_x_1655 a b c := 1/((a+b)*c)+1/(b*(a+c))-1/(a*(b+c)) in
        cPointhb h_x_1655.
Definition X_1656 :=
        let h_x_1656 a b c := 3×a^2*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_1656.
Definition X_1657 :=
        let h_x_1657 a b c := 3×a^2*(SA a b c)-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_1657.
Definition X_1658 :=
        let h_x_1658 a b c := a^2*(4*(SB a b c)*(SC a b c)*((SA a b c)^2-4×(DeltaMaj a b c)^2)+b^2×c^2*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1658.
Definition X_1659 :=
        let h_x_1659 a b c := 1/(b×c+(SA a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_1659.
Definition X_1660 :=
        let h_x_1660 a b c := a^4*(a^2×(SA a b c)^3-(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1660.
Definition X_1661 :=
        let h_x_1661 a b c := a^2*((a^2-(SA a b c))*(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^3+(SC a b c)^3)) in
        cPointhb h_x_1661.
Definition X_1662 :=
        let h_x_1662 a b c := a^2*((a^2+b^2+c^2)*(1+(e a b c))*(SA a b c)+8*((e a b c)-1)*(DeltaMaj a b c)^2) in
        cPointhb h_x_1662.
Definition X_1663 :=
        let h_x_1663 a b c := a^2*((a^2+b^2+c^2)*(1-(e a b c))*(SA a b c)-8*(1+(e a b c))*(DeltaMaj a b c)^2) in
        cPointhb h_x_1663.
Definition X_1664 :=
        let h_x_1664 a b c := a^2*((a^2+b^2+c^2)*(1+(e a b c))*(SA a b c)-8*((e a b c)-1)*(DeltaMaj a b c)^2) in
        cPointhb h_x_1664.
Definition X_1665 :=
        let h_x_1665 a b c := a^2*((a^2+b^2+c^2)*(1-(e a b c))*(SA a b c)+8*(1+(e a b c))*(DeltaMaj a b c)^2) in
        cPointhb h_x_1665.
Definition X_1666 :=
        let h_x_1666 a b c := a^2*((SA a b c)*(a^2+b^2+c^2)+4*(sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)-2*(DeltaMaj a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_1666.
Definition X_1667 :=
        let h_x_1667 a b c := a^2*((SA a b c)*(a^2+b^2+c^2)- 4*(DeltaMaj a b c)*(sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)+2*(DeltaMaj a b c))) in
        cPointhb h_x_1667.
Definition X_1668 :=
        let h_x_1668 a b c := a^2*((SA a b c)*(a^2+b^2+c^2)- 4*(sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)-2*(DeltaMaj a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_1668.
Definition X_1669 :=
        let h_x_1669 a b c := a^2*((SA a b c)*(a^2+b^2+c^2)+ 4*(DeltaMaj a b c)*(sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)+2*(DeltaMaj a b c))) in
        cPointhb h_x_1669.
Definition X_1670 :=
        let h_x_1670 a b c := a^2*(a^2+b^2+c^2-2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)+2*(SA a b c)) in
        cPointhb h_x_1670.
Definition X_1671 :=
        let h_x_1671 a b c := a^2*(a^2+b^2+c^2+2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)+2*(SA a b c)) in
        cPointhb h_x_1671.
Definition X_1672 :=
        let h_x_1672 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2-2×b×c×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_1672.
Definition X_1673 :=
        let h_x_1673 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2+2×b×c×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_1673.
Definition X_1674 :=
        let h_x_1674 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2-2×b×c×sqrt(a^4+b^4-b^2×c^2+c^4-a^2×b^2-a^2×c^2)) in
        cPointhb h_x_1674.
Definition X_1675 :=
        let h_x_1675 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2+2×b×c×sqrt(a^4+b^4-b^2×c^2+c^4-a^2×b^2-a^2×c^2)) in
        cPointhb h_x_1675.
Definition X_1676 :=
        let h_x_1676 a b c := 2×a^4*(SA a b c)+a^2×(SA a b c)^2+a^2*(SB a b c)*(SC a b c)+sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1676.
Definition X_1677 :=
        let h_x_1677 a b c := 2×a^4*(SA a b c)+a^2×(SA a b c)^2+a^2*(SB a b c)*(SC a b c)-sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1677.
Definition X_1678 :=
        let h_x_1678 a b c := a^6-2×a^2×b^2×c^2-a^4*(b^2+c^2)-2×a×b×c*(b+c)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_1678.
Definition X_1679 :=
        let h_x_1679 a b c := a^6-2×a^2×b^2×c^2-a^4*(b^2+c^2)+2×a×b×c*(b+c)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_1679.
Definition X_1680 :=
        let h_x_1680 a b c := a*(a^5-2×a×b^2×c^2-a^3*(b^2+c^2)-2×b×c*(b+c)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_1680.
Definition X_1681 :=
        let h_x_1681 a b c := a*(a^5-2×a×b^2×c^2-a^3*(b^2+c^2)+2×b×c*(b+c)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_1681.
Definition X_1682 :=
        let h_x_1682 a b c := a^2*(a-b-c)*(a×b+b^2+a×c+c^2)^2 in
        cPointhb h_x_1682.
Definition X_1683 :=
        let h_x_1683 a b c := a^2*( sqrt(a^2+b^2+c^2+2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2))*((s a b c)^2*(SA a b c)-2×(DeltaMaj a b c)^2)+sqrt(-a^2-b^2-c^2+2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2))*(2×(s a b c)^2+(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_1683.
Definition X_1684 :=
        let h_x_1684 a b c := a^2*(sqrt(a^2+b^2+c^2+2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2))*(2×(s a b c)^2+(SA a b c))*(DeltaMaj a b c)+sqrt(-a^2-b^2-c^2+2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2))*(-(s a b c)^2*(SA a b c)+2×(DeltaMaj a b c)^2)) in
        cPointhb h_x_1684.
Definition X_1685 :=
        let h_x_1685 a b c := a^2*((a+b+c)*(-b^3-a×b×c-c^3+a^2*(b+c))-4*(b*(a+b)+(a+b)*c+c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_1685.
Definition X_1686 :=
        let h_x_1686 a b c := a^2*((a+b+c)*(-b^3-a×b×c-c^3+a^2*(b+c))+4*(b*(a+b)+(a+b)*c+c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_1686.
Definition X_1687 :=
        let h_x_1687 a b c := a^2*(a^4-2×b^2×c^2-a^2*(b^2+c^2)-4×sqrt(b^2×c^2+a^2*(b^2+c^2))*(DeltaMaj a b c)) in
        cPointhb h_x_1687.
Definition X_1688 :=
        let h_x_1688 a b c := a^2*(a^4-2×b^2×c^2-a^2*(b^2+c^2)+4×sqrt(b^2×c^2+a^2*(b^2+c^2))*(DeltaMaj a b c)) in
        cPointhb h_x_1688.
Definition X_1689 :=
        let h_x_1689 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-c^4+4×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_1689.
Definition X_1690 :=
        let h_x_1690 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-c^4-4×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_1690.
Definition X_1691 :=
        let h_x_1691 a b c := a^2*(a^4-b^2×c^2) in
        cPointhb h_x_1691.
Definition X_1692 :=
        let h_x_1692 a b c := a^2*(-a^2*(SA a b c)+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_1692.
Definition X_1693 :=
        let h_x_1693 a b c := a^2*(a^4-2×b^2×c^2-a^2*(b^2+c^2))*(a^2*(b+c)+b×c*(b+c)+a*(b^2+b×c+c^2))+a^2×sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4)) in
        cPointhb h_x_1693.
Definition X_1694 :=
        let h_x_1694 a b c := a^2*(a^4-2×b^2×c^2-a^2*(b^2+c^2))*(a^2*(b+c)+b×c*(b+c)+a*(b^2+b×c+c^2))-a^2×sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4)) in
        cPointhb h_x_1694.
Definition X_1695 :=
        let h_x_1695 a b c := a*(a×(s a b c)^5*(SA a b c)-(s a b c)^3*(2×a+(s a b c))*(DeltaMaj a b c)^2-(DeltaMaj a b c)^4) in
        cPointhb h_x_1695.
Definition X_1696 :=
        let h_x_1696 a b c := a^2*(-b×c*(b+c)*(s a b c)+a*(s a b c)*(SA a b c)-2×(DeltaMaj a b c)^2) in
        cPointhb h_x_1696.
Definition X_1697 :=
        let h_x_1697 a b c := a*(3×a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1697.
Definition X_1698 :=
        let h_x_1698 a b c := a+2×b+2×c in
        cPointhb h_x_1698.
Definition X_1699 :=
        let h_x_1699 a b c := a^3+a×(b-c)^2-2×(b-c)^2*(b+c) in
        cPointhb h_x_1699.
Definition X_1700 :=
        let h_x_1700 a b c := 2×a^2*(b^2×c^2+a^2*(SA a b c))+a×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1700.
Definition X_1701 :=
        let h_x_1701 a b c := 2×a^2*(b^2×c^2+a^2*(SA a b c))-a×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1701.
Definition X_1702 :=
        let h_x_1702 a b c := a*(b*(SB a b c)+c*(SC a b c)-a*(b×c+(SA a b c)+4*(DeltaMaj a b c))) in
        cPointhb h_x_1702.
Definition X_1703 :=
        let h_x_1703 a b c := a*(b*(SB a b c)+c*(SC a b c)-a*(b×c+(SA a b c)-4*(DeltaMaj a b c))) in
        cPointhb h_x_1703.
Definition X_1704 :=
        let h_x_1704 a b c := a×sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*((a+b-c)*(a-b+c)*(b+c)-2×a*(b×c+(SA a b c)))-4×a^2*(2×a^2*(SA a b c)+(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1704.
Definition X_1705 :=
        let h_x_1705 a b c := a×sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*((a+b-c)*(a-b+c)*(b+c)-2×a*(b×c+(SA a b c)))+4×a^2*(2×a^2*(SA a b c)+(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1705.
Definition X_1706 :=
        let h_x_1706 a b c := a*(a^3+a^2*(b+c)-a×(b+c)^2-(b+c)*(b^2-6×b×c+c^2)) in
        cPointhb h_x_1706.
Definition X_1707 :=
        let h_x_1707 a b c := a*(3×a^2-b^2-c^2) in
        cPointhb h_x_1707.
Definition X_1708 :=
        let h_x_1708 a b c := (a*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3))/(a-b-c) in
        cPointhb h_x_1708.
Definition X_1709 :=
        let h_x_1709 a b c := a*(-a*(SA a b c)*(sb a b c)*(sc a b c)+b*(sa a b c)*(SB a b c)*(sc a b c)+c*(sa a b c)*(sb a b c)*(SC a b c)) in
        cPointhb h_x_1709.
Definition X_1710 :=
        let h_x_1710 a b c := a*(-a^2*(a+b)*(a+c)*(SA a b c)+b^2*(a+b)*(b+c)*(SB a b c)+c^2*(a+c)*(b+c)*(SC a b c)) in
        cPointhb h_x_1710.
Definition X_1711 :=
        let h_x_1711 a b c := a*(-a×(SA a b c)^2+b×(SB a b c)^2+c×(SC a b c)^2) in
        cPointhb h_x_1711.
Definition X_1712 :=
        let h_x_1712 a b c := a*(SB a b c)*(SC a b c)*(-(SA a b c)^2×(SB a b c)^2-(SA a b c)^2×(SC a b c)^2+(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1712.
Definition X_1713 :=
        let h_x_1713 a b c := a*(-a^2*(b+c)*(SA a b c)^2+b×c*(b×(SB a b c)^2+c×(SC a b c)^2)+a*(b^2×(SB a b c)^2+c^2×(SC a b c)^2)) in
        cPointhb h_x_1713.
Definition X_1714 :=
        let h_x_1714 a b c := a*(b+c)*(a^2-b×c)+(SB a b c)^2+(SC a b c)^2 in
        cPointhb h_x_1714.
Definition X_1715 :=
        let h_x_1715 a b c := a*((a+b-c)*(-a^2*(a-b+c)*(b+c)*(SA a b c)^2+b^2*(a+c)*(-a+b+c)*(SB a b c)^2)-(a+b)*c^2*((a-b)^2-c^2)*(SC a b c)^2) in
        cPointhb h_x_1715.
Definition X_1716 :=
        let h_x_1716 a b c := a*(-b×c*(SA a b c)+a×c*(SB a b c)+a×b*(SC a b c)) in
        cPointhb h_x_1716.
Definition X_1717 :=
        let h_x_1717 a b c := a*(-a^2×b×c*(SA a b c)+4*(b×c+(SA a b c))*(SB a b c)*(SC a b c)+a×b×c*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1717.
Definition X_1718 :=
        let h_x_1718 a b c := a*(-a^2×b×c*(SA a b c)+4*(-b×c+(SA a b c))*(SB a b c)*(SC a b c)+a×b×c*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1718.
Definition X_1719 :=
        let h_x_1719 a b c := a*((a+b)*(-a*(a+c)*(SA a b c)+b*(b+c)*(SB a b c))+c*(a+c)*(b+c)*(SC a b c)) in
        cPointhb h_x_1719.
Definition X_1720 :=
        let h_x_1720 a b c := a*(a^9-a^8×b-4×a^7×b^2+4×a^6×b^3+6×a^5×b^4-6×a^4×b^5-4×a^3×b^6+4×a^2×b^7+a×b^8-b^9-a^8×c+2×a^7×b×c-10×a^5×b^3×c+2×a^4×b^4×c+14×a^3×b^5×c-6×a×b^7×c-b^8×c-4×a^7×c^2+8×a^5×b^2×c^2+4×a^4×b^3×c^2-4×a^3×b^4×c^2-8×a^2×b^5×c^2+4×b^7×c^2+4×a^6×c^3-10×a^5×b×c^3+4×a^4×b^2×c^3-12×a^3×b^3×c^3+4×a^2×b^4×c^3+6×a×b^5×c^3+4×b^6×c^3+6×a^5×c^4+2×a^4×b×c^4-4×a^3×b^2×c^4+4×a^2×b^3×c^4-2×a×b^4×c^4-6×b^5×c^4-6×a^4×c^5+14×a^3×b×c^5-8×a^2×b^2×c^5+6×a×b^3×c^5-6×b^4×c^5-4×a^3×c^6+4×b^3×c^6+4×a^2×c^7-6×a×b×c^7+4×b^2×c^7+a×c^8-b×c^8-c^9) in
        cPointhb h_x_1720.
Definition X_1721 :=
        let h_x_1721 a b c := a*(-a^2*(c^2+(SC a b c))+2×a*(c*(SB a b c)+b*(SC a b c))-(b-c)*(-c*(b*(-b+c)+(SB a b c))+b*(SC a b c))) in
        cPointhb h_x_1721.
Definition X_1722 :=
        let h_x_1722 a b c := a×c*(a×c-b*(b+c)+(SB a b c))+a*(a+b)*(SC a b c) in
        cPointhb h_x_1722.
Definition X_1723 :=
        let h_x_1723 a b c := a*(a^2×b×c+a^3*(b+c)-a*(b^3+c^3)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1723.
Definition X_1724 :=
        let h_x_1724 a b c := a*(a^3+a^2×b+a^2×c-b^2×c-b×c^2) in
        cPointhb h_x_1724.
Definition X_1725 :=
        let h_x_1725 a b c := a*((SA a b c)*((SB a b c)-(SC a b c))^2-a^2*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_1725.
Definition X_1726 :=
        let h_x_1726 a b c := a*(-a^4×b×c*(SA a b c)+a×b^4×c*(SB a b c)+a×b×c^4*(SC a b c)) in
        cPointhb h_x_1726.
Definition X_1727 :=
        let h_x_1727 a b c := a*((a*(SA a b c)-b*(SB a b c))*(-a×b×c+2×a*(SA a b c)+2×b*(SB a b c))+a×b×c^2*(SC a b c)-2×c^2×(SC a b c)^2) in
        cPointhb h_x_1727.
Definition X_1728 :=
        let h_x_1728 a b c := a*(-a^2*(SA a b c)*(b×c+(SA a b c))+(b*(SB a b c)-c*(SC a b c))^2+a×b×c*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1728.
Definition X_1729 :=
        let h_x_1729 a b c := a*(-a^4*(SA a b c)+a^3*(b+c)*(SA a b c)+(b-c)*(b^3*(SB a b c)-c^3*(SC a b c))-a*(b^3*(SB a b c)+c^3*(SC a b c))) in
        cPointhb h_x_1729.
Definition X_1730 :=
        let h_x_1730 a b c := a*(a^5+2×a^3*(SA a b c)-a×((SB a b c)-(SC a b c))^2+2×c*(-(SA a b c)+(SB a b c))*(SC a b c)+2×b*(SB a b c)*(-(SA a b c)+(SC a b c))) in
        cPointhb h_x_1730.
Definition X_1731 :=
        let h_x_1731 a b c := a*(a-b-c)*(a^3+b^3-a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_1731.
Definition X_1732 :=
        let h_x_1732 a b c := a*(a^4-4×a^3×b+4×a×b^3-b^4-4×a^3×c-4×a^2×b×c+2×b^2×c^2+4×a×c^3-c^4) in
        cPointhb h_x_1732.
Definition X_1733 :=
        let h_x_1733 a b c := b×c*(-a^2*(SA a b c)+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_1733.
Definition X_1734 :=
        let h_x_1734 a b c := a*(b^3-c^3+a*((SB a b c)-(SC a b c))) in
        cPointhb h_x_1734.
Definition X_1735 :=
        let h_x_1735 a b c := a*(a^3×(SA a b c)^2-b^3×(SB a b c)^2+2×a*(SA a b c)*(SB a b c)*(SC a b c)-c^3×(SC a b c)^2) in
        cPointhb h_x_1735.
Definition X_1736 :=
        let h_x_1736 a b c := a*(a^3×b^2-a^2×b^3-a×b^4+b^5+a^3×c^2+2×a×b^2×c^2-b^3×c^2-a^2×c^3-b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_1736.
Definition X_1737 :=
        let h_x_1737 a b c := a^2*(SA a b c)+2*(SB a b c)*(SC a b c)-a*(b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1737.
Definition X_1738 :=
        let h_x_1738 a b c := a^2×b+b^3+a^2×c-2×a×b×c-b^2×c-b×c^2+c^3 in
        cPointhb h_x_1738.
Definition X_1739 :=
        let h_x_1739 a b c := a*(a×b^2+b^3-2×b^2×c+a×c^2-2×b×c^2+c^3) in
        cPointhb h_x_1739.
Definition X_1740 :=
        let h_x_1740 a b c := a*(-b^2×c^2+a^2*(b^2+c^2)) in
        cPointhb h_x_1740.
Definition X_1741 :=
        let h_x_1741 a b c := a*(a-b-c)*(a^6+2×a^5×b-a^4×b^2-4×a^3×b^3-a^2×b^4+2×a×b^5+b^6+2×a^5×c+2×a^4×b×c+2×a^3×b^2×c-2×a^2×b^3×c-4×a×b^4×c-a^4×c^2+2×a^3×b×c^2+6×a^2×b^2×c^2+2×a×b^3×c^2-b^4×c^2-4×a^3×c^3-2×a^2×b×c^3+2×a×b^2×c^3-a^2×c^4-4×a×b×c^4-b^2×c^4+2×a×c^5+c^6) in
        cPointhb h_x_1741.
Definition X_1742 :=
        let h_x_1742 a b c := a*(a^3×b-2×a^2×b^2+a×b^3+a^3×c+a^2×b×c-a×b^2×c-b^3×c-2×a^2×c^2-a×b×c^2+2×b^2×c^2+a×c^3-b×c^3) in
        cPointhb h_x_1742.
Definition X_1743 :=
        let h_x_1743 a b c := a*(3×a-b-c) in
        cPointhb h_x_1743.
Definition X_1744 :=
        let h_x_1744 a b c := a*(-((a^2*(a+b)*(a+c)*(SA a b c))/((a+b-c)*(a-b+c)))+(b^2*(a+b)*(b+c)*(SB a b c))/((a+b-c)*(-a+b+c))+(c^2*(a+c)*(b+c)*(SC a b c))/((a-b+c)*(-a+b+c))) in
        cPointhb h_x_1744.
Definition X_1745 :=
        let h_x_1745 a b c := a*(a^5×b-2×a^3×b^3+a×b^5+a^5×c+a^4×b×c-a×b^4×c-b^5×c-2×a^3×c^3+2×b^3×c^3-a×b×c^4+a×c^5-b×c^5) in
        cPointhb h_x_1745.
Definition X_1746 :=
        let h_x_1746 a b c := a^6-a^4×b^2+a^3×b^3-a×b^5+a^4×b×c-b^5×c-a^4×c^2+a×b^3×c^2+a^3×c^3+a×b^2×c^3+2×b^3×c^3-a×c^5-b×c^5 in
        cPointhb h_x_1746.
Definition X_1747 :=
        let h_x_1747 a b c := a*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2-4×a^4×b^2×c^2+2×b^6×c^2-2×b^4×c^4+2×a^2×c^6+2×b^2×c^6-c^8) in
        cPointhb h_x_1747.
Definition X_1748 :=
        let h_x_1748 a b c := a*((SB a b c)*(SC a b c)*(a^2*(SA a b c)-(SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_1748.
Definition X_1749 :=
        let h_x_1749 a b c := a*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_1749.
Definition X_1750 :=
        let h_x_1750 a b c := a*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5-3×a^4×c-2×a^2×b^2×c+5×b^4×c+2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-6×b^3×c^2+2×a^2×c^3-6×b^2×c^3-3×a×c^4+5×b×c^4+c^5) in
        cPointhb h_x_1750.
Definition X_1751 :=
        let h_x_1751 a b c := 1/(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_1751.
Definition X_1752 :=
        let h_x_1752 a b c := a*(a^6-2×a^5×b+a^4×b^2-a^2×b^4+2×a×b^5-b^6-2×a^5×c+2×a^3×b^2×c-2×a^2×b^3×c+2×b^5×c+a^4×c^2+2×a^3×b×c^2+2×a^2×b^2×c^2-2×a×b^3×c^2+b^4×c^2-2×a^2×b×c^3-2×a×b^2×c^3-4×b^3×c^3-a^2×c^4+b^2×c^4+2×a×c^5+2×b×c^5-c^6) in
        cPointhb h_x_1752.
Definition X_1753 :=
        let h_x_1753 a b c := a*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^5+a^4×b-2×a^3×b^2-2×a^2×b^3+a×b^4+b^5+a^4×c-2×a^2×b^2×c+b^4×c-2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-2×b^3×c^2-2×a^2×c^3-2×b^2×c^3+a×c^4+b×c^4+c^5) in
        cPointhb h_x_1753.
Definition X_1754 :=
        let h_x_1754 a b c := a*(a^5-a^4×b-a^3×b^2+a^2×b^3-a^4×c+b^4×c-a^3×c^2-b^3×c^2+a^2×c^3-b^2×c^3+b×c^4) in
        cPointhb h_x_1754.
Definition X_1755 :=
        let h_x_1755 a b c := a^3*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1755.
Definition X_1756 :=
        let h_x_1756 a b c := a*(a^4×b+a^3×b^2-a^2×b^3-a×b^4+a^4×c+b^4×c+a^3×c^2-b^3×c^2-a^2×c^3-b^2×c^3-a×c^4+b×c^4) in
        cPointhb h_x_1756.
Definition X_1757 :=
        let h_x_1757 a b c := a*(a^2+a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_1757.
Definition X_1758 :=
        let h_x_1758 a b c := a*(a+b-c)*(a-b+c)*(a^3-2×a^2×b+b^3-2×a^2×c+a×b×c+c^3) in
        cPointhb h_x_1758.
Definition X_1759 :=
        let h_x_1759 a b c := a*(a^3-b^3-c^3) in
        cPointhb h_x_1759.
Definition X_1760 :=
        let h_x_1760 a b c := a*(a^4-b^4-c^4) in
        cPointhb h_x_1760.
Definition X_1761 :=
        let h_x_1761 a b c := a*(a^4+a^3×b-a×b^3-b^4+a^3×c+a^2×b×c-a×b^2×c-b^3×c-a×b×c^2-a×c^3-b×c^3-c^4) in
        cPointhb h_x_1761.
Definition X_1762 :=
        let h_x_1762 a b c := a*(a^5-a^3×b^2+a^2×b^3-b^5-a^3×b×c+a×b^3×c-a^3×c^2+2×a×b^2×c^2+b^3×c^2+a^2×c^3+a×b×c^3+b^2×c^3-c^5) in
        cPointhb h_x_1762.
Definition X_1763 :=
        let h_x_1763 a b c := a*(-c*(SA a b c)*(SB a b c)-b*(SA a b c)*(SC a b c)+a*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1763.
Definition X_1764 :=
        let h_x_1764 a b c := a*(a^4×b+a^3×b^2-a^2×b^3-a×b^4+a^4×c-b^4×c+a^3×c^2-2×a×b^2×c^2+b^3×c^2-a^2×c^3+b^2×c^3-a×c^4-b×c^4) in
        cPointhb h_x_1764.
Definition X_1765 :=
        let h_x_1765 a b c := a*(a^6×b-a^5×b^2-2×a^4×b^3+2×a^3×b^4+a^2×b^5-a×b^6+a^6×c+a^4×b^2×c-a^2×b^4×c-b^6×c-a^5×c^2+a^4×b×c^2+a×b^4×c^2-b^5×c^2-2×a^4×c^3+2×b^4×c^3+2×a^3×c^4-a^2×b×c^4+a×b^2×c^4+2×b^3×c^4+a^2×c^5-b^2×c^5-a×c^6-b×c^6) in
        cPointhb h_x_1765.
Definition X_1766 :=
        let h_x_1766 a b c := a*(-a^2×b×c+a*(b^2×c+b×c^2)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1766.
Definition X_1767 :=
        let h_x_1767 a b c := a*(-a+b-c)*(-a-b+c)*(SB a b c)*(SC a b c)*(a^5-b^5-c^5+a^3*(-4×b×c+4*(SA a b c))+c×((SA a b c)-(SB a b c))^2-4×b^3*(SB a b c)+a*(4×b×c*(b^2+c^2)-((SB a b c)-(SC a b c))^2)+b×((SA a b c)-(SC a b c))^2-4×c^3*(SC a b c)) in
        cPointhb h_x_1767.
Definition X_1768 :=
        let h_x_1768 a b c := a*(a^5-a^4×b-2×a^3×b^2+2×a^2×b^3+a×b^4-b^5-a^4×c+5×a^3×b×c-2×a^2×b^2×c-3×a×b^3×c+b^4×c-2×a^3×c^2-2×a^2×b×c^2+4×a×b^2×c^2+2×a^2×c^3-3×a×b×c^3+a×c^4+b×c^4-c^5) in
        cPointhb h_x_1768.
Definition X_1769 :=
        let h_x_1769 a b c := a*(b-c)*(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1769.
Definition X_1770 :=
        let h_x_1770 a b c := a*((a+b-c)*(a-b+c)*(b+c)-2×a*(SA a b c))+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_1770.
Definition X_1771 :=
        let h_x_1771 a b c := a*(a^6-2×a^4×b^2+a^2×b^4+a^3×b^2×c-a^2×b^3×c-a×b^4×c+b^5×c-2×a^4×c^2+a^3×b×c^2+a×b^3×c^2-a^2×b×c^3+a×b^2×c^3-2×b^3×c^3+a^2×c^4-a×b×c^4+b×c^5) in
        cPointhb h_x_1771.
Definition X_1772 :=
        let h_x_1772 a b c := a*(-2×a^3×b×c*(b+c)+2×a×b×(b-c)^2×c*(b+c)+(b-c)^4×(b+c)^2+a^4*(b^2+c^2)-2×a^2*(b^4-b^3×c-b^2×c^2-b×c^3+c^4)) in
        cPointhb h_x_1772.
Definition X_1773 :=
        let h_x_1773 a b c := a*((a-b)*(a+b)^3*(a^2+b^2)+2×a^2*(a+b)*(a^2+b^2)*c+(a^4+2×a^3×b+2×a^2×b^2+6×a×b^3+b^4)*c^2+2×a×b*(a+3×b)*c^3-(a-b)*(a+b)*c^4-2×a×c^5-c^6) in
        cPointhb h_x_1773.
Definition X_1774 :=
        let h_x_1774 a b c := a*(a^3×b×c×(SA a b c)^2-a×b^3×c×(SB a b c)^2+2×a×(SA a b c)^2*(SB a b c)*(SC a b c)-2×b*(SA a b c)*(SB a b c)^2*(SC a b c)-a×b×c^3×(SC a b c)^2-2×c*(SA a b c)*(SB a b c)*(SC a b c)^2) in
        cPointhb h_x_1774.
Definition X_1775 :=
        let h_x_1775 a b c := a*(a^3×b×c×(SA a b c)^2+2*(SA a b c)*(SB a b c)*(SC a b c)*(b*(SB a b c)+c*(SC a b c))-a*(b^3×c×(SB a b c)^2+2×(SA a b c)^2*(SB a b c)*(SC a b c)+b×c^3×(SC a b c)^2)) in
        cPointhb h_x_1775.
Definition X_1776 :=
        let h_x_1776 a b c := a*(a-b-c)*(a^4-2×a^2×b^2+b^4+3×a^2×b×c-b^3×c-2×a^2×c^2-b×c^3+c^4) in
        cPointhb h_x_1776.
Definition X_1777 :=
        let h_x_1777 a b c := a*(a^3*(sa a b c)*(SA a b c)+c*(-(SA a b c)+(SB a b c))*(sc a b c)*(SC a b c)+b*(sb a b c)*(SB a b c)*(-(SA a b c)+(SC a b c))) in
        cPointhb h_x_1777.
Definition X_1778 :=
        let h_x_1778 a b c := a*(a+b)*(a+c)*(a^2+2×a×b-b^2+2×a×c-2×b×c-c^2) in
        cPointhb h_x_1778.
Definition X_1779 :=
        let h_x_1779 a b c := a^2*(c*(SA a b c)*((SA a b c)-(SC a b c))*(SC a b c)+b*(SB a b c)*((SA a b c)^2-(SA a b c)*(SB a b c)-a×c*(SC a b c))) in
        cPointhb h_x_1779.
Definition X_1780 :=
        let h_x_1780 a b c := a^2*(a+b)*(a+c)*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_1780.
Definition X_1781 :=
        let h_x_1781 a b c := a*(a×b×c*(a+b+c)+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1781.
Definition X_1782 :=
        let h_x_1782 a b c := a*(a^6+a^5×b-a^4×b^2+a^2×b^4-a×b^5-b^6+a^5×c-a^4×b×c-a^3×b^2×c+a^2×b^3×c-a^4×c^2-a^3×b×c^2+a×b^3×c^2+b^4×c^2+a^2×b×c^3+a×b^2×c^3+a^2×c^4+b^2×c^4-a×c^5-c^6) in
        cPointhb h_x_1782.
Definition X_1783 :=
        let h_x_1783 a b c := a*(a-b)*(a-c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1783.
Definition X_1784 :=
        let h_x_1784 a b c := a-(2*(SB a b c)*(SC a b c))/(a*(SA a b c)) in
        cPointhb h_x_1784.
Definition X_1785 :=
        let h_x_1785 a b c := (SB a b c)*(SC a b c)*(-a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1785.
Definition X_1786 :=
        let h_x_1786 a b c := a*(a+b-c)*(a-b+c)*(a^6+a^5*(b+c)-a^2×(b^2-c^2)^2-2×a^3*(b+c)*(b^2+c^2)-a^4*(b^2+b×c+c^2)+(b^2-c^2)^2*(b^2+b×c+c^2)+a*(b+c)*(b^4+c^4)) in
        cPointhb h_x_1786.
Definition X_1787 :=
        let h_x_1787 a b c := a*(-a+b-c)*(-a-b+c)*(a^6-a^5×b-a^4×b^2+2×a^3×b^3-a^2×b^4-a×b^5+b^6-a^5×c+3×a^4×b×c-2×a^2×b^3×c+a×b^4×c-b^5×c-a^4×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2-b^4×c^2+2×a^3×c^3-2×a^2×b×c^3+2×a×b^2×c^3+2×b^3×c^3-a^2×c^4+a×b×c^4-b^2×c^4-a×c^5-b×c^5+c^6) in
        cPointhb h_x_1787.
Definition X_1788 :=
        let h_x_1788 a b c := (a+b-c)*(a-b+c)*(a^2+2×a×b-b^2+2×a×c-2×b×c-c^2) in
        cPointhb h_x_1788.
Definition X_1789 :=
        let h_x_1789 a b c := (a*(SA a b c))/((b×c+2*(SA a b c))*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1789.
Definition X_1790 :=
        let h_x_1790 a b c := (a*(SA a b c))/(b^2×c+b×c^2) in
        cPointhb h_x_1790.
Definition X_1791 :=
        let h_x_1791 a b c := (a*(SA a b c))/(b*(a+b)+c*(a+c)) in
        cPointhb h_x_1791.
Definition X_1792 :=
        let h_x_1792 a b c := (a*(SA a b c))/((b×c-(SA a b c))*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1792.
Definition X_1793 :=
        let h_x_1793 a b c := (a*(-a+b+c)*(SA a b c))/((b+c)*(b×c-2*(SA a b c))) in
        cPointhb h_x_1793.
Definition X_1794 :=
        let h_x_1794 a b c := (a^2*(SA a b c))/(a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1794.
Definition X_1795 :=
        let h_x_1795 a b c := (a^2*(SA a b c))/(-a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1795.
Definition X_1796 :=
        let h_x_1796 a b c := (a^2*(SA a b c))/(2×a+b+c) in
        cPointhb h_x_1796.
Definition X_1797 :=
        let h_x_1797 a b c := (a^2*(SA a b c))/(-2×a+b+c) in
        cPointhb h_x_1797.
Definition X_1798 :=
        let h_x_1798 a b c := (a^2*(a+b)*(a+c)*(SA a b c))/(a×b+b^2+a×c+c^2) in
        cPointhb h_x_1798.
Definition X_1799 :=
        let h_x_1799 a b c := (SA a b c)/(b^2+c^2) in
        cPointhb h_x_1799.
Definition X_1800 :=
        let h_x_1800 a b c := a^2*(a+b)*(a-b-c)*(a+c)*(a^2-b^2-c^2)*(a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_1800.
Definition X_1801 :=
        let h_x_1801 a b c := a^2*(a+b)*(a+c)*(a^2-b^2-c^2)*(-a^3+a^2×b-a×b^2+b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_1801.
Definition X_1802 :=
        let h_x_1802 a b c := a^3×(-a+b+c)^2*(SA a b c) in
        cPointhb h_x_1802.
Definition X_1803 :=
        let h_x_1803 a b c := (a^2*(a^2-b^2-c^2))/((a-b-c)*(a×b-b^2+a×c+2×b×c-c^2)) in
        cPointhb h_x_1803.
Definition X_1804 :=
        let h_x_1804 a b c := (a^2×(SA a b c)^2)/(sa a b c) in
        cPointhb h_x_1804.
Definition X_1805 :=
        let h_x_1805 a b c := (a^2*(SA a b c))/((b+c)*(b×c-(SA a b c)+2*(DeltaMaj a b c))) in
        cPointhb h_x_1805.
Definition X_1806 :=
        let h_x_1806 a b c := (a^2*(SA a b c))/((b+c)*(b×c-(SA a b c)-2*(DeltaMaj a b c))) in
        cPointhb h_x_1806.
Definition X_1807 :=
        let h_x_1807 a b c := (a*(SA a b c))/(b×c-2*(SA a b c)) in
        cPointhb h_x_1807.
Definition X_1808 :=
        let h_x_1808 a b c := (a^2*(sa a b c)*(SA a b c))/((b+c)*(a^2-b×c)) in
        cPointhb h_x_1808.
Definition X_1809 :=
        let h_x_1809 a b c := (a*(sa a b c)*(SA a b c))/(-a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1809.
Definition X_1810 :=
        let h_x_1810 a b c := (a^2*(SA a b c))/(3×a^2-2×b×c-a*(b+c)+2*(SA a b c)) in
        cPointhb h_x_1810.
Definition X_1811 :=
        let h_x_1811 a b c := (a*(SA a b c))/((-a+2×b-c)*c+b*(-a-b+2×c)) in
        cPointhb h_x_1811.
Definition X_1812 :=
        let h_x_1812 a b c := (a*(sa a b c)*(SA a b c))/(b+c) in
        cPointhb h_x_1812.
Definition X_1813 :=
        let h_x_1813 a b c := (a^2*(SA a b c))/((b-c)*(sa a b c)) in
        cPointhb h_x_1813.
Definition X_1814 :=
        let h_x_1814 a b c := (a*(SA a b c))/(a×b-b^2+a×c-c^2) in
        cPointhb h_x_1814.
Definition X_1815 :=
        let h_x_1815 a b c := (a^2*(SA a b c))/(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_1815.
Definition X_1816 :=
        let h_x_1816 a b c := a*(a+b)*(a+c)*(-a+b+c)*(a^5*(b+c)-2×a^3*(b^3+c^3)+a*(b^5-b^4×c-b×c^4+c^5)+b×c*(a^4-(b-c)^2×(b+c)^2)) in
        cPointhb h_x_1816.
Definition X_1817 :=
        let h_x_1817 a b c := a*(a+b)*(a+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1817.
Definition X_1818 :=
        let h_x_1818 a b c := a^2*(-b^2-c^2+a*(b+c))*(SA a b c) in
        cPointhb h_x_1818.
Definition X_1819 :=
        let h_x_1819 a b c := a^2*(a+b)*(a-b-c)*(a+c)*(SA a b c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1819.
Definition X_1820 :=
        let h_x_1820 a b c := a/((SB a b c)*(SC a b c)*(a^2*(SA a b c)-(SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_1820.
Definition X_1821 :=
        let h_x_1821 a b c := 1/(a*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_1821.
Definition X_1822 :=
        let h_x_1822 a b c := a^3/((b^2-c^2)*(a^2*(1+(J a b c))*(SA a b c)-2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1822.
Definition X_1823 :=
        let h_x_1823 a b c := a^3/((b^2-c^2)*(a^2*(1-(J a b c))*(SA a b c)-2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_1823.
Definition X_1824 :=
        let h_x_1824 a b c := a*(b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1824.
Definition X_1825 :=
        let h_x_1825 a b c := a*(b×c+2*(SA a b c))*(SB a b c)*(SC a b c)*(b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1825.
Definition X_1826 :=
        let h_x_1826 a b c := a*(b^2×c+b×c^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1826.
Definition X_1827 :=
        let h_x_1827 a b c := a*(-a+b+c)*(-(b-c)^2+a*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1827.
Definition X_1828 :=
        let h_x_1828 a b c := a*(b*(a+b-c)+c*(a-b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1828.
Definition X_1829 :=
        let h_x_1829 a b c := a*(b*(a+b)+c*(a+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1829.
Definition X_1830 :=
        let h_x_1830 a b c := a*((a-b)^2×b*(a+b-c)+c×(-a+c)^2*(a-b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1830.
Definition X_1831 :=
        let h_x_1831 a b c := a*((b×(a+b)^2)/(a+b-c)+(c×(a+c)^2)/(a-b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1831.
Definition X_1832 :=
        let h_x_1832 a b c := (b+c)*(SB a b c)*(SC a b c)*(sqrt(3)*(b×c-(SA a b c))+2*(DeltaMaj a b c)) in
        cPointhb h_x_1832.
Definition X_1833 :=
        let h_x_1833 a b c := (b+c)*(SB a b c)*(SC a b c)*(sqrt(3)*(b×c-(SA a b c))-2*(DeltaMaj a b c)) in
        cPointhb h_x_1833.
Definition X_1834 :=
        let h_x_1834 a b c := ((SB a b c)/(a+b)+(SC a b c)/(a+c)) in
        cPointhb h_x_1834.
Definition X_1835 :=
        let h_x_1835 a b c := a*(a+b-c)*(a-b+c)*(b+c)*(b×c-2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1835.
Definition X_1836 :=
        let h_x_1836 a b c := a^3-(b-c)^2*(b+c) in
        cPointhb h_x_1836.
Definition X_1837 :=
        let h_x_1837 a b c := (-a+b+c)*(a^3+(b-c)^2*(b+c)) in
        cPointhb h_x_1837.
Definition X_1838 :=
        let h_x_1838 a b c := (SB a b c)*(SC a b c)*(a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1838.
Definition X_1839 :=
        let h_x_1839 a b c := (2×a+b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1839.
Definition X_1840 :=
        let h_x_1840 a b c := (b+c)*(a^2+b×c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1840.
Definition X_1841 :=
        let h_x_1841 a b c := a*(SB a b c)*(SC a b c)*(a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_1841.
Definition X_1842 :=
        let h_x_1842 a b c := (2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1842.
Definition X_1843 :=
        let h_x_1843 a b c := a^2*(b^2+c^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1843.
Definition X_1844 :=
        let h_x_1844 a b c := a*(2×a×b×c+a^2*(b+c)-(b-c)^2*(b+c))*(-b×c-2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1844.
Definition X_1845 :=
        let h_x_1845 a b c := a*(SB a b c)*(c/(a×c-2*(SB a b c))+b/(a×b-2*(SC a b c)))*(SC a b c) in
        cPointhb h_x_1845.
Definition X_1846 :=
        let h_x_1846 a b c := (SB a b c)*(SC a b c)*(1/(a×b×c-a*(SA a b c)-b*(SB a b c))+1/(a×b×c-a*(SA a b c)-c*(SC a b c))) in
        cPointhb h_x_1846.
Definition X_1847 :=
        let h_x_1847 a b c := b×c×(sb a b c)^2*(SB a b c)*(sc a b c)^2*(SC a b c) in
        cPointhb h_x_1847.
Definition X_1848 :=
        let h_x_1848 a b c := (b^2+c^2+a*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1848.
Definition X_1849 :=
        let h_x_1849 a b c := a*(a-b-c)*(SB a b c)*(SC a b c)*( b*(-a^2+(b-c)^2)*c- ((b-c)^2-a*(b+c))*(DeltaMaj a b c)) in
        cPointhb h_x_1849.
Definition X_1850 :=
        let h_x_1850 a b c := a*(a-b-c)*(SB a b c)*(SC a b c)*( b*(-a^2+(b-c)^2)*c+ ((b-c)^2-a*(b+c))*(DeltaMaj a b c)) in
        cPointhb h_x_1850.
Definition X_1851 :=
        let h_x_1851 a b c := (a^2+(b-c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1851.
Definition X_1852 :=
        let h_x_1852 a b c := (-a+b+c)*(SB a b c)*(SC a b c)*((a+b-c)*(a+c)^2*(SB a b c)+(a+b)^2*(a-b+c)*(SC a b c)) in
        cPointhb h_x_1852.
Definition X_1853 :=
        let h_x_1853 a b c := (SA a b c)*((SB a b c)-(SC a b c))^2-a^2*(SB a b c)*(SC a b c) in
        cPointhb h_x_1853.
Definition X_1854 :=
        let h_x_1854 a b c := a*(-a+b+c)*(a^5+2×a^2×b^3-a×b^4-2×b^5-2×a^2×b^2×c+2×b^4×c-2×a^2×b×c^2+2×a×b^2×c^2+2×a^2×c^3-a×c^4+2×b×c^4-2×c^5) in
        cPointhb h_x_1854.
Definition X_1855 :=
        let h_x_1855 a b c := (a-b-c)*(a×b-b^2+a×c+2×b×c-c^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1855.
Definition X_1856 :=
        let h_x_1856 a b c := (a-b-c)*(SB a b c)*(SC a b c)*(a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+2*(SA a b c))+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1856.
Definition X_1857 :=
        let h_x_1857 a b c := (a-b-c)*(SB a b c)^2×(SC a b c)^2 in
        cPointhb h_x_1857.
Definition X_1858 :=
        let h_x_1858 a b c := a*(-a+b+c)*(a^4×b-2×a^2×b^3+b^5+a^4×c+2×a^3×b×c+2×a^2×b^2×c-b^4×c+2×a^2×b×c^2-2×a^2×c^3-b×c^4+c^5) in
        cPointhb h_x_1858.
Definition X_1859 :=
        let h_x_1859 a b c := a*((b*(a+b))/(a+b-c)+(c*(a+c))/(a-b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1859.
Definition X_1860 :=
        let h_x_1860 a b c := a*(SB a b c)*(SC a b c)*(b^3×c*(a+c)*(SB a b c)+b*(a+b)*c^3*(SC a b c)) in
        cPointhb h_x_1860.
Definition X_1861 :=
        let h_x_1861 a b c := (b^2+c^2-a*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1861.
Definition X_1862 :=
        let h_x_1862 a b c := ((a-b)^2+(a-c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1862.
Definition X_1863 :=
        let h_x_1863 a b c := (1/(a+b-c)^2+1/(a-b+c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1863.
Definition X_1864 :=
        let h_x_1864 a b c := a*((b*(SB a b c))/(a+b-c)+(c*(SC a b c))/(a-b+c)) in
        cPointhb h_x_1864.
Definition X_1865 :=
        let h_x_1865 a b c := (b+c-c^2/(a+b)-b^2/(a+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1865.
Definition X_1866 :=
        let h_x_1866 a b c := a*(a+b-c)*(a-b+c)*(-b^3-2×a×b×c-c^3+a^2*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1866.
Definition X_1867 :=
        let h_x_1867 a b c := (b+c)*(a^2+a×b+a×c+2×b×c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1867.
Definition X_1868 :=
        let h_x_1868 a b c := a*(b+c)*(SB a b c)*(SC a b c)*((SA a b c)*(2*(SA a b c)+(SB a b c))+c*(a×b*(a+b+c)+c*(SC a b c))) in
        cPointhb h_x_1868.
Definition X_1869 :=
        let h_x_1869 a b c := (b+c)*((a+b)*(a+c)-(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1869.
Definition X_1870 :=
        let h_x_1870 a b c := a*(b×c-2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1870.
Definition X_1871 :=
        let h_x_1871 a b c := a*(SB a b c)*(SC a b c)*(a×b^2×c^2+4*(b+c)*(DeltaMaj a b c)^2) in
        cPointhb h_x_1871.
Definition X_1872 :=
        let h_x_1872 a b c := a*(SB a b c)*(SC a b c)*(a×b^2×c^2-4*(b+c)*(DeltaMaj a b c)^2) in
        cPointhb h_x_1872.
Definition X_1873 :=
        let h_x_1873 a b c := (a+b-c)*(a-b+c)*(b+c)*(b×c*(3×a+2*(b+c))+2×a*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1873.
Definition X_1874 :=
        let h_x_1874 a b c := (a+b-c)*(a-b+c)*(b+c)*(a^2-b×c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1874.
Definition X_1875 :=
        let h_x_1875 a b c := a*(a+b-c)*(a-b+c)*(SB a b c)*(SC a b c)*(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_1875.
Definition X_1876 :=
        let h_x_1876 a b c := a*(a+b-c)*(a-b+c)*(a^2-a*(b+c)+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1876.
Definition X_1877 :=
        let h_x_1877 a b c := (2×a-b-c)*(a+b-c)*(a-b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1877.
Definition X_1878 :=
        let h_x_1878 a b c := a*((-a+2×b-c)*c+b*(-a-b+2×c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1878.
Definition X_1879 :=
        let h_x_1879 a b c := (SB a b c)*(SC a b c)*(c^4*(SC a b c)*((SC a b c)^2-4×(DeltaMaj a b c)^2)+b^4*((SB a b c)^3-4*(SB a b c)*(DeltaMaj a b c)^2)) in
        cPointhb h_x_1879.
Definition X_1880 :=
        let h_x_1880 a b c := a*(-a^2+(b-c)^2)*(b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1880.
Definition X_1881 :=
        let h_x_1881 a b c := (SB a b c)*(SC a b c)*(b^3×(SB a b c)^2+c^3×(SC a b c)^2) in
        cPointhb h_x_1881.
Definition X_1882 :=
        let h_x_1882 a b c := (a+b-c)*(a-b+c)*(b+c)*(a^3-2×b×c*(b+c)-a×(b+c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1882.
Definition X_1883 :=
        let h_x_1883 a b c := (a×(b-c)^2+(b+c)*(b^2+c^2))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1883.
Definition X_1884 :=
        let h_x_1884 a b c := (-2×a^3-(b-c)^2*(b+c)+a*(b^2+c^2))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1884.
Definition X_1885 :=
        let h_x_1885 a b c := (SB a b c)*(SC a b c)*(a^2*(2×(SA a b c)^2+(SB a b c)*(SC a b c))+(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_1885.
Definition X_1886 :=
        let h_x_1886 a b c := (2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1886.
Definition X_1887 :=
        let h_x_1887 a b c := a*(a+b-c)*(a-b+c)*(a^2×b-b^3+a^2×c+2×a×b×c-3×b^2×c-3×b×c^2-c^3)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1887.
Definition X_1888 :=
        let h_x_1888 a b c := a*(2×a^3×b×c-a^4*(b+c)+2×a^2×(b-c)^2*(b+c)-(b-c)^4*(b+c)-2×a×b×c×(b+c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1888.
Definition X_1889 :=
        let h_x_1889 a b c := (a^2+2×b×c+2×a*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1889.
Definition X_1890 :=
        let h_x_1890 a b c := (2×a^2+b^2+c^2+a*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1890.
Definition X_1891 :=
        let h_x_1891 a b c := (2×a^3+2×a×b×c+a^2*(b+c)+(b+c)*(b^2+c^2))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1891.
Definition X_1892 :=
        let h_x_1892 a b c := (a+b-c)*(a-b+c)*(a^3-(b+c)*(b^2+c^2))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1892.
Definition X_1893 :=
        let h_x_1893 a b c := (a+b-c)*(a-b+c)*(b+c)*(a^2-2×b×c-a*(b+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1893.
Definition X_1894 :=
        let h_x_1894 a b c := (-2×a^2*(b+c)+(b-c)^2*(b+c)-a*(b^2+c^2))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1894.
Definition X_1895 :=
        let h_x_1895 a b c := b×c*(SB a b c)*(SC a b c)*(a^2*(SA a b c)-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1895.
Definition X_1896 :=
        let h_x_1896 a b c := b*(a+b)*c*(a+c)*(-a+b+c)*(SB a b c)^2×(SC a b c)^2 in
        cPointhb h_x_1896.
Definition X_1897 :=
        let h_x_1897 a b c := (a-b)*(a-c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_1897.
Definition X_1898 :=
        let h_x_1898 a b c := a*((b*(SB a b c)-c*(SC a b c))^2+a*(SA a b c)*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_1898.
Definition X_1899 :=
        let h_x_1899 a b c := (SB a b c)*(1/(SB a b c)^2+1/(SC a b c)^2)*(SC a b c) in
        cPointhb h_x_1899.
Definition X_1900 :=
        let h_x_1900 a b c := a*(c*(a+2×b+c)+b*(a+b+2×c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1900.
Definition X_1901 :=
        let h_x_1901 a b c := (b+c)*(a^3*(b+c)-a×(b-c)^2*(b+c)+2×a^2*(b×c-(SA a b c))+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1901.
Definition X_1902 :=
        let h_x_1902 a b c := a*(-2×a^3×b×c+a^4*(b+c)+2×a×b×c×(b+c)^2+(b-c)^2*(b+c)*(b^2+c^2)-2×a^2*(b^3+c^3))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1902.
Definition X_1903 :=
        let h_x_1903 a b c := a/((a+b)*(a+c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_1903.
Definition X_1904 :=
        let h_x_1904 a b c := ((b+c)*(b^2+c^2)+a*(b^2+4×b×c+c^2))*(SB a b c)*(SC a b c) in
        cPointhb h_x_1904.
Definition X_1905 :=
        let h_x_1905 a b c := a*(SB a b c)*(SC a b c)*(a×b^2×c^2+b*(SA a b c)*(SB a b c)+c*(SA a b c)*(SC a b c)) in
        cPointhb h_x_1905.
Definition X_1906 :=
        let h_x_1906 a b c := (SB a b c)*(SC a b c)*(b^2*(2×a^2×c^2+(SB a b c)^2)+c^2×(SC a b c)^2) in
        cPointhb h_x_1906.
Definition X_1907 :=
        let h_x_1907 a b c := a*(SB a b c)*(SC a b c)*(a^2×b^3×c^3+2×b×c*(b^2+c^2)*(DeltaMaj a b c)^2) in
        cPointhb h_x_1907.
Definition X_1908 :=
        let h_x_1908 a b c := a^2*(a×b^3+2×a^2×b×c+2×b^2×c^2+a×c^3) in
        cPointhb h_x_1908.
Definition X_1909 :=
        let h_x_1909 a b c := a+(b×c)/a in
        cPointhb h_x_1909.
Definition X_1910 :=
        let h_x_1910 a b c := a/((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1910.
Definition X_1911 :=
        let h_x_1911 a b c := a^3/(a^2-b×c) in
        cPointhb h_x_1911.
Definition X_1912 :=
        let h_x_1912 a b c := a*(b-(a×b^2)/c^2-c+(a×c^2)/b^2) in
        cPointhb h_x_1912.
Definition X_1913 :=
        let h_x_1913 a b c := a^3*(a×b^4+2×a^3×b×c+b^3×c^2+b^2×c^3+a×c^4) in
        cPointhb h_x_1913.
Definition X_1914 :=
        let h_x_1914 a b c := a^2*(a^2-b×c) in
        cPointhb h_x_1914.
Definition X_1915 :=
        let h_x_1915 a b c := a^2*(a^4+b^2×c^2) in
        cPointhb h_x_1915.
Definition X_1916 :=
        let h_x_1916 a b c := 1/(a^4-b^2×c^2) in
        cPointhb h_x_1916.
Definition X_1917 :=
        let h_x_1917 a b c := a^7 in
        cPointhb h_x_1917.
Definition X_1918 :=
        let h_x_1918 a b c := a^4*(b+c) in
        cPointhb h_x_1918.
Definition X_1919 :=
        let h_x_1919 a b c := a^4*(b-c) in
        cPointhb h_x_1919.
Definition X_1920 :=
        let h_x_1920 a b c := b^2×c^2*(a^2+b×c) in
        cPointhb h_x_1920.
Definition X_1921 :=
        let h_x_1921 a b c := (a^2-b×c)/a^2 in
        cPointhb h_x_1921.
Definition X_1922 :=
        let h_x_1922 a b c := a^4/(a^2-b×c) in
        cPointhb h_x_1922.
Definition X_1923 :=
        let h_x_1923 a b c := a^5*(b^2+c^2) in
        cPointhb h_x_1923.
Definition X_1924 :=
        let h_x_1924 a b c := a^5*(b^2-c^2) in
        cPointhb h_x_1924.
Definition X_1925 :=
        let h_x_1925 a b c := a+(b^2×c^2)/a^3 in
        cPointhb h_x_1925.
Definition X_1926 :=
        let h_x_1926 a b c := a-(b^2×c^2)/a^3 in
        cPointhb h_x_1926.
Definition X_1927 :=
        let h_x_1927 a b c := a^5/(a^4-b^2×c^2) in
        cPointhb h_x_1927.
Definition X_1928 :=
        let h_x_1928 a b c := 1/a^5 in
        cPointhb h_x_1928.
Definition X_1929 :=
        let h_x_1929 a b c := a/(a^2+a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_1929.
Definition X_1930 :=
        let h_x_1930 a b c := (b^2+c^2)/a in
        cPointhb h_x_1930.
Definition X_1931 :=
        let h_x_1931 a b c := a*(a+b)*(a+c)*(a^2+a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_1931.
Definition X_1932 :=
        let h_x_1932 a b c := a^3*(a^4+b^2×c^2) in
        cPointhb h_x_1932.
Definition X_1933 :=
        let h_x_1933 a b c := a^3*(a^4-b^2×c^2) in
        cPointhb h_x_1933.
Definition X_1934 :=
        let h_x_1934 a b c := 1/(a*(a^4-b^2×c^2)) in
        cPointhb h_x_1934.
Definition X_1935 :=
        let h_x_1935 a b c := a*(a^2×(SA a b c)^2+b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1935.
Definition X_1936 :=
        let h_x_1936 a b c := a*(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1936.
Definition X_1937 :=
        let h_x_1937 a b c := a/(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1937.
Definition X_1938 :=
        let h_x_1938 a b c := a^2*(SA a b c)*(a*(SA a b c)-b*(SB a b c)) in
        cPointhb h_x_1938.
Definition X_1938_bis :=
        let h_x_1938 a b c := a*(b^2*(SB a b c)*(a*(SA a b c)+c*(SB a b c))-c^2*(SC a b c)*(a*(SA a b c)+b*(SC a b c))) in
        cPointhb h_x_1938.
Definition X_1939 :=
        let h_x_1939 a b c := a*(a^4×b^2-a^3×b^3-a^2×b^4+a×b^5-2×a^4×b×c+a^2×b^3×c+2×a×b^4×c-b^5×c+a^4×c^2-3×a×b^3×c^2-a^3×c^3+a^2×b×c^3-3×a×b^2×c^3+2×b^3×c^3-a^2×c^4+2×a×b×c^4+a×c^5-b×c^5) in
        cPointhb h_x_1939.
Definition X_1940 :=
        let h_x_1940 a b c := (SB a b c)*(SC a b c)*(a^2×(SA a b c)^2+b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1940.
Definition X_1941 :=
        let h_x_1941 a b c := (SB a b c)*(SC a b c)*(a^4×(SA a b c)^4+b^2×c^2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1941.
Definition X_1942 :=
        let h_x_1942 a b c := (a^2*(SA a b c))/(a^4×(SA a b c)^4-b^2×c^2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_1942.
Definition X_1943 :=
        let h_x_1943 a b c := a^2×(SA a b c)^2+b×c*(SB a b c)*(SC a b c) in
        cPointhb h_x_1943.
Definition X_1944 :=
        let h_x_1944 a b c := a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c) in
        cPointhb h_x_1944.
Definition X_1945 :=
        let h_x_1945 a b c := a^2/(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1945.
Definition X_1946 :=
        let h_x_1946 a b c := a^3*(a-b-c)*(b-c)*(a^2-b^2-c^2) in
        cPointhb h_x_1946.
Definition X_1947 :=
        let h_x_1947 a b c := b×c*(SB a b c)*(SC a b c)*(a^2×(SA a b c)^2+b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1947.
Definition X_1948 :=
        let h_x_1948 a b c := b×c*(SB a b c)*(SC a b c)*(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1948.
Definition X_1949 :=
        let h_x_1949 a b c := (a^3*(SA a b c))/(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1949.
Definition X_1950 :=
        let h_x_1950 a b c := a^2*(a^2×(SA a b c)^2+b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1950.
Definition X_1951 :=
        let h_x_1951 a b c := a^2*(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1951.
Definition X_1952 :=
        let h_x_1952 a b c := 1/(a^2×(SA a b c)^2-b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1952.
Definition X_1953 :=
        let h_x_1953 a b c := a*(b^2*(SB a b c)+c^2*(SC a b c)) in
        cPointhb h_x_1953.
Definition X_1954 :=
        let h_x_1954 a b c := a*(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2+3*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1954.
Definition X_1955 :=
        let h_x_1955 a b c := a*(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1955.
Definition X_1956 :=
        let h_x_1956 a b c := a/(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1956.
Definition X_1957 :=
        let h_x_1957 a b c := a*(1/(SA a b c)^2+1/((SB a b c)*(SC a b c))) in
        cPointhb h_x_1957.
Definition X_1958 :=
        let h_x_1958 a b c := a*((SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1958.
Definition X_1959 :=
        let h_x_1959 a b c := a*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_1959.
Definition X_1960 :=
        let h_x_1960 a b c := a^2*(2×a-b-c)*(b-c) in
        cPointhb h_x_1960.
Definition X_1961 :=
        let h_x_1961 a b c := a*((a+b)*(a+c)+(b+c)^2) in
        cPointhb h_x_1961.
Definition X_1962 :=
        let h_x_1962 a b c := a*(b+c)*(2×a+b+c) in
        cPointhb h_x_1962.
Definition X_1963 :=
        let h_x_1963 a b c := a*(1/((a+b)*(a+c))+1/(b+c)^2) in
        cPointhb h_x_1963.
Definition X_1964 :=
        let h_x_1964 a b c := a^3*(b^2+c^2) in
        cPointhb h_x_1964.
Definition X_1965 :=
        let h_x_1965 a b c := b×c*(a^4+b^2×c^2) in
        cPointhb h_x_1965.
Definition X_1966 :=
        let h_x_1966 a b c := b×c*(a^4-b^2×c^2) in
        cPointhb h_x_1966.
Definition X_1967 :=
        let h_x_1967 a b c := a^3/(a^4-b^2×c^2) in
        cPointhb h_x_1967.
Definition X_1968 :=
        let h_x_1968 a b c := a^2*(1/(SA a b c)^2+1/((SB a b c)*(SC a b c))) in
        cPointhb h_x_1968.
Definition X_1969 :=
        let h_x_1969 a b c := 1/(a^3*(SA a b c)) in
        cPointhb h_x_1969.
Definition X_1970 :=
        let h_x_1970 a b c := a^2*(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2+3*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1970.
Definition X_1971 :=
        let h_x_1971 a b c := a^2*(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1971.
Definition X_1972 :=
        let h_x_1972 a b c := 1/(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1972.
Definition X_1973 :=
        let h_x_1973 a b c := a^3/(SA a b c) in
        cPointhb h_x_1973.
Definition X_1974 :=
        let h_x_1974 a b c := a^4/(SA a b c) in
        cPointhb h_x_1974.
Definition X_1975 :=
        let h_x_1975 a b c := (SA a b c)^2+(SB a b c)*(SC a b c) in
        cPointhb h_x_1975.
Definition X_1976 :=
        let h_x_1976 a b c := a^2/(-(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1976.
Definition X_1977 :=
        let h_x_1977 a b c := a^4×(b-c)^2 in
        cPointhb h_x_1977.
Definition X_1978 :=
        let h_x_1978 a b c := (b^2×c^2)/(b-c) in
        cPointhb h_x_1978.
Definition X_1979 :=
        let h_x_1979 a b c := a^2*(a^2×b^2-3×a^2×b×c+a×b^2×c+a^2×c^2+a×b×c^2-b^2×c^2) in
        cPointhb h_x_1979.
Definition X_1980 :=
        let h_x_1980 a b c := a^5*(b-c) in
        cPointhb h_x_1980.
Definition X_1981 :=
        let h_x_1981 a b c := (b*(-a^2+c^2)*(SB a b c)-(a^2-b^2)*c*(SC a b c))/((b^2-c^2)*(SA a b c)) in
        cPointhb h_x_1981.
Definition X_1982 :=
        let h_x_1982 a b c := (a+b)*(a+c)*(SB a b c)*(SC a b c)*((-a^2+b^2+c^2)*(b×c+2×a*(b+c))+2*((SA a b c)^2+(SB a b c)*(SC a b c))) in
        cPointhb h_x_1982.
Definition X_1983 :=
        let h_x_1983 a b c := a^3*(a-b)*(-a+c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_1983.
Definition X_1984 :=
        let h_x_1984 a b c := a*(a+b)*(a-b-c)^4×(b-c)^2*(a+c)*(a^4-a^2×b^2+a^2×b×c-b^3×c-a^2×c^2+2×b^2×c^2-b×c^3) in
        cPointhb h_x_1984.
Definition X_1985 :=
        let h_x_1985 a b c := a^3×b^3-a×b^5+a^4×b×c-b^5×c+a×b^3×c^2+a^3×c^3+a×b^2×c^3+2×b^3×c^3-a×c^5-b×c^5 in
        cPointhb h_x_1985.
Definition X_1986 :=
        let h_x_1986 a b c := a^2*(b^2×c^2-4×(SA a b c)^2)*(SB a b c)*(SC a b c)*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_1986.
Definition X_1987 :=
        let h_x_1987 a b c := a^2/(a^2*(SA a b c)*(SB a b c)*(SC a b c)+(SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_1987.
Definition X_1988 :=
        let h_x_1988 a b c := a^2/(a^2×b^2*(SA a b c)*(SB a b c)+a^2×c^2*(SA a b c)*(SC a b c)-b^2×c^2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1988.
Definition X_1989 :=
        let h_x_1989 a b c := 1/(b^2×c^2-4×(SA a b c)^2) in
        cPointhb h_x_1989.
Definition X_1990 :=
        let h_x_1990 a b c := (SB a b c)*(SC a b c)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_1990.
Definition X_1991 :=
        let h_x_1991 a b c := 2×a^2-b^2-c^2+4*(DeltaMaj a b c) in
        cPointhb h_x_1991.
Definition X_1992 :=
        let h_x_1992 a b c := a^2-(SA a b c)+(SB a b c)+(SC a b c) in
        cPointhb h_x_1992.
Definition X_1993 :=
        let h_x_1993 a b c := a^2*((a^2-(SA a b c))*(SA a b c)+(SB a b c)*(SC a b c)) in
        cPointhb h_x_1993.
Definition X_1994 :=
        let h_x_1994 a b c := a^2*(b^2×c^2-16×(DeltaMaj a b c)^2) in
        cPointhb h_x_1994.
Definition X_1995 :=
        let h_x_1995 a b c := a^2*(a^4-b^4+4×b^2×c^2-c^4) in
        cPointhb h_x_1995.
Definition X_1996 :=
        let h_x_1996 a b c := (a^2-2×a×b+b^2-2×a×c+4×b×c+c^2)/(a-b-c)^2 in
        cPointhb h_x_1996.
Definition X_1997 :=
        let h_x_1997 a b c := a^3-a^2×b-a×b^2+b^3-a^2×c+8×a×b×c-3×b^2×c-a×c^2-3×b×c^2+c^3 in
        cPointhb h_x_1997.
Definition X_1998 :=
        let h_x_1998 a b c := a*(a^5-3×a^4*(b+c)+2×a^3×(b+c)^2+(b-c)^2×(b+c)^3+2×a^2*(b+c)*(b^2+c^2)-a*(3×b^4+4×b^3×c-6×b^2×c^2+4×b×c^3+3×c^4)) in
        cPointhb h_x_1998.
Definition X_1999 :=
        let h_x_1999 a b c := a^3+a^2×b+a^2×c+a×b×c-b^2×c-b×c^2 in
        cPointhb h_x_1999.
Definition X_2000 :=
        let h_x_2000 a b c := a*(a×b×c*(SA a b c)-a*(SB a b c)*(SC a b c)+b*(SB a b c)*(SC a b c)+c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2000.
Definition X_2001 :=
        let h_x_2001 a b c := a^2×b^4×c^4-a^8*(SA a b c)+a^4*(b^4*(SB a b c)+c^4*(SC a b c)) in
        cPointhb h_x_2001.
Definition X_2002 :=
        let h_x_2002 a b c := a*(a+b-c)*(a-b+c)*(a×b×c*(SA a b c)+(-a+b+c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2002.
Definition X_2003 :=
        let h_x_2003 a b c := a^2*(a+b-c)*(a-b+c)*(b×c+2*(SA a b c))*(3×a×b×c-2×a*(SA a b c)-2×b*(SB a b c)-2×c*(SC a b c)) in
        cPointhb h_x_2003.
Definition X_2004 :=
        let h_x_2004 a b c := a^2*(2×a^2*(SA a b c)+(SA a b c)^2+5*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_2004.
Definition X_2005 :=
        let h_x_2005 a b c := a^2*(2×a^2*(SA a b c)+(SA a b c)^2+5*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_2005.
Definition X_2006 :=
        let h_x_2006 a b c := 1/((-a+b+c)*(a^2-b^2+b×c-c^2)) in
        cPointhb h_x_2006.
Definition X_2007 :=
        let h_x_2007 a b c := a^2*(b×c×sqrt(b^2×c^2+a^2*(b^2+c^2))+(a^2+b^2+c^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2007.
Definition X_2008 :=
        let h_x_2008 a b c := a^2*(b×c×sqrt(b^2×c^2+a^2*(b^2+c^2))-(a^2+b^2+c^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2008.
Definition X_2009 :=
        let h_x_2009 a b c := 1/(a^4-2×b^2×c^2-a^2*(b^2+c^2)-4×sqrt(b^2×c^2+a^2*(b^2+c^2))*(DeltaMaj a b c)) in
        cPointhb h_x_2009.
Definition X_2010 :=
        let h_x_2010 a b c := 1/(a^4-2×b^2×c^2-a^2*(b^2+c^2)+4×sqrt(b^2×c^2+a^2*(b^2+c^2))*(DeltaMaj a b c)) in
        cPointhb h_x_2010.
Definition X_2011 :=
        let h_x_2011 a b c := a^2*(-a^4+2×b^2×c^2+a^2*(b^2+c^2)+4*(b^2+c^2)*(e a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_2011.
Definition X_2012 :=
        let h_x_2012 a b c := a^2*(-a^4+2×b^2×c^2+a^2*(b^2+c^2)-4*(b^2+c^2)*(e a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_2012.
Definition X_2013 :=
        let h_x_2013 a b c := a*(b×c*(b+c)*sqrt(b^2×c^2+a^2*(b^2+c^2))+2×a*(b^2+c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_2013.
Definition X_2014 :=
        let h_x_2014 a b c := a*(b×c*(b+c)*sqrt(b^2×c^2+a^2*(b^2+c^2))-2×a*(b^2+c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_2014.
Definition X_2015 :=
        let h_x_2015 a b c := sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c))+2×a^2*(b^2+c^2)*(J a b c)*(DeltaMaj a b c) in
        cPointhb h_x_2015.
Definition X_2016 :=
        let h_x_2016 a b c := sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c))-2×a^2*(b^2+c^2)*(J a b c)*(DeltaMaj a b c) in
        cPointhb h_x_2016.
Definition X_2017 :=
        let h_x_2017 a b c := a*(sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))+2×a*(a^2+b^2+c^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2017.
Definition X_2018 :=
        let h_x_2018 a b c := a*(sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))-2×a*(a^2+b^2+c^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2018.
Definition X_2019 :=
        let h_x_2019 a b c := a^2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4))-4×a^2*(b^2+c^2)*(a^2*(b+c)+b×c*(b+c)+a*(b^2+b×c+c^2))*(DeltaMaj a b c) in
        cPointhb h_x_2019.
Definition X_2020 :=
        let h_x_2020 a b c := a^2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4))+4×a^2*(b^2+c^2)*(a^2*(b+c)+b×c*(b+c)+a*(b^2+b×c+c^2))*(DeltaMaj a b c) in
        cPointhb h_x_2020.
Definition X_2021 :=
        let h_x_2021 a b c := a^2*((SA a b c)*((SB a b c)-(SC a b c))^2+a^2*(-3×(SA a b c)^2+(SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_2021.
Definition X_2022 :=
        let h_x_2022 a b c := a^2*(3×a^8×b^2-4×a^6×b^4+4×a^4×b^6+b^10+3×a^8×c^2-6×a^6×b^2×c^2-4×a^4×b^4×c^2+2×a^2×b^6×c^2+b^8×c^2-4×a^6×c^4-4×a^4×b^2×c^4-4×a^2×b^4×c^4+2×b^6×c^4+4×a^4×c^6+2×a^2×b^2×c^6+2×b^4×c^6+b^2×c^8+c^10) in
        cPointhb h_x_2022.
Definition X_2023 :=
        let h_x_2023 a b c := a^6×b^2-a^4×b^4+2×a^2×b^6+a^6×c^2-2×a^4×b^2×c^2-a^2×b^4×c^2+b^6×c^2-a^4×c^4-a^2×b^2×c^4-2×b^4×c^4+2×a^2×c^6+b^2×c^6 in
        cPointhb h_x_2023.
Definition X_2024 :=
        let h_x_2024 a b c := a^2*(3×a^6×b^2-a^4×b^4+a^2×b^6+b^8+3×a^6×c^2-5×a^2×b^4×c^2+2×b^6×c^2-a^4×c^4-5×a^2×b^2×c^4-2×b^4×c^4+a^2×c^6+2×b^2×c^6+c^8) in
        cPointhb h_x_2024.
Definition X_2025 :=
        let h_x_2025 a b c := a^2*(3×a^6×b^2-3×a^4×b^4+3×a^2×b^6+b^8+3×a^6×c^2-4×a^4×b^2×c^2-5×a^2×b^4×c^2+4×b^6×c^2-3×a^4×c^4-5×a^2×b^2×c^4-2×b^4×c^4+3×a^2×c^6+4×b^2×c^6+c^8) in
        cPointhb h_x_2025.
Definition X_2026 :=
        let h_x_2026 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)+2*(e a b c)*(a^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2026.
Definition X_2027 :=
        let h_x_2027 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)-2*(e a b c)*(a^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2027.
Definition X_2028 :=
        let h_x_2028 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-c^4-(b^2+c^2)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_2028.
Definition X_2029 :=
        let h_x_2029 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-c^4+(b^2+c^2)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_2029.
Definition X_2030 :=
        let h_x_2030 a b c := a^2*(4×a^4+b^4-4×b^2×c^2+c^4-a^2*(b^2+c^2)) in
        cPointhb h_x_2030.
Definition X_2031 :=
        let h_x_2031 a b c := a^2*(4×a^6-5×a^4×b^2+4×a^2×b^4+b^6-5×a^4×c^2-6×a^2×b^2×c^2+b^4×c^2+4×a^2×c^4+b^2×c^4+c^6) in
        cPointhb h_x_2031.
Definition X_2032 :=
        let h_x_2032 a b c := a^2*(4×a^8-a^6×b^2+3×a^4×b^4+a^2×b^6+b^8-a^6×c^2-8×a^4×b^2×c^2-a^2×b^4×c^2-2×b^6×c^2+3×a^4×c^4-a^2×b^2×c^4+2×b^4×c^4+a^2×c^6-2×b^2×c^6+c^8) in
        cPointhb h_x_2032.
Definition X_2033 :=
        let h_x_2033 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2-(b^2+c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(e a b c)) in
        cPointhb h_x_2033.
Definition X_2034 :=
        let h_x_2034 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2+(b^2+c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(e a b c)) in
        cPointhb h_x_2034.
Definition X_2035 :=
        let h_x_2035 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2-(b^2+c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_2035.
Definition X_2036 :=
        let h_x_2036 a b c := a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2+(b^2+c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_2036.
Definition X_2037 :=
        let h_x_2037 a b c := a^2*(-b^4-c^4+a^2*(b^2+c^2))*(a^2*(b+c)+b×c*(b+c)+a*(b^2+b×c+c^2))-a^2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4))*(e a b c) in
        cPointhb h_x_2037.
Definition X_2038 :=
        let h_x_2038 a b c := a^2*(-b^4-c^4+a^2*(b^2+c^2))*(a^2*(b+c)+b×c*(b+c)+a*(b^2+b×c+c^2))+a^2×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(a^3×(b+c)^2+a^2*(b+c)*(b^2+c^2)-(b+c)*(b^4+c^4)-a*(b^4+2×b^3×c+2×b×c^3+c^4))*(e a b c) in
        cPointhb h_x_2038.
Definition X_2039 :=
        let h_x_2039 a b c := b^2*((SB a b c)^2-(SA a b c)*(SC a b c)-(SB a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2))+c^2*(-(SA a b c)*(SB a b c)+(SC a b c)^2-(SC a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_2039.
Definition X_2040 :=
        let h_x_2040 a b c := b^2*((SB a b c)^2-(SA a b c)*(SC a b c)+(SB a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2))+c^2*(-(SA a b c)*(SB a b c)+(SC a b c)^2+(SC a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_2040.
Definition X_2041 :=
        let h_x_2041 a b c := 2*(-1+sqrt(3))*a^2*(SA a b c)-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2041.
Definition X_2042 :=
        let h_x_2042 a b c := 2*(1+sqrt(3))*a^2*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2042.
Definition X_2043 :=
        let h_x_2043 a b c := 2*(1+sqrt(3))*a^2*(SA a b c)-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2043.
Definition X_2044 :=
        let h_x_2044 a b c := 2*(-1+sqrt(3))*a^2*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2044.
Definition X_2045 :=
        let h_x_2045 a b c := 2*(-3+sqrt(3))*a^2*(SA a b c)+4*(-2+sqrt(3))*(SB a b c)*(SC a b c) in
        cPointhb h_x_2045.
Definition X_2046 :=
        let h_x_2046 a b c := 2*(3+sqrt(3))*a^2*(SA a b c)+4*(2+sqrt(3))*(SB a b c)*(SC a b c) in
        cPointhb h_x_2046.
Definition X_2047 :=
        let h_x_2047 a b c := (SB a b c)*(SC a b c)+(a+b+c)^2*(DeltaMaj a b c) in
        cPointhb h_x_2047.
Definition X_2048 :=
        let h_x_2048 a b c := (a+b+c)^2*(SB a b c)*(SC a b c)+16×(DeltaMaj a b c)^3 in
        cPointhb h_x_2048.
Definition X_2049 :=
        let h_x_2049 a b c := a^2*(SA a b c)*((s a b c)^4-(DeltaMaj a b c)^2)+((s a b c)^4+(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2049.
Definition X_2050 :=
        let h_x_2050 a b c := a^2*(SA a b c)*((s a b c)^4-(DeltaMaj a b c)^2)-((s a b c)^4+(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2050.
Definition X_2051 :=
        let h_x_2051 a b c := 1/(a^3-b×c*(b+c)-a*(b^2-b×c+c^2)) in
        cPointhb h_x_2051.
Definition X_2052 :=
        let h_x_2052 a b c := 1/(a^2×(SA a b c)^2) in
        cPointhb h_x_2052.
Definition X_2053 :=
        let h_x_2053 a b c := (a^2*(-a+b+c))/(a×b+a×c-b×c) in
        cPointhb h_x_2053.
Definition X_2054 :=
        let h_x_2054 a b c := (a^2*(b+c))/(a^2+a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_2054.
Definition X_2055 :=
        let h_x_2055 a b c := a^2*(SA a b c)*(a^6×(SA a b c)^3-a^2*(SA a b c)*(SB a b c)^2×(SC a b c)^2-(SB a b c)^3×(SC a b c)^3+(SA a b c)^2*(SB a b c)*(SC a b c)*((SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_2055.
Definition X_2056 :=
        let h_x_2056 a b c := a^2*(3×a^2*(SA a b c)-(SA a b c)^2+(SB a b c)^2+(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_2056.
Definition X_2057 :=
        let h_x_2057 a b c := (sa a b c)*(c^2×(sa a b c)^2×(sb a b c)^2+2×(sa a b c)^2*(SA a b c)*(sb a b c)*(sc a b c)+b^2×(sa a b c)^2×(sc a b c)^2-a^2×(sb a b c)^2×(sc a b c)^2) in
        cPointhb h_x_2057.
Definition X_2058 :=
        let h_x_2058 a b c := a^2*(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))*(a^2×b^2×(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))^2×(sqrt(3)*(SB a b c)+2*(DeltaMaj a b c))^2+2×a^2*(SA a b c)*(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))^2*(sqrt(3)*(SB a b c)+2*(DeltaMaj a b c))*(sqrt(3)*(SC a b c)+2*(DeltaMaj a b c))+a^2×c^2×(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))^2×(sqrt(3)*(SC a b c)+2*(DeltaMaj a b c))^2-b^2×c^2×(sqrt(3)*(SB a b c)+2*(DeltaMaj a b c))^2×(sqrt(3)*(SC a b c)+2*(DeltaMaj a b c))^2) in
        cPointhb h_x_2058.
Definition X_2059 :=
        let h_x_2059 a b c := a^2*(a^2×b^2×(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c))^2×(sqrt(3)*(SB a b c)-2*(DeltaMaj a b c))^2+2×a^2*(SA a b c)*(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c))^2*(sqrt(3)*(SB a b c)-2*(DeltaMaj a b c))*(sqrt(3)*(SC a b c)-2*(DeltaMaj a b c))+a^2×c^2×(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c))^2×(sqrt(3)*(SC a b c)-2*(DeltaMaj a b c))^2-b^2×c^2×(sqrt(3)*(SB a b c)-2*(DeltaMaj a b c))^2×(sqrt(3)*(SC a b c)-2*(DeltaMaj a b c))^2)*(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c)) in
        cPointhb h_x_2059.
Definition X_2060 :=
        let h_x_2060 a b c := (a^2*(SA a b c)-(SB a b c)*(SC a b c))*(a^2*(b×c-(SA a b c))*(b×c+(SA a b c))-b^2×(SB a b c)^2+(SC a b c)*(2*(SA a b c)*(SB a b c)-c^2*(SC a b c)))*((-b^2×c^2+(SA a b c)^2)*(SB a b c)^2×(SC a b c)^2+a^2×(SA a b c)^2*(b^2×(SB a b c)^2+(SC a b c)*(-2*(SA a b c)*(SB a b c)+c^2*(SC a b c)))) in
        cPointhb h_x_2060.
Definition X_2061 :=
        let h_x_2061 a b c := (a^2*(SA a b c)-a×b*(SB a b c)+b×c*(SB a b c)-a×c*(SC a b c)+b×c*(SC a b c))*(c^2×(-a×b*(SA a b c)+a×c*(SA a b c)+b^2*(SB a b c)+a×c*(SC a b c)-b×c*(SC a b c))^2×(a^2*(SA a b c)-a×b*(SB a b c)+b×c*(SB a b c)-a×c*(SC a b c)+b×c*(SC a b c))^2+2*(SA a b c)*(-a×b*(SA a b c)+a×c*(SA a b c)+b^2*(SB a b c)+a×c*(SC a b c)-b×c*(SC a b c))*(a^2*(SA a b c)-a×b*(SB a b c)+b×c*(SB a b c)-a×c*(SC a b c)+b×c*(SC a b c))^2*(a×b*(SA a b c)-a×c*(SA a b c)+a×b*(SB a b c)-b×c*(SB a b c)+c^2*(SC a b c))-a^2×(-a×b*(SA a b c)+a×c*(SA a b c)+b^2*(SB a b c)+a×c*(SC a b c)-b×c*(SC a b c))^2×(a×b*(SA a b c)-a×c*(SA a b c)+a×b*(SB a b c)-b×c*(SB a b c)+c^2*(SC a b c))^2+b^2×(a^2*(SA a b c)-a×b*(SB a b c)+b×c*(SB a b c)-a×c*(SC a b c)+b×c*(SC a b c))^2×(a×b*(SA a b c)-a×c*(SA a b c)+a×b*(SB a b c)-b×c*(SB a b c)+c^2*(SC a b c))^2) in
        cPointhb h_x_2061.
Definition X_2062 :=
        let h_x_2062 a b c := a^2*(SA a b c)*(2×(SA a b c)^3*(SB a b c)*(SC a b c)+b×c*(-(SB a b c)^2×(SC a b c)^2+(SA a b c)^2*((SB a b c)^2+(SC a b c)^2))) in
        cPointhb h_x_2062.
Definition X_2063 :=
        let h_x_2063 a b c := c^2×(SA a b c)^3×(SB a b c)^2+(SA a b c)*(SC a b c)*(2×(SA a b c)^3*(SB a b c)+b^2×(SA a b c)^2*(SC a b c)-a^2×(SB a b c)^2*(SC a b c)) in
        cPointhb h_x_2063.
Definition X_2064 :=
        let h_x_2064 a b c := b×c*(-a^4+b^4+c^4+2×b×c*(SA a b c)) in
        cPointhb h_x_2064.
Definition X_2065 :=
        let h_x_2065 a b c := a^2/(((SA a b c)^2-(SB a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)^2-(SC a b c)^2)) in
        cPointhb h_x_2065.
Definition X_2066 :=
        let h_x_2066 a b c := a^2*(b×c+(SA a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_2066.
Definition X_2067 :=
        let h_x_2067 a b c := a^2*(-b×c+(SA a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_2067.
Definition X_2068 :=
        let h_x_2068 a b c := a*(a+sqrt(b×c)) in
        cPointhb h_x_2068.
Definition X_2069 :=
        let h_x_2069 a b c := a*(a-sqrt(b×c)) in
        cPointhb h_x_2069.
Definition X_2070 :=
        let h_x_2070 a b c := a^2*(-2+(J a b c)^2)*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2070.
Definition X_2071 :=
        let h_x_2071 a b c := a^2*(1+(J a b c)^2)*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2071.
Definition X_2072 :=
        let h_x_2072 a b c := a^2*(1+(J a b c)^2)*(SA a b c)+2*(-1+(J a b c)^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2072.
Definition X_2073 :=
        let h_x_2073 a b c := (a^2*((a^2-b^2-c^2)*(-b×c+a*(b+c))+a^2*(SA a b c)+3×(SA a b c)^2-(SB a b c)*(SC a b c)))/(2*(b+c)*(SA a b c)) in
        cPointhb h_x_2073.
Definition X_2074 :=
        let h_x_2074 a b c := (a*(a^3-a^2×b-a×b^2+b^3-a^2×c-a×b×c+b^2×c-a×c^2+b×c^2+c^3))/(2*(b+c)*(a^2-b^2-c^2)) in
        cPointhb h_x_2074.
Definition X_2075 :=
        let h_x_2075 a b c := (a^2*(a^4×b-2×a^2×b^3+b^5+a^4×c-a^3×b×c-a^2×b^2×c+a×b^3×c-a^2×b×c^2+a×b^2×c^2-2×a^2×c^3+a×b×c^3+c^5))/((b+c)*(a^2-b^2-c^2)) in
        cPointhb h_x_2075.
Definition X_2076 :=
        let h_x_2076 a b c := a^2*(a^4+a^2×b^2-b^4+a^2×c^2-b^2×c^2-c^4) in
        cPointhb h_x_2076.
Definition X_2077 :=
        let h_x_2077 a b c := a^2*((b×c+2*(SA a b c))*(b*(SB a b c)+c*(SC a b c))+a*(-3×b×c*(SA a b c)+(SA a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_2077.
Definition X_2078 :=
        let h_x_2078 a b c := a^2*(a+b-c)*(a-b+c)*(a^2-2×a×b+b^2-2×a×c+b×c+c^2) in
        cPointhb h_x_2078.
Definition X_2079 :=
        let h_x_2079 a b c := a^2*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2+5×a^4×b^2×c^2-3×a^2×b^4×c^2+2×b^6×c^2-3×a^2×b^2×c^4-2×b^4×c^4+2×a^2×c^6+2×b^2×c^6-c^8) in
        cPointhb h_x_2079.
Definition X_2080 :=
        let h_x_2080 a b c := a^2*(a^6-3×a^4×b^2+2×a^2×b^4-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+2×a^2×c^4+b^2×c^4) in
        cPointhb h_x_2080.
Definition X_2081 :=
        let h_x_2081 a b c := a^2*(b^2×c^2-4×(SA a b c)^2)*((SB a b c)-(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2081.
Definition X_2082 :=
        let h_x_2082 a b c := a*(a-b-c)*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_2082.
Definition X_2083 :=
        let h_x_2083 a b c := a*(SA a b c)*((SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_2083.
Definition X_2084 :=
        let h_x_2084 a b c := a^3*(b^4-c^4) in
        cPointhb h_x_2084.
Definition X_2085 :=
        let h_x_2085 a b c := a^3*(b^4+c^4) in
        cPointhb h_x_2085.
Definition X_2086 :=
        let h_x_2086 a b c := a^2×(b^2-c^2)^2*(a^4-b^2×c^2) in
        cPointhb h_x_2086.
Definition X_2087 :=
        let h_x_2087 a b c := a*(2×a-b-c)*(b-c)^2 in
        cPointhb h_x_2087.
Definition X_2088 :=
        let h_x_2088 a b c := a^2×(b^2-c^2)^2*(-b^2×c^2+(-a^2+b^2+c^2)^2) in
        cPointhb h_x_2088.
Definition X_2089 :=
        let h_x_2089 a b c := sqrt(((sb a b c)*(sc a b c))/(b×c))*(-sqrt((((s a b c)*(sa a b c))/(b×c)))+sqrt(((s a b c)*(sb a b c))/(a×c))+sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_2089.
Definition X_2090 :=
        let h_x_2090 a b c := sqrt(((sa a b c)*(sb a b c))/(a×b))+sqrt(((sa a b c)*(sc a b c))/(a×c)) in
        cPointhb h_x_2090.
Definition X_2091 :=
        let h_x_2091 a b c := (sb a b c)*(sc a b c)*sqrt(((sb a b c)*(sc a b c))/(b×c))*(sqrt(((sa a b c)*(sb a b c))/(a×b))+sqrt(((sa a b c)*(sc a b c))/(a×c))) in
        cPointhb h_x_2091.
Definition X_2092 :=
        let h_x_2092 a b c := a*(a^2×(b+c)^2+a*(b+c)*(b^2+c^2)) in
        cPointhb h_x_2092.
Definition X_2093 :=
        let h_x_2093 a b c := a*(a^3+3×a^2*(b+c)-3×(b-c)^2*(b+c)-a×(b+c)^2) in
        cPointhb h_x_2093.
Definition X_2094 :=
        let h_x_2094 a b c := 3×a×b×c-5×a*(SA a b c)+b*(SB a b c)+c*(SC a b c) in
        cPointhb h_x_2094.
Definition X_2095 :=
        let h_x_2095 a b c := a*(a^6+a^5*(b+c)-2×(b-c)^4×(b+c)^2+a×(b-c)^2*(b+c)*(b^2+c^2)-2×a^4*(2×b^2+b×c+2×c^2)-2×a^3*(b^3+c^3)+a^2*(5×b^4-2×b^3×c+2×b^2×c^2-2×b×c^3+5×c^4)) in
        cPointhb h_x_2095.
Definition X_2096 :=
        let h_x_2096 a b c := (2×a*(a+b-c)*(a-b+c))/(a^3-a^2*(b+c)+(b-c)^2*(b+c)-a*(b^2-6×b×c+c^2))-((SB a b c)*(SC a b c))/(4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2096.
Definition X_2097 :=
        let h_x_2097 a b c := a*(a/(a^2+b^2+c^2)-(2*(a+b-c)*(a-b+c))/(a^3-a^2*(b+c)+(b-c)^2*(b+c)-a*(b^2-6×b×c+c^2))) in
        cPointhb h_x_2097.
Definition X_2098 :=
        let h_x_2098 a b c := a*(a-b-c)*(a^2-2×(b-c)^2-a*(b+c)) in
        cPointhb h_x_2098.
Definition X_2099 :=
        let h_x_2099 a b c := a*(a+b-c)*(a-b+c)*(a-2×b-2×c) in
        cPointhb h_x_2099.
Definition X_2100 :=
        let h_x_2100 a b c := a*(a*(a+2*(b+c))*((J a b c)-1)*(SA a b c)-(b^2*((J a b c)-1)+2*(SA a b c))*(SB a b c))-(a×c^2*((J a b c)-1)+2×a*(SA a b c)-2*(a+2*(b+c))*(SB a b c))*(SC a b c) in
        cPointhb h_x_2100.
Definition X_2101 :=
        let h_x_2101 a b c := a*(a*(a+2*(b+c))*((J a b c)+1)*(SA a b c)-(b^2*((J a b c)+1)-2*(SA a b c))*(SB a b c))-(a×c^2*((J a b c)+1)-2×a*(SA a b c)+2*(a+2*(b+c))*(SB a b c))*(SC a b c) in
        cPointhb h_x_2101.
Definition X_2102 :=
        let h_x_2102 a b c := a*(J a b c)*(a^2*(b+c)-(b-c)^2*(b+c)+a*(-2×b×c+(SA a b c)))+(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2102.
Definition X_2103 :=
        let h_x_2103 a b c := a*(J a b c)*(a^2*(b+c)-(b-c)^2*(b+c)+a*(-2×b×c+(SA a b c)))-(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2103.
Definition X_2104 :=
        let h_x_2104 a b c := (a^2+b^2+c^2)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))+2×a^2*(J a b c)*((a^2-(SA a b c))*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2104.
Definition X_2105 :=
        let h_x_2105 a b c := (a^2+b^2+c^2)*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))-2×a^2*(J a b c)*((a^2-(SA a b c))*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2105.
Definition X_2106 :=
        let h_x_2106 a b c := a*(a+b)*(a+c)*(-a^2×b^2-a^2×c^2+b^2×c^2+a×b×c*(-a+b+c)) in
        cPointhb h_x_2106.
Definition X_2107 :=
        let h_x_2107 a b c := (a^2*(b+c))/(-a^2×b^2-a^2×c^2+b^2×c^2+a×b×c*(-a+b+c)) in
        cPointhb h_x_2107.
Definition X_2108 :=
        let h_x_2108 a b c := a*(a^3×b-a^2×b^2-a×b^3+a^3×c+a^2×b×c-a×b^2×c+b^3×c-a^2×c^2-a×b×c^2+b^2×c^2-a×c^3+b×c^3) in
        cPointhb h_x_2108.
Definition X_2109 :=
        let h_x_2109 a b c := a^2/(a^3×b-a^2×b^2-a×b^3+a^3×c+a^2×b×c-a×b^2×c+b^3×c-a^2×c^2-a×b×c^2+b^2×c^2-a×c^3+b×c^3) in
        cPointhb h_x_2109.
Definition X_2110 :=
        let h_x_2110 a b c := a^2*(a^3×b^2-a^2×b^3+a^3×b×c-a^2×b^2×c-a×b^3×c+a^3×c^2-a^2×b×c^2+a×b^2×c^2+b^3×c^2-a^2×c^3-a×b×c^3+b^2×c^3) in
        cPointhb h_x_2110.
Definition X_2111 :=
        let h_x_2111 a b c := a/(a^3×b^2-a^2×b^3+a^3×b×c-a^2×b^2×c-a×b^3×c+a^3×c^2-a^2×b×c^2+a×b^2×c^2+b^3×c^2-a^2×c^3-a×b×c^3+b^2×c^3) in
        cPointhb h_x_2111.
Definition X_2112 :=
        let h_x_2112 a b c := a^2*(a^4-a×b^3-a^2×b×c+2×b^2×c^2-a×c^3) in
        cPointhb h_x_2112.
Definition X_2113 :=
        let h_x_2113 a b c := a/(a^4-a×b^3-a^2×b×c+2×b^2×c^2-a×c^3) in
        cPointhb h_x_2113.
Definition X_2114 :=
        let h_x_2114 a b c := a*(-a+b-c)*(-a-b+c)*(a^4+a^3×b-2×a^2×b^2+a×b^3-b^4+a^3×c-3×a^2×b×c+a×b^2×c+b^3×c-2×a^2×c^2+a×b×c^2+a×c^3+b×c^3-c^4) in
        cPointhb h_x_2114.
Definition X_2115 :=
        let h_x_2115 a b c := (a^2*(a-b-c))/(a^4+a^3×b-2×a^2×b^2+a×b^3-b^4+a^3×c-3×a^2×b×c+a×b^2×c+b^3×c-2×a^2×c^2+a×b×c^2+a×c^3+b×c^3-c^4) in
        cPointhb h_x_2115.
Definition X_2116 :=
        let h_x_2116 a b c := a*(a×b-b^2+2×a×c+b×c)*(2×a×b+a×c+b×c-c^2)*(2×a^5×b-a^4×b^2-a^2×b^4+2×a^5×c+a^4×b×c-3×a^3×b^2×c+a^2×b^3×c-a×b^4×c-a^4×c^2-3×a^3×b×c^2-a^2×b^2×c^2+3×a×b^3×c^2-b^4×c^2+a^2×b×c^3+3×a×b^2×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4-b^2×c^4) in
        cPointhb h_x_2116.
Definition X_2117 :=
        let h_x_2117 a b c := (a^2*(-a^2+a×b+a×c+2×b×c))/(2×a^5×b-a^4×b^2-a^2×b^4+2×a^5×c+a^4×b×c-3×a^3×b^2×c+a^2×b^3×c-a×b^4×c-a^4×c^2-3×a^3×b×c^2-a^2×b^2×c^2+3×a×b^3×c^2-b^4×c^2+a^2×b×c^3+3×a×b^2×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4-b^2×c^4) in
        cPointhb h_x_2117.
Definition X_2118 :=
        let h_x_2118 a b c := a*((Rpower a (7/2))*(b^2×sqrt(c)-sqrt(b)×c^2)+a^3*(-2*(Rpower b (5/2))*sqrt(c)-b^2×c+b×c^2+2×sqrt(b)*(Rpower c (5/2)))+(Rpower a (5/2))*(b^3×sqrt(c)+3*(Rpower b (5/2))*c-3×b*(Rpower c (5/2))-sqrt(b)×c^3)+2×a^2*(-b^3×c-(Rpower b (5/2))*(Rpower c (3/2))+(Rpower b (3/2))*(Rpower c (5/2))+b×c^3)+(Rpower a (3/2))*(2×b^3*(Rpower c (3/2))+(Rpower b (5/2))*c^2-b^2*(Rpower c (5/2))-2*(Rpower b (3/2))*c^3)+a*(-b^3×c^2+b^2×c^3)) in
        cPointhb h_x_2118.
Definition X_2119 :=
        let h_x_2119 a b c := a^2*((-a^3×b^2+a^2×b^3)*c+(2×a^3*(Rpower b (3/2))+(Rpower a (5/2))*b^2-a^2*(Rpower b (5/2))-2*(Rpower a (3/2))*b^3)*(Rpower c (3/2))+2*(-a^3×b-(Rpower a (5/2))*(Rpower b (3/2))+(Rpower a (3/2))*(Rpower b (5/2))+a×b^3)*c^2+(a^3×sqrt(b)+3*(Rpower a (5/2))*b-3×a*(Rpower b (5/2))-sqrt(a)×b^3)*(Rpower c (5/2))+(-2*(Rpower a (5/2))*sqrt(b)-a^2×b+a×b^2+2×sqrt(a)*(Rpower b (5/2)))*c^3+(a^2×sqrt(b)-sqrt(a)×b^2)*(Rpower c (7/2)))*((Rpower b (7/2))*(-a^2×sqrt(c)+sqrt(a)×c^2)+b^3*(2*(Rpower a (5/2))*sqrt(c)+a^2×c-a×c^2-2×sqrt(a)*(Rpower c (5/2)))+(Rpower b (5/2))*(-a^3×sqrt(c)-3*(Rpower a (5/2))*c+3×a*(Rpower c (5/2))+sqrt(a)×c^3)+2×b^2*(a^3×c+(Rpower a (5/2))*(Rpower c (3/2))-(Rpower a (3/2))*(Rpower c (5/2))-a×c^3)+(Rpower b (3/2))*(-2×a^3*(Rpower c (3/2))-(Rpower a (5/2))*c^2+a^2*(Rpower c (5/2))+2*(Rpower a (3/2))*c^3)+b*(a^3×c^2-a^2×c^3)) in
        cPointhb h_x_2119.
Definition X_2120 :=
        let h_x_2120 a b c := (a^2*(-(((2*(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))^2)/(b^2×c^2))+((2*(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))^2)/(a^2×c^2)+((b^2*(SB a b c)+2*(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))^2)/(a^2×b^2)))/(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2120.
Definition X_2121 :=
        let h_x_2121 a b c := (a^2*(SA a b c)+2*(SB a b c)*(SC a b c))/((c^2*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)))/((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)+(b^2*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)))/((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)-(a^2*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c)))/((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_2121.
Definition X_2122 :=
        let h_x_2122 a b c := a^2*(a+b-c)*(a-b+c)*(-(((a+b-c)^2×(a-b+c)^2)/(b^2×c^2))+((a+b-c)^2×(-a+b+c)^2)/(a^2×c^2)+((a-b)^2-c^2)^2/(a^2×b^2)) in
        cPointhb h_x_2122.
Definition X_2123 :=
        let h_x_2123 a b c := 1/((a+b-c)*(a-b+c)*(-(((a+b-c)^2×(a-b+c)^2)/(b^2×c^2))+((a+b-c)^2×(-a+b+c)^2)/(a^2×c^2)+((a-b)^2-c^2)^2/(a^2×b^2))) in
        cPointhb h_x_2123.
Definition X_2124 :=
        let h_x_2124 a b c := a*(a+b-c)*(a-b+c)*(-(a+b-c)^2×(a-b+c)^2+(a+b-c)^2×(-a+b+c)^2+(a-b+c)^2×(-a+b+c)^2) in
        cPointhb h_x_2124.
Definition X_2125 :=
        let h_x_2125 a b c := a/((a+b-c)*(a-b+c)*(-(a+b-c)^2×(a-b+c)^2+(a+b-c)^2×(-a+b+c)^2+(a-b+c)^2×(-a+b+c)^2)) in
        cPointhb h_x_2125.
Definition X_2126 :=
        let h_x_2126 a b c := a^2*(a+b)*(a+c)*(-a^2×(a+b)^2×(a+c)^2+b^2×(a+b)^2×(b+c)^2+c^2×(a+c)^2×(b+c)^2) in
        cPointhb h_x_2126.
Definition X_2127 :=
        let h_x_2127 a b c := 1/((a+b)*(a+c)*(-a^2×(a+b)^2×(a+c)^2+b^2×(a+b)^2×(b+c)^2+c^2×(a+c)^2×(b+c)^2)) in
        cPointhb h_x_2127.
Definition X_2128 :=
        let h_x_2128 a b c := a*(SA a b c)*(1/((SA a b c)^2×(SB a b c)^2)+1/((SA a b c)^2×(SC a b c)^2)-1/((SB a b c)^2×(SC a b c)^2)) in
        cPointhb h_x_2128.
Definition X_2129 :=
        let h_x_2129 a b c := a/((SA a b c)*(1/((SA a b c)^2×(SB a b c)^2)+1/((SA a b c)^2×(SC a b c)^2)-1/((SB a b c)^2×(SC a b c)^2))) in
        cPointhb h_x_2129.
Definition X_2130 :=
        let h_x_2130 a b c := a^2*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(-a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2) in
        cPointhb h_x_2130.
Definition X_2131 :=
        let h_x_2131 a b c := 1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(-a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2)) in
        cPointhb h_x_2131.
Definition X_2132 :=
        let h_x_2132 a b c := a^2*((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))*(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))*(c^2×((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c))^2×((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2+b^2×((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c))^2×(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2-a^2×((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2×(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2) in
        cPointhb h_x_2132.
Definition X_2133 :=
        let h_x_2133 a b c := 1/(((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))*(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))*(c^2×((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c))^2×((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2+b^2×((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c))^2×(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2-a^2×((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2×(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))^2)) in
        cPointhb h_x_2133.
Definition X_2134 :=
        let h_x_2134 a b c := a*(a+b)*(a+c)*(-(a+b)^2×(a+c)^2+(a+b)^2×(b+c)^2+(a+c)^2×(b+c)^2) in
        cPointhb h_x_2134.
Definition X_2135 :=
        let h_x_2135 a b c := a/((a+b)*(a+c)*(-(a+b)^2×(a+c)^2+(a+b)^2×(b+c)^2+(a+c)^2×(b+c)^2)) in
        cPointhb h_x_2135.
Definition X_2136 :=
        let h_x_2136 a b c := a*(a-b-c)*(a^2+2×a×b+b^2+2×a×c-6×b×c+c^2) in
        cPointhb h_x_2136.
Definition X_2137 :=
        let h_x_2137 a b c := a/((a-b-c)*(a^2+2×a×b+b^2+2×a×c-6×b×c+c^2)) in
        cPointhb h_x_2137.
Definition X_2138 :=
        let h_x_2138 a b c := a^2*(SB a b c)*(SC a b c)*(c^2×(SA a b c)^2×(SB a b c)^2+b^2×(SA a b c)^2×(SC a b c)^2-a^2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_2138.
Definition X_2139 :=
        let h_x_2139 a b c := 1/((SB a b c)*(SC a b c)*(c^2×(SA a b c)^2×(SB a b c)^2+b^2×(SA a b c)^2×(SC a b c)^2-a^2×(SB a b c)^2×(SC a b c)^2)) in
        cPointhb h_x_2139.
Definition X_2140 :=
        let h_x_2140 a b c := a^2×b^2-a×b^3+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2+2×b^2×c^2-a×c^3-b×c^3 in
        cPointhb h_x_2140.
Definition X_2141 :=
        let h_x_2141 a b c := a^2/(a^2×b^2-a×b^3+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2+2×b^2×c^2-a×c^3-b×c^3) in
        cPointhb h_x_2141.
Definition X_2142 :=
        let h_x_2142 a b c := (a^2-b^2)*(-a^2+c^2)*(a^2×(a^2-b^2)^2×c^2×(b^2-c^2)^2-b^2×(a^2-b^2)^2×c^2×(-a^2+c^2)^2+a^2×b^2×(b^2-c^2)^2×(-a^2+c^2)^2) in
        cPointhb h_x_2142.
Definition X_2143 :=
        let h_x_2143 a b c := (a^2*(b^2-c^2))/(a^2×(a^2-b^2)^2×c^2×(b^2-c^2)^2-b^2×(a^2-b^2)^2×c^2×(-a^2+c^2)^2+a^2×b^2×(b^2-c^2)^2×(-a^2+c^2)^2) in
        cPointhb h_x_2143.
Definition X_2145 :=
        let h_x_2145 a b c := (a*(-a^2+b×c))/(a^6×b^3-a^3×b^6+a^4×b^4×c-5×a^5×b^2×c^2+a^2×b^5×c^2+a^6×c^3+4×a^3×b^3×c^3+b^6×c^3+a^4×b×c^4-5×a×b^4×c^4+a^2×b^2×c^5-a^3×c^6+b^3×c^6) in
        cPointhb h_x_2145.
Definition X_2144 :=
        let h_x_2144 a b c := a^2*(-b^2+a×c)*(a×b-c^2)*(a^6×b^3-a^3×b^6+a^4×b^4×c-5×a^5×b^2×c^2+a^2×b^5×c^2+a^6×c^3+4×a^3×b^3×c^3+b^6×c^3+a^4×b×c^4-5×a×b^4×c^4+a^2×b^2×c^5-a^3×c^6+b^3×c^6) in
        cPointhb h_x_2144.
Definition X_2146 :=
        let h_x_2146 a b c := (Rpower a (3/2))*(a^3*(Rpower b (3/2))-(Rpower a (3/2))*b^3-a^2×b^2×sqrt(c)+(Rpower a (5/2))*b×c-a*(Rpower b (5/2))*c+a^3*(Rpower c (3/2))+b^3*(Rpower c (3/2))-a^2×sqrt(b)×c^2+sqrt(a)×b^2×c^2-a×b*(Rpower c (5/2))-(Rpower a (3/2))*c^3+(Rpower b (3/2))*c^3) in
        cPointhb h_x_2146.
Definition X_2147 :=
        let h_x_2147 a b c := (Rpower a (3/2))/(a^3*(Rpower b (3/2))-(Rpower a (3/2))*b^3-a^2×b^2×sqrt(c)+(Rpower a (5/2))*b×c-a*(Rpower b (5/2))*c+a^3*(Rpower c (3/2))+b^3*(Rpower c (3/2))-a^2×sqrt(b)×c^2+sqrt(a)×b^2×c^2-a×b*(Rpower c (5/2))-(Rpower a (3/2))*c^3+(Rpower b (3/2))*c^3) in
        cPointhb h_x_2147.
Definition X_2148 :=
        let h_x_2148 a b c := a^3/(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2148.
Definition X_2149 :=
        let h_x_2149 a b c := a^3×(a-b)^2×(a-c)^2*(a+b-c)*(a-b+c) in
        cPointhb h_x_2149.
Definition X_2150 :=
        let h_x_2150 a b c := a^3×(a+b)^2×(a+c)^2*(-a+b+c) in
        cPointhb h_x_2150.
Definition X_2151 :=
        let h_x_2151 a b c := a^3/(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_2151.
Definition X_2152 :=
        let h_x_2152 a b c := a^3/(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_2152.
Definition X_2153 :=
        let h_x_2153 a b c := a*(sqrt(3)*(SB a b c)+2*(DeltaMaj a b c))*(sqrt(3)*(SC a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_2153.
Definition X_2154 :=
        let h_x_2154 a b c := a*(sqrt(3)*(SB a b c)-2*(DeltaMaj a b c))*(sqrt(3)*(SC a b c)-2*(DeltaMaj a b c)) in
        cPointhb h_x_2154.
Definition X_2155 :=
        let h_x_2155 a b c := a^3*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c)) in
        cPointhb h_x_2155.
Definition X_2156 :=
        let h_x_2156 a b c := a*(a^4+b^4-c^4)*(a^4-b^4+c^4) in
        cPointhb h_x_2156.
Definition X_2157 :=
        let h_x_2157 a b c := a*(a^4-a^2×b^2+b^4-c^4)*(a^4-b^4-a^2×c^2+c^4) in
        cPointhb h_x_2157.
Definition X_2158 :=
        let h_x_2158 a b c := a/((SA a b c)^3*(SB a b c)+(SA a b c)^2×(SB a b c)^2+(SA a b c)^3*(SC a b c)+4×(SA a b c)^2*(SB a b c)*(SC a b c)-(SA a b c)*(SB a b c)^2*(SC a b c)+(SA a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)*(SC a b c)^2-2×(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_2158.
Definition X_2159 :=
        let h_x_2159 a b c := a^3/((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2159.
Definition X_2160 :=
        let h_x_2160 a b c := a*(a×c+2*(SB a b c))*(a×b+2*(SC a b c)) in
        cPointhb h_x_2160.
Definition X_2161 :=
        let h_x_2161 a b c := a*(-a×c+2*(SB a b c))*(-a×b+2*(SC a b c)) in
        cPointhb h_x_2161.
Definition X_2162 :=
        let h_x_2162 a b c := a^2*(a×b-a×c+b×c)*(-a×b+a×c+b×c) in
        cPointhb h_x_2162.
Definition X_2163 :=
        let h_x_2163 a b c := a^2*(2×a+2×b-c)*(2×a-b+2×c) in
        cPointhb h_x_2163.
Definition X_2164 :=
        let h_x_2164 a b c := a^2*(a*(SA a b c)+b*(SB a b c)-c*(SC a b c))*(a*(SA a b c)-b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_2164.
Definition X_2165 :=
        let h_x_2165 a b c := ((SB a b c)^2-4×(DeltaMaj a b c)^2)*((SC a b c)^2-4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2165.
Definition X_2166 :=
        let h_x_2166 a b c := 1/(a*(b^2×c^2-4×(SA a b c)^2)) in
        cPointhb h_x_2166.
Definition X_2167 :=
        let h_x_2167 a b c := a/(b^2*(SB a b c)+c^2*(SC a b c)) in
        cPointhb h_x_2167.
Definition X_2168 :=
        let h_x_2168 a b c := a/(((SA a b c)^2-4×(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_2168.
Definition X_2169 :=
        let h_x_2169 a b c := (a^3*(SA a b c))/((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2169.
Definition X_2170 :=
        let h_x_2170 a b c := a×(b-c)^2*(-a+b+c) in
        cPointhb h_x_2170.
Definition X_2171 :=
        let h_x_2171 a b c := (a×(b+c)^2)/(-a+b+c) in
        cPointhb h_x_2171.
Definition X_2172 :=
        let h_x_2172 a b c := a^3*(-a^4+b^4+c^4) in
        cPointhb h_x_2172.
Definition X_2173 :=
        let h_x_2173 a b c := a*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2173.
Definition X_2174 :=
        let h_x_2174 a b c := a^3*(b×c+2*(SA a b c)) in
        cPointhb h_x_2174.
Definition X_2175 :=
        let h_x_2175 a b c := a^4*(a-b-c) in
        cPointhb h_x_2175.
Definition X_2176 :=
        let h_x_2176 a b c := a^2*(a×b+a×c-b×c) in
        cPointhb h_x_2176.
Definition X_2177 :=
        let h_x_2177 a b c := a^2*(-a+2×b+2×c) in
        cPointhb h_x_2177.
Definition X_2178 :=
        let h_x_2178 a b c := a^2*(a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_2178.
Definition X_2179 :=
        let h_x_2179 a b c := a^3*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2179.
Definition X_2180 :=
        let h_x_2180 a b c := a^3*((SA a b c)^2-4×(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2180.
Definition X_2181 :=
        let h_x_2181 a b c := a*(SB a b c)*(SC a b c)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2181.
Definition X_2182 :=
        let h_x_2182 a b c := a^4*(SA a b c)-a*(b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2182.
Definition X_2183 :=
        let h_x_2183 a b c := a^2*(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2183.
Definition X_2184 :=
        let h_x_2184 a b c := a*((SA a b c)*(SB a b c)-2×(DeltaMaj a b c)^2)*((SA a b c)*(SC a b c)-2×(DeltaMaj a b c)^2) in
        cPointhb h_x_2184.
Definition X_2185 :=
        let h_x_2185 a b c := (a*(-a+b+c))/(b+c)^2 in
        cPointhb h_x_2185.
Definition X_2186 :=
        let h_x_2186 a b c := a*(-a^2×b^2+b^4-2×a^2×c^2-b^2×c^2)*(-2×a^2×b^2-a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_2186.
Definition X_2187 :=
        let h_x_2187 a b c := a^2*(a^2*(SA a b c)-a×b*(SB a b c)+b×c*(SB a b c)-a×c*(SC a b c)+b×c*(SC a b c)) in
        cPointhb h_x_2187.
Definition X_2188 :=
        let h_x_2188 a b c := (a^3*(a-b-c)*(SA a b c))/(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2188.
Definition X_2189 :=
        let h_x_2189 a b c := (a^2*(-a+b+c)*(SB a b c)*(SC a b c))/(b+c)^2 in
        cPointhb h_x_2189.
Definition X_2190 :=
        let h_x_2190 a b c := a*(SB a b c)*(SC a b c)*((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)*((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2) in
        cPointhb h_x_2190.
Definition X_2191 :=
        let h_x_2191 a b c := a/(a^2+b^2+c^2-2×a*(b+c)) in
        cPointhb h_x_2191.
Definition X_2192 :=
        let h_x_2192 a b c := (a^2*(a-b-c))/(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2192.
Definition X_2193 :=
        let h_x_2193 a b c := (a^3*(a-b-c)*(SA a b c))/(b+c) in
        cPointhb h_x_2193.
Definition X_2194 :=
        let h_x_2194 a b c := (a^3*(-a+b+c))/(b+c) in
        cPointhb h_x_2194.
Definition X_2195 :=
        let h_x_2195 a b c := (a^2*(a-b-c))/(a×b-b^2+a×c-c^2) in
        cPointhb h_x_2195.
Definition X_2196 :=
        let h_x_2196 a b c := (a^3*(SA a b c))/(a^2-b×c) in
        cPointhb h_x_2196.
Definition X_2197 :=
        let h_x_2197 a b c := (a^2×(b+c)^2*(SA a b c))/(-a+b+c) in
        cPointhb h_x_2197.
Definition X_2198 :=
        let h_x_2198 a b c := a^3*(b+c)*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_2198.
Definition X_2199 :=
        let h_x_2199 a b c := a*(-a+b-c)*(-a-b+c)*(a^2*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_2199.
Definition X_2200 :=
        let h_x_2200 a b c := a^4*(b+c)*(SA a b c) in
        cPointhb h_x_2200.
Definition X_2201 :=
        let h_x_2201 a b c := a*(a^2-b×c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2201.
Definition X_2202 :=
        let h_x_2202 a b c := a*(a-b-c)*(a^2×b×c-b^3×c+2×b^2×c^2-b×c^3-2×a^2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_2202.
Definition X_2203 :=
        let h_x_2203 a b c := a^3/((b+c)*(SA a b c)) in
        cPointhb h_x_2203.
Definition X_2204 :=
        let h_x_2204 a b c := (a^3*(-a+b+c))/((b+c)*(SA a b c)) in
        cPointhb h_x_2204.
Definition X_2205 :=
        let h_x_2205 a b c := a^5*(b+c) in
        cPointhb h_x_2205.
Definition X_2206 :=
        let h_x_2206 a b c := a^4/(b+c) in
        cPointhb h_x_2206.
Definition X_2207 :=
        let h_x_2207 a b c := a^2/(SA a b c)^2 in
        cPointhb h_x_2207.
Definition X_2208 :=
        let h_x_2208 a b c := a^3/(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2208.
Definition X_2209 :=
        let h_x_2209 a b c := a^3*(a×b+a×c-b×c) in
        cPointhb h_x_2209.
Definition X_2210 :=
        let h_x_2210 a b c := a^2*(a^3-a×b×c) in
        cPointhb h_x_2210.
Definition X_2211 :=
        let h_x_2211 a b c := a^4*(SB a b c)*(SC a b c)*((SA a b c)^2-(SB a b c)*(SC a b c)) in
        cPointhb h_x_2211.
Definition X_2212 :=
        let h_x_2212 a b c := a^3*(-a+b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2212.
Definition X_2213 :=
        let h_x_2213 a b c := a^2/(a^4-4×a×b×c*(b+c)-4×a^2*(b×c+(SA a b c))-((SB a b c)-(SC a b c))^2) in
        cPointhb h_x_2213.
Definition X_2214 :=
        let h_x_2214 a b c := a/((a+b)*(a+c)+2*(SA a b c)) in
        cPointhb h_x_2214.
Definition X_2215 :=
        let h_x_2215 a b c := a^2/(b×c*(a+b+c)+a*(SA a b c)) in
        cPointhb h_x_2215.
Definition X_2216 :=
        let h_x_2216 a b c := a/(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2-2×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_2216.
Definition X_2217 :=
        let h_x_2217 a b c := a/(a^2×b-b^3+a^2×c-a×b×c-c^3) in
        cPointhb h_x_2217.
Definition X_2218 :=
        let h_x_2218 a b c := a/(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_2218.
Definition X_2219 :=
        let h_x_2219 a b c := a/(b×(a^2-b^2)^2+a*(a-b)*(a+b)^2×c-b×(a+b)^2×c^2-(2×a^2+a×b+b^2)*c^3+c^5) in
        cPointhb h_x_2219.
Definition X_2220 :=
        let h_x_2220 a b c := a^3*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_2220.
Definition X_2221 :=
        let h_x_2221 a b c := a^2/(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_2221.
Definition X_2222 :=
        let h_x_2222 a b c := a/((a-b-c)*(b-c)*(b×c-2*(SA a b c))) in
        cPointhb h_x_2222.
Definition X_2223 :=
        let h_x_2223 a b c := a^3*(b^2+c^2-a*(b+c)) in
        cPointhb h_x_2223.
Definition X_2224 :=
        let h_x_2224 a b c := a/(b^3+c^3-a*(b^2+c^2)) in
        cPointhb h_x_2224.
Definition X_2225 :=
        let h_x_2225 a b c := a^3*(b^3+c^3-a*(b^2+c^2)) in
        cPointhb h_x_2225.
Definition X_2226 :=
        let h_x_2226 a b c := a^2/(-2×a+b+c)^2 in
        cPointhb h_x_2226.
Definition X_2227 :=
        let h_x_2227 a b c := a*(a^2×b^4-b^4×c^2+a^2×c^4-b^2×c^4) in
        cPointhb h_x_2227.
Definition X_2228 :=
        let h_x_2228 a b c := a*(a×b^3-b^3×c+a×c^3-b×c^3) in
        cPointhb h_x_2228.
Definition X_2229 :=
        let h_x_2229 a b c := a*(b+c)*(a^2×b^2-a^2×b×c+a^2×c^2-b^2×c^2) in
        cPointhb h_x_2229.
Definition X_2230 :=
        let h_x_2230 a b c := a*(a^3×b^3+a^3×c^3-2×b^3×c^3) in
        cPointhb h_x_2230.
Definition X_2231 :=
        let h_x_2231 a b c := a*(b+c)*(a^4×b^2-a^4×b×c+a^4×c^2-b^3×c^3) in
        cPointhb h_x_2231.
Definition X_2232 :=
        let h_x_2232 a b c := a*(a^5×b^3+a^5×c^3-b^5×c^3-b^3×c^5) in
        cPointhb h_x_2232.
Definition X_2233 :=
        let h_x_2233 a b c := a*(b^3+c^3)*(a^6-b^3×c^3) in
        cPointhb h_x_2233.
Definition X_2234 :=
        let h_x_2234 a b c := a*(a^2×b^2+a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_2234.
Definition X_2235 :=
        let h_x_2235 a b c := a*(a^3×b^2+a^3×c^2-b^3×c^2-b^2×c^3) in
        cPointhb h_x_2235.
Definition X_2236 :=
        let h_x_2236 a b c := a*(b^2+c^2)*(a^4-b^2×c^2) in
        cPointhb h_x_2236.
Definition X_2237 :=
        let h_x_2237 a b c := a*(a^5×b^2+a^5×c^2-b^5×c^2-b^2×c^5) in
        cPointhb h_x_2237.
Definition X_2238 :=
        let h_x_2238 a b c := a*(b+c)*(a^2-b×c) in
        cPointhb h_x_2238.
Definition X_2239 :=
        let h_x_2239 a b c := a*(a^3×b+a^3×c-b^3×c-b×c^3) in
        cPointhb h_x_2239.
Definition X_2240 :=
        let h_x_2240 a b c := a*(b+c)*(a^4-b^3×c+b^2×c^2-b×c^3) in
        cPointhb h_x_2240.
Definition X_2241 :=
        let h_x_2241 a b c := a*(a^3-2×a×b×c) in
        cPointhb h_x_2241.
Definition X_2242 :=
        let h_x_2242 a b c := a*(a^3+2×a×b×c) in
        cPointhb h_x_2242.
Definition X_2243 :=
        let h_x_2243 a b c := a*(2×a^3-b^3-c^3) in
        cPointhb h_x_2243.
Definition X_2244 :=
        let h_x_2244 a b c := a*(2×a^4-b^4-c^4) in
        cPointhb h_x_2244.
Definition X_2245 :=
        let h_x_2245 a b c := a^2*(b+c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_2245.
Definition X_2246 :=
        let h_x_2246 a b c := a*(2×a^3-2×a^2×b+a×b^2-b^3-2×a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_2246.
Definition X_2247 :=
        let h_x_2247 a b c := a*(-a^2*((SA a b c)^2+(SB a b c)*(SC a b c))+2*(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_2247.
Definition X_2248 :=
        let h_x_2248 a b c := a^2/(a×b+a×c+b×c+2*(SA a b c)) in
        cPointhb h_x_2248.
Definition X_2249 :=
        let h_x_2249 a b c := a^2/((b+c)*(a^4-a^2×b^2+a^2×b×c-b^3×c-a^2×c^2+2×b^2×c^2-b×c^3)) in
        cPointhb h_x_2249.
Definition X_2250 :=
        let h_x_2250 a b c := (a*(b+c))/(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2250.
Definition X_2251 :=
        let h_x_2251 a b c := a^3*(-2×a+b+c) in
        cPointhb h_x_2251.
Definition X_2252 :=
        let h_x_2252 a b c := a^2*(SA a b c)*(a*((a+b-c)*(a-b+c)*(b+c)-2×a*(SA a b c))-4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2252.
Definition X_2253 :=
        let h_x_2253 a b c := a^3*(SA a b c)*(a^5+2×a^3*(SA a b c)-a×((SB a b c)-(SC a b c))^2-2*(b^3*(SB a b c)+c^3*(SC a b c))) in
        cPointhb h_x_2253.
Definition X_2254 :=
        let h_x_2254 a b c := a*((a-b)^2*(a+b-c)-(-a+c)^2*(a-b+c)) in
        cPointhb h_x_2254.
Definition X_2255 :=
        let h_x_2255 a b c := a^2/(a^3-a×(b-c)^2-a^2*(b+c)+(b+c)^3) in
        cPointhb h_x_2255.
Definition X_2256 :=
        let h_x_2256 a b c := a^2*(a^3-a×(b-c)^2-a^2*(b+c)+(b+c)^3) in
        cPointhb h_x_2256.
Definition X_2257 :=
        let h_x_2257 a b c := a*((a-b)^3*(a+b)-2×a×(a+b)^2×c-2*(a-b)*b×c^2+2×a×c^3-c^4) in
        cPointhb h_x_2257.
Definition X_2258 :=
        let h_x_2258 a b c := a^2/(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_2258.
Definition X_2259 :=
        let h_x_2259 a b c := a^3/(b*(a+c)*(SB a b c)+(a+b)*c*(SC a b c)) in
        cPointhb h_x_2259.
Definition X_2260 :=
        let h_x_2260 a b c := a*(b*(a+c)*(SB a b c)+(a+b)*c*(SC a b c)) in
        cPointhb h_x_2260.
Definition X_2261 :=
        let h_x_2261 a b c := a*(a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+2*(SA a b c))-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2261.
Definition X_2262 :=
        let h_x_2262 a b c := a*(a^3*(b+c)-a×(b-c)^2*(b+c)-2×a^2*(b×c-(SA a b c))+4*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2262.
Definition X_2263 :=
        let h_x_2263 a b c := (a*(a^3-a^2*(b+c)-(b-c)^2*(b+c)+a×(b+c)^2))/(-a+b+c) in
        cPointhb h_x_2263.
Definition X_2264 :=
        let h_x_2264 a b c := a*(a-b-c)*(2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2264.
Definition X_2265 :=
        let h_x_2265 a b c := a*(a^3*(b+c)-a×(b-c)^2*(b+c)+a^2*(-2×b×c+(SA a b c))-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2265.
Definition X_2266 :=
        let h_x_2266 a b c := a^2*(a^5-a×((SB a b c)-(SC a b c))^2+2*(b^5+c^5-c×((SA a b c)-(SB a b c))^2+2×b^3*(SB a b c)-b×((SA a b c)-(SC a b c))^2+2×c^3*(SC a b c))) in
        cPointhb h_x_2266.
Definition X_2267 :=
        let h_x_2267 a b c := a*(a×b×c*(-a+b+c)+a^2*(SA a b c)) in
        cPointhb h_x_2267.
Definition X_2268 :=
        let h_x_2268 a b c := a^2*(a-b-c)*(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_2268.
Definition X_2269 :=
        let h_x_2269 a b c := a^2*(-a+b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_2269.
Definition X_2270 :=
        let h_x_2270 a b c := a*((a-b)*(a+b)^3+2×a×(a-b)^2×c+2×b*(a+b)*c^2-2×a×c^3-c^4) in
        cPointhb h_x_2270.
Definition X_2271 :=
        let h_x_2271 a b c := a^2*(a^2-2×a*(b+c)-(b+c)^2) in
        cPointhb h_x_2271.
Definition X_2272 :=
        let h_x_2272 a b c := a^2*(a^4*(b+c)-(b-c)^2×(b+c)^3-2×a^3*(b^2-b×c+c^2)+2×a×(b-c)^2*(b^2+b×c+c^2)) in
        cPointhb h_x_2272.
Definition X_2273 :=
        let h_x_2273 a b c := a^2*(a^3+(b+c)*(b^2+c^2)) in
        cPointhb h_x_2273.
Definition X_2274 :=
        let h_x_2274 a b c := a^2*((a×b+a×c+b×c)*(b^2+c^2)+a^2*(b^2+b×c+c^2)) in
        cPointhb h_x_2274.
Definition X_2275 :=
        let h_x_2275 a b c := a^2*(b^2-b×c+c^2) in
        cPointhb h_x_2275.
Definition X_2276 :=
        let h_x_2276 a b c := a^2*(b^2+b×c+c^2) in
        cPointhb h_x_2276.
Definition X_2277 :=
        let h_x_2277 a b c := a^2*(b^3+c^3+a*(b^2+b×c+c^2)) in
        cPointhb h_x_2277.
Definition X_2278 :=
        let h_x_2278 a b c := a^2*(a^3-b×c*(b+c)-a*(b^2+c^2)) in
        cPointhb h_x_2278.
Definition X_2279 :=
        let h_x_2279 a b c := a^2/(a^2-2×b×c-a*(b+c)) in
        cPointhb h_x_2279.
Definition X_2280 :=
        let h_x_2280 a b c := a^2*(a^2-2×b×c-a*(b+c)) in
        cPointhb h_x_2280.
Definition X_2281 :=
        let h_x_2281 a b c := (a^3*(b+c))/(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_2281.
Definition X_2282 :=
        let h_x_2282 a b c := a/(a^3*(b-c)*(b+c)*(SA a b c)+a^2*(-b^3+c^3)*(SA a b c)+a×b^2×c^2*((SB a b c)-(SC a b c))+b^2×c^2*(-c*(SB a b c)+b*(SC a b c))) in
        cPointhb h_x_2282.
Definition X_2283 :=
        let h_x_2283 a b c := (a^2*(-b^2-c^2+a*(b+c)))/((a-b-c)*(b-c)) in
        cPointhb h_x_2283.
Definition X_2284 :=
        let h_x_2284 a b c := (a^2*(b^2+c^2-a*(b+c)))/(b-c) in
        cPointhb h_x_2284.
Definition X_2285 :=
        let h_x_2285 a b c := (a*(a^2+b^2+2×b×c+c^2))/(a-b-c) in
        cPointhb h_x_2285.
Definition X_2286 :=
        let h_x_2286 a b c := (a^2*(a^2+b^2+2×b×c+c^2)*(SA a b c))/(sa a b c) in
        cPointhb h_x_2286.
Definition X_2287 :=
        let h_x_2287 a b c := (a×(a-b-c)^2)/(b+c) in
        cPointhb h_x_2287.
Definition X_2288 :=
        let h_x_2288 a b c := a^3*(a×b^2×c^2+b*(SA a b c)*(SB a b c)+c*(SA a b c)*(SC a b c)) in
        cPointhb h_x_2288.
Definition X_2289 :=
        let h_x_2289 a b c := a^3*(sa a b c)*(SA a b c)^2 in
        cPointhb h_x_2289.
Definition X_2290 :=
        let h_x_2290 a b c := a^3*(-(b^2-c^2)^2+a^2*(b^2+c^2))*(-b^2×c^2+4×(SA a b c)^2) in
        cPointhb h_x_2290.
Definition X_2291 :=
        let h_x_2291 a b c := a^2/((b-c)^2+a*(-2×a+b+c)) in
        cPointhb h_x_2291.
Definition X_2292 :=
        let h_x_2292 a b c := a*(b+c)*(b^2+c^2+a*(b+c)) in
        cPointhb h_x_2292.
Definition X_2293 :=
        let h_x_2293 a b c := a^2*(sa a b c)*(a^2-2×b×c-a*(b+c)+2*(SA a b c)) in
        cPointhb h_x_2293.
Definition X_2294 :=
        let h_x_2294 a b c := a*(b+c)*(a×b×c+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_2294.
Definition X_2295 :=
        let h_x_2295 a b c := a*(b+c)*(a^2+b×c) in
        cPointhb h_x_2295.
Definition X_2296 :=
        let h_x_2296 a b c := 1/(a×b^2+a×b×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_2296.
Definition X_2297 :=
        let h_x_2297 a b c := a/(a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_2297.
Definition X_2298 :=
        let h_x_2298 a b c := a/(b^2+c^2+a*(b+c)) in
        cPointhb h_x_2298.
Definition X_2299 :=
        let h_x_2299 a b c := a^2/((SA a b c)*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_2299.
Definition X_2300 :=
        let h_x_2300 a b c := a^3*(b^2+c^2+a*(b+c)) in
        cPointhb h_x_2300.
Definition X_2301 :=
        let h_x_2301 a b c := a^2*(a^5-2×a^4×b+2×a^2×b^3-a×b^4-2×a^4×c-a^3×b×c+a^2×b^2×c+a×b^3×c+b^4×c+a^2×b×c^2+4×a×b^2×c^2-b^3×c^2+2×a^2×c^3+a×b×c^3-b^2×c^3-a×c^4+b×c^4) in
        cPointhb h_x_2301.
Definition X_2302 :=
        let h_x_2302 a b c := a^2*(a×(a-b)^3×(a+b)^2-(a^5+a^4×b-2×a^2×b^3-a×b^4+b^5)*c-2×a^2*(a-b)*(a+b)*c^2+2*(a^3+a^2×b+b^3)*c^3+a*(a+b)*c^4-(a+b)*c^5) in
        cPointhb h_x_2302.
Definition X_2303 :=
        let h_x_2303 a b c := (a*(a^2+(b+c)^2))/(b+c) in
        cPointhb h_x_2303.
Definition X_2304 :=
        let h_x_2304 a b c := a^3*(a^3×b-a×b^3+a^3×c+a^2×b×c-a×b^2×c-b^3×c-a×b×c^2-2×b^2×c^2-a×c^3-b×c^3) in
        cPointhb h_x_2304.
Definition X_2305 :=
        let h_x_2305 a b c := a^2*(a^3-b^3+a×b×c-c^3+2×a^2*(b+c)) in
        cPointhb h_x_2305.
Definition X_2306 :=
        let h_x_2306 a b c := a/(sqrt(3)*(s a b c)*(sa a b c)-(DeltaMaj a b c)) in
        cPointhb h_x_2306.
Definition X_2307 :=
        let h_x_2307 a b c := a^2*(b×c-(SA a b c)-2×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_2307.
Definition X_2308 :=
        let h_x_2308 a b c := a^2*(2×a+b+c) in
        cPointhb h_x_2308.
Definition X_2309 :=
        let h_x_2309 a b c := a^2*(b×c*(b+c)+a*(b^2+c^2)) in
        cPointhb h_x_2309.
Definition X_2310 :=
        let h_x_2310 a b c := a×(b-c)^2×(-a+b+c)^2 in
        cPointhb h_x_2310.
Definition X_2311 :=
        let h_x_2311 a b c := (a^2*(-a+b+c))/((b+c)*(-a^2+b×c)) in
        cPointhb h_x_2311.
Definition X_2312 :=
        let h_x_2312 a b c := a*(2×a^6-a^4×b^2-b^6-a^4×c^2+b^4×c^2+b^2×c^4-c^6) in
        cPointhb h_x_2312.
Definition X_2313 :=
        let h_x_2313 a b c := a*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^8-2×a^6×b^2+a^4×b^4-2×a^6×c^2+a^4×b^2×c^2+b^6×c^2+a^4×c^4-2×b^4×c^4+b^2×c^6) in
        cPointhb h_x_2313.
Definition X_2314 :=
        let h_x_2314 a b c := a*(SA a b c)*(a^4×(SA a b c)^2-(SB a b c)*((SB a b c)-(SC a b c))^2*(SC a b c)-a^2*(SA a b c)*((SB a b c)^2+(SC a b c)^2)) in
        cPointhb h_x_2314.
Definition X_2315 :=
        let h_x_2315 a b c := a^3*(SA a b c)*(-(SA a b c)×((SB a b c)-(SC a b c))^2+a^2*((SA a b c)^2-(SB a b c)*(SC a b c))) in
        cPointhb h_x_2315.
Definition X_2316 :=
        let h_x_2316 a b c := (a^2*(-a+b+c))/(-2×a+b+c) in
        cPointhb h_x_2316.
Definition X_2317 :=
        let h_x_2317 a b c := a^2*(a×b×c-2×a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2317.
Definition X_2318 :=
        let h_x_2318 a b c := a^2*(b+c)*(-a+b+c)*(SA a b c) in
        cPointhb h_x_2318.
Definition X_2319 :=
        let h_x_2319 a b c := (a*(-a+b+c))/(a×b+a×c-b×c) in
        cPointhb h_x_2319.
Definition X_2320 :=
        let h_x_2320 a b c := (a*(-a+b+c))/(-a+2×b+2×c) in
        cPointhb h_x_2320.
Definition X_2321 :=
        let h_x_2321 a b c := (b+c)*(-a+b+c) in
        cPointhb h_x_2321.
Definition X_2322 :=
        let h_x_2322 a b c := (-a+b+c)^2/((b+c)*(SA a b c)) in
        cPointhb h_x_2322.
Definition X_2323 :=
        let h_x_2323 a b c := a^2*(-a+b+c)*(b×c-2*(SA a b c)) in
        cPointhb h_x_2323.
Definition X_2324 :=
        let h_x_2324 a b c := a*(a^4+4×a×b×c*(b+c)-2×a^2×(b+c)^2+(b^2-c^2)^2) in
        cPointhb h_x_2324.
Definition X_2325 :=
        let h_x_2325 a b c := (2×a-b-c)*(-a+b+c) in
        cPointhb h_x_2325.
Definition X_2326 :=
        let h_x_2326 a b c := (a×(-a+b+c)^2)/((b+c)^2*(-a^2+b^2+c^2)) in
        cPointhb h_x_2326.
Definition X_2327 :=
        let h_x_2327 a b c := (a^2×(-a+b+c)^2*(SA a b c))/(b+c) in
        cPointhb h_x_2327.
Definition X_2328 :=
        let h_x_2328 a b c := (a^2×(-a+b+c)^2)/(b+c) in
        cPointhb h_x_2328.
Definition X_2329 :=
        let h_x_2329 a b c := a*(-a+b+c)*(a^2+b×c) in
        cPointhb h_x_2329.
Definition X_2330 :=
        let h_x_2330 a b c := a^2*(-a+b+c)*(a^2+b×c) in
        cPointhb h_x_2330.
Definition X_2331 :=
        let h_x_2331 a b c := a*(SB a b c)*(SC a b c)*(-a*(b×c+(SA a b c))+b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_2331.
Definition X_2332 :=
        let h_x_2332 a b c := (a^2×(-a+b+c)^2)/((b+c)*(SA a b c)) in
        cPointhb h_x_2332.
Definition X_2333 :=
        let h_x_2333 a b c := a^2*(b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2333.
Definition X_2334 :=
        let h_x_2334 a b c := a^2/(3×a+b+c) in
        cPointhb h_x_2334.
Definition X_2335 :=
        let h_x_2335 a b c := (a*(-a+b+c))/(b×c*(a+b+c)+a*(SA a b c)) in
        cPointhb h_x_2335.
Definition X_2336 :=
        let h_x_2336 a b c := a^2/(3×a^3+3×a^2*(b+c)+(b-c)^2*(b+c)+a×(b+c)^2) in
        cPointhb h_x_2336.
Definition X_2337 :=
        let h_x_2337 a b c := (a^3*(-a+b+c))/(a^3×b×c+8×a×(DeltaMaj a b c)^2) in
        cPointhb h_x_2337.
Definition X_2338 :=
        let h_x_2338 a b c := (a^2*(-a+b+c))/(2×a^3-a^2*(b+c)-(b-c)^2*(b+c)) in
        cPointhb h_x_2338.
Definition X_2339 :=
        let h_x_2339 a b c := (a*(-a+b+c))/(a^2+(b+c)^2) in
        cPointhb h_x_2339.
Definition X_2340 :=
        let h_x_2340 a b c := a^2*(-a+b+c)*(b^2+c^2-a*(b+c)) in
        cPointhb h_x_2340.
Definition X_2341 :=
        let h_x_2341 a b c := (a*(-a+b+c))/((b+c)*(a^2-b^2+b×c-c^2)) in
        cPointhb h_x_2341.
Definition X_2342 :=
        let h_x_2342 a b c := (a^2*(-a+b+c))/(a×b×c-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2342.
Definition X_2343 :=
        let h_x_2343 a b c := (a^2*(-a+b+c))/((a-b)^3*(a+b)-2×a×(a+b)^2×c-2*(a-b)*b×c^2+2×a×c^3-c^4) in
        cPointhb h_x_2343.
Definition X_2344 :=
        let h_x_2344 a b c := (a*(-a+b+c))/(b^2+b×c+c^2) in
        cPointhb h_x_2344.
Definition X_2345 :=
        let h_x_2345 a b c := a^2+(b+c)^2 in
        cPointhb h_x_2345.
Definition X_2346 :=
        let h_x_2346 a b c := a/(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_2346.
Definition X_2347 :=
        let h_x_2347 a b c := a^2*(a-b-c)*((b-c)^2+a*(b+c)) in
        cPointhb h_x_2347.
Definition X_2348 :=
        let h_x_2348 a b c := a*(a-b-c)*(2×a^2+(b-c)^2-a*(b+c)) in
        cPointhb h_x_2348.
Definition X_2349 :=
        let h_x_2349 a b c := a/((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2349.
Definition X_2350 :=
        let h_x_2350 a b c := a^2/(-a^2+b×c+a*(b+c)) in
        cPointhb h_x_2350.
Definition X_2351 :=
        let h_x_2351 a b c := (a^2*(SA a b c))/(a^2*(SA a b c)-(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_2351.
Definition X_2352 :=
        let h_x_2352 a b c := a^3*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_2352.
Definition X_2353 :=
        let h_x_2353 a b c := a^2/(a^4-b^4-c^4) in
        cPointhb h_x_2353.
Definition X_2354 :=
        let h_x_2354 a b c := a^2*(b*(a+b)+c*(a+c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_2354.
Definition X_2355 :=
        let h_x_2355 a b c := a*(2×a+b+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2355.
Definition X_2356 :=
        let h_x_2356 a b c := a^2*(a^2-a*(b+c)+2*(SA a b c))*(SB a b c)*(SC a b c) in
        cPointhb h_x_2356.
Definition X_2357 :=
        let h_x_2357 a b c := (a^2*(b+c))/(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2357.
Definition X_2358 :=
        let h_x_2358 a b c := (a*(b+c))/((a-b-c)*(SA a b c)*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))) in
        cPointhb h_x_2358.
Definition X_2359 :=
        let h_x_2359 a b c := (a^2*(SA a b c))/(b*(a+b)+c*(a+c)) in
        cPointhb h_x_2359.
Definition X_2360 :=
        let h_x_2360 a b c := (a^2*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c)))/(b+c) in
        cPointhb h_x_2360.
Definition X_2361 :=
        let h_x_2361 a b c := a^3*(-a+b+c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_2361.
Definition X_2362 :=
        let h_x_2362 a b c := a*(a×c+(SB a b c)+2*(DeltaMaj a b c))*(a×b+(SC a b c)+2*(DeltaMaj a b c)) in
        cPointhb h_x_2362.
Definition X_2363 :=
        let h_x_2363 a b c := a^2/(a^2×(b+c)^2+a*(b+c)*(b^2+c^2)) in
        cPointhb h_x_2363.
Definition X_2364 :=
        let h_x_2364 a b c := (a^2*(-a+b+c))/(a-2×b-2×c) in
        cPointhb h_x_2364.
Definition X_2365 :=
        let h_x_2365 a b c := a^2/(a*(SA a b c)*(SB a b c)^2-c×(SB a b c)^2*(SC a b c)+a*(SA a b c)*(SC a b c)^2-b*(SB a b c)*(SC a b c)^2) in
        cPointhb h_x_2365.
Definition X_2366 :=
        let h_x_2366 a b c := 1/(b^2*(-(SA a b c)+(SB a b c))*(SC a b c)^2+c^2×(SB a b c)^2*(-(SA a b c)+(SC a b c))) in
        cPointhb h_x_2366.
Definition X_2367 :=
        let h_x_2367 a b c := (b^2×c^2)/(a^2×b^4-b^6+a^2×c^4-c^6) in
        cPointhb h_x_2367.
Definition X_2368 :=
        let h_x_2368 a b c := ((a+b)*(a+c))/(a^2×b^2-a×b^3+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2-a×c^3-b×c^3) in
        cPointhb h_x_2368.
Definition X_2369 :=
        let h_x_2369 a b c := ((a+b-c)*(a-b+c))/(a^2×b^2-2×a×b^3+b^4+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2-2×a×c^3-b×c^3+c^4) in
        cPointhb h_x_2369.
Definition X_2370 :=
        let h_x_2370 a b c := 1/(a^3×b^2+a^2×b^3-a×b^4-b^5-2×a^2×b^2×c+2×b^4×c+a^3×c^2-2×a^2×b×c^2+2×a×b^2×c^2-b^3×c^2+a^2×c^3-b^2×c^3-a×c^4+2×b×c^4-c^5) in
        cPointhb h_x_2370.
Definition X_2371 :=
        let h_x_2371 a b c := a^2/(-2×a^4-3×a^2×(b-c)^2+(b-c)^4+a^3*(b+c)+3×a×(b-c)^2*(b+c)) in
        cPointhb h_x_2371.
Definition X_2372 :=
        let h_x_2372 a b c := 1/(a^3×b^2+a^2×b^3-a×b^4-b^5+a^3×c^2+a^2×c^3-a×c^4-c^5) in
        cPointhb h_x_2372.
Definition X_2373 :=
        let h_x_2373 a b c := 1/(a^4×b^2-b^6+a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+b^2×c^4-c^6) in
        cPointhb h_x_2373.
Definition X_2374 :=
        let h_x_2374 a b c := 1/((SA a b c)*((SA a b c)^2-(SB a b c)^2+(SB a b c)*(SC a b c)-(SC a b c)^2)) in
        cPointhb h_x_2374.
Definition X_2375 :=
        let h_x_2375 a b c := a^2/(a^3×b+a^3×c+2×a^2×b×c-a×b^2×c-b^3×c-a×b×c^2-b×c^3) in
        cPointhb h_x_2375.
Definition X_2376 :=
        let h_x_2376 a b c := a/((-a+b+c)*(-a^2+b^2+c^2)*(a^4×b-2×a^3×b^2+2×a×b^4-b^5+a^4×c+2×a^3×b×c+b^4×c-2×a^3×c^2-4×a×b^2×c^2+2×a×c^4+b×c^4-c^5)) in
        cPointhb h_x_2376.
Definition X_2377 :=
        let h_x_2377 a b c := a/((-a+b+c)^2*(a^3*(b+c)+3×a×(b-c)^2*(b+c)+a^2*(-3×b^2+4×b×c-3×c^2)-(b-c)^2*(b^2+c^2))) in
        cPointhb h_x_2377.
Definition X_2378 :=
        let h_x_2378 a b c := a^2/(3*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))+2×sqrt(3)*(-a^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2378.
Definition X_2379 :=
        let h_x_2379 a b c := a^2/(3*(a^2*(SA a b c)-2*(SB a b c)*(SC a b c))-2×sqrt(3)*(-a^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2379.
Definition X_2380 :=
        let h_x_2380 a b c := a^2/(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)+2×sqrt(3)*(-a^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2380.
Definition X_2381 :=
        let h_x_2381 a b c := a^2/(a^2*(SA a b c)-2*(SB a b c)*(SC a b c)-2×sqrt(3)*(-a^2+2*(SA a b c))*(DeltaMaj a b c)) in
        cPointhb h_x_2381.
Definition X_2382 :=
        let h_x_2382 a b c := a^2/(a^2×b-2×a×b^2+a^2×c+b^2×c-2×a×c^2+b×c^2) in
        cPointhb h_x_2382.
Definition X_2383 :=
        let h_x_2383 a b c := a^2/((a^2-b^2-c^2)*(2×a^8+(b^2-c^2)^4-4×a^6*(b^2+c^2)-2×a^2×(b^2-c^2)^2*(b^2+c^2)+3×a^4*(b^4+c^4))) in
        cPointhb h_x_2383.
Definition X_2384 :=
        let h_x_2384 a b c := a^2/((a-2×b)*(a-2×c)-2*(SA a b c)) in
        cPointhb h_x_2384.
Definition X_2385 :=
        let h_x_2385 a b c := a*(SA a b c)*(SB a b c)^2-c×(SB a b c)^2*(SC a b c)+a*(SA a b c)*(SC a b c)^2-b*(SB a b c)*(SC a b c)^2 in
        cPointhb h_x_2385.
Definition X_2386 :=
        let h_x_2386 a b c := a^2*(b^2*(-(SA a b c)+(SB a b c))*(SC a b c)^2+c^2×(SB a b c)^2*(-(SA a b c)+(SC a b c))) in
        cPointhb h_x_2386.
Definition X_2387 :=
        let h_x_2387 a b c := a^4*(a^2×b^4-b^6+a^2×c^4-c^6) in
        cPointhb h_x_2387.
Definition X_2388 :=
        let h_x_2388 a b c := a^2*(b+c)*(a^2×b^2-a×b^3+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2-a×c^3-b×c^3) in
        cPointhb h_x_2388.
Definition X_2389 :=
        let h_x_2389 a b c := a^2*(-a+b+c)*(a^2×b^2-2×a×b^3+b^4+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2-2×a×c^3-b×c^3+c^4) in
        cPointhb h_x_2389.
Definition X_2390 :=
        let h_x_2390 a b c := a^2*(-a×(b^2-c^2)^2+a^3*(b^2+c^2)+a^2*(b+c)*(b^2-3×b×c+c^2)-(b-c)^2*(b^3+c^3)) in
        cPointhb h_x_2390.
Definition X_2391 :=
        let h_x_2391 a b c := -2×a^4-3×a^2×(b-c)^2+(b-c)^4+a^3*(b+c)+3×a×(b-c)^2*(b+c) in
        cPointhb h_x_2391.
Definition X_2392 :=
        let h_x_2392 a b c := a^2*(a^3×b^2+a^2×b^3-a×b^4-b^5+a^3×c^2+a^2×c^3-a×c^4-c^5) in
        cPointhb h_x_2392.
Definition X_2393 :=
        let h_x_2393 a b c := a^2*(a^4×b^2-b^6+a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+b^2×c^4-c^6) in
        cPointhb h_x_2393.
Definition X_2394 :=
        let h_x_2394 a b c := (b^2-c^2)/(-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_2394.
Definition X_2395 :=
        let h_x_2395 a b c := (b^2-c^2)/(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_2395.
Definition X_2396 :=
        let h_x_2396 a b c := (a^2×b^2-b^4+a^2×c^2-c^4)/(b^2-c^2) in
        cPointhb h_x_2396.
Definition X_2397 :=
        let h_x_2397 a b c := (a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3)/(b-c) in
        cPointhb h_x_2397.
Definition X_2398 :=
        let h_x_2398 a b c := (2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)/(b-c) in
        cPointhb h_x_2398.
Definition X_2399 :=
        let h_x_2399 a b c := ((b-c)*(-a+b+c))/(-2×a^4+a^3×b+a^2×b^2-a×b^3+b^4+a^3×c-2×a^2×b×c+a×b^2×c+a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_2399.
Definition X_2400 :=
        let h_x_2400 a b c := (b-c)/(-2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2400.
Definition X_2401 :=
        let h_x_2401 a b c := (b-c)/(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_2401.
Definition X_2402 :=
        let h_x_2402 a b c := ((b-c)*(a^2-2×a×b+b^2-2×a×c+c^2))/(a×b-b^2+a×c-c^2) in
        cPointhb h_x_2402.
Definition X_2403 :=
        let h_x_2403 a b c := ((b-c)*(-3×a+b+c))/(-2×a+b+c) in
        cPointhb h_x_2403.
Definition X_2404 :=
        let h_x_2404 a b c := (b^2×(SA a b c)^2×(SB a b c)^3*((SA a b c)-(SC a b c))*(-(SB a b c)+(SC a b c))-c^2×(SA a b c)^2*(-(SA a b c)+(SB a b c))*(SC a b c)^3*(-(SB a b c)+(SC a b c)))/(a^2×(SA a b c)^4×(-(SB a b c)+(SC a b c))^2) in
        cPointhb h_x_2404.
Definition X_2405 :=
        let h_x_2405 a b c := ((b×(SB a b c)^2)/((-a+b)*(a+b-c))+(c×(SC a b c)^2)/((-a+c)*(a-b+c)))/(a×(b-c)^2×(-a+b+c)^2*(SA a b c)) in
        cPointhb h_x_2405.
Definition X_2406 :=
        let h_x_2406 a b c := (a^2*((b^2×c^2*(SB a b c))/((a-b)*(-a-b+c))-(b^2×c^2*(SC a b c))/((-a+b-c)*(-a+c))))/((a-b-c)^2×(b-c)^2) in
        cPointhb h_x_2406.
Definition X_2407 :=
        let h_x_2407 a b c := (a^4-c^2*(SB a b c)-b^2*(SC a b c))/(b^2-c^2) in
        cPointhb h_x_2407.
Definition X_2408 :=
        let h_x_2408 a b c := ((5×a^2-b^2-c^2)*(b^2-c^2))/(2×a^2-b^2-c^2) in
        cPointhb h_x_2408.
Definition X_2409 :=
        let h_x_2409 a b c := (-2×a^6+a^4×b^2+b^6+a^4×c^2-b^4×c^2-b^2×c^4+c^6)/((b^2-c^2)*(-a^2+b^2+c^2)) in
        cPointhb h_x_2409.
Definition X_2410 :=
        let h_x_2410 a b c := (-4×(SB a b c)^2×(SC a b c)^2-2×a^2*((SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(6×(SB a b c)^2-8*(SB a b c)*(SC a b c)+6×(SC a b c)^2))/((b^2×c^2-4×(SA a b c)^2)*((SB a b c)-(SC a b c))) in
        cPointhb h_x_2410.
Definition X_2411 :=
        let h_x_2411 a b c := ((b^2×c^2-4×(SA a b c)^2)*((SB a b c)-(SC a b c)))/(2×(SB a b c)^2×(SC a b c)^2+a^2*((SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(-3×(SB a b c)^2+4*(SB a b c)*(SC a b c)-3×(SC a b c)^2)) in
        cPointhb h_x_2411.
Definition X_2412 :=
        let h_x_2412 a b c := ((a-b)^2×b^2*(a+b)-(a^3+3×b^3)*c^2+(a^2+3×b^2)*c^3+a×c^4-c^5)/(b^3+c^3-a*(b^2+c^2)) in
        cPointhb h_x_2412.
Definition X_2413 :=
        let h_x_2413 a b c := (((SB a b c)-(SC a b c))*(-3×a^2*(SA a b c)+(SA a b c)^2-3*(SB a b c)*(SC a b c)))/((b^2×c^2-4×(SA a b c)^2)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2413.
Definition X_2414 :=
        let h_x_2414 a b c := (a×b-b^2+a×c-c^2)/((b-c)*(a^2-2×a×b+b^2-2×a×c+c^2)) in
        cPointhb h_x_2414.
Definition X_2415 :=
        let h_x_2415 a b c := (2×a-b-c)/((3×a-b-c)*(b-c)) in
        cPointhb h_x_2415.
Definition X_2416 :=
        let h_x_2416 a b c := ((SA a b c)^2*((SB a b c)-(SC a b c)))/((SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_2416.
Definition X_2417 :=
        let h_x_2417 a b c := ((a-b-c)*(b-c)*(a^2-b^2-c^2))/(a^5*(b+c)-2×a^3×(b-c)^2*(b+c)+a×(b-c)^4*(b+c)+2×a^2×(b^2-c^2)^2-a^4*(b^2+c^2)-(b^2-c^2)^2*(b^2+c^2)) in
        cPointhb h_x_2417.
Definition X_2418 :=
        let h_x_2418 a b c := (-2×a^2+b^2+c^2)/((b^2-c^2)*(-5×a^2+b^2+c^2)) in
        cPointhb h_x_2418.
Definition X_2419 :=
        let h_x_2419 a b c := ((b^2-c^2)*(-a^2+b^2+c^2))/(-2×a^6+a^4×b^2+b^6+a^4×c^2-b^4×c^2-b^2×c^4+c^6) in
        cPointhb h_x_2419.
Definition X_2420 :=
        let h_x_2420 a b c := (a^2*(-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4))/(b^2-c^2) in
        cPointhb h_x_2420.
Definition X_2421 :=
        let h_x_2421 a b c := (a^2*(a^2×b^2-b^4+a^2×c^2-c^4))/(b^2-c^2) in
        cPointhb h_x_2421.
Definition X_2422 :=
        let h_x_2422 a b c := (a^2*(b^2-c^2))/(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_2422.
Definition X_2423 :=
        let h_x_2423 a b c := (a^2*(b-c))/(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_2423.
Definition X_2424 :=
        let h_x_2424 a b c := (a^2*(b-c))/(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_2424.
Definition X_2425 :=
        let h_x_2425 a b c := (a^2*(-2×a^4+a^3×b+a^2×b^2-a×b^3+b^4+a^3×c-2×a^2×b×c+a×b^2×c+a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4))/((b-c)*(-a+b+c)) in
        cPointhb h_x_2425.
Definition X_2426 :=
        let h_x_2426 a b c := (a^2*(-2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3))/(b-c) in
        cPointhb h_x_2426.
Definition X_2427 :=
        let h_x_2427 a b c := (a^2*(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3))/(b-c) in
        cPointhb h_x_2427.
Definition X_2428 :=
        let h_x_2428 a b c := (a^2*(a×b-b^2+a×c-c^2))/((b-c)*(a^2-2×a×b+b^2-2×a×c+c^2)) in
        cPointhb h_x_2428.
Definition X_2429 :=
        let h_x_2429 a b c := (a^2*(-2×a+b+c))/((b-c)*(-3×a+b+c)) in
        cPointhb h_x_2429.
Definition X_2430 :=
        let h_x_2430 a b c := (a^2*(b-c)*(b+c)*(a^2-b^2-c^2)^2)/(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+4×a^4×b^2×c^2-3×a^2×b^4×c^2-2×b^6×c^2-3×a^4×c^4-3×a^2×b^2×c^4+6×b^4×c^4+3×a^2×c^6-2×b^2×c^6-c^8) in
        cPointhb h_x_2430.
Definition X_2431 :=
        let h_x_2431 a b c := (a^3×(b-c)^2×(-a+b+c)^2*(SA a b c))/((b×(SB a b c)^2)/((-a+b)*(a+b-c))+(c×(SC a b c)^2)/((-a+c)*(a-b+c))) in
        cPointhb h_x_2431.
Definition X_2432 :=
        let h_x_2432 a b c := (2×a^2*(b-c)*(-a+b+c))/(-2×a^4+a^2×(b-c)^2+a^3*(b+c)-a×(b-c)^2*(b+c)+(b^2-c^2)^2) in
        cPointhb h_x_2432.
Definition X_2433 :=
        let h_x_2433 a b c := (a^2*(b^2-c^2))/(a^4-c^2*(SB a b c)-b^2*(SC a b c)) in
        cPointhb h_x_2433.
Definition X_2434 :=
        let h_x_2434 a b c := (a^2*(2×a^2-b^2-c^2))/((5×a^2-b^2-c^2)*(b^2-c^2)) in
        cPointhb h_x_2434.
Definition X_2435 :=
        let h_x_2435 a b c := (a^2*(b^2-c^2)*(-a^2+b^2+c^2))/(-2×a^6+a^4×b^2+b^6+a^4×c^2-b^4×c^2-b^2×c^4+c^6) in
        cPointhb h_x_2435.
Definition X_2436 :=
        let h_x_2436 a b c := (a^2*(b^2×c^2-4×(SA a b c)^2)*((SB a b c)-(SC a b c)))/(-4×(SB a b c)^2×(SC a b c)^2-2×a^2*((SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(6×(SB a b c)^2-8*(SB a b c)*(SC a b c)+6×(SC a b c)^2)) in
        cPointhb h_x_2436.
Definition X_2437 :=
        let h_x_2437 a b c := (a^2*(2×(SB a b c)^2×(SC a b c)^2+a^2*((SA a b c)^3-(SA a b c)*(SB a b c)*(SC a b c))+(SA a b c)^2*(-3×(SB a b c)^2+4*(SB a b c)*(SC a b c)-3×(SC a b c)^2)))/((b^2×c^2-4×(SA a b c)^2)*((SB a b c)-(SC a b c))) in
        cPointhb h_x_2437.
Definition X_2438 :=
        let h_x_2438 a b c := (a^2*(b^3+c^3-a*(b^2+c^2)))/((a-b)^2×b^2*(a+b)-(a^3+3×b^3)*c^2+(a^2+3×b^2)*c^3+a×c^4-c^5) in
        cPointhb h_x_2438.
Definition X_2439 :=
        let h_x_2439 a b c := (a^2*(b^2×c^2-4×(SA a b c)^2)*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)))/(((SB a b c)-(SC a b c))*(-3×a^2*(SA a b c)+(SA a b c)^2-3*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2439.
Definition X_2440 :=
        let h_x_2440 a b c := (a^2*(b-c)*(a^2-2×a×b+b^2-2×a×c+c^2))/(a×b-b^2+a×c-c^2) in
        cPointhb h_x_2440.
Definition X_2441 :=
        let h_x_2441 a b c := (a^2*(3×a-b-c)*(b-c))/(2×a-b-c) in
        cPointhb h_x_2441.
Definition X_2442 :=
        let h_x_2442 a b c := (a^2*((SB a b c)^2×(SC a b c)^2-(SA a b c)^2*((SB a b c)^2-(SB a b c)*(SC a b c)+(SC a b c)^2)))/((SA a b c)^2*((SB a b c)-(SC a b c))) in
        cPointhb h_x_2442.
Definition X_2443 :=
        let h_x_2443 a b c := (a^2*(a^5*(b+c)-2×a^3×(b-c)^2*(b+c)+a×(b-c)^4*(b+c)+2×a^2×(b^2-c^2)^2-a^4*(b^2+c^2)-(b^2-c^2)^2*(b^2+c^2)))/((a-b-c)*(b-c)*(a^2-b^2-c^2)) in
        cPointhb h_x_2443.
Definition X_2444 :=
        let h_x_2444 a b c := (a^2*(b^2-c^2)*(-5×a^2+b^2+c^2))/(-2×a^2+b^2+c^2) in
        cPointhb h_x_2444.
Definition X_2445 :=
        let h_x_2445 a b c := (a^2*(-2×a^6+a^4×b^2+b^6+a^4×c^2-b^4×c^2-b^2×c^4+c^6))/((b^2-c^2)*(-a^2+b^2+c^2)) in
        cPointhb h_x_2445.
Definition X_2446 :=
        let h_x_2446 a b c := a*(1-(SB a b c)/(a×c)-(SC a b c)/(a×b)+sqrt(1-2*(-1+(SA a b c)/(b×c)+(SB a b c)/(a×c)+(SC a b c)/(a×b)))) in
        cPointhb h_x_2446.
Definition X_2447 :=
        let h_x_2447 a b c := a*(1-(SB a b c)/(a×c)-(SC a b c)/(a×b)-sqrt(1-2*(-1+(SA a b c)/(b×c)+(SB a b c)/(a×c)+(SC a b c)/(a×b)))) in
        cPointhb h_x_2447.
Definition X_2448 :=
        let h_x_2448 a b c := a*(sqrt((3×a×b×c-2*(a*(SA a b c)+b*(SB a b c)+c*(SC a b c)))/(a×b×c))*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))+2*(-a×b×c+b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_2448.
Definition X_2449 :=
        let h_x_2449 a b c := a*(sqrt((3×a×b×c-2*(a*(SA a b c)+b*(SB a b c)+c*(SC a b c)))/(a×b×c))*(a*(b×c+(SA a b c))-b*(SB a b c)-c*(SC a b c))-2*(-a×b×c+b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_2449.
Definition X_2450 :=
        let h_x_2450 a b c := ((SA a b c)^2-(SB a b c)*(SC a b c))*((SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_2450.
Definition X_2451 :=
        let h_x_2451 a b c := a^2*((SB a b c)-(SC a b c))*((SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_2451.
Definition X_2452 :=
        let h_x_2452 a b c := 2*(SB a b c)*(SC a b c)*((SA a b c)^2+(SB a b c)*(SC a b c))+a^2*(SA a b c)*((SB a b c)^2-4*(SB a b c)*(SC a b c)+(SC a b c)^2) in
        cPointhb h_x_2452.
Definition X_2453 :=
        let h_x_2453 a b c := -a^6*(SA a b c)+((SA a b c)^2+(SB a b c)*(SC a b c))*(3×(SB a b c)^2-2*(SB a b c)*(SC a b c)+3×(SC a b c)^2) in
        cPointhb h_x_2453.
Definition X_2454 :=
        let h_x_2454 a b c := 3*(SB a b c)*(SC a b c)-2×sqrt((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2+(SB a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)*(SC a b c)*((SA a b c)+(SB a b c)+(SC a b c)))-(SS a b c)^2 in
        cPointhb h_x_2454.
Definition X_2455 :=
        let h_x_2455 a b c := 3*(SB a b c)*(SC a b c)+2×sqrt((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2+(SB a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)*(SC a b c)*((SA a b c)+(SB a b c)+(SC a b c)))-(SS a b c)^2 in
        cPointhb h_x_2455.
Definition X_2457 :=
        let h_x_2457 a b c := (b^2-c^2)*(2×a^3+a^2*(b+c)-(b-c)^2*(b+c)-2×a*(b^2-b×c+c^2)) in
        cPointhb h_x_2457.
Definition X_2456 :=
        let h_x_2456 a b c := a^2*(((SA a b c)^2-2*(SB a b c)*(SC a b c))*((SA a b c)^2+(SB a b c)*(SC a b c))+a^2*(SA a b c)*(2×(SA a b c)^2+(SB a b c)^2-3*(SB a b c)*(SC a b c)+(SC a b c)^2)) in
        cPointhb h_x_2456.
Definition X_2458 :=
        let h_x_2458 a b c := a^2*(a^8+2×a^4×b^4-a^2×b^6+a^4×b^2×c^2-2×b^6×c^2+2×a^4×c^4-a^2×c^6-2×b^2×c^6) in
        cPointhb h_x_2458.
Definition X_2459 :=
        let h_x_2459 a b c := a^2*(a^2*(SS a b c)-(SA a b c)*(2*(SS a b c)+(SA a b c))+(SB a b c)*(SC a b c)) in
        cPointhb h_x_2459.
Definition X_2460 :=
        let h_x_2460 a b c := a^2*(-(SS a b c)*(a^2-2*(SA a b c))-(SA a b c)^2+(SB a b c)*(SC a b c)) in
        cPointhb h_x_2460.
Definition X_2461 :=
        let h_x_2461 a b c := a^2*(a^8-2×a^6×b^2+3×a^4×b^4-2×a^2×b^6-2×a^6×c^2+a^4×b^2×c^2+2×a^2×b^4×c^2-3×b^6×c^2+3×a^4×c^4+2×a^2×b^2×c^4+2×b^4×c^4-2×a^2×c^6-3×b^2×c^6)+a^2*(4×a^6+4×a^4×b^2+4×a^4×c^2-4×a^2×b^2×c^2-4×b^4×c^2-4×b^2×c^4)*(DeltaMaj a b c) in
        cPointhb h_x_2461.
Definition X_2462 :=
        let h_x_2462 a b c := a^2*(a^8-2×a^6×b^2+3×a^4×b^4-2×a^2×b^6-2×a^6×c^2+a^4×b^2×c^2+2×a^2×b^4×c^2-3×b^6×c^2+3×a^4×c^4+2×a^2×b^2×c^4+2×b^4×c^4-2×a^2×c^6-3×b^2×c^6)-a^2*(4×a^6+4×a^4×b^2+4×a^4×c^2-4×a^2×b^2×c^2-4×b^4×c^2-4×b^2×c^4)*(DeltaMaj a b c) in
        cPointhb h_x_2462.
Definition X_2463 :=
        let h_x_2463 a b c := a^2*(b×c*(J a b c)+(SA a b c))+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2463.
Definition X_2464 :=
        let h_x_2464 a b c := a^2*(b×c*(J a b c)-(SA a b c))-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2464.
Definition X_2465 :=
        let h_x_2465 a b c := a^2*((J a b c)*(SS a b c)+(SA a b c))+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2465.
Definition X_2466 :=
        let h_x_2466 a b c := a^2*((J a b c)*(SS a b c)-(SA a b c))-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2466.
Definition X_2467 :=
        let h_x_2467 a b c := a×b×c*(b+c)*(J a b c)+a^2*(SA a b c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2467.
Definition X_2468 :=
        let h_x_2468 a b c := a×b×c*(b+c)*(J a b c)-a^2*(SA a b c)-4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2468.
Definition X_2469 :=
        let h_x_2469 a b c := a^2*(J a b c)*(2×(SS a b c)^2+(a^2+b^2+c^2)*(SA a b c))+2*((SS a b c)^2+3*(SB a b c)*(SC a b c))*sqrt(-(SS a b c)^2+(SA a b c)^2+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_2469.
Definition X_2470 :=
        let h_x_2470 a b c := a^2*(J a b c)*(2×(SS a b c)^2+(a^2+b^2+c^2)*(SA a b c))-2*((SS a b c)^2+3*(SB a b c)*(SC a b c))*sqrt(-(SS a b c)^2+(SA a b c)^2+(SB a b c)^2+(SC a b c)^2) in
        cPointhb h_x_2470.
Definition X_2471 :=
        let h_x_2471 a b c := a^2*(J a b c)*(2×(SS a b c)^2+(a^2+b^2+c^2)*(SA a b c))+sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(2×a^2*(SA a b c)+8*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2471.
Definition X_2472 :=
        let h_x_2472 a b c := a^2*(J a b c)*(2×(SS a b c)^2+(a^2+b^2+c^2)*(SA a b c))-sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(2×a^2*(SA a b c)+8*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2472.
Definition X_2473 :=
        let h_x_2473 a b c := a*(b-c)*(a^4+2×a^2×b×c-a^3*(b+c)-a×(b+c)^3+(b-c)^2*(b^2+c^2)) in
        cPointhb h_x_2473.
Definition X_2474 :=
        let h_x_2474 a b c := a^2*(a^2+2*(SA a b c))*((SB a b c)-(SC a b c))*(a^2×c^2+(SC a b c)^2) in
        cPointhb h_x_2474.
Definition X_2475 :=
        let h_x_2475 a b c := a×b×c*(a+b+c)+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2475.
Definition X_2476 :=
        let h_x_2476 a b c := a*(b×c*(a+b+c)+2×a*(SA a b c))+4*(SB a b c)*(SC a b c) in
        cPointhb h_x_2476.
Definition X_2477 :=
        let h_x_2477 a b c := a^4*(a+b-c)*(a-b+c)*(b×c+2*(SA a b c))^2 in
        cPointhb h_x_2477.
Definition X_2478 :=
        let h_x_2478 a b c := a^4-2×a^2×b×c-2×a×b×c*(b+c)-(b^2-c^2)^2 in
        cPointhb h_x_2478.
Definition X_2479 :=
        let h_x_2479 a b c := 3*(SB a b c)*(SC a b c)-sqrt((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2+(SB a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)*(SC a b c)*((SA a b c)+(SB a b c)+(SC a b c)))-(SS a b c)^2 in
        cPointhb h_x_2479.
Definition X_2480 :=
        let h_x_2480 a b c := 3*(SB a b c)*(SC a b c)+sqrt((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2+(SB a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)*(SC a b c)*((SA a b c)+(SB a b c)+(SC a b c)))-(SS a b c)^2 in
        cPointhb h_x_2480.
Definition X_2481 :=
        let h_x_2481 a b c := 1/(a*(b^2+c^2-a*(b+c))) in
        cPointhb h_x_2481.
Definition X_2482 :=
        let h_x_2482 a b c := (2×a^2-b^2-c^2)^2 in
        cPointhb h_x_2482.
Definition X_2483 :=
        let h_x_2483 a b c := a^2*(b-c)*(a^2+b^2+c^2+b×c) in
        cPointhb h_x_2483.
Definition X_2484 :=
        let h_x_2484 a b c := a^2*(b-c)*(a^2+(b+c)^2) in
        cPointhb h_x_2484.
Definition X_2485 :=
        let h_x_2485 a b c := a^2*(b^2-c^2)*(a^4-b^4-c^4) in
        cPointhb h_x_2485.
Definition X_2486 :=
        let h_x_2486 a b c := (b-c)^2*(b+c)*(a^2-b×c-a*(b+c)) in
        cPointhb h_x_2486.
Definition X_2487 :=
        let h_x_2487 a b c := (b-c)*((b-c)^2+a*(b+c)-4×a^2) in
        cPointhb h_x_2487.
Definition X_2488 :=
        let h_x_2488 a b c := a^2*(a-b-c)*(b-c)*(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_2488.
Definition X_2489 :=
        let h_x_2489 a b c := a^2*(b^2-c^2)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2489.
Definition X_2490 :=
        let h_x_2490 a b c := (b-c)*(5×a^2+2×b×c-3×a*(b+c)+2*(SA a b c)) in
        cPointhb h_x_2490.
Definition X_2491 :=
        let h_x_2491 a b c := a^4*(b^2-c^2)*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_2491.
Definition X_2492 :=
        let h_x_2492 a b c := a^2*(b^2-c^2)*(a^4-b^4+b^2×c^2-c^4) in
        cPointhb h_x_2492.
Definition X_2493 :=
        let h_x_2493 a b c := a^2*(-a^2×(SA a b c)^3+2×(SA a b c)^2*(SB a b c)*(SC a b c)+(SB a b c)*(SC a b c)*((SB a b c)^2-4*(SB a b c)*(SC a b c)+(SC a b c)^2)+(SA a b c)*((SB a b c)^3+(SC a b c)^3)) in
        cPointhb h_x_2493.
Definition X_2494 :=
        let h_x_2494 a b c := a^2×b^2*(a^2+b^2)*(b-(s a b c) )^2-a^2×c^2*(a^2+c^2)*(c-(s a b c))^2 in
        cPointhb h_x_2494.
Definition X_2495 :=
        let h_x_2495 a b c := a^2×c^2×(-c+(s a b c))^2*(SB a b c)-a^2×b^2×(-b+(s a b c))^2*(SC a b c) in
        cPointhb h_x_2495.
Definition X_2496 :=
        let h_x_2496 a b c := (b-c)*(-7×a^3+4×a^2*(b+c)+2×(b-c)^2*(b+c)+a*(-3×b^2+2×b×c-3×c^2)) in
        cPointhb h_x_2496.
Definition X_2497 :=
        let h_x_2497 a b c := a^2×b^2*(-2×a^2×b^2-a^2×c^2-b^2×c^2+c^4)*(-b+(s a b c))^2-a^2×c^2*(-a^2×b^2+b^4-2×a^2×c^2-b^2×c^2)*(-c+(s a b c))^2 in
        cPointhb h_x_2497.
Definition X_2498 :=
        let h_x_2498 a b c := a^2×b^2×(-a+b-c)^2*(c^2+2*(a^2+b^2-c^2))-a^2×c^2×(-a-b+c)^2*(b^2+2*(a^2-b^2+c^2)) in
        cPointhb h_x_2498.
Definition X_2499 :=
        let h_x_2499 a b c := a×b*(2×a×b+a×c+b×c+c^2)*(-b+(s a b c))^2-a×c*(a×b+b^2+2×a×c+b×c)*(-c+(s a b c))^2 in
        cPointhb h_x_2499.
Definition X_2500 :=
        let h_x_2500 a b c := a×c*(a×b+b^2+2×a×c+b×c)*(5×a^2-6×a×b+5×b^2+2×a×c+2×b×c-3×c^2)-a×b*(2×a×b+a×c+b×c+c^2)*(5×a^2+2×a×b-3×b^2-6×a×c+2×b×c+5×c^2) in
        cPointhb h_x_2500.
Definition X_2501 :=
        let h_x_2501 a b c := (SB a b c)*(SC a b c)*((SB a b c)-(SC a b c)) in
        cPointhb h_x_2501.
Definition X_2502 :=
        let h_x_2502 a b c := a^2*(2×a^4-2×a^2×b^2-b^4-2×a^2×c^2+4×b^2×c^2-c^4) in
        cPointhb h_x_2502.
Definition X_2503 :=
        let h_x_2503 a b c := a^2*(b+c)*(a^4-b^4-2×a^2×b×c+b^3×c+b^2×c^2+b×c^3-c^4) in
        cPointhb h_x_2503.
Definition X_2504 :=
        let h_x_2504 a b c := (b-c)*(a^2-b^2-c^2)*(2×a^3-a^2×b+b^3-a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2504.
Definition X_2505 :=
        let h_x_2505 a b c := (b-c)*(2×a^3-5×a^2×b+8×a×b^2-b^3-5×a^2×c-3×b^2×c+8×a×c^2-3×b×c^2-c^3) in
        cPointhb h_x_2505.
Definition X_2506 :=
        let h_x_2506 a b c := a^2*(b^2-c^2)*(a^6+a^4×b^2-a^2×b^4-b^6+a^4×c^2-4×a^2×b^2×c^2+3×b^4×c^2-a^2×c^4+3×b^2×c^4-c^6) in
        cPointhb h_x_2506.
Definition X_2507 :=
        let h_x_2507 a b c := a^2*(b^2-c^2)*(a^6×b^2-a^2×b^6+a^6×c^2-a^2×b^4×c^2-a^2×b^2×c^4+2×b^4×c^4-a^2×c^6) in
        cPointhb h_x_2507.
Definition X_2508 :=
        let h_x_2508 a b c := a^2*(b^2-c^2)*(a^8-b^8-a^4×b^2×c^2+b^6×c^2+b^2×c^6-c^8) in
        cPointhb h_x_2508.
Definition X_2509 :=
        let h_x_2509 a b c := a*(a+b)*(a+c)*(b^2-c^2)*(a^3-a^2×b+a×b^2-b^3-a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2-c^3) in
        cPointhb h_x_2509.
Definition X_2510 :=
        let h_x_2510 a b c := a^2*(a^2-b^2-c^2)*(b^2-c^2)*(a^4+b^4-3×b^2×c^2+c^4) in
        cPointhb h_x_2510.
Definition X_2511 :=
        let h_x_2511 a b c := a*(a+b)*(a+c)*(b+c)^2*(b^2-c^2)*(-a^4+a^2×b^2-2×a^2×b×c+a^2×c^2+b^2×c^2) in
        cPointhb h_x_2511.
Definition X_2512 :=
        let h_x_2512 a b c := a*(b^2-c^2)*(2×a×b^2+a×b×c+b^2×c+2×a×c^2+b×c^2) in
        cPointhb h_x_2512.
Definition X_2513 :=
        let h_x_2513 a b c := a^2*(b^2-c^2)*(2×a^2×b^4+3×a^2×b^2×c^2+b^4×c^2+2×a^2×c^4+b^2×c^4) in
        cPointhb h_x_2513.
Definition X_2514 :=
        let h_x_2514 a b c := a^2*(b^2-c^2)*(a^2×b^2+b^4+a^2×c^2+c^4) in
        cPointhb h_x_2514.
Definition X_2515 :=
        let h_x_2515 a b c := a^2*(b-c)*(2×a^2+2×b^2+3×b×c+2×c^2) in
        cPointhb h_x_2515.
Definition X_2516 :=
        let h_x_2516 a b c := a*(5×a-3×b-3×c)*(b-c) in
        cPointhb h_x_2516.
Definition X_2517 :=
        let h_x_2517 a b c := b*(b-c)*c*(a^2+(b+c)^2) in
        cPointhb h_x_2517.
Definition X_2518 :=
        let h_x_2518 a b c := a^2*(b^4-c^4)*(2×a^4+2×b^4-3×b^2×c^2+2×c^4) in
        cPointhb h_x_2518.
Definition X_2519 :=
        let h_x_2519 a b c := a^2*(a^2-b^2-c^2)*(b^2-c^2)*(a^4+2×a^2×b^2+b^4+2×a^2×c^2-6×b^2×c^2+c^4) in
        cPointhb h_x_2519.
Definition X_2520 :=
        let h_x_2520 a b c := (c-(s a b c))^2×(SB a b c)^2-(b-(s a b c))^2×(SC a b c)^2 in
        cPointhb h_x_2520.
Definition X_2521 :=
        let h_x_2521 a b c := a^2*(b-c)*(2×a^4+2×b^4+3×a^2×b×c+3×a×b^2×c+3×b^3×c+3×a×b×c^2+3×b×c^3+2×c^4) in
        cPointhb h_x_2521.
Definition X_2522 :=
        let h_x_2522 a b c := a*(b-c)*(a^2-b^2-c^2)*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_2522.
Definition X_2523 :=
        let h_x_2523 a b c := a*(b-c)*(a^2-b^2-c^2)*(a^2+a×b+b^2+a×c+2×b×c+c^2) in
        cPointhb h_x_2523.
Definition X_2524 :=
        let h_x_2524 a b c := a^2*(a^2-b^2-c^2)*(b^2-c^2)*(a^2×b^2+a^2×c^2-b^2×c^2) in
        cPointhb h_x_2524.
Definition X_2525 :=
        let h_x_2525 a b c := (a^2-b^2-c^2)*(b^4-c^4) in
        cPointhb h_x_2525.
Definition X_2526 :=
        let h_x_2526 a b c := a*(b-c)*(a^2+3×b^2+2×b×c+3×c^2) in
        cPointhb h_x_2526.
Definition X_2527 :=
        let h_x_2527 a b c := (b-c)*(6×a^2-a*(b+c)+(b+c)^2) in
        cPointhb h_x_2527.
Definition X_2528 :=
        let h_x_2528 a b c := (b^2-c^2)*(b^2+c^2)^2 in
        cPointhb h_x_2528.
Definition X_2529 :=
        let h_x_2529 a b c := (b-c)*(7×a^2+a×b+2×b^2+a×c+4×b×c+2×c^2) in
        cPointhb h_x_2529.
Definition X_2530 :=
        let h_x_2530 a b c := a*(b-c)*(b^2+c^2)*(a^2+a×b+b^2+a×c+b×c+c^2) in
        cPointhb h_x_2530.
Definition X_2531 :=
        let h_x_2531 a b c := a^4*(b^2-c^2)*(b^2+c^2)^2 in
        cPointhb h_x_2531.
Definition X_2532 :=
        let h_x_2532 a b c := a*(b-c)*(a+b+c)*(5×a^3×b+2×a^2×b^2-3×a×b^3+5×a^3×c-2×a^2×b×c-3×a×b^2×c-4×b^3×c+2×a^2×c^2-3×a×b×c^2-8×b^2×c^2-3×a×c^3-4×b×c^3) in
        cPointhb h_x_2532.
Definition X_2533 :=
        let h_x_2533 a b c := (a^2+b×c)*(b^2-c^2) in
        cPointhb h_x_2533.
Definition X_2534 :=
        let h_x_2534 a b c := a*(a+b+c)*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2)+(b+c)*(SS a b c) in
        cPointhb h_x_2534.
Definition X_2535 :=
        let h_x_2535 a b c := a*(a+b+c)*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2)-(b+c)*(SS a b c) in
        cPointhb h_x_2535.
Definition X_2536 :=
        let h_x_2536 a b c := a*(b×c*(b+c)*(SS a b c)+a*(a+b+c)*(SA a b c)*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2)) in
        cPointhb h_x_2536.
Definition X_2537 :=
        let h_x_2537 a b c := a*(b×c*(b+c)*(SS a b c)-a*(a+b+c)*(SA a b c)*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2)) in
        cPointhb h_x_2537.
Definition X_2538 :=
        let h_x_2538 a b c := a*(a*(a+b+c)*(a^3×b^2+a^2×b^3-a×b^4-b^5+2×a^3×b×c+a^2×b^2×c-2×a×b^3×c-b^4×c+a^3×c^2+a^2×b×c^2+a^2×c^3-2×a×b×c^3-a×c^4-b×c^4-c^5)*(DeltaMaj a b c))*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2)-4×a×b×c*(b+c)*(a^2×b+a×b^2+a^2×c+a×b×c+b^2×c+a×c^2+b×c^2)*(DeltaMaj a b c)^2 in
        cPointhb h_x_2538.
Definition X_2539 :=
        let h_x_2539 a b c := a*(a*(a+b+c)*(a^3×b^2+a^2×b^3-a×b^4-b^5+2×a^3×b×c+a^2×b^2×c-2×a×b^3×c-b^4×c+a^3×c^2+a^2×b×c^2+a^2×c^3-2×a×b×c^3-a×c^4-b×c^4-c^5)*(DeltaMaj a b c))*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2)+4×a×b×c*(b+c)*(a^2×b+a×b^2+a^2×c+a×b×c+b^2×c+a×c^2+b×c^2)*(DeltaMaj a b c)^2 in
        cPointhb h_x_2539.
Definition X_2540 :=
        let h_x_2540 a b c := a×b×c*(b+c)*(DeltaMaj a b c)+(a^2*(s a b c)*(SA a b c)+2*(s a b c)*(SB a b c)*(SC a b c))*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2) in
        cPointhb h_x_2540.
Definition X_2541 :=
        let h_x_2541 a b c := a×b×c*(b+c)*(DeltaMaj a b c)-(a^2*(s a b c)*(SA a b c)+2*(s a b c)*(SB a b c)*(SC a b c))*sqrt(((s a b c)^4+(DeltaMaj a b c)^2)/(s a b c)^2) in
        cPointhb h_x_2541.
Definition X_2542 :=
        let h_x_2542 a b c := 2×a^6-2×a^4×b^2-2×a^4×c^2-4×a^2×b^2×c^2+(-a^4+b^4-2×b^2×c^2+c^4)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_2542.
Definition X_2543 :=
        let h_x_2543 a b c := 2×a^6-2×a^4×b^2-2×a^4×c^2-4×a^2×b^2×c^2-(-a^4+b^4-2×b^2×c^2+c^4)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_2543.
Definition X_2544 :=
        let h_x_2544 a b c := a^4×b^2×c^2-b^2×c^2×(b^2-c^2)^2+a^6*(b^2+c^2)-a^2*(b^2+c^2)*((b-c)^2×(b+c)^2-8×sqrt(b^2×c^2+a^2×b^2+a^2×c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_2544.
Definition X_2545 :=
        let h_x_2545 a b c := a^4×b^2×c^2-b^2×c^2×(b^2-c^2)^2+a^6*(b^2+c^2)-a^2*(b^2+c^2)*((b-c)^2×(b+c)^2+8×sqrt(b^2×c^2+a^2×b^2+a^2×c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_2545.
Definition X_2546 :=
        let h_x_2546 a b c := 2×a^6-2×a^4×b^2-2×a^4×c^2-4×a^2×b^2×c^2+sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(-a^4+b^4-2×b^2×c^2+c^4) in
        cPointhb h_x_2546.
Definition X_2547 :=
        let h_x_2547 a b c := 2×a^6-2×a^4×b^2-2×a^4×c^2-4×a^2×b^2×c^2-sqrt(a^2×b^2+a^2×c^2+b^2×c^2)*(-a^4+b^4-2×b^2×c^2+c^4) in
        cPointhb h_x_2547.
Definition X_2548 :=
        let h_x_2548 a b c := a^2×b^2+a^2×c^2+2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2548.
Definition X_2549 :=
        let h_x_2549 a b c := a^2×b^2+a^2×c^2-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2549.
Definition X_2550 :=
        let h_x_2550 a b c := a^3-a^2×b+a×b^2-b^3-a^2×c+2×a×b×c+b^2×c+a×c^2+b×c^2-c^3 in
        cPointhb h_x_2550.
Definition X_2551 :=
        let h_x_2551 a b c := (a-b-c)*(a^3+a^2×b+a×b^2+b^3+a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_2551.
Definition X_2552 :=
        let h_x_2552 a b c := a^3×b×c*(SA a b c)+4×a×b×c*(SB a b c)*(SC a b c)+sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2552.
Definition X_2553 :=
        let h_x_2553 a b c := a^3×b×c*(SA a b c)+4×a×b×c*(SB a b c)*(SC a b c)-sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2553.
Definition X_2554 :=
        let h_x_2554 a b c := a^2*(1-(J a b c)/(e a b c))*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2554.
Definition X_2555 :=
        let h_x_2555 a b c := a^2*(1+(J a b c)/(e a b c))*(SA a b c)-2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2555.
Definition X_2556 :=
        let h_x_2556 a b c := a*(a×b×c*(e a b c)-a*(SA a b c)*sqrt((3×a×b×c-2×a*(SA a b c)-2×b*(SB a b c)-2×c*(SC a b c))/(a×b×c))-(e a b c)*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_2556.
Definition X_2557 :=
        let h_x_2557 a b c := a*(a×b×c*(e a b c)+a*(SA a b c)*sqrt((3×a×b×c-2×a*(SA a b c)-2×b*(SB a b c)-2×c*(SC a b c))/(a×b×c))-(e a b c)*(b*(SB a b c)+c*(SC a b c))) in
        cPointhb h_x_2557.
Definition X_2558 :=
        let h_x_2558 a b c := a^2*(a^2-b^2-c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)+a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2)*(e a b c) in
        cPointhb h_x_2558.
Definition X_2559 :=
        let h_x_2559 a b c := a^2*(a^2-b^2-c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)-a^2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2)*(e a b c) in
        cPointhb h_x_2559.
Definition X_2560 :=
        let h_x_2560 a b c := a^2*((SA a b c)+2*(e a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_2560.
Definition X_2561 :=
        let h_x_2561 a b c := a^2*((SA a b c)-2*(e a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_2561.
Definition X_2562 :=
        let h_x_2562 a b c := (-a^4+a^2×b^2+a^2×c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)+(e a b c)*(4×a^2×b^2*(DeltaMaj a b c)+4×a^2×c^2*(DeltaMaj a b c)) in
        cPointhb h_x_2562.
Definition X_2563 :=
        let h_x_2563 a b c := (-a^4+a^2×b^2+a^2×c^2)*sqrt(a^2×b^2+a^2×c^2+b^2×c^2)-(e a b c)*(4×a^2×b^2*(DeltaMaj a b c)+4×a^2×c^2*(DeltaMaj a b c)) in
        cPointhb h_x_2563.
Definition X_2564 :=
        let h_x_2564 a b c := a^2*(b×c*(e a b c)+(SA a b c)) in
        cPointhb h_x_2564.
Definition X_2565 :=
        let h_x_2565 a b c := a^2*(b×c*(e a b c)-(SA a b c)) in
        cPointhb h_x_2565.
Definition X_2566 :=
        let h_x_2566 a b c := -a^4+a^2×b^2+a^2×c^2+(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(e a b c) in
        cPointhb h_x_2566.
Definition X_2567 :=
        let h_x_2567 a b c := -a^4+a^2×b^2+a^2×c^2-(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(e a b c) in
        cPointhb h_x_2567.
Definition X_2568 :=
        let h_x_2568 a b c := a*(b×c*(b+c)*(e a b c)+a*(SA a b c)) in
        cPointhb h_x_2568.
Definition X_2569 :=
        let h_x_2569 a b c := a*(b×c*(b+c)*(e a b c)-a*(SA a b c)) in
        cPointhb h_x_2569.
Definition X_2570 :=
        let h_x_2570 a b c := a^2*((e a b c)+(J a b c))*(SA a b c)+4*(e a b c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2570.
Definition X_2571 :=
        let h_x_2571 a b c := a^2*((e a b c)-(J a b c))*(SA a b c)+4*(e a b c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_2571.
Definition X_2572 :=
        let h_x_2572 a b c := 2×a^2*(SA a b c)+a*(e a b c)*(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2572.
Definition X_2573 :=
        let h_x_2573 a b c := 2×a^2*(SA a b c)-a*(e a b c)*(a×b×c+a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2573.
Definition X_2574 :=
        let h_x_2574 a b c := a/(a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)+b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2574.
Definition X_2575 :=
        let h_x_2575 a b c := a/(a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)-b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2575.
Definition X_2576 :=
        let h_x_2576 a b c := a^2*(a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)+b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2576.
Definition X_2577 :=
        let h_x_2577 a b c := a^2*(a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)-b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2577.
Definition X_2578 :=
        let h_x_2578 a b c := a^2/(-a^2×b×c*(SA a b c)+a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2578.
Definition X_2579 :=
        let h_x_2579 a b c := a^2/(-a^2×b×c*(SA a b c)-a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2579.
Definition X_2580 :=
        let h_x_2580 a b c := a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)+b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2580.
Definition X_2581 :=
        let h_x_2581 a b c := a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)-b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2581.
Definition X_2582 :=
        let h_x_2582 a b c := 1/(-a^2×b×c*(SA a b c)+a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2582.
Definition X_2583 :=
        let h_x_2583 a b c := 1/(-a^2×b×c*(SA a b c)-a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2583.
Definition X_2584 :=
        let h_x_2584 a b c := (a*(SA a b c))/(b×c*(-a^2×b×c*(SA a b c)+a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2584.
Definition X_2585 :=
        let h_x_2585 a b c := (a*(SA a b c))/(b×c*(-a^2×b×c*(SA a b c)-a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2585.
Definition X_2586 :=
        let h_x_2586 a b c := (SB a b c)*(SC a b c)*(a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)+b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2586.
Definition X_2587 :=
        let h_x_2587 a b c := (SB a b c)*(SC a b c)*(a×sqrt((a^2-b^2)^2*(a^2+b^2)-(a^4-3×a^2×b^2+b^4)*c^2-(a^2+b^2)*c^4+c^6)*(SA a b c)-b×c*(-a^2*(SA a b c)+2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2587.
Definition X_2588 :=
        let h_x_2588 a b c := 1/((SA a b c)*(-a^2×b×c*(SA a b c)+a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)+2×b×c*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2588.
Definition X_2589 :=
        let h_x_2589 a b c := 1/((SA a b c)*(a^2×b×c*(SA a b c)+a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)-2×b×c*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2589.
Definition X_2590 :=
        let h_x_2590 a b c := a/(a×b×c*(s a b c)*(SA a b c)-(DeltaMaj a b c)*((s a b c)*(SA a b c)*sqrt(a×b×c*(-(16/(a+b+c))+(a×b×c)/(DeltaMaj a b c)^2))+4×b×c*(DeltaMaj a b c))) in
        cPointhb h_x_2590.
Definition X_2591 :=
        let h_x_2591 a b c := a/(a×b×c*(s a b c)*(SA a b c)+(DeltaMaj a b c)*((s a b c)*(SA a b c)*sqrt(a×b×c*(-(16/(a+b+c))+(a×b×c)/(DeltaMaj a b c)^2))-4×b×c*(DeltaMaj a b c))) in
        cPointhb h_x_2591.
Definition X_2592 :=
        let h_x_2592 a b c := b×c*(b^2-c^2)*(a^2×b×c*(SA a b c)+a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)-2×b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2592.
Definition X_2593 :=
        let h_x_2593 a b c := b×c*(b^2-c^2)*(a^2×b×c*(SA a b c)-a×sqrt(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+3×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6)*(SA a b c)-2×b×c*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2593.
Definition X_2594 :=
        let h_x_2594 a b c := (a^2*(b+c)*(b×c+2*(SA a b c)))/(-a+b+c) in
        cPointhb h_x_2594.
Definition X_2595 :=
        let h_x_2595 a b c := 1/(-a+b+c)*(a^8-2×a^6×b^2+a^4×b^4-2×a^6×b×c+2×a^4×b^3×c+a^2×b^5×c-b^7×c-2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2+2×a^4×b×c^3+b^5×c^3+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4+a^2×b×c^5+b^3×c^5-2×b^2×c^6-b×c^7) in
        cPointhb h_x_2595.
Definition X_2596 :=
        let h_x_2596 a b c := (a-b-c)*(a^8-2×a^6×b^2+a^4×b^4+2×a^6×b×c-2×a^4×b^3×c-a^2×b^5×c+b^7×c-2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2-2×a^4×b×c^3-b^5×c^3+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4-a^2×b×c^5-b^3×c^5-2×b^2×c^6+b×c^7) in
        cPointhb h_x_2596.
Definition X_2597 :=
        let h_x_2597 a b c := (a^2×(a+b+c)^2)/((a-b-c)*(a^8-2×a^6×b^2+a^4×b^4+2×a^6×b×c-2×a^4×b^3×c-a^2×b^5×c+b^7×c-2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2-2×a^4×b×c^3-b^5×c^3+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4-a^2×b×c^5-b^3×c^5-2×b^2×c^6+b×c^7)) in
        cPointhb h_x_2597.
Definition X_2598 :=
        let h_x_2598 a b c := a^2*(a^8×b^3-a^7×b^4-3×a^6×b^5+3×a^5×b^6+3×a^4×b^7-3×a^3×b^8-a^2×b^9+a×b^10+2×a^9×b×c-2×a^8×b^2×c-5×a^7×b^3×c+6×a^6×b^4×c+3×a^5×b^5×c-6×a^4×b^6×c+a^3×b^7×c+2×a^2×b^8×c-a×b^9×c-2×a^8×b×c^2+4×a^7×b^2×c^2-a^6×b^3×c^2-7×a^5×b^4×c^2+6×a^4×b^5×c^2+5×a^3×b^6×c^2-4×a^2×b^7×c^2-2×a×b^8×c^2+b^9×c^2+a^8×c^3-5×a^7×b×c^3-a^6×b^2×c^3+8×a^5×b^3×c^3-4×a^3×b^5×c^3-a^2×b^6×c^3+3×a×b^7×c^3-b^8×c^3-a^7×c^4+6×a^6×b×c^4-7×a^5×b^2×c^4+2×a^3×b^4×c^4+4×a^2×b^5×c^4+a×b^6×c^4-3×b^7×c^4-3×a^6×c^5+3×a^5×b×c^5+6×a^4×b^2×c^5-4×a^3×b^3×c^5+4×a^2×b^4×c^5-4×a×b^5×c^5+3×b^6×c^5+3×a^5×c^6-6×a^4×b×c^6+5×a^3×b^2×c^6-a^2×b^3×c^6+a×b^4×c^6+3×b^5×c^6+3×a^4×c^7+a^3×b×c^7-4×a^2×b^2×c^7+3×a×b^3×c^7-3×b^4×c^7-3×a^3×c^8+2×a^2×b×c^8-2×a×b^2×c^8-b^3×c^8-a^2×c^9-a×b×c^9+b^2×c^9+a×c^10) in
        cPointhb h_x_2598.
Definition X_2599 :=
        let h_x_2599 a b c := (a*(b+c)*(a^2-b^2-b×c-c^2)*(-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4))/(-a+b+c) in
        cPointhb h_x_2599.
Definition X_2600 :=
        let h_x_2600 a b c := a*(a-b-c)*(b-c)*(a^2-b^2+b×c-c^2)*(-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_2600.
Definition X_2601 :=
        let h_x_2601 a b c := (a*(a^8-2×a^6×b^2+a^4×b^4-2×a^6×b×c+2×a^4×b^3×c+a^2×b^5×c-b^7×c-2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2+2×a^4×b×c^3+b^5×c^3+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4+a^2×b×c^5+b^3×c^5-2×b^2×c^6-b×c^7))/((-a+b+c)*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)) in
        cPointhb h_x_2601.
Definition X_2602 :=
        let h_x_2602 a b c := 1/(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a*(a-b-c)*(a^8-2×a^6×b^2+a^4×b^4+2×a^6×b×c-2×a^4×b^3×c-a^2×b^5×c+b^7×c-2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2-2×a^4×b×c^3-b^5×c^3+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4-a^2×b×c^5-b^3×c^5-2×b^2×c^6+b×c^7)) in
        cPointhb h_x_2602.
Definition X_2603 :=
        let h_x_2603 a b c := (a*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4))/((a-b-c)*(a^8-2×a^6×b^2+a^4×b^4+2×a^6×b×c-2×a^4×b^3×c-a^2×b^5×c+b^7×c-2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2-2×a^4×b×c^3-b^5×c^3+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4-a^2×b×c^5-b^3×c^5-2×b^2×c^6+b×c^7)) in
        cPointhb h_x_2603.
Definition X_2604 :=
        let h_x_2604 a b c := -1/(c*(a^4-b^2×c^2+c^4-a^2*(b^2+2×c^2))*(b×c*((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)+a*((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)*(c*(SA a b c)*(SC a b c)+b*(SB a b c)*(SC a b c)+4×b×(DeltaMaj a b c)^2+4×c×(DeltaMaj a b c)^2)))-1/(b*(a^4+b^4-b^2×c^2-a^2*(2×b^2+c^2))*(b×c*((SA a b c)*(SB a b c)+4×(DeltaMaj a b c)^2)*((SB a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)+a*((SA a b c)*(SC a b c)+4×(DeltaMaj a b c)^2)*(b*(SA a b c)*(SB a b c)+c*(SB a b c)*(SC a b c)+4×b×(DeltaMaj a b c)^2+4×c×(DeltaMaj a b c)^2))) in
        cPointhb h_x_2604.
Definition X_2605 :=
        let h_x_2605 a b c := a^2*(b-c)*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_2605.
Definition X_2606 :=
        let h_x_2606 a b c := a^6-a^4×b^2-b^5×c-a^4×c^2+a^2×b^2×c^2+2×b^3×c^3-b×c^5 in
        cPointhb h_x_2606.
Definition X_2607 :=
        let h_x_2607 a b c := a^6-a^4×b^2+b^5×c-a^4×c^2+a^2×b^2×c^2-2×b^3×c^3+b×c^5 in
        cPointhb h_x_2607.
Definition X_2608 :=
        let h_x_2608 a b c := a^2/(a^6-a^4×b^2+b^5×c-a^4×c^2+a^2×b^2×c^2-2×b^3×c^3+b×c^5) in
        cPointhb h_x_2608.
Definition X_2609 :=
        let h_x_2609 a b c := (a^2*(-a^5×b^3+2×a^3×b^5-a×b^7+2×a^6×b×c-2×a^4×b^3×c+b^6×c^2-a^5×c^3-2×a^4×b×c^3+2×a^2×b^3×c^3-2×b^4×c^4+2×a^3×c^5+b^2×c^6-a×c^7))/((a^4×b-a^2×b^3+b^4×c-a^3×c^2-b^2×c^3+a×c^4)*(-a^3×b^2+a×b^4+a^4×c-b^3×c^2-a^2×c^3+b×c^4)) in
        cPointhb h_x_2609.
Definition X_2610 :=
        let h_x_2610 a b c := a*(b-c)*(b+c)^2*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_2610.
Definition X_2611 :=
        let h_x_2611 a b c := a×(b-c)^2*(b+c)*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_2611.
Definition X_2612 :=
        let h_x_2612 a b c := (a*(a^6-a^4×b^2-b^5×c-a^4×c^2+a^2×b^2×c^2+2×b^3×c^3-b×c^5))/(b^2-c^2) in
        cPointhb h_x_2612.
Definition X_2613 :=
        let h_x_2613 a b c := (a*(a^6-a^4×b^2+b^5×c-a^4×c^2+a^2×b^2×c^2-2×b^3×c^3+b×c^5))/(b^2-c^2) in
        cPointhb h_x_2613.
Definition X_2614 :=
        let h_x_2614 a b c := (a*(b^2-c^2))/(a^6-a^4×b^2+b^5×c-a^4×c^2+a^2×b^2×c^2-2×b^3×c^3+b×c^5) in
        cPointhb h_x_2614.
Definition X_2615 :=
        let h_x_2615 a b c := (a×(b^2-c^2)^2*(a^7-2×a^5×b^2+a^3×b^4+2×a^5×b×c-a^4×b^2×c-2×a^3×b^3×c+2×a^2×b^4×c-b^6×c-2×a^5×c^2-a^4×b×c^2+3×a^3×b^2×c^2-a×b^4×c^2-2×a^3×b×c^3+2×a×b^3×c^3+a^3×c^4+2×a^2×b×c^4-a×b^2×c^4-b×c^6))/((a^5×b-a^3×b^3+a^3×b^2×c-a^2×b^3×c+b^5×c-a^3×b×c^2+a×b^3×c^2-a^3×c^3+a^2×b×c^3-a×b^2×c^3-b^3×c^3+a×c^5)*(-a^3×b^3+a×b^5+a^5×c-a^3×b^2×c+a^2×b^3×c+a^3×b×c^2-a×b^3×c^2-a^3×c^3-a^2×b×c^3+a×b^2×c^3-b^3×c^3+b×c^5)) in
        cPointhb h_x_2615.
Definition X_2616 :=
        let h_x_2616 a b c := (a*(b^2-c^2))/(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_2616.
Definition X_2617 :=
        let h_x_2617 a b c := (a*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4))/(b^2-c^2) in
        cPointhb h_x_2617.
Definition X_2618 :=
        let h_x_2618 a b c := b×c*(b^2-c^2)*(-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_2618.
Definition X_2619 :=
        let h_x_2619 a b c := (b×c*(2×a^8-2×a^6×b^2-a^2×b^6+b^8-2×a^6×c^2+2×a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2+a^2×b^2×c^4+6×b^4×c^4-a^2×c^6-4×b^2×c^6+c^8))/(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_2619.
Definition X_2620 :=
        let h_x_2620 a b c := 1/(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)×a^3*(a^6×b^4-3×a^4×b^6+3×a^2×b^8-b^10+a^4×b^4×c^2-3×a^2×b^6×c^2+2×b^8×c^2+a^6×c^4+a^4×b^2×c^4+2×a^2×b^4×c^4-b^6×c^4-3×a^4×c^6-3×a^2×b^2×c^6-b^4×c^6+3×a^2×c^8+2×b^2×c^8-c^10) in
        cPointhb h_x_2620.
Definition X_2621 :=
        let h_x_2621 a b c := (a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)/(a*(a^6×b^4-3×a^4×b^6+3×a^2×b^8-b^10+a^4×b^4×c^2-3×a^2×b^6×c^2+2×b^8×c^2+a^6×c^4+a^4×b^2×c^4+2×a^2×b^4×c^4-b^6×c^4-3×a^4×c^6-3×a^2×b^2×c^6-b^4×c^6+3×a^2×c^8+2×b^2×c^8-c^10)) in
        cPointhb h_x_2621.
Definition X_2622 :=
        let h_x_2622 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^14×b^2-a^13×b^3-5×a^12×b^4+5×a^11×b^5+10×a^10×b^6-10×a^9×b^7-10×a^8×b^8+10×a^7×b^9+5×a^6×b^10-5×a^5×b^11-a^4×b^12+a^3×b^13+a^14×c^2-6×a^12×b^2×c^2+3×a^11×b^3×c^2+12×a^10×b^4×c^2-9×a^9×b^5×c^2-10×a^8×b^6×c^2+8×a^7×b^7×c^2+3×a^6×b^8×c^2-3×a^3×b^11×c^2+a×b^13×c^2-a^13×c^3+3×a^11×b^2×c^3-3×a^9×b^4×c^3+3×a^7×b^6×c^3-6×a^5×b^8×c^3+6×a^3×b^10×c^3-2×a×b^12×c^3-5×a^12×c^4+12×a^10×b^2×c^4-3×a^9×b^3×c^4-8×a^8×b^4×c^4+3×a^7×b^5×c^4+a^6×b^6×c^4-a^5×b^7×c^4+3×a^3×b^9×c^4-a^2×b^10×c^4-2×a×b^11×c^4+b^12×c^4+5×a^11×c^5-9×a^9×b^2×c^5+3×a^7×b^4×c^5+3×a^5×b^6×c^5-6×a^3×b^8×c^5+4×a×b^10×c^5+10×a^10×c^6-10×a^8×b^2×c^6+3×a^7×b^3×c^6+a^6×b^4×c^6+3×a^5×b^5×c^6+2×a^4×b^6×c^6-a^3×b^7×c^6+a^2×b^8×c^6+a×b^9×c^6-4×b^10×c^6-10×a^9×c^7+8×a^7×b^2×c^7-a^5×b^4×c^7-a^3×b^6×c^7-2×a×b^8×c^7-10×a^8×c^8+3×a^6×b^2×c^8-6×a^5×b^3×c^8-6×a^3×b^5×c^8+a^2×b^6×c^8-2×a×b^7×c^8+6×b^8×c^8+10×a^7×c^9+3×a^3×b^4×c^9+a×b^6×c^9+5×a^6×c^10+6×a^3×b^3×c^10-a^2×b^4×c^10+4×a×b^5×c^10-4×b^6×c^10-5×a^5×c^11-3×a^3×b^2×c^11-2×a×b^4×c^11-a^4×c^12-2×a×b^3×c^12+b^4×c^12+a^3×c^13+a×b^2×c^13) in
        cPointhb h_x_2622.
Definition X_2623 :=
        let h_x_2623 a b c := (a^2*(b^2-c^2))/(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_2623.
Definition X_2624 :=
        let h_x_2624 a b c := a^3*(-b^6+c^6+a^4*(-b^2+c^2)+2×a^2*(b^4-c^4)) in
        cPointhb h_x_2624.
Definition X_2625 :=
        let h_x_2625 a b c := -((a-b)*b*(a+b)*(a-c)*c*(a+c)*(2×a^8+2×a^4×b^2×c^2+(b^2-c^2)^4-2×a^6*(b^2+c^2)-a^2×(b^2-c^2)^2*(b^2+c^2))) in
        cPointhb h_x_2625.
Definition X_2626 :=
        let h_x_2626 a b c := -(a^3*(a-b)*(a+b)*(a-c)*(a+c)*(a^6*(b^4+c^4)+a^4*(-3×b^6+b^4×c^2+b^2×c^4-3×c^6)-(b^2-c^2)^2*(b^6+c^6)+a^2*(3×b^8-3×b^6×c^2+2×b^4×c^4-3×b^2×c^6+3×c^8))) in
        cPointhb h_x_2626.
Definition X_2627 :=
        let h_x_2627 a b c := b*(b-c)*c*(b+c)*(a^10+b^4×(b^2-c^2)^3-a^8*(2×b^2+3×c^2)-a^2×b^4*(2×b^4-3×b^2×c^2+c^4)+a^6*(b^4+3×b^2×c^2+3×c^4)+a^4*(b^6-2×b^4×c^2-b^2×c^4-c^6))*(-a^10+c^4×(b^2-c^2)^3+a^8*(3×b^2+2×c^2)-a^6*(3×b^4+3×b^2×c^2+c^4)+a^2×c^4*(b^4-3×b^2×c^2+2×c^4)+a^4*(b^6+b^4×c^2+2×b^2×c^4-c^6)) in
        cPointhb h_x_2627.
Definition X_2628 :=
        let h_x_2628 a b c := -(a^2×(b-c)^2*(b+c)*(a^12*(b+c)-b^4×(b-c)^2×c^4×(b+c)^3-a^11*(b^2+b×c+c^2)-4×a^10*(b^3+b^2×c+b×c^2+c^3)+a^4*(b+c)*(b^4+b^2×c^2+c^4)^2+a^9*(4×b^4+4×b^3×c+6×b^2×c^2+4×b×c^3+4×c^4)+2×a^8*(3×b^5+3×b^4×c+5×b^3×c^2+5×b^2×c^3+3×b×c^4+3×c^5)-a^7*(6×b^6+6×b^5×c+11×b^4×c^2+10×b^3×c^3+11×b^2×c^4+6×b×c^5+6×c^6)-4×a^6*(b^7+b^6×c+2×b^5×c^2+2×b^4×c^3+2×b^3×c^4+2×b^2×c^5+b×c^6+c^7)+a×b^2×c^2*(b^8-b^7×c-2×b^6×c^2-2×b^2×c^6-b×c^7+c^8)+a^5*(4×b^8+4×b^7×c+9×b^6×c^2+7×b^5×c^3+6×b^4×c^4+7×b^3×c^5+9×b^2×c^6+4×b×c^7+4×c^8)-a^3*(b^10+b^9×c+4×b^8×c^2-b^6×c^4+3×b^5×c^5-b^4×c^6+4×b^2×c^8+b×c^9+c^10))) in
        cPointhb h_x_2628.
Definition X_2629 :=
        let h_x_2629 a b c := a*(a^8-a^6*(b^2+c^2)+3×a^2×(b^2-c^2)^2*(b^2+c^2)+a^4*(-2×b^4+5×b^2×c^2-2×c^4)-(b^2-c^2)^2*(b^4+3×b^2×c^2+c^4)) in
        cPointhb h_x_2629.
Definition X_2630 :=
        let h_x_2630 a b c := a*(2×a^9-a^8*(b+c)-2×a×b^2×c^2×(b^2-c^2)^2-2×a^7*(b^2+c^2)+2×a^3×(b^2-c^2)^2*(b^2+c^2)-a^6*(b^3-3×b^2×c-3×b×c^2+c^3)-2×a^5*(b^4-3×b^2×c^2+c^4)-(b-c)^2×(b+c)^3*(b^4-2×b^3×c+b^2×c^2-2×b×c^3+c^4)-a^2×(b-c)^2*(b^5+3×b^4×c+8×b^3×c^2+8×b^2×c^3+3×b×c^4+c^5)+a^4*(4×b^5-2×b^4×c-3×b^3×c^2-3×b^2×c^3-2×b×c^4+4×c^5)) in
        cPointhb h_x_2630.
Definition X_2631 :=
        let h_x_2631 a b c := a*(b-c)*(b+c)*(a^2-b^2-c^2)*(2×a^4-(b^2-c^2)^2-a^2*(b^2+c^2)) in
        cPointhb h_x_2631.
Definition X_2632 :=
        let h_x_2632 a b c := -(a×(b-c)^2×(b+c)^2×(-a^2+b^2+c^2)^2) in
        cPointhb h_x_2632.
Definition X_2633 :=
        let h_x_2633 a b c := -(a*(a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^8-a^6*(b^2+c^2)+3×a^2×(b^2-c^2)^2*(b^2+c^2)+a^4*(-2×b^4+5×b^2×c^2-2×c^4)-(b^2-c^2)^2*(b^4+3×b^2×c^2+c^4))) in
        cPointhb h_x_2633.
Definition X_2634 :=
        let h_x_2634 a b c := -(a×(b-c)^2*(b+c)*(a^2-b^2-c^2)*(a^12+3×a^10×b×c-2×a^11*(b+c)-10×a^7×b^2×c^2*(b+c)-2×a×b^2×(b-c)^2×c^2×(b+c)^3*(b^2+c^2)-b×c×(b+c)^4×(b^3-2×b^2×c+2×b×c^2-c^3)^2+4×a^9*(b^3+b^2×c+b×c^2+c^3)+2×a^3×(b-c)^2×(b+c)^3*(b^4+3×b^2×c^2+c^4)+a^4×b×c×(b+c)^2*(3×b^4-13×b^3×c+17×b^2×c^2-13×b×c^3+3×c^4)-a^8*(5×b^4+6×b^3×c-b^2×c^2+6×b×c^3+5×c^4)-a^2×(b^2-c^2)^2*(b^6-2×b^4×c^2+3×b^3×c^3-2×b^2×c^4+c^6)+a^6*(5×b^6+b^5×c+2×b^4×c^2+13×b^3×c^3+2×b^2×c^4+b×c^5+5×c^6)+a^5*(-4×b^7-4×b^6×c+6×b^5×c^2+6×b^4×c^3+6×b^3×c^4+6×b^2×c^5-4×b×c^6-4×c^7))) in
        cPointhb h_x_2634.
Definition X_2635 :=
        let h_x_2635 a b c := a*(a^4*(b+c)-a^2×(b-c)^2*(b+c)-2×b×(b-c)^2×c*(b+c)+a×(b^2-c^2)^2-a^3*(b^2+c^2)) in
        cPointhb h_x_2635.
Definition X_2636 :=
        let h_x_2636 a b c := a*(-(b^2×(b-c)^4×c^2×(b+c)^2)+a×b×(b-c)^4×c×(b+c)^3+a^8*(b^2-3×b×c+c^2)+a^7*(-2×b^3+3×b^2×c+3×b×c^2-2×c^3)+a^5×(b-c)^2*(4×b^3+3×b^2×c+3×b×c^2+4×c^3)-a^6*(b^4-5×b^3×c+9×b^2×c^2-5×b×c^3+c^4)+a^2×(b^2-c^2)^2*(b^4-b^3×c+5×b^2×c^2-b×c^3+c^4)-a^4×(b-c)^2*(b^4+3×b^3×c-b^2×c^2+3×b×c^3+c^4)-a^3×(b-c)^2*(2×b^5+3×b^4×c+7×b^3×c^2+7×b^2×c^3+3×b×c^4+2×c^5)) in
        cPointhb h_x_2636.
Definition X_2637 :=
        let h_x_2637 a b c := a^2*(a-b-c)*(b-c)*(a^2-b^2-c^2)*(a^4*(b+c)-a^2×(b-c)^2*(b+c)-2×b×(b-c)^2×c*(b+c)+a×(b^2-c^2)^2-a^3*(b^2+c^2)) in
        cPointhb h_x_2637.
Definition X_2638 :=
        let h_x_2638 a b c := a^3×(b-c)^2×(-a+b+c)^2×(-a^2+b^2+c^2)^2 in
        cPointhb h_x_2638.
Definition X_2639 :=
        let h_x_2639 a b c := (a-b)*(a-c)*(a+b-c)*(a-b+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(-(b^2×(b-c)^4×c^2×(b+c)^2)+a×b×(b-c)^4×c×(b+c)^3+a^8*(b^2-3×b×c+c^2)+a^7*(-2×b^3+3×b^2×c+3×b×c^2-2×c^3)+a^5×(b-c)^2*(4×b^3+3×b^2×c+3×b×c^2+4×c^3)-a^6*(b^4-5×b^3×c+9×b^2×c^2-5×b×c^3+c^4)+a^2×(b^2-c^2)^2*(b^4-b^3×c+5×b^2×c^2-b×c^3+c^4)-a^4×(b-c)^2*(b^4+3×b^3×c-b^2×c^2+3×b×c^3+c^4)-a^3×(b-c)^2*(2×b^5+3×b^4×c+7×b^3×c^2+7×b^2×c^3+3×b×c^4+2×c^5)) in
        cPointhb h_x_2639.
Definition X_2640 :=
        let h_x_2640 a b c := a*(a^4-b^4+3×b^2×c^2-c^4-a^2*(b^2+c^2)) in
        cPointhb h_x_2640.
Definition X_2641 :=
        let h_x_2641 a b c := a*(2×a^5+2×a×b^2×c^2-a^4*(b+c)-2×a^3*(b^2+c^2)-(b+c)*(b^2-b×c+c^2)^2+a^2*(3×b^3-b^2×c-b×c^2+3×c^3)) in
        cPointhb h_x_2641.
Definition X_2642 :=
        let h_x_2642 a b c := a*(b^2-c^2)*(-2×a^2+b^2+c^2) in
        cPointhb h_x_2642.
Definition X_2643 :=
        let h_x_2643 a b c := -(a×(b-c)^2×(b+c)^2) in
        cPointhb h_x_2643.
Definition X_2644 :=
        let h_x_2644 a b c := -(a*(a-b)*(a+b)*(a-c)*(a+c)*(a^4-b^4+3×b^2×c^2-c^4-a^2*(b^2+c^2))) in
        cPointhb h_x_2644.
Definition X_2645 :=
        let h_x_2645 a b c := a*(b+c)*(b-c)^2*(a^6+2×a^5*(b+c)+2×a×b^2×c^2*(b+c)-3×a^4*(b^2+b×c+c^2)-2×a^3*(b^3+b^2×c+b×c^2+c^3)-b×c*(b^4+2×b^3×c+b^2×c^2+2×b×c^3+c^4)+a^2*(b^4+3×b^3×c+7×b^2×c^2+3×b×c^3+c^4)) in
        cPointhb h_x_2645.
Definition X_2646 :=
        let h_x_2646 a b c := a*(a-b-c)*(2×a^2-(b-c)^2+a*(b+c)) in
        cPointhb h_x_2646.
Definition X_2647 :=
        let h_x_2647 a b c := a*(a+b-c)*(a-b+c)*(a^4+a^2×b×c-a^3*(b+c)-(b+c)^2*(b^2-3×b×c+c^2)+a*(b^3+b^2×c+b×c^2+c^3)) in
        cPointhb h_x_2647.
Definition X_2648 :=
        let h_x_2648 a b c := a*(a-b-c)*(a^3+b^3+a*(b-2×c)*c-2×b×c^2+c^3)*(a^3+b^3-2×b^2×c+c^3+a×b*(-2×b+c)) in
        cPointhb h_x_2648.
Definition X_2649 :=
        let h_x_2649 a b c := a*(-a+b+c)*(2×a^5-a^4×b-5×a^3×b^2+2×a^2×b^3+3×a×b^4-b^5-a^4×c+4×a^3×b×c-3×a^2×b^2×c-4×a×b^3×c+2×b^4×c-5×a^3×c^2-3×a^2×b×c^2+2×a×b^2×c^2-b^3×c^2+2×a^2×c^3-4×a×b×c^3-b^2×c^3+3×a×c^4+2×b×c^4-c^5) in
        cPointhb h_x_2649.
Definition X_2650 :=
        let h_x_2650 a b c := a*(b+c)*(2×a^2-(b-c)^2+a*(b+c)) in
        cPointhb h_x_2650.
Definition X_2651 :=
        let h_x_2651 a b c := a*(a+b)*(a+c)*(a^3+b^3+a×b×c+c^3-2×a^2*(b+c)) in
        cPointhb h_x_2651.
Definition X_2652 :=
        let h_x_2652 a b c := a*(b+c)*(a^3+b^3+a*(b-2×c)*c-2×b×c^2+c^3)*(a^3+b^3-2×b^2×c+c^3+a×b*(-2×b+c)) in
        cPointhb h_x_2652.
Definition X_2653 :=
        let h_x_2653 a b c := a^2*(b+c)*(-b^4+b^3×c+2×b^2×c^2+b×c^3-c^4+a^3*(b+c)+3×a×b×c*(b+c)+2×a^2*(b^2+b×c+c^2)) in
        cPointhb h_x_2653.
Definition X_2654 :=
        let h_x_2654 a b c := a*(-2×a^4×b×c+a^5*(b+c)+2×b×c×(b^2-c^2)^2-2×a^3*(b^3+c^3)+a*(b^5-b^4×c-b×c^4+c^5)) in
        cPointhb h_x_2654.
Definition X_2655 :=
        let h_x_2655 a b c := a*(a+b-c)*(a-b+c)*(b^2×(b-c)^2×c^2×(b+c)^3-a^2×(b-c)^2×(b+c)^3*(b^2+c^2)+a^3×(b^2-c^2)^2*(b^2-b×c+c^2)+a×b×c×(b^2-c^2)^2*(b^2-b×c+c^2)+a^7*(b^2+b×c+c^2)-a^6*(b^3+b^2×c+b×c^2+c^3)-a^5*(2×b^4+b^3×c-b^2×c^2+b×c^3+2×c^4)+a^4*(2×b^5+2×b^4×c-b^3×c^2-b^2×c^3+2×b×c^4+2×c^5)) in
        cPointhb h_x_2655.
Definition X_2656 :=
        let h_x_2656 a b c := a*(a-b-c)*(a^6×(b-c)^2*(b+c)-b^2×(b-c)^3×c^2×(b+c)^2+a^7*(b^2+b×c-c^2)+a×b×c×(b^2-c^2)^2*(b^2-b×c+c^2)+a^2*(b+c)*(b^3-b^2×c+b×c^2-c^3)^2-a^5*(2×b^4+b^3×c-b^2×c^2+b×c^3-2×c^4)+a^4*(-2×b^5+2×b^4×c+b^3×c^2-b^2×c^3+2×b×c^4-2×c^5)+a^3*(b^6-b^5×c+b^4×c^2+2×b^3×c^3-b^2×c^4-b×c^5-c^6))*(-(a^6×(b-c)^2*(b+c))-b^2×(b-c)^3×c^2×(b+c)^2+a^7*(b^2-b×c-c^2)-a×b×c×(b^2-c^2)^2*(b^2-b×c+c^2)-a^2*(b+c)*(b^3-b^2×c+b×c^2-c^3)^2+a^5*(-2×b^4+b^3×c-b^2×c^2+b×c^3+2×c^4)+a^4*(2×b^5-2×b^4×c+b^3×c^2-b^2×c^3-2×b×c^4+2×c^5)+a^3*(b^6+b^5×c+b^4×c^2-2×b^3×c^3-b^2×c^4+b×c^5-c^6)) in
        cPointhb h_x_2656.
Definition X_2657 :=
        let h_x_2657 a b c := a*(a-b-c)*(2×a^9×b×c-b^2×(b-c)^4×c^2×(b+c)^3-a^5×b×c×(b^2-c^2)^2-a×b×c×(b^2-c^2)^4-3×a^7×b×c*(b^2+c^2)+3×a^3×b×c×(b^2-c^2)^2*(b^2+c^2)+a^8*(b^3+c^3)-3×a^6*(b^5+c^5)+a^4*(3×b^7-b^5×c^2-2×b^4×c^3-2×b^3×c^4-b^2×c^5+3×c^7)-a^2*(b^9-2×b^7×c^2+b^5×c^4+b^4×c^5-2×b^2×c^7+c^9)) in
        cPointhb h_x_2657.
Definition X_2658 :=
        let h_x_2658 a b c := a^2*(b+c)*(a^2-b^2-c^2)*(a^4*(b+c)-a^2×(b-c)^2*(b+c)-2×b×(b-c)^2×c*(b+c)-a×(b^2-c^2)^2+a^3*(b^2+c^2)) in
        cPointhb h_x_2658.
Definition X_2659 :=
        let h_x_2659 a b c := (a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(b^2×(b-c)^2×c^2×(b+c)^3-a^2×(b-c)^2×(b+c)^3*(b^2+c^2)+a^3×(b^2-c^2)^2*(b^2-b×c+c^2)+a×b×c×(b^2-c^2)^2*(b^2-b×c+c^2)+a^7*(b^2+b×c+c^2)-a^6*(b^3+b^2×c+b×c^2+c^3)-a^5*(2×b^4+b^3×c-b^2×c^2+b×c^3+2×c^4)+a^4*(2×b^5+2×b^4×c-b^3×c^2-b^2×c^3+2×b×c^4+2×c^5)) in
        cPointhb h_x_2659.
Definition X_2660 :=
        let h_x_2660 a b c := a^2*(b+c)*(a^2-b^2-c^2)*(a^6×(b-c)^2*(b+c)-b^2×(b-c)^3×c^2×(b+c)^2+a^7*(b^2+b×c-c^2)+a×b×c×(b^2-c^2)^2*(b^2-b×c+c^2)+a^2*(b+c)*(b^3-b^2×c+b×c^2-c^3)^2-a^5*(2×b^4+b^3×c-b^2×c^2+b×c^3-2×c^4)+a^4*(-2×b^5+2×b^4×c+b^3×c^2-b^2×c^3+2×b×c^4-2×c^5)+a^3*(b^6-b^5×c+b^4×c^2+2×b^3×c^3-b^2×c^4-b×c^5-c^6))*(-(a^6×(b-c)^2*(b+c))-b^2×(b-c)^3×c^2×(b+c)^2+a^7*(b^2-b×c-c^2)-a×b×c×(b^2-c^2)^2*(b^2-b×c+c^2)-a^2*(b+c)*(b^3-b^2×c+b×c^2-c^3)^2+a^5*(-2×b^4+b^3×c-b^2×c^2+b×c^3+2×c^4)+a^4*(2×b^5-2×b^4×c+b^3×c^2-b^2×c^3-2×b×c^4+2×c^5)+a^3*(b^6+b^5×c+b^4×c^2-2×b^3×c^3-b^2×c^4+b×c^5-c^6)) in
        cPointhb h_x_2660.
Definition X_2661 :=
        let h_x_2661 a b c := a^2*(b+c)*(a^2-b^2-c^2)*(2×a^11×b×c*(b+c)-b^3×c^3×(b^2-c^2)^4-a×b^2×(b-c)^4×c^2×(b+c)^3*(2×b^2+b×c+2×c^2)+a^10*(b^4+b^3×c+2×b^2×c^2+b×c^3+c^4)-a^2×b×(b-c)^4×c×(b+c)^2*(2×b^4+3×b^3×c+5×b^2×c^2+3×b×c^3+2×c^4)+a^9*(b^5-4×b^4×c-4×b×c^4+c^5)-a^4×(b^2-c^2)^2*(b^6-5×b^5×c+2×b^4×c^2-7×b^3×c^3+2×b^2×c^4-5×b×c^5+c^6)-a^3×(b-c)^2×(b+c)^3*(b^6+b^5×c-4×b^4×c^2+5×b^3×c^3-4×b^2×c^4+b×c^5+c^6)-a^8*(3×b^6+b^5×c+2×b^4×c^2+2×b^3×c^3+2×b^2×c^4+b×c^5+3×c^6)+a^6×(b-c)^2*(3×b^6+3×b^5×c+2×b^4×c^2+3×b^3×c^3+2×b^2×c^4+3×b×c^5+3×c^6)-a^7*(3×b^7+5×b^5×c^2-5×b^4×c^3-5×b^3×c^4+5×b^2×c^5+3×c^7)+a^5*(3×b^9+4×b^8×c-9×b^6×c^3+2×b^5×c^4+2×b^4×c^5-9×b^3×c^6+4×b×c^8+3×c^9)) in
        cPointhb h_x_2661.
Definition X_2662 :=
        let h_x_2662 a b c := a*(a+b-c)*(a-b+c)*(-(a^7×b×c*(b+c))+a^3×b×(b-c)^2×c×(b+c)^3-b^2×(b-c)^2×c^2×(b+c)^4-a×b×(b-c)^2×c×(b+c)^3*(b^2+c^2)+a^8*(b^2+3×b×c+c^2)+a^5×b×c*(b^3+b^2×c+b×c^2+c^3)-a^2×(b^2-c^2)^2*(b^4-b^3×c+b^2×c^2-b×c^3+c^4)+a^4×(b+c)^2*(3×b^4-5×b^3×c+9×b^2×c^2-5×b×c^3+3×c^4)-a^6*(3×b^4+5×b^3×c+3×b^2×c^2+5×b×c^3+3×c^4)) in
        cPointhb h_x_2662.
Definition X_2663 :=
        let h_x_2663 a b c := a*(b^2×c^2+a×b×c*(b+c)+a^2*(b^2+3×b×c+c^2)) in
        cPointhb h_x_2663.
Definition X_2664 :=
        let h_x_2664 a b c := a*(-(b^2×c^2)-a×b×c*(b+c)+a^2*(b^2+b×c+c^2)) in
        cPointhb h_x_2664.
Definition X_2665 :=
        let h_x_2665 a b c := a*(a×b*(b-c)*c+b^2×c^2+a^2*(b^2-b×c-c^2))*(a×b*(b-c)*c-b^2×c^2+a^2*(b^2+b×c-c^2)) in
        cPointhb h_x_2665.
Definition X_2666 :=
        let h_x_2666 a b c := a*(a^2×b^3+2×a^3×b×c+4×a^2×b^2×c+a×b^3×c+4×a^2×b×c^2+8×a×b^2×c^2+b^3×c^2+a^2×c^3+a×b×c^3+b^2×c^3) in
        cPointhb h_x_2666.
Definition X_2667 :=
        let h_x_2667 a b c := a^2*(b+c)*(2×b×c+a*(b+c)) in
        cPointhb h_x_2667.
Definition X_2668 :=
        let h_x_2668 a b c := (a+b)*(a+c)*(b^2×c^2+a×b×c*(b+c)+a^2*(b^2+3×b×c+c^2)) in
        cPointhb h_x_2668.
Definition X_2669 :=
        let h_x_2669 a b c := (a+b)*(a+c)*(-(b^2×c^2)-a×b×c*(b+c)+a^2*(b^2+b×c+c^2)) in
        cPointhb h_x_2669.
Definition X_2670 :=
        let h_x_2670 a b c := a^2*(b+c)*(a^2×b^3+2×a^3×b×c+2×a^2×b^2×c+a×b^3×c+2×a^2×b×c^2+4×a×b^2×c^2+b^3×c^2+a^2×c^3+a×b×c^3+b^2×c^3) in
        cPointhb h_x_2670.
Definition X_2671 :=
        let h_x_2671 a b c := 1/(2*(SA a b c)+(SS a b c)*TauMaj^2) in
        cPointhb h_x_2671.
Definition X_2672 :=
        let h_x_2672 a b c := 1/(2*(SA a b c)-(SS a b c)*TauMaj^2) in
        cPointhb h_x_2672.
Definition X_2673 :=
        let h_x_2673 a b c := a^2*(2*(SA a b c)+(SS a b c)*TauMaj^2) in
        cPointhb h_x_2673.
Definition X_2674 :=
        let h_x_2674 a b c := a^2*(2*(SA a b c)-(SS a b c)*TauMaj^2) in
        cPointhb h_x_2674.
Definition X_2675 :=
        let h_x_2675 a b c := 4*(a^2*(SA a b c)-(SB a b c)*(SC a b c))-(SS a b c)^2×TauMaj^4 in
        cPointhb h_x_2675.
Definition X_2676 :=
        let h_x_2676 a b c := 4*(SB a b c)*(SC a b c)+(SS a b c)^2×TauMaj^4 in
        cPointhb h_x_2676.
Definition X_2677 :=
        let h_x_2677 a b c := (b-c)^2*(b+c)*(-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3)*(a^3-a^2×b-a×b^2+b^3-a^2×c-a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_2677.
Definition X_2678 :=
        let h_x_2678 a b c := (b-c)^2*(b+c)*(-2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c-a^2×b×c-a×b^2×c+b^3×c-a^2×c^2-a×b×c^2+b^2×c^2-a×c^3+b×c^3+c^4) in
        cPointhb h_x_2678.
Definition X_2679 :=
        let h_x_2679 a b c := a^2×(b^2-c^2)^2*(-a^4+b^2×c^2)*(-a^2×b^2+b^4-a^2×c^2+c^4) in
        cPointhb h_x_2679.
Definition X_2680 :=
        let h_x_2680 a b c := a×(b-c)^2*(b+c)*(a^3+a×b×c-b^2×c-b×c^2)*(-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2680.
Definition X_2681 :=
        let h_x_2681 a b c := (b-c)^2*(b+c)*(a^2+a×b-b^2+a×c-b×c-c^2)*(-2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2681.
Definition X_2682 :=
        let h_x_2682 a b c := (2×a^2-b^2-c^2)*(b^2-c^2)^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_2682.
Definition X_2683 :=
        let h_x_2683 a b c := a*(-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3)*(-a^2×b^2+b^4-a^2×c^2+c^4)*(a^5×b-a^3×b^3+a^5×c-2×a^4×b×c+a^2×b^3×c+a×b^4×c-b^5×c-a×b^3×c^2-a^3×c^3+a^2×b×c^3-a×b^2×c^3+2×b^3×c^3+a×b×c^4-b×c^5) in
        cPointhb h_x_2683.
Definition X_2684 :=
        let h_x_2684 a b c := (-2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3)*(-a^2×b^2+b^4-a^2×c^2+c^4)*(2×a^5-a^4×b-a^3×b^2+a×b^4-b^5-a^4×c+a^2×b^2×c-a^3×c^2+a^2×b×c^2-2×a×b^2×c^2+b^3×c^2+b^2×c^3+a×c^4-c^5) in
        cPointhb h_x_2684.
Definition X_2685 :=
        let h_x_2685 a b c := (2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^5×b^2-a^4×b^3-2×a^3×b^4+2×a^2×b^5+a×b^6-b^7+a^5×c^2+2×a^3×b^2×c^2-a^2×b^3×c^2-a×b^4×c^2-b^5×c^2-a^4×c^3-a^2×b^2×c^3+2×b^4×c^3-2×a^3×c^4-a×b^2×c^4+2×b^3×c^4+2×a^2×c^5-b^2×c^5+a×c^6-c^7) in
        cPointhb h_x_2685.
Definition X_2686 :=
        let h_x_2686 a b c := (b^2-c^2)^2*(-5×a^2+b^2+c^2)*(-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+9×a^2×b^2×c^2-4×b^4×c^2-a^2×c^4-4×b^2×c^4+c^6) in
        cPointhb h_x_2686.
Definition X_2687 :=
        let h_x_2687 a b c := a/(-a^5×b+a^4×b^2+2×a^3×b^3-2×a^2×b^4-a×b^5+b^6-a^5×c-a^3×b^2×c+2×a×b^4×c+a^4×c^2-a^3×b×c^2+2×a^2×b^2×c^2-a×b^3×c^2-b^4×c^2+2×a^3×c^3-a×b^2×c^3-2×a^2×c^4+2×a×b×c^4-b^2×c^4-a×c^5+c^6) in
        cPointhb h_x_2687.
Definition X_2688 :=
        let h_x_2688 a b c := 1/(-a^5×b^2+a^4×b^3+2×a^3×b^4-2×a^2×b^5-a×b^6+b^7-a^5×c^2-2×a^3×b^2×c^2+a^2×b^3×c^2+a×b^4×c^2+b^5×c^2+a^4×c^3+a^2×b^2×c^3-2×b^4×c^3+2×a^3×c^4+a×b^2×c^4-2×b^3×c^4-2×a^2×c^5+b^2×c^5-a×c^6+c^7) in
        cPointhb h_x_2688.
Definition X_2689 :=
        let h_x_2689 a b c := 1/((b-c)*(a^4×b-2×a^2×b^3+b^5+a^4×c-a^3×b×c-a^2×b^2×c+a×b^3×c-a^2×b×c^2+a×b^2×c^2-2×a^2×c^3+a×b×c^3+c^5)) in
        cPointhb h_x_2689.
Definition X_2690 :=
        let h_x_2690 a b c := 1/((b-c)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c-a^2×b×c-a×b^2×c+b^3×c-a^2×c^2-a×b×c^2+b^2×c^2-a×c^3+b×c^3+c^4)) in
        cPointhb h_x_2690.
Definition X_2691 :=
        let h_x_2691 a b c := 1/(b*(b-c)*c*(a^5-a^4×b-a×b^4+b^5-a^4×c-a^3×b×c+4×a^2×b^2×c-a×b^3×c-b^4×c+4×a^2×b×c^2-2×a×b^2×c^2-a×b×c^3-a×c^4-b×c^4+c^5)) in
        cPointhb h_x_2691.
Definition X_2692 :=
        let h_x_2692 a b c := 1/((b-c)*(a^4×b-2×a^2×b^3+b^5+a^4×c-3×a^3×b×c+a^2×b^2×c+3×a×b^3×c-2×b^4×c+a^2×b×c^2+3×a×b^2×c^2-2×b^3×c^2-2×a^2×c^3+3×a×b×c^3-2×b^2×c^3-2×b×c^4+c^5)) in
        cPointhb h_x_2692.
Definition X_2693 :=
        let h_x_2693 a b c := 1/(b^2×c^2*(-2×a^10+2×a^8×b^2+5×a^6×b^4-7×a^4×b^6+a^2×b^8+b^10+2×a^8×c^2-12×a^6×b^2×c^2+7×a^4×b^4×c^2+6×a^2×b^6×c^2-3×b^8×c^2+5×a^6×c^4+7×a^4×b^2×c^4-14×a^2×b^4×c^4+2×b^6×c^4-7×a^4×c^6+6×a^2×b^2×c^6+2×b^4×c^6+a^2×c^8-3×b^2×c^8+c^10)) in
        cPointhb h_x_2693.
Definition X_2694 :=
        let h_x_2694 a b c := 1/(b×c*(a^8×b-2×a^6×b^3+2×a^2×b^7-b^9+a^8×c-2×a^7×b×c+a^6×b^2×c+a^5×b^3×c-4×a^4×b^4×c+4×a^3×b^5×c+a^2×b^6×c-3×a×b^7×c+b^8×c+a^6×b×c^2+4×a^4×b^3×c^2-7×a^2×b^5×c^2+2×b^7×c^2-2×a^6×c^3+a^5×b×c^3+4×a^4×b^2×c^3-8×a^3×b^3×c^3+4×a^2×b^4×c^3+3×a×b^5×c^3-2×b^6×c^3-4×a^4×b×c^4+4×a^2×b^3×c^4+4×a^3×b×c^5-7×a^2×b^2×c^5+3×a×b^3×c^5+a^2×b×c^6-2×b^3×c^6+2×a^2×c^7-3×a×b×c^7+2×b^2×c^7+b×c^8-c^9)) in
        cPointhb h_x_2694.
Definition X_2695 :=
        let h_x_2695 a b c := 1/(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8-a^5×b^2×c+a^4×b^3×c+2×a^3×b^4×c-2×a^2×b^5×c-a×b^6×c+b^7×c+a^6×c^2-a^5×b×c^2+2×a^4×b^2×c^2-a^3×b^3×c^2-2×a^2×b^4×c^2+2×a×b^5×c^2-b^6×c^2+a^4×b×c^3-a^3×b^2×c^3+2×a^2×b^3×c^3-a×b^4×c^3-b^5×c^3-3×a^4×c^4+2×a^3×b×c^4-2×a^2×b^2×c^4-a×b^3×c^4+4×b^4×c^4-2×a^2×b×c^5+2×a×b^2×c^5-b^3×c^5+3×a^2×c^6-a×b×c^6-b^2×c^6+b×c^7-c^8) in
        cPointhb h_x_2695.
Definition X_2696 :=
        let h_x_2696 a b c := 1/((b^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+9×a^2×b^2×c^2-4×b^4×c^2-a^2×c^4-4×b^2×c^4+c^6)) in
        cPointhb h_x_2696.
Definition X_2697 :=
        let h_x_2697 a b c := 1/(-a^8×b^2+2×a^6×b^4-2×a^2×b^8+b^10-a^8×c^2-a^4×b^4×c^2+2×a^2×b^6×c^2+2×a^6×c^4-a^4×b^2×c^4-b^6×c^4+2×a^2×b^2×c^6-b^4×c^6-2×a^2×c^8+c^10) in
        cPointhb h_x_2697.
Definition X_2698 :=
        let h_x_2698 a b c := a^2/(-a^6×b^2+a^4×b^4-a^6×c^2+2×a^4×b^2×c^2-a^2×b^4×c^2+b^6×c^2+a^4×c^4-a^2×b^2×c^4-2×b^4×c^4+b^2×c^6) in
        cPointhb h_x_2698.
Definition X_2699 :=
        let h_x_2699 a b c := a^2/(-a^5×b+a^3×b^3-a^5×c+2×a^4×b×c-a^2×b^3×c-a×b^4×c+b^5×c+a×b^3×c^2+a^3×c^3-a^2×b×c^3+a×b^2×c^3-2×b^3×c^3-a×b×c^4+b×c^5) in
        cPointhb h_x_2699.
Definition X_2700 :=
        let h_x_2700 a b c := a^2/(-2×a^5+a^4×b+a^3×b^2-a×b^4+b^5+a^4×c-a^2×b^2×c+a^3×c^2-a^2×b×c^2+2×a×b^2×c^2-b^3×c^2-b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_2700.
Definition X_2701 :=
        let h_x_2701 a b c := a^2/((b-c)*(a^3-2×a^2×b+b^3-2×a^2×c+a×b×c+c^3)) in
        cPointhb h_x_2701.
Definition X_2702 :=
        let h_x_2702 a b c := 1/(b^2*(b-c)*c^2*(a^2+a×b-b^2+a×c-b×c-c^2)) in
        cPointhb h_x_2702.
Definition X_2703 :=
        let h_x_2703 a b c := 1/(b^2*(b-c)*c^2*(-a^3-a×b×c+b^2×c+b×c^2)) in
        cPointhb h_x_2703.
Definition X_2704 :=
        let h_x_2704 a b c := 1/(b^2*(b-c)*c^2*(-a^5+2×a^4×b-a^3×b^2+2×a^4×c-a^3×b×c+a^2×b^2×c-a×b^3×c+b^4×c-a^3×c^2+a^2×b×c^2-b^3×c^2-a×b×c^3-b^2×c^3+b×c^4)) in
        cPointhb h_x_2704.
Definition X_2705 :=
        let h_x_2705 a b c := 1/(b^2*(b-c)*c^2*(3×a^3-2×a^2×b+b^3-2×a^2×c+3×a×b×c-2×b^2×c-2×b×c^2+c^3)) in
        cPointhb h_x_2705.
Definition X_2706 :=
        let h_x_2706 a b c := a^2/(a^10×b^2-3×a^8×b^4+3×a^6×b^6-a^4×b^8+a^10×c^2+2×a^8×b^2×c^2-2×a^6×b^4×c^2+a^4×b^6×c^2-a^2×b^8×c^2-b^10×c^2-3×a^8×c^4-2×a^6×b^2×c^4+a^2×b^6×c^4+4×b^8×c^4+3×a^6×c^6+a^4×b^2×c^6+a^2×b^4×c^6-6×b^6×c^6-a^4×c^8-a^2×b^2×c^8+4×b^4×c^8-b^2×c^10) in
        cPointhb h_x_2706.
Definition X_2707 :=
        let h_x_2707 a b c := 1/(b^2×c^2*(a^8×b-a^7×b^2-2×a^6×b^3+2×a^5×b^4+a^4×b^5-a^3×b^6+a^8×c+a^6×b^2×c-2×a^4×b^4×c+a^2×b^6×c-b^8×c-a^7×c^2+a^6×b×c^2-2×a^5×b^2×c^2+a^4×b^3×c^2+a^3×b^4×c^2+a^2×b^5×c^2-2×a×b^6×c^2+b^7×c^2-2×a^6×c^3+a^4×b^2×c^3-2×a^2×b^4×c^3+3×b^6×c^3+2×a^5×c^4-2×a^4×b×c^4+a^3×b^2×c^4-2×a^2×b^3×c^4+4×a×b^4×c^4-3×b^5×c^4+a^4×c^5+a^2×b^2×c^5-3×b^4×c^5-a^3×c^6+a^2×b×c^6-2×a×b^2×c^6+3×b^3×c^6+b^2×c^7-b×c^8)) in
        cPointhb h_x_2707.
Definition X_2708 :=
        let h_x_2708 a b c := 1/(b^2×c^2*(2×a^6-a^5×b-2×a^4×b^2+a^3×b^3+a^2×b^4-b^6-a^5×c+2×a^4×b×c-a^2×b^3×c-a×b^4×c+b^5×c-2×a^4×c^2+a×b^3×c^2+b^4×c^2+a^3×c^3-a^2×b×c^3+a×b^2×c^3-2×b^3×c^3+a^2×c^4-a×b×c^4+b^2×c^4+b×c^5-c^6)) in
        cPointhb h_x_2708.
Definition X_2709 :=
        let h_x_2709 a b c := 1/(b^2×c^2*(b^2-c^2)*(4×a^4-a^2×b^2+b^4-a^2×c^2-4×b^2×c^2+c^4)) in
        cPointhb h_x_2709.
Definition X_2710 :=
        let h_x_2710 a b c := 1/(b^2×c^2*(-2×a^8+2×a^6×b^2-a^4×b^4+b^8+2×a^6×c^2-2×b^6×c^2-a^4×c^4+2×b^4×c^4-2×b^2×c^6+c^8)) in
        cPointhb h_x_2710.
Definition X_2711 :=
        let h_x_2711 a b c := 1/(b^2×c^2*(-a^4×b+a^3×b^2-a^4×c+a^2×b^2×c+b^4×c+a^3×c^2+a^2×b×c^2-2×a×b^2×c^2-b^3×c^2-b^2×c^3+b×c^4)) in
        cPointhb h_x_2711.
Definition X_2712 :=
        let h_x_2712 a b c := 1/(b^2×c^2*(-2×a^3+a^2×b+a×b^2+b^3+a^2×c-2×b^2×c+a×c^2-2×b×c^2+c^3)) in
        cPointhb h_x_2712.
Definition X_2713 :=
        let h_x_2713 a b c := 1/(b^2×c^2*(b^2-c^2)*(-a^4+a^2×b^2-a^2×b×c+b^3×c+a^2×c^2-2×b^2×c^2+b×c^3)*(a^4-a^2×b^2-a^2×b×c+b^3×c-a^2×c^2+2×b^2×c^2+b×c^3)) in
        cPointhb h_x_2713.
Definition X_2714 :=
        let h_x_2714 a b c := 1/(b^2×c^2*(-b+c)*(-a^6+a^5×b+a^4×b^2-a^3×b^3+a^5×c-a^4×b×c-a^3×b^2×c+b^5×c+a^4×c^2-a^3×b×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2-a^3×c^3+2×a×b^2×c^3-2×b^3×c^3+b×c^5)) in
        cPointhb h_x_2714.
Definition X_2715 :=
        let h_x_2715 a b c := 1/(b^2×c^2*(b^2-c^2)*(-a^2×b^2+b^4-a^2×c^2+c^4)) in
        cPointhb h_x_2715.
Definition X_2716 :=
        let h_x_2716 a b c := 1/(b×c*(-a^5×b+a^4×b^2+2×a^3×b^3-2×a^2×b^4-a×b^5+b^6-a^5×c+2×a^4×b×c-3×a^3×b^2×c-a^2×b^3×c+4×a×b^4×c-b^5×c+a^4×c^2-3×a^3×b×c^2+6×a^2×b^2×c^2-3×a×b^3×c^2-b^4×c^2+2×a^3×c^3-a^2×b×c^3-3×a×b^2×c^3+2×b^3×c^3-2×a^2×c^4+4×a×b×c^4-b^2×c^4-a×c^5-b×c^5+c^6)) in
        cPointhb h_x_2716.
Definition X_2717 :=
        let h_x_2717 a b c := 1/(b×c*(-a^4×b+2×a^3×b^2-2×a×b^4+b^5-a^4×c-a^2×b^2×c+2×a×b^3×c+2×a^3×c^2-a^2×b×c^2-b^3×c^2+2×a×b×c^3-b^2×c^3-2×a×c^4+c^5)) in
        cPointhb h_x_2717.
Definition X_2718 :=
        let h_x_2718 a b c := 1/(b×c*(-a^2×b+b^3-a^2×c+4×a×b×c-2×b^2×c-2×b×c^2+c^3)) in
        cPointhb h_x_2718.
Definition X_2719 :=
        let h_x_2719 a b c := a/(b*(b-c)*c*(a^7-2×a^5×b^2+a^3×b^4-3×a^5×b×c+3×a^4×b^2×c+2×a^3×b^3×c-2×a^2×b^4×c+a×b^5×c-b^6×c-2×a^5×c^2+3×a^4×b×c^2+2×a^3×b^2×c^2-2×a^2×b^3×c^2-b^5×c^2+2×a^3×b×c^3-2×a^2×b^2×c^3-2×a×b^3×c^3+2×b^4×c^3+a^3×c^4-2×a^2×b×c^4+2×b^3×c^4+a×b×c^5-b^2×c^5-b×c^6)) in
        cPointhb h_x_2719.
Definition X_2720 :=
        let h_x_2720 a b c := 1/(b^2*(b-c)*c^2*(-a+b+c)*(-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3)) in
        cPointhb h_x_2720.
Definition X_2721 :=
        let h_x_2721 a b c := 1/(b×c*(-a^3×b+a^2×b^2-a×b^3+b^4-a^3×c+2×a×b^2×c+a^2×c^2+2×a×b×c^2-4×b^2×c^2-a×c^3+c^4)) in
        cPointhb h_x_2721.
Definition X_2722 :=
        let h_x_2722 a b c := 1/(b×c*(-b+c)*(a^5-a^4×b-a×b^4+b^5-a^4×c+a^3×b×c-a×b^3×c+b^4×c-a×b×c^3-a×c^4+b×c^4+c^5)) in
        cPointhb h_x_2722.
Definition X_2723 :=
        let h_x_2723 a b c := 1/(-a^5×b^2+a^4×b^3+2×a^3×b^4-2×a^2×b^5-a×b^6+b^7+a^4×b^2×c-2×a^3×b^3×c+2×a×b^5×c-b^6×c-a^5×c^2+a^4×b×c^2-2×a^3×b^2×c^2+2×a^2×b^3×c^2-a×b^4×c^2+b^5×c^2+a^4×c^3-2×a^3×b×c^3+2×a^2×b^2×c^3-b^4×c^3+2×a^3×c^4-a×b^2×c^4-b^3×c^4-2×a^2×c^5+2×a×b×c^5+b^2×c^5-a×c^6-b×c^6+c^7) in
        cPointhb h_x_2723.
Definition X_2724 :=
        let h_x_2724 a b c := 1/(-a^4×b^2+2×a^3×b^3-2×a×b^5+b^6-a^4×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2+2×a^3×c^3+2×a×b^2×c^3-4×b^3×c^3+b^2×c^4-2×a×c^5+c^6) in
        cPointhb h_x_2724.
Definition X_2725 :=
        let h_x_2725 a b c := 1/(b×c*(-a^3×b+a^2×b^2-a×b^3+b^4-a^3×c+2×a^2×b×c-b^3×c+a^2×c^2-a×c^3-b×c^3+c^4)) in
        cPointhb h_x_2725.
Definition X_2726 :=
        let h_x_2726 a b c := 1/(-a^2×b^2+b^4+2×a×b^2×c-2×b^3×c-a^2×c^2+2×a×b×c^2-2×b×c^3+c^4) in
        cPointhb h_x_2726.
Definition X_2727 :=
        let h_x_2727 a b c := 1/(b^2*(b-c)*c^2*(a^6-3×a^5×b+a^4×b^2+2×a^3×b^3-a^2×b^4+a×b^5-b^6-3×a^5×c+3×a^4×b×c+2×a^3×b^2×c-2×a^2×b^3×c+a×b^4×c-b^5×c+a^4×c^2+2×a^3×b×c^2-2×a^2×b^2×c^2-2×a×b^3×c^2+b^4×c^2+2×a^3×c^3-2×a^2×b×c^3-2×a×b^2×c^3+2×b^3×c^3-a^2×c^4+a×b×c^4+b^2×c^4+a×c^5-b×c^5-c^6)) in
        cPointhb h_x_2727.
Definition X_2728 :=
        let h_x_2728 a b c := 1/(b×c*(-b+c)*(a^5-a^4×b-a×b^4+b^5-a^4×c+3×a^3×b×c-3×a^2×b^2×c+a×b^3×c-3×a^2×b×c^2+4×a×b^2×c^2-b^3×c^2+a×b×c^3-b^2×c^3-a×c^4+c^5)) in
        cPointhb h_x_2728.
Definition X_2729 :=
        let h_x_2729 a b c := 1/(-a^3×b^2+a^2×b^3-a×b^4+b^5-a^3×c^2+4×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_2729.
Definition X_2730 :=
        let h_x_2730 a b c := 1/(b*(b-c)*c*(a^5-a^4×b-a×b^4+b^5-a^4×c-a^3×b×c+3×a^2×b^2×c+a×b^3×c-2×b^4×c+3×a^2×b×c^2-4×a×b^2×c^2+b^3×c^2+a×b×c^3+b^2×c^3-a×c^4-2×b×c^4+c^5)) in
        cPointhb h_x_2730.
Definition X_2731 :=
        let h_x_2731 a b c := 1/((b-c)*(a^4×b-2×a^2×b^3+b^5+a^4×c-4×a^3×b×c+2×a^2×b^2×c+4×a×b^3×c-3×b^4×c+2×a^2×b×c^2-2×a×b^2×c^2-2×a^2×c^3+4×a×b×c^3-3×b×c^4+c^5)) in
        cPointhb h_x_2731.
Definition X_2732 :=
        let h_x_2732 a b c := 1/(b^2×c^2*(-2×a^10+a^9×b+2×a^8×b^2-3×a^7×b^3+5×a^6×b^4+3×a^5×b^5-7×a^4×b^6-a^3×b^7+a^2×b^8+b^10+a^9×c-2×a^8×b×c+2×a^7×b^2×c+a^6×b^3×c-6×a^5×b^4×c+3×a^4×b^5×c+2×a^3×b^6×c-a^2×b^7×c+a×b^8×c-b^9×c+2×a^8×c^2+2×a^7×b×c^2-12×a^6×b^2×c^2+3×a^5×b^3×c^2+7×a^4×b^4×c^2-4×a^3×b^5×c^2+6×a^2×b^6×c^2-a×b^7×c^2-3×b^8×c^2-3×a^7×c^3+a^6×b×c^3+3×a^5×b^2×c^3-6×a^4×b^3×c^3+3×a^3×b^4×c^3+a^2×b^5×c^3-3×a×b^6×c^3+4×b^7×c^3+5×a^6×c^4-6×a^5×b×c^4+7×a^4×b^2×c^4+3×a^3×b^3×c^4-14×a^2×b^4×c^4+3×a×b^5×c^4+2×b^6×c^4+3×a^5×c^5+3×a^4×b×c^5-4×a^3×b^2×c^5+a^2×b^3×c^5+3×a×b^4×c^5-6×b^5×c^5-7×a^4×c^6+2×a^3×b×c^6+6×a^2×b^2×c^6-3×a×b^3×c^6+2×b^4×c^6-a^3×c^7-a^2×b×c^7-a×b^2×c^7+4×b^3×c^7+a^2×c^8+a×b×c^8-3×b^2×c^8-b×c^9+c^10)) in
        cPointhb h_x_2732.
Definition X_2733 :=
        let h_x_2733 a b c := 1/(b×c*(a^8×b-2×a^6×b^3+2×a^2×b^7-b^9+a^8×c-4×a^7×b×c+3×a^6×b^2×c+4×a^5×b^3×c-7×a^4×b^4×c+4×a^3×b^5×c+a^2×b^6×c-4×a×b^7×c+2×b^8×c+3×a^6×b×c^2-8×a^5×b^2×c^2+7×a^4×b^3×c^2+4×a^3×b^4×c^2-11×a^2×b^5×c^2+4×a×b^6×c^2+b^7×c^2-2×a^6×c^3+4×a^5×b×c^3+7×a^4×b^2×c^3-16×a^3×b^3×c^3+8×a^2×b^4×c^3+4×a×b^5×c^3-5×b^6×c^3-7×a^4×b×c^4+4×a^3×b^2×c^4+8×a^2×b^3×c^4-8×a×b^4×c^4+3×b^5×c^4+4×a^3×b×c^5-11×a^2×b^2×c^5+4×a×b^3×c^5+3×b^4×c^5+a^2×b×c^6+4×a×b^2×c^6-5×b^3×c^6+2×a^2×c^7-4×a×b×c^7+b^2×c^7+2×b×c^8-c^9)) in
        cPointhb h_x_2733.
Definition X_2734 :=
        let h_x_2734 a b c := 1/(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8-2×a^5×b^2×c+2×a^4×b^3×c+4×a^3×b^4×c-4×a^2×b^5×c-2×a×b^6×c+2×b^7×c+a^6×c^2-2×a^5×b×c^2+4×a^4×b^2×c^2-4×a^3×b^3×c^2-3×a^2×b^4×c^2+6×a×b^5×c^2-2×b^6×c^2+2×a^4×b×c^3-4×a^3×b^2×c^3+8×a^2×b^3×c^3-4×a×b^4×c^3-2×b^5×c^3-3×a^4×c^4+4×a^3×b×c^4-3×a^2×b^2×c^4-4×a×b^3×c^4+6×b^4×c^4-4×a^2×b×c^5+6×a×b^2×c^5-2×b^3×c^5+3×a^2×c^6-2×a×b×c^6-2×b^2×c^6+2×b×c^7-c^8) in
        cPointhb h_x_2734.
Definition X_2735 :=
        let h_x_2735 a b c := 1/((b-c)*(a^6×b-a^4×b^3-a^2×b^5+b^7+a^6×c-a^5×b×c-a^2×b^4×c+a×b^5×c-5×a^3×b^2×c^2+9×a^2×b^3×c^2+a×b^4×c^2-5×b^5×c^2-a^4×c^3+9×a^2×b^2×c^3-4×a×b^3×c^3-a^2×b×c^4+a×b^2×c^4-a^2×c^5+a×b×c^5-5×b^2×c^5+c^7)) in
        cPointhb h_x_2735.
Definition X_2736 :=
        let h_x_2736 a b c := 1/(b*(b-c)*c*(a^4-2×a^3×b+2×a^2×b^2-2×a×b^3+b^4-2×a^3×c+3×a^2×b×c-b^3×c+2×a^2×c^2-2×a×c^3-b×c^3+c^4)) in
        cPointhb h_x_2736.
Definition X_2737 :=
        let h_x_2737 a b c := 1/((b-c)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c-4×a^2×b×c+5×a×b^2×c-2×b^3×c-a^2×c^2+5×a×b×c^2-2×b^2×c^2-a×c^3-2×b×c^3+c^4)) in
        cPointhb h_x_2737.
Definition X_2738 :=
        let h_x_2738 a b c := 1/(b^2×c^2*(-2×a^9+a^8×b+a^7×b^2+2×a^6×b^3+3×a^5×b^4-6×a^4×b^5-a^3×b^6+2×a^2×b^7-a×b^8+b^9+a^8×c-3×a^6×b^2×c+3×a^4×b^4×c-a^2×b^6×c+a^7×c^2-3×a^6×b×c^2-6×a^5×b^2×c^2+3×a^4×b^3×c^2+a^3×b^4×c^2+3×a^2×b^5×c^2+4×a×b^6×c^2-3×b^7×c^2+2×a^6×c^3+3×a^4×b^2×c^3-4×a^2×b^4×c^3-b^6×c^3+3×a^5×c^4+3×a^4×b×c^4+a^3×b^2×c^4-4×a^2×b^3×c^4-6×a×b^4×c^4+3×b^5×c^4-6×a^4×c^5+3×a^2×b^2×c^5+3×b^4×c^5-a^3×c^6-a^2×b×c^6+4×a×b^2×c^6-b^3×c^6+2×a^2×c^7-3×b^2×c^7-a×c^8+c^9)) in
        cPointhb h_x_2738.
Definition X_2739 :=
        let h_x_2739 a b c := 1/(b×c*(a^7×b-a^6×b^2-a^5×b^3+a^4×b^4-a^3×b^5+a^2×b^6+a×b^7-b^8+a^7×c-2×a^6×b×c+2×a^5×b^2×c-3×a^4×b^3×c+a^3×b^4×c+4×a^2×b^5×c-4×a×b^6×c+b^7×c-a^6×c^2+2×a^5×b×c^2+4×a^4×b^2×c^2-5×a^2×b^4×c^2-2×a×b^5×c^2+2×b^6×c^2-a^5×c^3-3×a^4×b×c^3+5×a×b^4×c^3-b^5×c^3+a^4×c^4+a^3×b×c^4-5×a^2×b^2×c^4+5×a×b^3×c^4-2×b^4×c^4-a^3×c^5+4×a^2×b×c^5-2×a×b^2×c^5-b^3×c^5+a^2×c^6-4×a×b×c^6+2×b^2×c^6+a×c^7+b×c^7-c^8)) in
        cPointhb h_x_2739.
Definition X_2740 :=
        let h_x_2740 a b c := 1/((b-c)*(a^5×b-a^4×b^2-a×b^5+b^6+a^5×c-a^4×b×c-a×b^4×c+b^5×c-a^4×c^2+5×a^2×b^2×c^2+4×a×b^3×c^2-4×b^4×c^2+4×a×b^2×c^3-4×b^3×c^3-a×b×c^4-4×b^2×c^4-a×c^5+b×c^5+c^6)) in
        cPointhb h_x_2740.
Definition X_2741 :=
        let h_x_2741 a b c := 1/(-a^7×b^2+a^6×b^3+a^5×b^4-a^4×b^5+a^3×b^6-a^2×b^7-a×b^8+b^9-a^7×c^2-a^3×b^4×c^2+2×a×b^6×c^2+a^6×c^3+a^2×b^4×c^3-2×b^6×c^3+a^5×c^4-a^3×b^2×c^4+a^2×b^3×c^4-2×a×b^4×c^4+b^5×c^4-a^4×c^5+b^4×c^5+a^3×c^6+2×a×b^2×c^6-2×b^3×c^6-a^2×c^7-a×c^8+c^9) in
        cPointhb h_x_2741.
Definition X_2742 :=
        let h_x_2742 a b c := 1/(b^2*(b-c)*c^2*(a^2×b-2×a×b^2+b^3+a^2×c+2×a×b×c-b^2×c-2×a×c^2-b×c^2+c^3)) in
        cPointhb h_x_2742.
Definition X_2743 :=
        let h_x_2743 a b c := 1/(b*(b-c)*c*(a^3-a^2×b-a×b^2+b^3-a^2×c+5×a×b×c-2×b^2×c-a×c^2-2×b×c^2+c^3)) in
        cPointhb h_x_2743.
Definition X_2744 :=
        let h_x_2744 a b c := 1/(b^2×c^2*(-a^9×b+3×a^7×b^3-3×a^5×b^5+a^3×b^7-a^9×c+2×a^8×b×c-2×a^7×b^2×c-a^6×b^3×c+6×a^5×b^4×c-3×a^4×b^5×c-2×a^3×b^6×c+a^2×b^7×c-a×b^8×c+b^9×c-2×a^7×b×c^2-3×a^5×b^3×c^2+4×a^3×b^5×c^2+a×b^7×c^2+3×a^7×c^3-a^6×b×c^3-3×a^5×b^2×c^3+6×a^4×b^3×c^3-3×a^3×b^4×c^3-a^2×b^5×c^3+3×a×b^6×c^3-4×b^7×c^3+6×a^5×b×c^4-3×a^3×b^3×c^4-3×a×b^5×c^4-3×a^5×c^5-3×a^4×b×c^5+4×a^3×b^2×c^5-a^2×b^3×c^5-3×a×b^4×c^5+6×b^5×c^5-2×a^3×b×c^6+3×a×b^3×c^6+a^3×c^7+a^2×b×c^7+a×b^2×c^7-4×b^3×c^7-a×b×c^8+b×c^9)) in
        cPointhb h_x_2744.
Definition X_2745 :=
        let h_x_2745 a b c := 1/(b^2×c^2*(2×a^7-2×a^6×b-3×a^5×b^2+3×a^4×b^3+a×b^6-b^7-2×a^6×c+8×a^5×b×c-3×a^4×b^2×c-4×a^3×b^3×c+4×a^2×b^4×c-4×a×b^5×c+b^6×c-3×a^5×c^2-3×a^4×b×c^2+8×a^3×b^2×c^2-4×a^2×b^3×c^2-a×b^4×c^2+3×b^5×c^2+3×a^4×c^3-4×a^3×b×c^3-4×a^2×b^2×c^3+8×a×b^3×c^3-3×b^4×c^3+4×a^2×b×c^4-a×b^2×c^4-3×b^3×c^4-4×a×b×c^5+3×b^2×c^5+a×c^6+b×c^6-c^7)) in
        cPointhb h_x_2745.
Definition X_2746 :=
        let h_x_2746 a b c := 1/(b*(b-c)*c*(a^5-a^4×b-a×b^4+b^5-a^4×c+5×a^3×b×c-a×b^3×c+b^4×c+4×a×b^2×c^2-4×b^3×c^2-a×b×c^3-4×b^2×c^3-a×c^4+b×c^4+c^5)) in
        cPointhb h_x_2746.
Definition X_2747 :=
        let h_x_2747 a b c := 1/(b×c*(-a^7×b+a^6×b^2+a^5×b^3-a^4×b^4+a^3×b^5-a^2×b^6-a×b^7+b^8-a^7×c-a^3×b^4×c+2×a×b^6×c+a^6×c^2+a^2×b^4×c^2-2×b^6×c^2+a^5×c^3-a×b^4×c^3-a^4×c^4-a^3×b×c^4+a^2×b^2×c^4-a×b^3×c^4+2×b^4×c^4+a^3×c^5-a^2×c^6+2×a×b×c^6-2×b^2×c^6-a×c^7+c^8)) in
        cPointhb h_x_2747.
Definition X_2748 :=
        let h_x_2748 a b c := 1/(b*(b-c)*c*(a^2+b^2-3×b×c+c^2)) in
        cPointhb h_x_2748.
Definition X_2749 :=
        let h_x_2749 a b c := 1/(b^2×c^2*(-a^8×b+a^7×b^2+2×a^6×b^3-2×a^5×b^4-a^4×b^5+a^3×b^6-a^8×c-a^6×b^2×c-2×a^4×b^4×c+3×a^2×b^6×c+b^8×c+a^7×c^2-a^6×b×c^2+2×a^5×b^2×c^2+3×a^4×b^3×c^2-a^3×b^4×c^2-a^2×b^5×c^2-2×a×b^6×c^2-b^7×c^2+2×a^6×c^3+3×a^4×b^2×c^3-2×a^2×b^4×c^3-3×b^6×c^3-2×a^5×c^4-2×a^4×b×c^4-a^3×b^2×c^4-2×a^2×b^3×c^4+4×a×b^4×c^4+3×b^5×c^4-a^4×c^5-a^2×b^2×c^5+3×b^4×c^5+a^3×c^6+3×a^2×b×c^6-2×a×b^2×c^6-3×b^3×c^6-b^2×c^7+b×c^8)) in
        cPointhb h_x_2749.
Definition X_2750 :=
        let h_x_2750 a b c := 1/(b^2×c^2*(2×a^6-2×a^5×b+a^4×b^2+2×a^3×b^3-2×a^2×b^4-b^6-2×a^5×c-2×a^3×b^2×c+2×a^2×b^3×c+2×b^5×c+a^4×c^2-2×a^3×b×c^2+b^4×c^2+2×a^3×c^3+2×a^2×b×c^3-4×b^3×c^3-2×a^2×c^4+b^2×c^4+2×b×c^5-c^6)) in
        cPointhb h_x_2750.
Definition X_2751 :=
        let h_x_2751 a b c := 1/(b×c*(a^4×b-b^5+a^4×c-4×a^3×b×c+a^2×b^2×c+2×b^4×c+a^2×b×c^2-b^3×c^2-b^2×c^3+2×b×c^4-c^5)) in
        cPointhb h_x_2751.
Definition X_2752 :=
        let h_x_2752 a b c := 1/(b×c*(-a^4×b+b^5-a^4×c+2×a^3×b×c+a^2×b^2×c-a×b^3×c-b^4×c+a^2×b×c^2-a×b×c^3-b×c^4+c^5)) in
        cPointhb h_x_2752.
Definition X_2753 :=
        let h_x_2753 a b c := 1/(b*(b-c)*c*(a^4+2×a^2×b^2+b^4+3×a^2×b×c-3×a×b^2×c+2×a^2×c^2-3×a×b×c^2-4×b^2×c^2+c^4)) in
        cPointhb h_x_2753.
Definition X_2754 :=
        let h_x_2754 a b c := 1/(b×c*(-a^6×b-a^4×b^3+a^2×b^5+b^7-a^6×c+2×a^5×b×c+2×a^4×b^2×c-a^3×b^3×c-a×b^5×c-b^6×c+2×a^4×b×c^2-a^2×b^3×c^2-b^5×c^2-a^4×c^3-a^3×b×c^3-a^2×b^2×c^3+2×a×b^3×c^3+b^4×c^3+b^3×c^4+a^2×c^5-a×b×c^5-b^2×c^5-b×c^6+c^7)) in
        cPointhb h_x_2754.
Definition X_2755 :=
        let h_x_2755 a b c := 1/(b^2×c^2*(-2×a^7+a^6×b+a^5×b^2-5×a^4×b^3+3×a^2×b^5+a×b^6+b^7+a^6×c+4×a^4×b^2×c-3×a^2×b^4×c-2×b^6×c+a^5×c^2+4×a^4×b×c^2-a×b^4×c^2-4×b^5×c^2-5×a^4×c^3+5×b^4×c^3-3×a^2×b×c^4-a×b^2×c^4+5×b^3×c^4+3×a^2×c^5-4×b^2×c^5+a×c^6-2×b×c^6+c^7)) in
        cPointhb h_x_2755.
Definition X_2756 :=
        let h_x_2756 a b c := 1/(b×c*(-a^5×b-a^4×b^2+a×b^5+b^6-a^5×c+6×a^4×b×c-a^3×b^2×c-3×a^2×b^3×c+2×a×b^4×c-3×b^5×c-a^4×c^2-a^3×b×c^2+6×a^2×b^2×c^2-3×a×b^3×c^2-b^4×c^2-3×a^2×b×c^3-3×a×b^2×c^3+6×b^3×c^3+2×a×b×c^4-b^2×c^4+a×c^5-3×b×c^5+c^6)) in
        cPointhb h_x_2756.
Definition X_2757 :=
        let h_x_2757 a b c := 1/(a^3×b^2+a^2×b^3-a×b^4-b^5-3×a^2×b^2×c+3×b^4×c+a^3×c^2-3×a^2×b×c^2+4×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-a×c^4+3×b×c^4-c^5) in
        cPointhb h_x_2757.
Definition X_2758 :=
        let h_x_2758 a b c := 1/(-a^3×b^2-a^2×b^3+a×b^4+b^5+2×a^2×b^2×c-2×b^4×c-a^3×c^2+2×a^2×b×c^2-a^2×c^3+a×c^4-2×b×c^4+c^5) in
        cPointhb h_x_2758.
Definition X_2759 :=
        let h_x_2759 a b c := 1/((b-c)*(a^3×b+a^2×b^2+a×b^3+b^4+a^3×c-a^2×b×c+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2-7×b^2×c^2+a×c^3-b×c^3+c^4)) in
        cPointhb h_x_2759.
Definition X_2760 :=
        let h_x_2760 a b c := 1/(-a^5×b^2-a^4×b^3+a×b^6+b^7+2×a^4×b^2×c-2×b^6×c-a^5×c^2+2×a^4×b×c^2+2×a^3×b^2×c^2-a^2×b^3×c^2-a×b^4×c^2-b^5×c^2-a^4×c^3-a^2×b^2×c^3+2×b^4×c^3-a×b^2×c^4+2×b^3×c^4-b^2×c^5+a×c^6-2×b×c^6+c^7) in
        cPointhb h_x_2760.
Definition X_2761 :=
        let h_x_2761 a b c := 1/(b^2*(b-c)*c^2*(a^10-a^9×b-3×a^8×b^2+3×a^7×b^3+3×a^6×b^4-3×a^5×b^5-a^4×b^6+a^3×b^7-a^9×c-3×a^8×b×c+3×a^7×b^2×c+2×a^6×b^3×c-3×a^5×b^4×c+4×a^4×b^5×c+a^3×b^6×c-2×a^2×b^7×c-b^9×c-3×a^8×c^2+3×a^7×b×c^2+a^4×b^4×c^2-a^3×b^5×c^2+2×a^2×b^6×c^2-2×a×b^7×c^2+3×a^7×c^3+2×a^6×b×c^3-8×a^4×b^3×c^3-a^3×b^4×c^3+2×a^2×b^5×c^3-2×a×b^6×c^3+4×b^7×c^3+3×a^6×c^4-3×a^5×b×c^4+a^4×b^2×c^4-a^3×b^3×c^4-4×a^2×b^4×c^4+4×a×b^5×c^4-3×a^5×c^5+4×a^4×b×c^5-a^3×b^2×c^5+2×a^2×b^3×c^5+4×a×b^4×c^5-6×b^5×c^5-a^4×c^6+a^3×b×c^6+2×a^2×b^2×c^6-2×a×b^3×c^6+a^3×c^7-2×a^2×b×c^7-2×a×b^2×c^7+4×b^3×c^7-b×c^9)) in
        cPointhb h_x_2761.
Definition X_2762 :=
        let h_x_2762 a b c := 1/(b^2*(b-c)*c^2*(a^7+2×a^6×b-2×a^5×b^2-3×a^4×b^3+a^3×b^4+b^7+2×a^6×c-3×a^5×b×c+2×a^3×b^3×c-2×a^2×b^4×c+a×b^5×c-2×a^5×c^2+2×a^3×b^2×c^2+2×a^2×b^3×c^2-2×b^5×c^2-3×a^4×c^3+2×a^3×b×c^3+2×a^2×b^2×c^3-2×a×b^3×c^3+b^4×c^3+a^3×c^4-2×a^2×b×c^4+b^3×c^4+a×b×c^5-2×b^2×c^5+c^7)) in
        cPointhb h_x_2762.
Definition X_2763 :=
        let h_x_2763 a b c := 1/(b^2×c^2*(-2×a^8+2×a^6×b^2-5×a^4×b^4+4×a^2×b^6+b^8+2×a^6×c^2+8×a^4×b^2×c^2-4×a^2×b^4×c^2-6×b^6×c^2-5×a^4×c^4-4×a^2×b^2×c^4+10×b^4×c^4+4×a^2×c^6-6×b^2×c^6+c^8)) in
        cPointhb h_x_2763.
Definition X_2764 :=
        let h_x_2764 a b c := 1/(b^2×c^2*(b^2-c^2)*(4×a^8-5×a^6×b^2-a^4×b^4+a^2×b^6+b^8-5×a^6×c^2+8×a^4×b^2×c^2-a^2×b^4×c^2-2×b^6×c^2-a^4×c^4-a^2×b^2×c^4+2×b^4×c^4+a^2×c^6-2×b^2×c^6+c^8)) in
        cPointhb h_x_2764.
Definition X_2765 :=
        let h_x_2765 a b c := 1/(b*(b-c)*c*(a^6-a^4×b^2-a^2×b^4+b^6+a^4×b×c-2×a^3×b^2×c+2×a×b^4×c-b^5×c-a^4×c^2-2×a^3×b×c^2+6×a^2×b^2×c^2-2×a×b^3×c^2-b^4×c^2-2×a×b^2×c^3+2×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-b×c^5+c^6)) in
        cPointhb h_x_2765.
Definition X_2766 :=
        let h_x_2766 a b c := 1/(b*(b-c)*c*(-a^2+b^2+c^2)*(-a^4+b^4-a^2×b×c+a×b^2×c+a×b×c^2-2×b^2×c^2+c^4)) in
        cPointhb h_x_2766.
Definition X_2767 :=
        let h_x_2767 a b c := 1/(b×c*(a^6×b+a^4×b^3-a^2×b^5-b^7+a^6×c-2×a^5×b×c-2×a^4×b^2×c+a^3×b^3×c+4×a^2×b^4×c-3×a×b^5×c+b^6×c-2×a^4×b×c^2-3×a^2×b^3×c^2+5×b^5×c^2+a^4×c^3+a^3×b×c^3-3×a^2×b^2×c^3+6×a×b^3×c^3-5×b^4×c^3+4×a^2×b×c^4-5×b^3×c^4-a^2×c^5-3×a×b×c^5+5×b^2×c^5+b×c^6-c^7)) in
        cPointhb h_x_2767.
Definition X_2768 :=
        let h_x_2768 a b c := 1/(a^4×b^2-b^6-a^3×b^2×c+a^2×b^3×c-a×b^4×c+b^5×c+a^4×c^2-a^3×b×c^2-4×a^2×b^2×c^2+2×a×b^3×c^2+2×b^4×c^2+a^2×b×c^3+2×a×b^2×c^3-4×b^3×c^3-a×b×c^4+2×b^2×c^4+b×c^5-c^6) in
        cPointhb h_x_2768.
Definition X_2769 :=
        let h_x_2769 a b c := 1/((b-c)*(a^6×b-a^4×b^3-a^2×b^5+b^7+a^6×c-a^5×b×c-a^2×b^4×c+a×b^5×c-a^3×b^2×c^2+a^2×b^3×c^2+a×b^4×c^2-b^5×c^2-a^4×c^3+a^2×b^2×c^3-a^2×b×c^4+a×b^2×c^4-a^2×c^5+a×b×c^5-b^2×c^5+c^7)) in
        cPointhb h_x_2769.
Definition X_2770 :=
        let h_x_2770 a b c := 1/(-a^4×b^2+b^6-a^4×c^2+4×a^2×b^2×c^2-2×b^4×c^2-2×b^2×c^4+c^6) in
        cPointhb h_x_2770.
Definition X_2771 :=
        let h_x_2771 a b c := a*(-a^5×b+a^4×b^2+2×a^3×b^3-2×a^2×b^4-a×b^5+b^6-a^5×c-a^3×b^2×c+2×a×b^4×c+a^4×c^2-a^3×b×c^2+2×a^2×b^2×c^2-a×b^3×c^2-b^4×c^2+2×a^3×c^3-a×b^2×c^3-2×a^2×c^4+2×a×b×c^4-b^2×c^4-a×c^5+c^6) in
        cPointhb h_x_2771.
Definition X_2772 :=
        let h_x_2772 a b c := a^2*(-a^5×b^2+a^4×b^3+2×a^3×b^4-2×a^2×b^5-a×b^6+b^7-a^5×c^2-2×a^3×b^2×c^2+a^2×b^3×c^2+a×b^4×c^2+b^5×c^2+a^4×c^3+a^2×b^2×c^3-2×b^4×c^3+2×a^3×c^4+a×b^2×c^4-2×b^3×c^4-2×a^2×c^5+b^2×c^5-a×c^6+c^7) in
        cPointhb h_x_2772.
Definition X_2773 :=
        let h_x_2773 a b c := a^2*(b-c)*(a^4×b-2×a^2×b^3+b^5+a^4×c-a^3×b×c-a^2×b^2×c+a×b^3×c-a^2×b×c^2+a×b^2×c^2-2×a^2×c^3+a×b×c^3+c^5) in
        cPointhb h_x_2773.
Definition X_2774 :=
        let h_x_2774 a b c := a^2*(b-c)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c-a^2×b×c-a×b^2×c+b^3×c-a^2×c^2-a×b×c^2+b^2×c^2-a×c^3+b×c^3+c^4) in
        cPointhb h_x_2774.
Definition X_2775 :=
        let h_x_2775 a b c := a*(b-c)*(a^5-a^4×b-a×b^4+b^5-a^4×c-a^3×b×c+4×a^2×b^2×c-a×b^3×c-b^4×c+4×a^2×b×c^2-2×a×b^2×c^2-a×b×c^3-a×c^4-b×c^4+c^5) in
        cPointhb h_x_2775.
Definition X_2776 :=
        let h_x_2776 a b c := a^2*(b-c)*(a^4×b-2×a^2×b^3+b^5+a^4×c-3×a^3×b×c+a^2×b^2×c+3×a×b^3×c-2×b^4×c+a^2×b×c^2+3×a×b^2×c^2-2×b^3×c^2-2×a^2×c^3+3×a×b×c^3-2×b^2×c^3-2×b×c^4+c^5) in
        cPointhb h_x_2776.
Definition X_2777 :=
        let h_x_2777 a b c := -2×a^10+2×a^8×b^2+5×a^6×b^4-7×a^4×b^6+a^2×b^8+b^10+2×a^8×c^2-12×a^6×b^2×c^2+7×a^4×b^4×c^2+6×a^2×b^6×c^2-3×b^8×c^2+5×a^6×c^4+7×a^4×b^2×c^4-14×a^2×b^4×c^4+2×b^6×c^4-7×a^4×c^6+6×a^2×b^2×c^6+2×b^4×c^6+a^2×c^8-3×b^2×c^8+c^10 in
        cPointhb h_x_2777.
Definition X_2778 :=
        let h_x_2778 a b c := a*(a^8×b-2×a^6×b^3+2×a^2×b^7-b^9+a^8×c-2×a^7×b×c+a^6×b^2×c+a^5×b^3×c-4×a^4×b^4×c+4×a^3×b^5×c+a^2×b^6×c-3×a×b^7×c+b^8×c+a^6×b×c^2+4×a^4×b^3×c^2-7×a^2×b^5×c^2+2×b^7×c^2-2×a^6×c^3+a^5×b×c^3+4×a^4×b^2×c^3-8×a^3×b^3×c^3+4×a^2×b^4×c^3+3×a×b^5×c^3-2×b^6×c^3-4×a^4×b×c^4+4×a^2×b^3×c^4+4×a^3×b×c^5-7×a^2×b^2×c^5+3×a×b^3×c^5+a^2×b×c^6-2×b^3×c^6+2×a^2×c^7-3×a×b×c^7+2×b^2×c^7+b×c^8-c^9) in
        cPointhb h_x_2778.
Definition X_2779 :=
        let h_x_2779 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8-a^5×b^2×c+a^4×b^3×c+2×a^3×b^4×c-2×a^2×b^5×c-a×b^6×c+b^7×c+a^6×c^2-a^5×b×c^2+2×a^4×b^2×c^2-a^3×b^3×c^2-2×a^2×b^4×c^2+2×a×b^5×c^2-b^6×c^2+a^4×b×c^3-a^3×b^2×c^3+2×a^2×b^3×c^3-a×b^4×c^3-b^5×c^3-3×a^4×c^4+2×a^3×b×c^4-2×a^2×b^2×c^4-a×b^3×c^4+4×b^4×c^4-2×a^2×b×c^5+2×a×b^2×c^5-b^3×c^5+3×a^2×c^6-a×b×c^6-b^2×c^6+b×c^7-c^8) in
        cPointhb h_x_2779.
Definition X_2780 :=
        let h_x_2780 a b c := a^2*(b^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+9×a^2×b^2×c^2-4×b^4×c^2-a^2×c^4-4×b^2×c^4+c^6) in
        cPointhb h_x_2780.
Definition X_2781 :=
        let h_x_2781 a b c := a^2*(-a^8×b^2+2×a^6×b^4-2×a^2×b^8+b^10-a^8×c^2-a^4×b^4×c^2+2×a^2×b^6×c^2+2×a^6×c^4-a^4×b^2×c^4-b^6×c^4+2×a^2×b^2×c^6-b^4×c^6-2×a^2×c^8+c^10) in
        cPointhb h_x_2781.
Definition X_2782 :=
        let h_x_2782 a b c := -a^6×b^2+a^4×b^4-a^6×c^2+2×a^4×b^2×c^2-a^2×b^4×c^2+b^6×c^2+a^4×c^4-a^2×b^2×c^4-2×b^4×c^4+b^2×c^6 in
        cPointhb h_x_2782.
Definition X_2783 :=
        let h_x_2783 a b c := -a^5×b+a^3×b^3-a^5×c+2×a^4×b×c-a^2×b^3×c-a×b^4×c+b^5×c+a×b^3×c^2+a^3×c^3-a^2×b×c^3+a×b^2×c^3-2×b^3×c^3-a×b×c^4+b×c^5 in
        cPointhb h_x_2783.
Definition X_2784 :=
        let h_x_2784 a b c := -2×a^5+a^4×b+a^3×b^2-a×b^4+b^5+a^4×c-a^2×b^2×c+a^3×c^2-a^2×b×c^2+2×a×b^2×c^2-b^3×c^2-b^2×c^3-a×c^4+c^5 in
        cPointhb h_x_2784.
Definition X_2785 :=
        let h_x_2785 a b c := (b-c)*(a^3-2×a^2×b+b^3-2×a^2×c+a×b×c+c^3) in
        cPointhb h_x_2785.
Definition X_2786 :=
        let h_x_2786 a b c := (b-c)*(a^2+a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_2786.
Definition X_2787 :=
        let h_x_2787 a b c := (b-c)*(-a^3-a×b×c+b^2×c+b×c^2) in
        cPointhb h_x_2787.
Definition X_2788 :=
        let h_x_2788 a b c := (b-c)*(-a^5+2×a^4×b-a^3×b^2+2×a^4×c-a^3×b×c+a^2×b^2×c-a×b^3×c+b^4×c-a^3×c^2+a^2×b×c^2-b^3×c^2-a×b×c^3-b^2×c^3+b×c^4) in
        cPointhb h_x_2788.
Definition X_2789 :=
        let h_x_2789 a b c := (b-c)*(3×a^3-2×a^2×b+b^3-2×a^2×c+3×a×b×c-2×b^2×c-2×b×c^2+c^3) in
        cPointhb h_x_2789.
Definition X_2790 :=
        let h_x_2790 a b c := a^10×b^2-3×a^8×b^4+3×a^6×b^6-a^4×b^8+a^10×c^2+2×a^8×b^2×c^2-2×a^6×b^4×c^2+a^4×b^6×c^2-a^2×b^8×c^2-b^10×c^2-3×a^8×c^4-2×a^6×b^2×c^4+a^2×b^6×c^4+4×b^8×c^4+3×a^6×c^6+a^4×b^2×c^6+a^2×b^4×c^6-6×b^6×c^6-a^4×c^8-a^2×b^2×c^8+4×b^4×c^8-b^2×c^10 in
        cPointhb h_x_2790.
Definition X_2791 :=
        let h_x_2791 a b c := a^8×b-a^7×b^2-2×a^6×b^3+2×a^5×b^4+a^4×b^5-a^3×b^6+a^8×c+a^6×b^2×c-2×a^4×b^4×c+a^2×b^6×c-b^8×c-a^7×c^2+a^6×b×c^2-2×a^5×b^2×c^2+a^4×b^3×c^2+a^3×b^4×c^2+a^2×b^5×c^2-2×a×b^6×c^2+b^7×c^2-2×a^6×c^3+a^4×b^2×c^3-2×a^2×b^4×c^3+3×b^6×c^3+2×a^5×c^4-2×a^4×b×c^4+a^3×b^2×c^4-2×a^2×b^3×c^4+4×a×b^4×c^4-3×b^5×c^4+a^4×c^5+a^2×b^2×c^5-3×b^4×c^5-a^3×c^6+a^2×b×c^6-2×a×b^2×c^6+3×b^3×c^6+b^2×c^7-b×c^8 in
        cPointhb h_x_2791.
Definition X_2792 :=
        let h_x_2792 a b c := 2×a^6-a^5×b-2×a^4×b^2+a^3×b^3+a^2×b^4-b^6-a^5×c+2×a^4×b×c-a^2×b^3×c-a×b^4×c+b^5×c-2×a^4×c^2+a×b^3×c^2+b^4×c^2+a^3×c^3-a^2×b×c^3+a×b^2×c^3-2×b^3×c^3+a^2×c^4-a×b×c^4+b^2×c^4+b×c^5-c^6 in
        cPointhb h_x_2792.
Definition X_2793 :=
        let h_x_2793 a b c := (b^2-c^2)*(4×a^4-a^2×b^2+b^4-a^2×c^2-4×b^2×c^2+c^4) in
        cPointhb h_x_2793.
Definition X_2794 :=
        let h_x_2794 a b c := -2×a^8+2×a^6×b^2-a^4×b^4+b^8+2×a^6×c^2-2×b^6×c^2-a^4×c^4+2×b^4×c^4-2×b^2×c^6+c^8 in
        cPointhb h_x_2794.
Definition X_2795 :=
        let h_x_2795 a b c := -a^4×b+a^3×b^2-a^4×c+a^2×b^2×c+b^4×c+a^3×c^2+a^2×b×c^2-2×a×b^2×c^2-b^3×c^2-b^2×c^3+b×c^4 in
        cPointhb h_x_2795.
Definition X_2796 :=
        let h_x_2796 a b c := -2×a^3+a^2×b+a×b^2+b^3+a^2×c-2×b^2×c+a×c^2-2×b×c^2+c^3 in
        cPointhb h_x_2796.
Definition X_2797 :=
        let h_x_2797 a b c := (b^2-c^2)*(-a^4+a^2×b^2-a^2×b×c+b^3×c+a^2×c^2-2×b^2×c^2+b×c^3)*(a^4-a^2×b^2-a^2×b×c+b^3×c-a^2×c^2+2×b^2×c^2+b×c^3) in
        cPointhb h_x_2797.
Definition X_2798 :=
        let h_x_2798 a b c := (b-c)*(-a^6+a^5×b+a^4×b^2-a^3×b^3+a^5×c-a^4×b×c-a^3×b^2×c+b^5×c+a^4×c^2-a^3×b×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2-a^3×c^3+2×a×b^2×c^3-2×b^3×c^3+b×c^5) in
        cPointhb h_x_2798.
Definition X_2799 :=
        let h_x_2799 a b c := (b^2-c^2)*(-a^2×b^2+b^4-a^2×c^2+c^4) in
        cPointhb h_x_2799.
Definition X_2800 :=
        let h_x_2800 a b c := a*(-a^5×b+a^4×b^2+2×a^3×b^3-2×a^2×b^4-a×b^5+b^6-a^5×c+2×a^4×b×c-3×a^3×b^2×c-a^2×b^3×c+4×a×b^4×c-b^5×c+a^4×c^2-3×a^3×b×c^2+6×a^2×b^2×c^2-3×a×b^3×c^2-b^4×c^2+2×a^3×c^3-a^2×b×c^3-3×a×b^2×c^3+2×b^3×c^3-2×a^2×c^4+4×a×b×c^4-b^2×c^4-a×c^5-b×c^5+c^6) in
        cPointhb h_x_2800.
Definition X_2801 :=
        let h_x_2801 a b c := a*(-a^4×b+2×a^3×b^2-2×a×b^4+b^5-a^4×c-a^2×b^2×c+2×a×b^3×c+2×a^3×c^2-a^2×b×c^2-b^3×c^2+2×a×b×c^3-b^2×c^3-2×a×c^4+c^5) in
        cPointhb h_x_2801.
Definition X_2802 :=
        let h_x_2802 a b c := a*(-a^2×b+b^3-a^2×c+4×a×b×c-2×b^2×c-2×b×c^2+c^3) in
        cPointhb h_x_2802.
Definition X_2803 :=
        let h_x_2803 a b c := (b-c)*(a^7-2×a^5×b^2+a^3×b^4-3×a^5×b×c+3×a^4×b^2×c+2×a^3×b^3×c-2×a^2×b^4×c+a×b^5×c-b^6×c-2×a^5×c^2+3×a^4×b×c^2+2×a^3×b^2×c^2-2×a^2×b^3×c^2-b^5×c^2+2×a^3×b×c^3-2×a^2×b^2×c^3-2×a×b^3×c^3+2×b^4×c^3+a^3×c^4-2×a^2×b×c^4+2×b^3×c^4+a×b×c^5-b^2×c^5-b×c^6) in
        cPointhb h_x_2803.
Definition X_2804 :=
        let h_x_2804 a b c := (b-c)*(-a+b+c)*(-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2804.
Definition X_2805 :=
        let h_x_2805 a b c := a*(-a^3×b+a^2×b^2-a×b^3+b^4-a^3×c+2×a×b^2×c+a^2×c^2+2×a×b×c^2-4×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_2805.
Definition X_2806 :=
        let h_x_2806 a b c := a*(-b+c)*(a^5-a^4×b-a×b^4+b^5-a^4×c+a^3×b×c-a×b^3×c+b^4×c-a×b×c^3-a×c^4+b×c^4+c^5) in
        cPointhb h_x_2806.
Definition X_2807 :=
        let h_x_2807 a b c := a^2*(-a^5×b^2+a^4×b^3+2×a^3×b^4-2×a^2×b^5-a×b^6+b^7+a^4×b^2×c-2×a^3×b^3×c+2×a×b^5×c-b^6×c-a^5×c^2+a^4×b×c^2-2×a^3×b^2×c^2+2×a^2×b^3×c^2-a×b^4×c^2+b^5×c^2+a^4×c^3-2×a^3×b×c^3+2×a^2×b^2×c^3-b^4×c^3+2×a^3×c^4-a×b^2×c^4-b^3×c^4-2×a^2×c^5+2×a×b×c^5+b^2×c^5-a×c^6-b×c^6+c^7) in
        cPointhb h_x_2807.
Definition X_2808 :=
        let h_x_2808 a b c := a^2*(-a^4×b^2+2×a^3×b^3-2×a×b^5+b^6-a^4×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2+2×a^3×c^3+2×a×b^2×c^3-4×b^3×c^3+b^2×c^4-2×a×c^5+c^6) in
        cPointhb h_x_2808.
Definition X_2809 :=
        let h_x_2809 a b c := a*(-a^3×b+a^2×b^2-a×b^3+b^4-a^3×c+2×a^2×b×c-b^3×c+a^2×c^2-a×c^3-b×c^3+c^4) in
        cPointhb h_x_2809.
Definition X_2810 :=
        let h_x_2810 a b c := a^2*(-a^2×b^2+b^4+2×a×b^2×c-2×b^3×c-a^2×c^2+2×a×b×c^2-2×b×c^3+c^4) in
        cPointhb h_x_2810.
Definition X_2811 :=
        let h_x_2811 a b c := (b-c)*(a^6-3×a^5×b+a^4×b^2+2×a^3×b^3-a^2×b^4+a×b^5-b^6-3×a^5×c+3×a^4×b×c+2×a^3×b^2×c-2×a^2×b^3×c+a×b^4×c-b^5×c+a^4×c^2+2×a^3×b×c^2-2×a^2×b^2×c^2-2×a×b^3×c^2+b^4×c^2+2×a^3×c^3-2×a^2×b×c^3-2×a×b^2×c^3+2×b^3×c^3-a^2×c^4+a×b×c^4+b^2×c^4+a×c^5-b×c^5-c^6) in
        cPointhb h_x_2811.
Definition X_2812 :=
        let h_x_2812 a b c := a*(-b+c)*(a^5-a^4×b-a×b^4+b^5-a^4×c+3×a^3×b×c-3×a^2×b^2×c+a×b^3×c-3×a^2×b×c^2+4×a×b^2×c^2-b^3×c^2+a×b×c^3-b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_2812.
Definition X_2813 :=
        let h_x_2813 a b c := a^2*(-a^3×b^2+a^2×b^3-a×b^4+b^5-a^3×c^2+4×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_2813.
Definition X_2814 :=
        let h_x_2814 a b c := a*(b-c)*(a^5-a^4×b-a×b^4+b^5-a^4×c-a^3×b×c+3×a^2×b^2×c+a×b^3×c-2×b^4×c+3×a^2×b×c^2-4×a×b^2×c^2+b^3×c^2+a×b×c^3+b^2×c^3-a×c^4-2×b×c^4+c^5) in
        cPointhb h_x_2814.
Definition X_2815 :=
        let h_x_2815 a b c := a^2*(b-c)*(a^4×b-2×a^2×b^3+b^5+a^4×c-4×a^3×b×c+2×a^2×b^2×c+4×a×b^3×c-3×b^4×c+2×a^2×b×c^2-2×a×b^2×c^2-2×a^2×c^3+4×a×b×c^3-3×b×c^4+c^5) in
        cPointhb h_x_2815.
Definition X_2816 :=
        let h_x_2816 a b c := -2×a^10+a^9×b+2×a^8×b^2-3×a^7×b^3+5×a^6×b^4+3×a^5×b^5-7×a^4×b^6-a^3×b^7+a^2×b^8+b^10+a^9×c-2×a^8×b×c+2×a^7×b^2×c+a^6×b^3×c-6×a^5×b^4×c+3×a^4×b^5×c+2×a^3×b^6×c-a^2×b^7×c+a×b^8×c-b^9×c+2×a^8×c^2+2×a^7×b×c^2-12×a^6×b^2×c^2+3×a^5×b^3×c^2+7×a^4×b^4×c^2-4×a^3×b^5×c^2+6×a^2×b^6×c^2-a×b^7×c^2-3×b^8×c^2-3×a^7×c^3+a^6×b×c^3+3×a^5×b^2×c^3-6×a^4×b^3×c^3+3×a^3×b^4×c^3+a^2×b^5×c^3-3×a×b^6×c^3+4×b^7×c^3+5×a^6×c^4-6×a^5×b×c^4+7×a^4×b^2×c^4+3×a^3×b^3×c^4-14×a^2×b^4×c^4+3×a×b^5×c^4+2×b^6×c^4+3×a^5×c^5+3×a^4×b×c^5-4×a^3×b^2×c^5+a^2×b^3×c^5+3×a×b^4×c^5-6×b^5×c^5-7×a^4×c^6+2×a^3×b×c^6+6×a^2×b^2×c^6-3×a×b^3×c^6+2×b^4×c^6-a^3×c^7-a^2×b×c^7-a×b^2×c^7+4×b^3×c^7+a^2×c^8+a×b×c^8-3×b^2×c^8-b×c^9+c^10 in
        cPointhb h_x_2816.
Definition X_2817 :=
        let h_x_2817 a b c := a*(a^8×b-2×a^6×b^3+2×a^2×b^7-b^9+a^8×c-4×a^7×b×c+3×a^6×b^2×c+4×a^5×b^3×c-7×a^4×b^4×c+4×a^3×b^5×c+a^2×b^6×c-4×a×b^7×c+2×b^8×c+3×a^6×b×c^2-8×a^5×b^2×c^2+7×a^4×b^3×c^2+4×a^3×b^4×c^2-11×a^2×b^5×c^2+4×a×b^6×c^2+b^7×c^2-2×a^6×c^3+4×a^5×b×c^3+7×a^4×b^2×c^3-16×a^3×b^3×c^3+8×a^2×b^4×c^3+4×a×b^5×c^3-5×b^6×c^3-7×a^4×b×c^4+4×a^3×b^2×c^4+8×a^2×b^3×c^4-8×a×b^4×c^4+3×b^5×c^4+4×a^3×b×c^5-11×a^2×b^2×c^5+4×a×b^3×c^5+3×b^4×c^5+a^2×b×c^6+4×a×b^2×c^6-5×b^3×c^6+2×a^2×c^7-4×a×b×c^7+b^2×c^7+2×b×c^8-c^9) in
        cPointhb h_x_2817.
Definition X_2818 :=
        let h_x_2818 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8-2×a^5×b^2×c+2×a^4×b^3×c+4×a^3×b^4×c-4×a^2×b^5×c-2×a×b^6×c+2×b^7×c+a^6×c^2-2×a^5×b×c^2+4×a^4×b^2×c^2-4×a^3×b^3×c^2-3×a^2×b^4×c^2+6×a×b^5×c^2-2×b^6×c^2+2×a^4×b×c^3-4×a^3×b^2×c^3+8×a^2×b^3×c^3-4×a×b^4×c^3-2×b^5×c^3-3×a^4×c^4+4×a^3×b×c^4-3×a^2×b^2×c^4-4×a×b^3×c^4+6×b^4×c^4-4×a^2×b×c^5+6×a×b^2×c^5-2×b^3×c^5+3×a^2×c^6-2×a×b×c^6-2×b^2×c^6+2×b×c^7-c^8) in
        cPointhb h_x_2818.
Definition X_2819 :=
        let h_x_2819 a b c := a^2*(b-c)*(a^6×b-a^4×b^3-a^2×b^5+b^7+a^6×c-a^5×b×c-a^2×b^4×c+a×b^5×c-5×a^3×b^2×c^2+9×a^2×b^3×c^2+a×b^4×c^2-5×b^5×c^2-a^4×c^3+9×a^2×b^2×c^3-4×a×b^3×c^3-a^2×b×c^4+a×b^2×c^4-a^2×c^5+a×b×c^5-5×b^2×c^5+c^7) in
        cPointhb h_x_2819.
Definition X_2820 :=
        let h_x_2820 a b c := a*(b-c)*(a^4-2×a^3×b+2×a^2×b^2-2×a×b^3+b^4-2×a^3×c+3×a^2×b×c-b^3×c+2×a^2×c^2-2×a×c^3-b×c^3+c^4) in
        cPointhb h_x_2820.
Definition X_2821 :=
        let h_x_2821 a b c := a^2*(b-c)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c-4×a^2×b×c+5×a×b^2×c-2×b^3×c-a^2×c^2+5×a×b×c^2-2×b^2×c^2-a×c^3-2×b×c^3+c^4) in
        cPointhb h_x_2821.
Definition X_2822 :=
        let h_x_2822 a b c := -2×a^9+a^8×b+a^7×b^2+2×a^6×b^3+3×a^5×b^4-6×a^4×b^5-a^3×b^6+2×a^2×b^7-a×b^8+b^9+a^8×c-3×a^6×b^2×c+3×a^4×b^4×c-a^2×b^6×c+a^7×c^2-3×a^6×b×c^2-6×a^5×b^2×c^2+3×a^4×b^3×c^2+a^3×b^4×c^2+3×a^2×b^5×c^2+4×a×b^6×c^2-3×b^7×c^2+2×a^6×c^3+3×a^4×b^2×c^3-4×a^2×b^4×c^3-b^6×c^3+3×a^5×c^4+3×a^4×b×c^4+a^3×b^2×c^4-4×a^2×b^3×c^4-6×a×b^4×c^4+3×b^5×c^4-6×a^4×c^5+3×a^2×b^2×c^5+3×b^4×c^5-a^3×c^6-a^2×b×c^6+4×a×b^2×c^6-b^3×c^6+2×a^2×c^7-3×b^2×c^7-a×c^8+c^9 in
        cPointhb h_x_2822.
Definition X_2823 :=
        let h_x_2823 a b c := a*(a^7×b-a^6×b^2-a^5×b^3+a^4×b^4-a^3×b^5+a^2×b^6+a×b^7-b^8+a^7×c-2×a^6×b×c+2×a^5×b^2×c-3×a^4×b^3×c+a^3×b^4×c+4×a^2×b^5×c-4×a×b^6×c+b^7×c-a^6×c^2+2×a^5×b×c^2+4×a^4×b^2×c^2-5×a^2×b^4×c^2-2×a×b^5×c^2+2×b^6×c^2-a^5×c^3-3×a^4×b×c^3+5×a×b^4×c^3-b^5×c^3+a^4×c^4+a^3×b×c^4-5×a^2×b^2×c^4+5×a×b^3×c^4-2×b^4×c^4-a^3×c^5+4×a^2×b×c^5-2×a×b^2×c^5-b^3×c^5+a^2×c^6-4×a×b×c^6+2×b^2×c^6+a×c^7+b×c^7-c^8) in
        cPointhb h_x_2823.
Definition X_2824 :=
        let h_x_2824 a b c := a^2*(b-c)*(a^5×b-a^4×b^2-a×b^5+b^6+a^5×c-a^4×b×c-a×b^4×c+b^5×c-a^4×c^2+5×a^2×b^2×c^2+4×a×b^3×c^2-4×b^4×c^2+4×a×b^2×c^3-4×b^3×c^3-a×b×c^4-4×b^2×c^4-a×c^5+b×c^5+c^6) in
        cPointhb h_x_2824.
Definition X_2825 :=
        let h_x_2825 a b c := a^2*(-a^7×b^2+a^6×b^3+a^5×b^4-a^4×b^5+a^3×b^6-a^2×b^7-a×b^8+b^9-a^7×c^2-a^3×b^4×c^2+2×a×b^6×c^2+a^6×c^3+a^2×b^4×c^3-2×b^6×c^3+a^5×c^4-a^3×b^2×c^4+a^2×b^3×c^4-2×a×b^4×c^4+b^5×c^4-a^4×c^5+b^4×c^5+a^3×c^6+2×a×b^2×c^6-2×b^3×c^6-a^2×c^7-a×c^8+c^9) in
        cPointhb h_x_2825.
Definition X_2826 :=
        let h_x_2826 a b c := (b-c)*(a^2×b-2×a×b^2+b^3+a^2×c+2×a×b×c-b^2×c-2×a×c^2-b×c^2+c^3) in
        cPointhb h_x_2826.
Definition X_2827 :=
        let h_x_2827 a b c := a*(b-c)*(a^3-a^2×b-a×b^2+b^3-a^2×c+5×a×b×c-2×b^2×c-a×c^2-2×b×c^2+c^3) in
        cPointhb h_x_2827.
Definition X_2828 :=
        let h_x_2828 a b c := -a^9×b+3×a^7×b^3-3×a^5×b^5+a^3×b^7-a^9×c+2×a^8×b×c-2×a^7×b^2×c-a^6×b^3×c+6×a^5×b^4×c-3×a^4×b^5×c-2×a^3×b^6×c+a^2×b^7×c-a×b^8×c+b^9×c-2×a^7×b×c^2-3×a^5×b^3×c^2+4×a^3×b^5×c^2+a×b^7×c^2+3×a^7×c^3-a^6×b×c^3-3×a^5×b^2×c^3+6×a^4×b^3×c^3-3×a^3×b^4×c^3-a^2×b^5×c^3+3×a×b^6×c^3-4×b^7×c^3+6×a^5×b×c^4-3×a^3×b^3×c^4-3×a×b^5×c^4-3×a^5×c^5-3×a^4×b×c^5+4×a^3×b^2×c^5-a^2×b^3×c^5-3×a×b^4×c^5+6×b^5×c^5-2×a^3×b×c^6+3×a×b^3×c^6+a^3×c^7+a^2×b×c^7+a×b^2×c^7-4×b^3×c^7-a×b×c^8+b×c^9 in
        cPointhb h_x_2828.
Definition X_2829 :=
        let h_x_2829 a b c := 2×a^7-2×a^6×b-3×a^5×b^2+3×a^4×b^3+a×b^6-b^7-2×a^6×c+8×a^5×b×c-3×a^4×b^2×c-4×a^3×b^3×c+4×a^2×b^4×c-4×a×b^5×c+b^6×c-3×a^5×c^2-3×a^4×b×c^2+8×a^3×b^2×c^2-4×a^2×b^3×c^2-a×b^4×c^2+3×b^5×c^2+3×a^4×c^3-4×a^3×b×c^3-4×a^2×b^2×c^3+8×a×b^3×c^3-3×b^4×c^3+4×a^2×b×c^4-a×b^2×c^4-3×b^3×c^4-4×a×b×c^5+3×b^2×c^5+a×c^6+b×c^6-c^7 in
        cPointhb h_x_2829.
Definition X_2830 :=
        let h_x_2830 a b c := a*(b-c)*(a^5-a^4×b-a×b^4+b^5-a^4×c+5×a^3×b×c-a×b^3×c+b^4×c+4×a×b^2×c^2-4×b^3×c^2-a×b×c^3-4×b^2×c^3-a×c^4+b×c^4+c^5) in
        cPointhb h_x_2830.
Definition X_2831 :=
        let h_x_2831 a b c := a*(-a^7×b+a^6×b^2+a^5×b^3-a^4×b^4+a^3×b^5-a^2×b^6-a×b^7+b^8-a^7×c-a^3×b^4×c+2×a×b^6×c+a^6×c^2+a^2×b^4×c^2-2×b^6×c^2+a^5×c^3-a×b^4×c^3-a^4×c^4-a^3×b×c^4+a^2×b^2×c^4-a×b^3×c^4+2×b^4×c^4+a^3×c^5-a^2×c^6+2×a×b×c^6-2×b^2×c^6-a×c^7+c^8) in
        cPointhb h_x_2831.
Definition X_2832 :=
        let h_x_2832 a b c := a*(b-c)*(a^2+b^2-3×b×c+c^2) in
        cPointhb h_x_2832.
Definition X_2833 :=
        let h_x_2833 a b c := -a^8×b+a^7×b^2+2×a^6×b^3-2×a^5×b^4-a^4×b^5+a^3×b^6-a^8×c-a^6×b^2×c-2×a^4×b^4×c+3×a^2×b^6×c+b^8×c+a^7×c^2-a^6×b×c^2+2×a^5×b^2×c^2+3×a^4×b^3×c^2-a^3×b^4×c^2-a^2×b^5×c^2-2×a×b^6×c^2-b^7×c^2+2×a^6×c^3+3×a^4×b^2×c^3-2×a^2×b^4×c^3-3×b^6×c^3-2×a^5×c^4-2×a^4×b×c^4-a^3×b^2×c^4-2×a^2×b^3×c^4+4×a×b^4×c^4+3×b^5×c^4-a^4×c^5-a^2×b^2×c^5+3×b^4×c^5+a^3×c^6+3×a^2×b×c^6-2×a×b^2×c^6-3×b^3×c^6-b^2×c^7+b×c^8 in
        cPointhb h_x_2833.
Definition X_2834 :=
        let h_x_2834 a b c := 2×a^6-2×a^5×b+a^4×b^2+2×a^3×b^3-2×a^2×b^4-b^6-2×a^5×c-2×a^3×b^2×c+2×a^2×b^3×c+2×b^5×c+a^4×c^2-2×a^3×b×c^2+b^4×c^2+2×a^3×c^3+2×a^2×b×c^3-4×b^3×c^3-2×a^2×c^4+b^2×c^4+2×b×c^5-c^6 in
        cPointhb h_x_2834.
Definition X_2835 :=
        let h_x_2835 a b c := a*(a^4×b-b^5+a^4×c-4×a^3×b×c+a^2×b^2×c+2×b^4×c+a^2×b×c^2-b^3×c^2-b^2×c^3+2×b×c^4-c^5) in
        cPointhb h_x_2835.
Definition X_2836 :=
        let h_x_2836 a b c := a*(-a^4×b+b^5-a^4×c+2×a^3×b×c+a^2×b^2×c-a×b^3×c-b^4×c+a^2×b×c^2-a×b×c^3-b×c^4+c^5) in
        cPointhb h_x_2836.
Definition X_2837 :=
        let h_x_2837 a b c := a*(b-c)*(a^4+2×a^2×b^2+b^4+3×a^2×b×c-3×a×b^2×c+2×a^2×c^2-3×a×b×c^2-4×b^2×c^2+c^4) in
        cPointhb h_x_2837.
Definition X_2838 :=
        let h_x_2838 a b c := a*(-a^6×b-a^4×b^3+a^2×b^5+b^7-a^6×c+2×a^5×b×c+2×a^4×b^2×c-a^3×b^3×c-a×b^5×c-b^6×c+2×a^4×b×c^2-a^2×b^3×c^2-b^5×c^2-a^4×c^3-a^3×b×c^3-a^2×b^2×c^3+2×a×b^3×c^3+b^4×c^3+b^3×c^4+a^2×c^5-a×b×c^5-b^2×c^5-b×c^6+c^7) in
        cPointhb h_x_2838.
Definition X_2839 :=
        let h_x_2839 a b c := -2×a^7+a^6×b+a^5×b^2-5×a^4×b^3+3×a^2×b^5+a×b^6+b^7+a^6×c+4×a^4×b^2×c-3×a^2×b^4×c-2×b^6×c+a^5×c^2+4×a^4×b×c^2-a×b^4×c^2-4×b^5×c^2-5×a^4×c^3+5×b^4×c^3-3×a^2×b×c^4-a×b^2×c^4+5×b^3×c^4+3×a^2×c^5-4×b^2×c^5+a×c^6-2×b×c^6+c^7 in
        cPointhb h_x_2839.
Definition X_2840 :=
        let h_x_2840 a b c := a*(-a^5×b-a^4×b^2+a×b^5+b^6-a^5×c+6×a^4×b×c-a^3×b^2×c-3×a^2×b^3×c+2×a×b^4×c-3×b^5×c-a^4×c^2-a^3×b×c^2+6×a^2×b^2×c^2-3×a×b^3×c^2-b^4×c^2-3×a^2×b×c^3-3×a×b^2×c^3+6×b^3×c^3+2×a×b×c^4-b^2×c^4+a×c^5-3×b×c^5+c^6) in
        cPointhb h_x_2840.
Definition X_2841 :=
        let h_x_2841 a b c := a^2*(a^3×b^2+a^2×b^3-a×b^4-b^5-3×a^2×b^2×c+3×b^4×c+a^3×c^2-3×a^2×b×c^2+4×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-a×c^4+3×b×c^4-c^5) in
        cPointhb h_x_2841.
Definition X_2842 :=
        let h_x_2842 a b c := a^2*(-a^3×b^2-a^2×b^3+a×b^4+b^5+2×a^2×b^2×c-2×b^4×c-a^3×c^2+2×a^2×b×c^2-a^2×c^3+a×c^4-2×b×c^4+c^5) in
        cPointhb h_x_2842.
Definition X_2843 :=
        let h_x_2843 a b c := a^2*(b-c)*(a^3×b+a^2×b^2+a×b^3+b^4+a^3×c-a^2×b×c+a×b^2×c-b^3×c+a^2×c^2+a×b×c^2-7×b^2×c^2+a×c^3-b×c^3+c^4) in
        cPointhb h_x_2843.
Definition X_2844 :=
        let h_x_2844 a b c := a^2*(-a^5×b^2-a^4×b^3+a×b^6+b^7+2×a^4×b^2×c-2×b^6×c-a^5×c^2+2×a^4×b×c^2+2×a^3×b^2×c^2-a^2×b^3×c^2-a×b^4×c^2-b^5×c^2-a^4×c^3-a^2×b^2×c^3+2×b^4×c^3-a×b^2×c^4+2×b^3×c^4-b^2×c^5+a×c^6-2×b×c^6+c^7) in
        cPointhb h_x_2844.
Definition X_2845 :=
        let h_x_2845 a b c := (b-c)*(a^10-a^9×b-3×a^8×b^2+3×a^7×b^3+3×a^6×b^4-3×a^5×b^5-a^4×b^6+a^3×b^7-a^9×c-3×a^8×b×c+3×a^7×b^2×c+2×a^6×b^3×c-3×a^5×b^4×c+4×a^4×b^5×c+a^3×b^6×c-2×a^2×b^7×c-b^9×c-3×a^8×c^2+3×a^7×b×c^2+a^4×b^4×c^2-a^3×b^5×c^2+2×a^2×b^6×c^2-2×a×b^7×c^2+3×a^7×c^3+2×a^6×b×c^3-8×a^4×b^3×c^3-a^3×b^4×c^3+2×a^2×b^5×c^3-2×a×b^6×c^3+4×b^7×c^3+3×a^6×c^4-3×a^5×b×c^4+a^4×b^2×c^4-a^3×b^3×c^4-4×a^2×b^4×c^4+4×a×b^5×c^4-3×a^5×c^5+4×a^4×b×c^5-a^3×b^2×c^5+2×a^2×b^3×c^5+4×a×b^4×c^5-6×b^5×c^5-a^4×c^6+a^3×b×c^6+2×a^2×b^2×c^6-2×a×b^3×c^6+a^3×c^7-2×a^2×b×c^7-2×a×b^2×c^7+4×b^3×c^7-b×c^9) in
        cPointhb h_x_2845.
Definition X_2846 :=
        let h_x_2846 a b c := (b-c)*(a^7+2×a^6×b-2×a^5×b^2-3×a^4×b^3+a^3×b^4+b^7+2×a^6×c-3×a^5×b×c+2×a^3×b^3×c-2×a^2×b^4×c+a×b^5×c-2×a^5×c^2+2×a^3×b^2×c^2+2×a^2×b^3×c^2-2×b^5×c^2-3×a^4×c^3+2×a^3×b×c^3+2×a^2×b^2×c^3-2×a×b^3×c^3+b^4×c^3+a^3×c^4-2×a^2×b×c^4+b^3×c^4+a×b×c^5-2×b^2×c^5+c^7) in
        cPointhb h_x_2846.
Definition X_2847 :=
        let h_x_2847 a b c := -2×a^8+2×a^6×b^2-5×a^4×b^4+4×a^2×b^6+b^8+2×a^6×c^2+8×a^4×b^2×c^2-4×a^2×b^4×c^2-6×b^6×c^2-5×a^4×c^4-4×a^2×b^2×c^4+10×b^4×c^4+4×a^2×c^6-6×b^2×c^6+c^8 in
        cPointhb h_x_2847.
Definition X_2848 :=
        let h_x_2848 a b c := (b^2-c^2)*(4×a^8-5×a^6×b^2-a^4×b^4+a^2×b^6+b^8-5×a^6×c^2+8×a^4×b^2×c^2-a^2×b^4×c^2-2×b^6×c^2-a^4×c^4-a^2×b^2×c^4+2×b^4×c^4+a^2×c^6-2×b^2×c^6+c^8) in
        cPointhb h_x_2848.
Definition X_2849 :=
        let h_x_2849 a b c := a*(b-c)*(a^6-a^4×b^2-a^2×b^4+b^6+a^4×b×c-2×a^3×b^2×c+2×a×b^4×c-b^5×c-a^4×c^2-2×a^3×b×c^2+6×a^2×b^2×c^2-2×a×b^3×c^2-b^4×c^2-2×a×b^2×c^3+2×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-b×c^5+c^6) in
        cPointhb h_x_2849.
Definition X_2850 :=
        let h_x_2850 a b c := a*(b-c)*(-a^2+b^2+c^2)*(-a^4+b^4-a^2×b×c+a×b^2×c+a×b×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_2850.
Definition X_2851 :=
        let h_x_2851 a b c := a*(a^6×b+a^4×b^3-a^2×b^5-b^7+a^6×c-2×a^5×b×c-2×a^4×b^2×c+a^3×b^3×c+4×a^2×b^4×c-3×a×b^5×c+b^6×c-2×a^4×b×c^2-3×a^2×b^3×c^2+5×b^5×c^2+a^4×c^3+a^3×b×c^3-3×a^2×b^2×c^3+6×a×b^3×c^3-5×b^4×c^3+4×a^2×b×c^4-5×b^3×c^4-a^2×c^5-3×a×b×c^5+5×b^2×c^5+b×c^6-c^7) in
        cPointhb h_x_2851.
Definition X_2852 :=
        let h_x_2852 a b c := a^2*(a^4×b^2-b^6-a^3×b^2×c+a^2×b^3×c-a×b^4×c+b^5×c+a^4×c^2-a^3×b×c^2-4×a^2×b^2×c^2+2×a×b^3×c^2+2×b^4×c^2+a^2×b×c^3+2×a×b^2×c^3-4×b^3×c^3-a×b×c^4+2×b^2×c^4+b×c^5-c^6) in
        cPointhb h_x_2852.
Definition X_2853 :=
        let h_x_2853 a b c := a^2*(b-c)*(a^6×b-a^4×b^3-a^2×b^5+b^7+a^6×c-a^5×b×c-a^2×b^4×c+a×b^5×c-a^3×b^2×c^2+a^2×b^3×c^2+a×b^4×c^2-b^5×c^2-a^4×c^3+a^2×b^2×c^3-a^2×b×c^4+a×b^2×c^4-a^2×c^5+a×b×c^5-b^2×c^5+c^7) in
        cPointhb h_x_2853.
Definition X_2854 :=
        let h_x_2854 a b c := a^2*(-a^4×b^2+b^6-a^4×c^2+4×a^2×b^2×c^2-2×b^4×c^2-2×b^2×c^4+c^6) in
        cPointhb h_x_2854.
Definition X_2855 :=
        let h_x_2855 a b c := 1/((b^2-c^2)*(a^8-2×a^6×b^2+2×a^4×b^4-2×a^2×b^6+b^8-2×a^6×c^2+7×a^4×b^2×c^2-2×a^2×b^4×c^2+b^6×c^2+2×a^4×c^4-2×a^2×b^2×c^4-4×b^4×c^4-2×a^2×c^6+b^2×c^6+c^8)) in
        cPointhb h_x_2855.
Definition X_2856 :=
        let h_x_2856 a b c := a/(-a^5×b+a^4×b^2-a×b^5+b^6-a^5×c+a^3×b^2×c+a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2-b^4×c^2+a×b^2×c^3-b^2×c^4-a×c^5+c^6) in
        cPointhb h_x_2856.
Definition X_2857 :=
        let h_x_2857 a b c := 1/(-a^6×b^2+a^4×b^4-a^2×b^6+b^8-a^6×c^2+2×a^4×b^2×c^2-b^6×c^2+a^4×c^4-a^2×c^6-b^2×c^6+c^8) in
        cPointhb h_x_2857.
Definition X_2858 :=
        let h_x_2858 a b c := 1/((b^2-c^2)*(a^4+b^4-3×b^2×c^2+c^4)) in
        cPointhb h_x_2858.
Definition X_2859 :=
        let h_x_2859 a b c := 1/(a*(-b+c)*(a^5×b^2-a^4×b^3-a×b^6+b^7+a^5×b×c-a^4×b^2×c-a×b^5×c+b^6×c+a^5×c^2-a^4×b×c^2-a^3×b^2×c^2+a^2×b^3×c^2-a^4×c^3+a^2×b^2×c^3-a×b×c^5-a×c^6+b×c^6+c^7)) in
        cPointhb h_x_2859.
Definition X_2860 :=
        let h_x_2860 a b c := 1/(a*(b-c)*(a^2×b^2-2×a×b^3+b^4+a^2×b×c-2×a×b^2×c+b^3×c+a^2×c^2-2×a×b×c^2+b^2×c^2-2×a×c^3+b×c^3+c^4)) in
        cPointhb h_x_2860.
Definition X_2861 :=
        let h_x_2861 a b c := 1/(-a^4×b^2+2×a^3×b^3-2×a×b^5+b^6-2×a^2×b^3×c+2×a×b^4×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+2×a^3×c^3-2×a^2×b×c^3+2×a×b×c^4-b^2×c^4-2×a×c^5+c^6) in
        cPointhb h_x_2861.
Definition X_2862 :=
        let h_x_2862 a b c := 1/(-a^3×b^2+a^2×b^3-a×b^4+b^5+a^2×b^2×c-b^4×c-a^3×c^2+a^2×b×c^2+a^2×c^3-a×c^4-b×c^4+c^5) in
        cPointhb h_x_2862.
Definition X_2863 :=
        let h_x_2863 a b c := 1/(a*(-a^2×b^3+b^5+2×a×b^3×c-2×b^4×c-a^2×c^3+2×a×b×c^3-2×b×c^4+c^5)) in
        cPointhb h_x_2863.
Definition X_2864 :=
        let h_x_2864 a b c := 1/(a*(b-c)*(a^3×b^2-a^2×b^3-a×b^4+b^5+a^3×b×c-a^2×b^2×c-a×b^3×c+b^4×c+a^3×c^2-a^2×b×c^2-a×b^2×c^2+b^3×c^2-a^2×c^3-a×b×c^3+b^2×c^3-a×c^4+b×c^4+c^5)) in
        cPointhb h_x_2864.
Definition X_2865 :=
        let h_x_2865 a b c := 1/((b-c)*(a^5×b-a^4×b^2-a×b^5+b^6+a^5×c-2×a^4×b×c+2×a^3×b^2×c+2×a^2×b^3×c+a×b^4×c-a^4×c^2+2×a^3×b×c^2-2×a^2×b^2×c^2-2×a×b^3×c^2-b^4×c^2+2×a^2×b×c^3-2×a×b^2×c^3+a×b×c^4-b^2×c^4-a×c^5+c^6)) in
        cPointhb h_x_2865.
Definition X_2866 :=
        let h_x_2866 a b c := 1/(a*(a^4×b^3-b^7-2×a^3×b^3×c+2×b^6×c+a^2×b^3×c^2-b^5×c^2+a^4×c^3-2×a^3×b×c^3+a^2×b^2×c^3-b^2×c^5+2×b×c^6-c^7)) in
        cPointhb h_x_2866.
Definition X_2867 :=
        let h_x_2867 a b c := 1/((b^2-c^2)*(-a^4+b^4+a^2×b×c-b^3×c-b×c^3+c^4)*(-a^4+b^4-a^2×b×c+b^3×c+b×c^3+c^4)) in
        cPointhb h_x_2867.
Definition X_2868 :=
        let h_x_2868 a b c := 1/(a^2*(-a^4×b^4+b^8+2×a^2×b^4×c^2-2×b^6×c^2-a^4×c^4+2×a^2×b^2×c^4-2×b^2×c^6+c^8)) in
        cPointhb h_x_2868.
Definition X_2869 :=
        let h_x_2869 a b c := a^2*(b^2-c^2)*(a^8-2×a^6×b^2+2×a^4×b^4-2×a^2×b^6+b^8-2×a^6×c^2+7×a^4×b^2×c^2-2×a^2×b^4×c^2+b^6×c^2+2×a^4×c^4-2×a^2×b^2×c^4-4×b^4×c^4-2×a^2×c^6+b^2×c^6+c^8) in
        cPointhb h_x_2869.
Definition X_2870 :=
        let h_x_2870 a b c := a*(-a^5×b+a^4×b^2-a×b^5+b^6-a^5×c+a^3×b^2×c+a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2-b^4×c^2+a×b^2×c^3-b^2×c^4-a×c^5+c^6) in
        cPointhb h_x_2870.
Definition X_2871 :=
        let h_x_2871 a b c := a^2*(-a^6×b^2+a^4×b^4-a^2×b^6+b^8-a^6×c^2+2×a^4×b^2×c^2-b^6×c^2+a^4×c^4-a^2×c^6-b^2×c^6+c^8) in
        cPointhb h_x_2871.
Definition X_2872 :=
        let h_x_2872 a b c := a^2*(b^2-c^2)*(a^4+b^4-3×b^2×c^2+c^4) in
        cPointhb h_x_2872.
Definition X_2873 :=
        let h_x_2873 a b c := a^3*(b-c)*(a^5×b^2-a^4×b^3-a×b^6+b^7+a^5×b×c-a^4×b^2×c-a×b^5×c+b^6×c+a^5×c^2-a^4×b×c^2-a^3×b^2×c^2+a^2×b^3×c^2-a^4×c^3+a^2×b^2×c^3-a×b×c^5-a×c^6+b×c^6+c^7) in
        cPointhb h_x_2873.
Definition X_2874 :=
        let h_x_2874 a b c := a^3*(b-c)*(a^2×b^2-2×a×b^3+b^4+a^2×b×c-2×a×b^2×c+b^3×c+a^2×c^2-2×a×b×c^2+b^2×c^2-2×a×c^3+b×c^3+c^4) in
        cPointhb h_x_2874.
Definition X_2875 :=
        let h_x_2875 a b c := a^2*(-a^4×b^2+2×a^3×b^3-2×a×b^5+b^6-2×a^2×b^3×c+2×a×b^4×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+2×a^3×c^3-2×a^2×b×c^3+2×a×b×c^4-b^2×c^4-2×a×c^5+c^6) in
        cPointhb h_x_2875.
Definition X_2876 :=
        let h_x_2876 a b c := a^2*(-a^3×b^2+a^2×b^3-a×b^4+b^5+a^2×b^2×c-b^4×c-a^3×c^2+a^2×b×c^2+a^2×c^3-a×c^4-b×c^4+c^5) in
        cPointhb h_x_2876.
Definition X_2877 :=
        let h_x_2877 a b c := a^3*(-a^2×b^3+b^5+2×a×b^3×c-2×b^4×c-a^2×c^3+2×a×b×c^3-2×b×c^4+c^5) in
        cPointhb h_x_2877.
Definition X_2878 :=
        let h_x_2878 a b c := a^3*(b-c)*(a^3×b^2-a^2×b^3-a×b^4+b^5+a^3×b×c-a^2×b^2×c-a×b^3×c+b^4×c+a^3×c^2-a^2×b×c^2-a×b^2×c^2+b^3×c^2-a^2×c^3-a×b×c^3+b^2×c^3-a×c^4+b×c^4+c^5) in
        cPointhb h_x_2878.
Definition X_2879 :=
        let h_x_2879 a b c := a^2*(b-c)*(a^5×b-a^4×b^2-a×b^5+b^6+a^5×c-2×a^4×b×c+2×a^3×b^2×c+2×a^2×b^3×c+a×b^4×c-a^4×c^2+2×a^3×b×c^2-2×a^2×b^2×c^2-2×a×b^3×c^2-b^4×c^2+2×a^2×b×c^3-2×a×b^2×c^3+a×b×c^4-b^2×c^4-a×c^5+c^6) in
        cPointhb h_x_2879.
Definition X_2880 :=
        let h_x_2880 a b c := a^3*(a^4×b^3-b^7-2×a^3×b^3×c+2×b^6×c+a^2×b^3×c^2-b^5×c^2+a^4×c^3-2×a^3×b×c^3+a^2×b^2×c^3-b^2×c^5+2×b×c^6-c^7) in
        cPointhb h_x_2880.
Definition X_2881 :=
        let h_x_2881 a b c := a^2*(b^2-c^2)*(-a^4+b^4+a^2×b×c-b^3×c-b×c^3+c^4)*(-a^4+b^4-a^2×b×c+b^3×c+b×c^3+c^4) in
        cPointhb h_x_2881.
Definition X_2882 :=
        let h_x_2882 a b c := a^4*(-a^4×b^4+b^8+2×a^2×b^4×c^2-2×b^6×c^2-a^4×c^4+2×a^2×b^2×c^4-2×b^2×c^6+c^8) in
        cPointhb h_x_2882.
Definition X_2883 :=
        let h_x_2883 a b c := (3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4)*(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2+4×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_2883.
Definition X_2884 :=
        let h_x_2884 a b c := (3×a^2-2×a×b-b^2-2×a×c+2×b×c-c^2)*(a^2×b^2-2×a×b^3+b^4+2×a×b^2×c+2×b^3×c+a^2×c^2+2×a×b×c^2-6×b^2×c^2-2×a×c^3+2×b×c^3+c^4) in
        cPointhb h_x_2884.
Definition X_2885 :=
        let h_x_2885 a b c := (3×a-b-c)*(a×b^2+b^3-3×b^2×c+a×c^2-3×b×c^2+c^3) in
        cPointhb h_x_2885.
Definition X_2886 :=
        let h_x_2886 a b c := (a×b^2-b^3+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_2886.
Definition X_2887 :=
        let h_x_2887 a b c := (b+c)*(b^2-b×c+c^2) in
        cPointhb h_x_2887.
Definition X_2888 :=
        let h_x_2888 a b c := c^2/(a^2*(SA a b c)+b^2*(SB a b c))+b^2/(a^2*(SA a b c)+c^2*(SC a b c))-a^2/(b^2*(SB a b c)+c^2*(SC a b c)) in
        cPointhb h_x_2888.
Definition X_2889 :=
        let h_x_2889 a b c := -(a^2/(b^2*(SB a b c)+2*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2*(SA a b c)*(SC a b c)))+b^2/(a^2*(SA a b c)+2*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2*(SB a b c)*(SC a b c))+c^2/(a^2*(SA a b c)+b^2*(SB a b c)+2*(SA a b c)*(SC a b c)+2*(SB a b c)*(SC a b c)) in
        cPointhb h_x_2889.
Definition X_2890 :=
        let h_x_2890 a b c := -(a^2/((a+b-c)*c+b*(a-b+c)))+b^2/((a+b-c)*c+a*(-a+b+c))+c^2/(b*(a-b+c)+a*(-a+b+c)) in
        cPointhb h_x_2890.
Definition X_2891 :=
        let h_x_2891 a b c := -(a^2/(2×a+b+c))+b^2/(a+2×b+c)+c^2/(a+b+2×c) in
        cPointhb h_x_2891.
Definition X_2892 :=
        let h_x_2892 a b c := -(a^2/(c^2*(a^4-a^2×b^2+b^4-c^4)+b^2*(a^4-b^4-a^2×c^2+c^4)))+b^2/(c^2*(a^4-a^2×b^2+b^4-c^4)+a^2*(-a^4+b^4-b^2×c^2+c^4))+c^2/(b^2*(a^4-b^4-a^2×c^2+c^4)+a^2*(-a^4+b^4-b^2×c^2+c^4)) in
        cPointhb h_x_2892.
Definition X_2893 :=
        let h_x_2893 a b c := c^2/(a*(SA a b c)+b*(SB a b c))+b^2/(a*(SA a b c)+c*(SC a b c))-a^2/(b*(SB a b c)+c*(SC a b c)) in
        cPointhb h_x_2893.
Definition X_2894 :=
        let h_x_2894 a b c := c^2/(a*(b+c)*(SA a b c)+b*(a+c)*(SB a b c))+b^2/(a*(b+c)*(SA a b c)+(a+b)*c*(SC a b c))-a^2/(b*(a+c)*(SB a b c)+(a+b)*c*(SC a b c)) in
        cPointhb h_x_2894.
Definition X_2895 :=
        let h_x_2895 a b c := -(a^2/(a×b+a×c))+b^2/(a×b+b×c)+c^2/(a×c+b×c) in
        cPointhb h_x_2895.
Definition X_2896 :=
        let h_x_2896 a b c := a^4-a^2×b^2-b^4-a^2×c^2-b^2×c^2-c^4 in
        cPointhb h_x_2896.
Definition X_2897 :=
        let h_x_2897 a b c := c^2/(1/(a*(SA a b c))+1/(b*(SB a b c)))+b^2/(1/(a*(SA a b c))+1/(c*(SC a b c)))-a^2/(1/(b*(SB a b c))+1/(c*(SC a b c))) in
        cPointhb h_x_2897.
Definition X_2898 :=
        let h_x_2898 a b c := ((SA a b c)/(-a+b+c)-(SB a b c)/(a-b+c)-(SC a b c)/(a+b-c))/(-a+b+c) in
        cPointhb h_x_2898.
Definition X_2899 :=
        let h_x_2899 a b c := (a-b-c)*(a^3+a^2×b+a×b^2+b^3+a^2×c-3×b^2×c+a×c^2-3×b×c^2+c^3) in
        cPointhb h_x_2899.
Definition X_2900 :=
        let h_x_2900 a b c := a*(a-b-c)*(a^4-2×a^3×b+2×a×b^3-b^4-2×a^3×c-2×a^2×b×c+2×b^2×c^2+2×a×c^3-c^4) in
        cPointhb h_x_2900.
Definition X_2901 :=
        let h_x_2901 a b c := (b+c)*(-a^3-a^2×b-a^2×c+b^2×c+b×c^2) in
        cPointhb h_x_2901.
Definition X_2902 :=
        let h_x_2902 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c))*(sqrt(3)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)+(-4×a^4+4×b^4-8×b^2×c^2+4×c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_2902.
Definition X_2903 :=
        let h_x_2903 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)+4*(DeltaMaj a b c))*(sqrt(3)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)-(-4×a^4+4×b^4-8×b^2×c^2+4×c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_2903.
Definition X_2904 :=
        let h_x_2904 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_2904.
Definition X_2905 :=
        let h_x_2905 a b c := (-a^2+a×b+b^2+a×c+b×c+c^2)/((b+c)*(-a^2+b^2+c^2)) in
        cPointhb h_x_2905.
Definition X_2906 :=
        let h_x_2906 a b c := (a*(a^3+a^2×b-a×b^2-b^3+a^2×c-a×b×c-b^2×c-a×c^2-b×c^2-c^3))/((b+c)*(a^2-b^2-c^2)) in
        cPointhb h_x_2906.
Definition X_2907 :=
        let h_x_2907 a b c := (a+b)*(a-b-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^3+2×a^2×b-b^3+2×a^2×c+a×b×c-c^3) in
        cPointhb h_x_2907.
Definition X_2908 :=
        let h_x_2908 a b c := a^3*(a^5-a^3×b^2+a^2×b^3-b^5-a^3×c^2+b^3×c^2+a^2×c^3+b^2×c^3-c^5) in
        cPointhb h_x_2908.
Definition X_2909 :=
        let h_x_2909 a b c := a^4*(a^6-a^4×b^2+a^2×b^4-b^6-a^4×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_2909.
Definition X_2910 :=
        let h_x_2910 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-2×a^3×b^2×c+2×a^2×b^3×c+2×a×b^4×c-2×b^5×c-3×a^4×c^2-2×a^3×b×c^2-2×a^2×b^2×c^2-2×a×b^3×c^2+b^4×c^2+2×a^2×b×c^3-2×a×b^2×c^3+4×b^3×c^3+3×a^2×c^4+2×a×b×c^4+b^2×c^4-2×b×c^5-c^6) in
        cPointhb h_x_2910.
Definition X_2911 :=
        let h_x_2911 a b c := a^2*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_2911.
Definition X_2912 :=
        let h_x_2912 a b c := a^2*(a^2-b^2-c^2-4×sqrt(3)*(DeltaMaj a b c))*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6+sqrt(3)*(-4×a^4+4×b^4-8×b^2×c^2+4×c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_2912.
Definition X_2913 :=
        let h_x_2913 a b c := a^2*(a^2-b^2-c^2+4×sqrt(3)*(DeltaMaj a b c))*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6-sqrt(3)*(-4×a^4+4×b^4-8×b^2×c^2+4×c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_2913.
Definition X_2914 :=
        let h_x_2914 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)*(-b^2×c^2+(a^2-b^2-c^2)^2) in
        cPointhb h_x_2914.
Definition X_2915 :=
        let h_x_2915 a b c := a^2*(a^5+a^4×b-a×b^4-b^5+a^4×c+a^3×b×c-a×b^3×c-b^4×c-a×b×c^3-a×c^4-b×c^4-c^5) in
        cPointhb h_x_2915.
Definition X_2916 :=
        let h_x_2916 a b c := a^2*(a^6+a^4×b^2-a^2×b^4-b^6+a^4×c^2-a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4-c^6) in
        cPointhb h_x_2916.
Definition X_2917 :=
        let h_x_2917 a b c := a^2*(-(a^2/(b^2*(SA a b c)*(SB a b c)+c^2*(SA a b c)*(SC a b c)))+c^2/(a^2*(SA a b c)*(SC a b c)+b^2*(SB a b c)*(SC a b c))+b^2/(a^2*(SA a b c)*(SB a b c)+c^2*(SB a b c)*(SC a b c))) in
        cPointhb h_x_2917.
Definition X_2918 :=
        let h_x_2918 a b c := a^2*(-(a^2/(b^2*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))+c^2*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))))+c^2/(a^2*(b^2*(SB a b c)+2*(SA a b c)*(SC a b c))+b^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)))+b^2/(a^2*(2*(SA a b c)*(SB a b c)+c^2*(SC a b c))+c^2*(a^2*(SA a b c)+2*(SB a b c)*(SC a b c)))) in
        cPointhb h_x_2918.
Definition X_2919 :=
        let h_x_2919 a b c := a^2*(-(a^2/(b^2/(a+b-c)+c^2/(a-b+c)))+c^2/(a^2/(a-b+c)+b^2/(-a+b+c))+b^2/(a^2/(a+b-c)+c^2/(-a+b+c))) in
        cPointhb h_x_2919.
Definition X_2920 :=
        let h_x_2920 a b c := a^2*(-(a^2/(b^2*(a+b-c)+c^2*(a-b+c)))+c^2/(a^2*(a-b+c)+b^2*(-a+b+c))+b^2/(a^2*(a+b-c)+c^2*(-a+b+c))) in
        cPointhb h_x_2920.
Definition X_2921 :=
        let h_x_2921 a b c := a^2*(-(a^2/(b^2*(a+b-c)*c+b×c^2*(a-b+c)))+c^2/(a^2×b*(a-b+c)+a×b^2*(-a+b+c))+b^2/(a^2*(a+b-c)*c+a×c^2*(-a+b+c))) in
        cPointhb h_x_2921.
Definition X_2922 :=
        let h_x_2922 a b c := a^2*(-(a^2/(b^2*(a+b)+c^2*(a+c)))+c^2/(a^2*(a+c)+b^2*(b+c))+b^2/(a^2*(a+b)+c^2*(b+c))) in
        cPointhb h_x_2922.
Definition X_2923 :=
        let h_x_2923 a b c := a^2*(c^2/(b^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))+a^2*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)+2×sqrt(3)×b^2*(DeltaMaj a b c)))+b^2/(c^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))+a^2*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c)))-a^2/(c^2*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)+2×sqrt(3)×b^2*(DeltaMaj a b c))+b^2*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c)))) in
        cPointhb h_x_2923.
Definition X_2924 :=
        let h_x_2924 a b c := a^2*(c^2/(b^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c))+a^2*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)-2×sqrt(3)×b^2*(DeltaMaj a b c)))+b^2/(c^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c))+a^2*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)-2×sqrt(3)×c^2*(DeltaMaj a b c)))-a^2/(c^2*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)-2×sqrt(3)×b^2*(DeltaMaj a b c))+b^2*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)-2×sqrt(3)×c^2*(DeltaMaj a b c)))) in
        cPointhb h_x_2924.
Definition X_2925 :=
        let h_x_2925 a b c := a^2*(-(a^4/(sqrt(3)×a^2+4*(DeltaMaj a b c)))+b^4/(sqrt(3)×b^2+4*(DeltaMaj a b c))+c^4/(sqrt(3)×c^2+4*(DeltaMaj a b c))) in
        cPointhb h_x_2925.
Definition X_2926 :=
        let h_x_2926 a b c := a^2*(-(a^4/(sqrt(3)×a^2-4*(DeltaMaj a b c)))+b^4/(sqrt(3)×b^2-4*(DeltaMaj a b c))+c^4/(sqrt(3)×c^2-4*(DeltaMaj a b c))) in
        cPointhb h_x_2926.
Definition X_2927 :=
        let h_x_2927 a b c := a^2*(-(a^2/(b^2*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))*((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))+c^2*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)+2×sqrt(3)*(DeltaMaj a b c))))+c^2/(a^2*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)+2×sqrt(3)*(DeltaMaj a b c))+b^2*((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)+2×sqrt(3)*(DeltaMaj a b c)))+b^2/(a^2*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))*((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))+c^2*((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)+2×sqrt(3)*(DeltaMaj a b c)))) in
        cPointhb h_x_2927.
Definition X_2928 :=
        let h_x_2928 a b c := a^2*(-(a^2/(b^2*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))*((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))+c^2*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)-2×sqrt(3)*(DeltaMaj a b c))))+c^2/(a^2*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)-2×sqrt(3)*(DeltaMaj a b c))+b^2*((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)-2×sqrt(3)*(DeltaMaj a b c)))+b^2/(a^2*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))*((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))+c^2*((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))*((SC a b c)-2×sqrt(3)*(DeltaMaj a b c)))) in
        cPointhb h_x_2928.
Definition X_2929 :=
        let h_x_2929 a b c := a^2*(-(a^2/(b^2*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))+c^2*(b^2*(SB a b c)-(SA a b c)*(SC a b c))))+c^2/(a^2*(b^2*(SB a b c)-(SA a b c)*(SC a b c))+b^2*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))+b^2/(a^2*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))+c^2*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))) in
        cPointhb h_x_2929.
Definition X_2930 :=
        let h_x_2930 a b c := a^2*(a^6+a^4×b^2-a^2×b^4-b^6+a^4×c^2-5×a^2×b^2×c^2+3×b^4×c^2-a^2×c^4+3×b^2×c^4-c^6) in
        cPointhb h_x_2930.
Definition X_2931 :=
        let h_x_2931 a b c := a^2*(c^2/(b^2*((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c))+a^2*((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c)))+b^2/(c^2*((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-2*(SB a b c)*(SC a b c))+a^2*(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c)))-a^2/(c^2*((SA a b c)*(SB a b c)-2*(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c))+b^2*(-2*(SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)+(SB a b c)*(SC a b c)))) in
        cPointhb h_x_2931.
Definition X_2932 :=
        let h_x_2932 a b c := a^2*(-a^5+a^4×b+2×a^3×b^2-2×a^2×b^3-a×b^4+b^5+a^4×c-5×a^3×b×c+5×a×b^3×c-b^4×c+2×a^3×c^2-2×b^3×c^2-2×a^2×c^3+5×a×b×c^3-2×b^2×c^3-a×c^4-b×c^4+c^5) in
        cPointhb h_x_2932.
Definition X_2933 :=
        let h_x_2933 a b c := a^2*(a^5-a^3×b^2+a^2×b^3-b^5+2×a^3×b×c-2×a×b^3×c-a^3×c^2+b^3×c^2+a^2×c^3-2×a×b×c^3+b^2×c^3-c^5) in
        cPointhb h_x_2933.
Definition X_2934 :=
        let h_x_2934 a b c := a^2*(a^12-3×a^10×b^2+3×a^8×b^4-3×a^4×b^8+3×a^2×b^10-b^12-3×a^10×c^2+3×a^8×b^2×c^2+2×a^6×b^4×c^2-2×a^4×b^6×c^2-3×a^2×b^8×c^2+3×b^10×c^2+3×a^8×c^4+2×a^6×b^2×c^4-2×a^4×b^4×c^4-3×b^8×c^4-2×a^4×b^2×c^6+2×b^6×c^6-3×a^4×c^8-3×a^2×b^2×c^8-3×b^4×c^8+3×a^2×c^10+3×b^2×c^10-c^12) in
        cPointhb h_x_2934.
Definition X_2935 :=
        let h_x_2935 a b c := a^2*(c^2/(a^2×b^2*(b^2×c^2-4×(SA a b c)^2)*(SB a b c)*(SC a b c)+a^2×b^2*(SA a b c)*(a^2×c^2-4×(SB a b c)^2)*(SC a b c))+b^2/(a^2×c^2*(b^2×c^2-4×(SA a b c)^2)*(SB a b c)*(SC a b c)+a^2×c^2*(SA a b c)*(SB a b c)*(a^2×b^2-4×(SC a b c)^2))-a^2/(b^2×c^2*(SA a b c)*(a^2×c^2-4×(SB a b c)^2)*(SC a b c)+b^2×c^2*(SA a b c)*(SB a b c)*(a^2×b^2-4×(SC a b c)^2))) in
        cPointhb h_x_2935.
Definition X_2936 :=
        let h_x_2936 a b c := a^2*(a^8-a^6×b^2+a^2×b^6-b^8-a^6×c^2+5×a^4×b^2×c^2-5×a^2×b^4×c^2+b^6×c^2-5×a^2×b^2×c^4+4×b^4×c^4+a^2×c^6+b^2×c^6-c^8) in
        cPointhb h_x_2936.
Definition X_2937 :=
        let h_x_2937 a b c := a^2*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2-a^4×b^2×c^2+a^2×b^4×c^2+2×b^6×c^2+a^2×b^2×c^4-2×b^4×c^4+2×a^2×c^6+2×b^2×c^6-c^8) in
        cPointhb h_x_2937.
Definition X_2938 :=
        let h_x_2938 a b c := a*(1/((a+b)*(a+b-c))+1/((a+c)*(a-b+c))-1/((b+c)*(-a+b+c))) in
        cPointhb h_x_2938.
Definition X_2939 :=
        let h_x_2939 a b c := a*(a^6+3×a^5×b+a^4×b^2-2×a^3×b^3-a^2×b^4-a×b^5-b^6+3×a^5×c+3×a^4×b×c-2×a^3×b^2×c-2×a^2×b^3×c-a×b^4×c-b^5×c+a^4×c^2-2×a^3×b×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2-2×a^3×c^3-2×a^2×b×c^3+2×a×b^2×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4+b^2×c^4-a×c^5-b×c^5-c^6) in
        cPointhb h_x_2939.
Definition X_2940 :=
        let h_x_2940 a b c := a*(a^6+4×a^5×b+3×a^4×b^2-2×a^3×b^3-3×a^2×b^4-2×a×b^5-b^6+4×a^5×c+8×a^4×b×c-6×a^2×b^3×c-4×a×b^4×c-2×b^5×c+3×a^4×c^2-5×a^2×b^2×c^2+b^4×c^2-2×a^3×c^3-6×a^2×b×c^3+4×b^3×c^3-3×a^2×c^4-4×a×b×c^4+b^2×c^4-2×a×c^5-2×b×c^5-c^6) in
        cPointhb h_x_2940.
Definition X_2941 :=
        let h_x_2941 a b c := a*(a^5+a^4×b-a×b^4-b^5+a^4×c+5×a^3×b×c-2×a^2×b^2×c-3×a×b^3×c-b^4×c-2×a^2×b×c^2+2×b^3×c^2-3×a×b×c^3+2×b^2×c^3-a×c^4-b×c^4-c^5) in
        cPointhb h_x_2941.
Definition X_2942 :=
        let h_x_2942 a b c := a*(-(1/((-a+b+c)*(b/(a+b-c)+c/(a-b+c))))+1/((a+b-c)*(a/(a-b+c)+b/(-a+b+c)))+1/((a-b+c)*(a/(a+b-c)+c/(-a+b+c)))) in
        cPointhb h_x_2942.
Definition X_2943 :=
        let h_x_2943 a b c := a*(-(1/((-a+b+c)*(b*(a+b-c)+c*(a-b+c))))+1/((a+b-c)*(a*(a-b+c)+b*(-a+b+c)))+1/((a-b+c)*(a*(a+b-c)+c*(-a+b+c)))) in
        cPointhb h_x_2943.
Definition X_2944 :=
        let h_x_2944 a b c := a*(-(1/((-a+b+c)*(b*(a+b)+c*(a+c))))+1/((a+b-c)*(a*(a+c)+b*(b+c)))+1/((a-b+c)*(a*(a+b)+c*(b+c)))) in
        cPointhb h_x_2944.
Definition X_2945 :=
        let h_x_2945 a b c := a*(1/((a+b-c)*(a^2×b*(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))+a×b^2*(sqrt(3)*(SB a b c)+2*(DeltaMaj a b c))))+1/((a-b+c)*(a^2×c*(sqrt(3)*(SA a b c)+2*(DeltaMaj a b c))+a×c^2*(sqrt(3)*(SC a b c)+2*(DeltaMaj a b c))))-1/((-a+b+c)*(b^2×c*(sqrt(3)*(SB a b c)+2*(DeltaMaj a b c))+b×c^2*(sqrt(3)*(SC a b c)+2*(DeltaMaj a b c))))) in
        cPointhb h_x_2945.
Definition X_2946 :=
        let h_x_2946 a b c := a*(1/((a+b-c)*(a^2×b*(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c))+a×b^2*(sqrt(3)*(SB a b c)-2*(DeltaMaj a b c))))+1/((a-b+c)*(a^2×c*(sqrt(3)*(SA a b c)-2*(DeltaMaj a b c))+a×c^2*(sqrt(3)*(SC a b c)-2*(DeltaMaj a b c))))-1/((-a+b+c)*(b^2×c*(sqrt(3)*(SB a b c)-2*(DeltaMaj a b c))+b×c^2*(sqrt(3)*(SC a b c)-2*(DeltaMaj a b c))))) in
        cPointhb h_x_2946.
Definition X_2947 :=
        let h_x_2947 a b c := a*(1/((a+b-c)*((a×b)/(SA a b c)+(a×b)/(SB a b c)))+1/((a-b+c)*((a×c)/(SA a b c)+(a×c)/(SC a b c)))-1/((-a+b+c)*((b×c)/(SB a b c)+(b×c)/(SC a b c)))) in
        cPointhb h_x_2947.
Definition X_2948 :=
        let h_x_2948 a b c := a*(a^6+2×a^5×b-a^4×b^2-2×a^3×b^3+a^2×b^4-b^6+2×a^5×c-2×a^3×b^2×c-a^4×c^2-2×a^3×b×c^2-a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2-2×a^3×c^3+2×a×b^2×c^3+a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_2948.
Definition X_2949 :=
        let h_x_2949 a b c := a*(1/((a+b-c)*(a^2×b*(b×c+2*(SA a b c))+a×b^2*(a×c+2*(SB a b c))))+1/((a-b+c)*(a^2×c*(b×c+2*(SA a b c))+a×c^2*(a×b+2*(SC a b c))))-1/((-a+b+c)*(b^2×c*(a×c+2*(SB a b c))+b×c^2*(a×b+2*(SC a b c))))) in
        cPointhb h_x_2949.
Definition X_2950 :=
        let h_x_2950 a b c := a*(1/((a+b-c)*(a^2×b*(-b×c+2*(SA a b c))+a×b^2*(-a×c+2*(SB a b c))))+1/((a-b+c)*(a^2×c*(-b×c+2*(SA a b c))+a×c^2*(-a×b+2*(SC a b c))))-1/((-a+b+c)*(b^2×c*(-a×c+2*(SB a b c))+b×c^2*(-a×b+2*(SC a b c))))) in
        cPointhb h_x_2950.
Definition X_2951 :=
        let h_x_2951 a b c := a*(a^4-4×a^3×b+6×a^2×b^2-4×a×b^3+b^4-4×a^3×c-4×a^2×b×c+4×a×b^2×c+4×b^3×c+6×a^2×c^2+4×a×b×c^2-10×b^2×c^2-4×a×c^3+4×b×c^3+c^4) in
        cPointhb h_x_2951.
Definition X_2952 :=
        let h_x_2952 a b c := a*(1/((a+b-c)*(a^2×b*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))+a×b^2*((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))))+1/((a-b+c)*(a^2×c*((SA a b c)+2×sqrt(3)*(DeltaMaj a b c))+a×c^2*((SC a b c)+2×sqrt(3)*(DeltaMaj a b c))))-1/((-a+b+c)*(b^2×c*((SB a b c)+2×sqrt(3)*(DeltaMaj a b c))+b×c^2*((SC a b c)+2×sqrt(3)*(DeltaMaj a b c))))) in
        cPointhb h_x_2952.
Definition X_2953 :=
        let h_x_2953 a b c := a*(1/((a+b-c)*(a^2×b*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))+a×b^2*((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))))+1/((a-b+c)*(a^2×c*((SA a b c)-2×sqrt(3)*(DeltaMaj a b c))+a×c^2*((SC a b c)-2×sqrt(3)*(DeltaMaj a b c))))-1/((-a+b+c)*(b^2×c*((SB a b c)-2×sqrt(3)*(DeltaMaj a b c))+b×c^2*((SC a b c)-2×sqrt(3)*(DeltaMaj a b c))))) in
        cPointhb h_x_2953.
Definition X_2954 :=
        let h_x_2954 a b c := a*(1/((a+b-c)*(a^2×b*(b+c)*(SA a b c)+a×b^2*(a+c)*(SB a b c)))+1/((a-b+c)*(a^2×c*(b+c)*(SA a b c)+a*(a+b)*c^2*(SC a b c)))-1/((-a+b+c)*(b^2×c*(a+c)*(SB a b c)+b*(a+b)*c^2*(SC a b c)))) in
        cPointhb h_x_2954.
Definition X_2955 :=
        let h_x_2955 a b c := a*(1/((a+b-c)*(a×b*(b+c)*(SA a b c)+a×b*(a+c)*(SB a b c)))+1/((a-b+c)*(a×c*(b+c)*(SA a b c)+a*(a+b)*c*(SC a b c)))-1/((-a+b+c)*(b×c*(a+c)*(SB a b c)+b*(a+b)*c*(SC a b c)))) in
        cPointhb h_x_2955.
Definition X_2956 :=
        let h_x_2956 a b c := a*(-3×a^6-2×a^5×b+7×a^4×b^2+4×a^3×b^3-5×a^2×b^4-2×a×b^5+b^6-2×a^5×c-6×a^4×b×c-4×a^3×b^2×c+4×a^2×b^3×c+6×a×b^4×c+2×b^5×c+7×a^4×c^2-4×a^3×b×c^2+2×a^2×b^2×c^2-4×a×b^3×c^2-b^4×c^2+4×a^3×c^3+4×a^2×b×c^3-4×a×b^2×c^3-4×b^3×c^3-5×a^2×c^4+6×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_2956.
Definition X_2957 :=
        let h_x_2957 a b c := a*(1/((a-b+c)*((a×c)/(a-b)+(a×c)/(b-c)))+1/((a+b-c)*((a×b)/(b-c)+(a×b)/(-a+c)))-1/((-a+b+c)*((b×c)/(a-b)+(b×c)/(-a+c)))) in
        cPointhb h_x_2957.
Definition X_2958 :=
        let h_x_2958 a b c := a*(1/((a-b+c)*((a^2×c)/(b-c)+(a×c^2)/(a-b)))+1/((a+b-c)*((a^2×b)/(b-c)+(a×b^2)/(-a+c)))-1/((-a+b+c)*((b×c^2)/(a-b)+(b^2×c)/(-a+c)))) in
        cPointhb h_x_2958.
Definition X_2959 :=
        let h_x_2959 a b c := a*(a^5+3×a^4×b+a^3×b^2-a^2×b^3-a×b^4-b^5+3×a^4×c+4×a^3×b×c-a^2×b^2×c-2×a×b^3×c-b^4×c+a^3×c^2-a^2×b×c^2-a×b^2×c^2+b^3×c^2-a^2×c^3-2×a×b×c^3+b^2×c^3-a×c^4-b×c^4-c^5) in
        cPointhb h_x_2959.
Definition X_2960 :=
        let h_x_2960 a b c := a*(-a^6-2×a^5×b-a^4×b^2+a^2×b^4+2×a×b^5+b^6-2×a^5×c-5×a^4×b×c-a^3×b^2×c+3×a^2×b^3×c+3×a×b^4×c+2×b^5×c-a^4×c^2-a^3×b×c^2+2×a^2×b^2×c^2-a×b^3×c^2-b^4×c^2+3×a^2×b×c^3-a×b^2×c^3-4×b^3×c^3+a^2×c^4+3×a×b×c^4-b^2×c^4+2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_2960.
Definition X_2961 :=
        let h_x_2961 a b c := a*(-(1/((-a+b+c)*(b×(a+b-c)^2×c+b×c×(a-b+c)^2)))+1/((a+b-c)*(a×b×(a-b+c)^2+a×b×(-a+b+c)^2))+1/((a-b+c)*(a×(a+b-c)^2×c+a×c×(-a+b+c)^2))) in
        cPointhb h_x_2961.
Definition X_2962 :=
        let h_x_2962 a b c := 1/(a*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_2962.
Definition X_2963 :=
        let h_x_2963 a b c := 1/(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_2963.
Definition X_2964 :=
        let h_x_2964 a b c := a^3*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_2964.
Definition X_2965 :=
        let h_x_2965 a b c := a^4*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_2965.
Definition X_2966 :=
        let h_x_2966 a b c := 1/((b^2-c^2)*(a^2×b^2-b^4+a^2×c^2-c^4)) in
        cPointhb h_x_2966.
Definition X_2967 :=
        let h_x_2967 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2×b^2-b^4+a^2×c^2-c^4)^2 in
        cPointhb h_x_2967.
Definition X_2968 :=
        let h_x_2968 a b c := (a-b-c)^2×(b-c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_2968.
Definition X_2969 :=
        let h_x_2969 a b c := (b-c)^2*(-a^2+b^2-c^2)*(a^2+b^2-c^2) in
        cPointhb h_x_2969.
Definition X_2970 :=
        let h_x_2970 a b c := b^2×c^2×(b^2-c^2)^2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2970.
Definition X_2971 :=
        let h_x_2971 a b c := a^2×(b^2-c^2)^2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2971.
Definition X_2972 :=
        let h_x_2972 a b c := a^2×(b^2-c^2)^2×(SA a b c)^3 in
        cPointhb h_x_2972.
Definition X_2973 :=
        let h_x_2973 a b c := b^2×(b-c)^2×c^2*(SB a b c)*(SC a b c) in
        cPointhb h_x_2973.
Definition X_2974 :=
        let h_x_2974 a b c := b^2×c^2*(a^2-b^2-c^2)*(2×a^4-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4)^2 in
        cPointhb h_x_2974.
Definition X_2975 :=
        let h_x_2975 a b c := a*(a^3-a×b^2+a×b×c-b^2×c-a×c^2-b×c^2) in
        cPointhb h_x_2975.
Definition X_2976 :=
        let h_x_2976 a b c := (3×a-b-c)*(b-c)*(2×a^2-a×b+b^2-a×c-2×b×c+c^2) in
        cPointhb h_x_2976.
Definition X_2977 :=
        let h_x_2977 a b c := (b-c)*(2×a^3+a^2×b-2×a×b^2+b^3+a^2×c-4×a×b×c+b^2×c-2×a×c^2+b×c^2+c^3) in
        cPointhb h_x_2977.
Definition X_2978 :=
        let h_x_2978 a b c := a^2*(b-c)*(a×b^2+a×b×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_2978.
Definition X_2979 :=
        let h_x_2979 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-b^2×c^2-c^4) in
        cPointhb h_x_2979.
Definition X_2980 :=
        let h_x_2980 a b c := 1/(a^2×b^2-b^4+a^2×c^2-b^2×c^2-c^4) in
        cPointhb h_x_2980.
Definition X_2981 :=
        let h_x_2981 a b c := a^2/((-a^4-a^2×b^2+2×b^4-a^2×c^2-4×b^2×c^2+2×c^4-4×sqrt(3)×a^2*(DeltaMaj a b c))*(4×a^4-5×a^2×b^2+b^4-5×a^2×c^2-2×b^2×c^2+c^4-4×sqrt(3)×b^2*(DeltaMaj a b c)-4×sqrt(3)×c^2*(DeltaMaj a b c))) in
        cPointhb h_x_2981.
Definition X_2982 :=
        let h_x_2982 a b c := a/((-a+b+c)*(a^2×b-b^3+a^2×c+2×a×b×c+b^2×c+b×c^2-c^3)) in
        cPointhb h_x_2982.
Definition X_2983 :=
        let h_x_2983 a b c := a^2/(2×a^3+a^2×b+b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2983.
Definition X_2984 :=
        let h_x_2984 a b c := a^2/((a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(2×a^6-3×a^4×b^2+2×a^2×b^4-b^6-3×a^4×c^2-4×a^2×b^2×c^2+b^4×c^2+2×a^2×c^4+b^2×c^4-c^6)) in
        cPointhb h_x_2984.
Definition X_2985 :=
        let h_x_2985 a b c := 1/(a×b^2+b^3-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_2985.
Definition X_2986 :=
        let h_x_2986 a b c := 1/(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_2986.
Definition X_2987 :=
        let h_x_2987 a b c := a^2/(2×a^4-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_2987.
Definition X_2988 :=
        let h_x_2988 a b c := 1/(a^4×b^2-2×a^2×b^4+b^6-a^3×b^2×c+a^2×b^3×c+a×b^4×c-b^5×c+a^4×c^2-a^3×b×c^2+2×a^2×b^2×c^2-a×b^3×c^2-b^4×c^2+a^2×b×c^3-a×b^2×c^3+2×b^3×c^3-2×a^2×c^4+a×b×c^4-b^2×c^4-b×c^5+c^6) in
        cPointhb h_x_2988.
Definition X_2989 :=
        let h_x_2989 a b c := 1/(a^3×b^2-a^2×b^3-a×b^4+b^5+a^3×c^2+2×a×b^2×c^2-b^3×c^2-a^2×c^3-b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_2989.
Definition X_2990 :=
        let h_x_2990 a b c := a/(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c+a×b^2×c-a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_2990.
Definition X_2991 :=
        let h_x_2991 a b c := a/(a^2×b+b^3+a^2×c-2×a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_2991.
Definition X_2992 :=
        let h_x_2992 a b c := 1/(c^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)+2×sqrt(3)×b^2*(DeltaMaj a b c))+b^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c))-a^2*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)+2×sqrt(3)×b^2*(DeltaMaj a b c))*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c))) in
        cPointhb h_x_2992.
Definition X_2993 :=
        let h_x_2993 a b c := 1/(c^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c))*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)-2×sqrt(3)×b^2*(DeltaMaj a b c))+b^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c))*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)-2×sqrt(3)×c^2*(DeltaMaj a b c))-a^2*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)-2×sqrt(3)×b^2*(DeltaMaj a b c))*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)-2×sqrt(3)×c^2*(DeltaMaj a b c))) in
        cPointhb h_x_2993.
Definition X_2994 :=
        let h_x_2994 a b c := 1/(a*(SA a b c)-b*(SB a b c)-c*(SC a b c)) in
        cPointhb h_x_2994.
Definition X_2995 :=
        let h_x_2995 a b c := 1/(a*(a^2×b-b^3+a^2×c-a×b×c-c^3)) in
        cPointhb h_x_2995.
Definition X_2996 :=
        let h_x_2996 a b c := 1/((SA a b c)-(SB a b c)-(SC a b c)) in
        cPointhb h_x_2996.
Definition X_2997 :=
        let h_x_2997 a b c := 1/(a*(a^2×b-b^3+a^2×c+a×b×c-c^3)) in
        cPointhb h_x_2997.
Definition X_2998 :=
        let h_x_2998 a b c := 1/(a^2×b^2+a^2×c^2-b^2×c^2) in
        cPointhb h_x_2998.
Definition X_2999 :=
        let h_x_2999 a b c := a*(a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_2999.
Definition X_3000 :=
        let h_x_3000 a b c := a*(a^3×b-2×a^2×b^2+a×b^3+a^3×c+2×a^2×b×c-a×b^2×c-2×b^3×c-2×a^2×c^2-a×b×c^2+4×b^2×c^2+a×c^3-2×b×c^3) in
        cPointhb h_x_3000.
Definition X_3001 :=
        let h_x_3001 a b c := a^2*(a^2×b^4-b^6+a^2×c^4-c^6) in
        cPointhb h_x_3001.
Definition X_3002 :=
        let h_x_3002 a b c := a^2*(a^3×b^2-a^2×b^3-a×b^4+b^5+a^2×b^2×c-b^4×c+a^3×c^2+a^2×b×c^2-a^2×c^3-a×c^4-b×c^4+c^5) in
        cPointhb h_x_3002.
Definition X_3003 :=
        let h_x_3003 a b c := a^2*(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_3003.
Definition X_3004 :=
        let h_x_3004 a b c := (b-c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3004.
Definition X_3005 :=
        let h_x_3005 a b c := a^2*(b^4-c^4) in
        cPointhb h_x_3005.
Definition X_3006 :=
        let h_x_3006 a b c := a×b^2-b^3+a×c^2-c^3 in
        cPointhb h_x_3006.
Definition X_3007 :=
        let h_x_3007 a b c := a^3×b^2+a^2×b^3-a×b^4-b^5-2×a^2×b^2×c+2×b^4×c+a^3×c^2-2×a^2×b×c^2+2×a×b^2×c^2-b^3×c^2+a^2×c^3-b^2×c^3-a×c^4+2×b×c^4-c^5 in
        cPointhb h_x_3007.
Definition X_3008 :=
        let h_x_3008 a b c := 2×a^2-a×b+b^2-a×c-2×b×c+c^2 in
        cPointhb h_x_3008.
Definition X_3009 :=
        let h_x_3009 a b c := a^2*(a×b^2-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_3009.
Definition X_3010 :=
        let h_x_3010 a b c := a^2*(a^3×b^2-2×a^2×b^3+a×b^4+a^2×b^2×c-b^4×c+a^3×c^2+a^2×b×c^2-2×a×b^2×c^2+b^3×c^2-2×a^2×c^3+b^2×c^3+a×c^4-b×c^4) in
        cPointhb h_x_3010.
Definition X_3011 :=
        let h_x_3011 a b c := 2×a^3-a^2×b+b^3-a^2×c-b^2×c-b×c^2+c^3 in
        cPointhb h_x_3011.
Definition X_3012 :=
        let h_x_3012 a b c := 2×a^5+(-a^4-4×a^2×(b-c)^2+(b-c)^4)*(b+c)+2×a×(b^2-c^2)^2 in
        cPointhb h_x_3012.
Definition X_3013 :=
        let h_x_3013 a b c := a*(b+c)*(a^6-2×a^4×b^2+a^2×b^4+2×a^4×b×c-a^2×b^3×c-b^5×c-2×a^4×c^2+a^2×b^2×c^2-a^2×b×c^3+2×b^3×c^3+a^2×c^4-b×c^5) in
        cPointhb h_x_3013.
Definition X_3014 :=
        let h_x_3014 a b c := a^6×b^2-b^8+a^6×c^2-4×a^4×b^2×c^2+a^2×b^4×c^2+2×b^6×c^2+a^2×b^2×c^4-2×b^4×c^4+2×b^2×c^6-c^8 in
        cPointhb h_x_3014.
Definition X_3015 :=
        let h_x_3015 a b c := 2×a^7-2×a^5×b^2-2×a^4×b^3+a^3×b^4+a^2×b^5-a×b^6+b^7+2×a^4×b^2×c-a^2×b^4×c-b^6×c-2×a^5×c^2+2×a^4×b×c^2+a×b^4×c^2-3×b^5×c^2-2×a^4×c^3+3×b^4×c^3+a^3×c^4-a^2×b×c^4+a×b^2×c^4+3×b^3×c^4+a^2×c^5-3×b^2×c^5-a×c^6-b×c^6+c^7 in
        cPointhb h_x_3015.
Definition X_3016 :=
        let h_x_3016 a b c := a^2*(a^6×b^2-2×a^4×b^4+a^2×b^6+a^6×c^2-2×b^6×c^2-2×a^4×c^4+4×b^4×c^4+a^2×c^6-2×b^2×c^6) in
        cPointhb h_x_3016.
Definition X_3017 :=
        let h_x_3017 a b c := a^4+3×a^3×b+a^2×b^2+b^4+3×a^3×c+3×a^2×b×c+a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3017.
Definition X_3018 :=
        let h_x_3018 a b c := 2×a^8-2×a^6×b^2-a^4×b^4+b^8-2×a^6×c^2+4×a^4×b^2×c^2-4×b^6×c^2-a^4×c^4+6×b^4×c^4-4×b^2×c^6+c^8 in
        cPointhb h_x_3018.
Definition X_3019 :=
        let h_x_3019 a b c := 3×a^6-a^5×b-4×a^4×b^2-a^3×b^3+2×a^2×b^4+2×a×b^5-b^6-a^5×c-a^4×b×c-a^3×b^2×c-a^2×b^3×c+2×a×b^4×c+2×b^5×c-4×a^4×c^2-a^3×b×c^2-2×a^2×b^2×c^2-4×a×b^3×c^2+b^4×c^2-a^3×c^3-a^2×b×c^3-4×a×b^2×c^3-4×b^3×c^3+2×a^2×c^4+2×a×b×c^4+b^2×c^4+2×a×c^5+2×b×c^5-c^6 in
        cPointhb h_x_3019.
Definition X_3020 :=
        let h_x_3020 a b c := (b-c)^2*(-a+b+c)*(b^2-b×c+c^2)^2 in
        cPointhb h_x_3020.
Definition X_3021 :=
        let h_x_3021 a b c := (a-b-c)*(2×a^2-a×b+b^2-a×c-2×b×c+c^2)^2 in
        cPointhb h_x_3021.
Definition X_3022 :=
        let h_x_3022 a b c := a^2×(a-b-c)^3×(b-c)^2 in
        cPointhb h_x_3022.
Definition X_3023 :=
        let h_x_3023 a b c := (a-b-c)*(b-c)^2×(a^2+b×c)^2 in
        cPointhb h_x_3023.
Definition X_3024 :=
        let h_x_3024 a b c := a^2*(a-b-c)*(b-c)^2×(a^2-b^2-b×c-c^2)^2 in
        cPointhb h_x_3024.
Definition X_3025 :=
        let h_x_3025 a b c := a^2×(b-c)^2*(-a+b+c)*(a^2-b^2+b×c-c^2)^2 in
        cPointhb h_x_3025.
Definition X_3026 :=
        let h_x_3026 a b c := (a-b-c)*(b-c)^2×(a^2+a×b+a×c+2×b×c)^2 in
        cPointhb h_x_3026.
Definition X_3027 :=
        let h_x_3027 a b c := (a+b-c)*(a-b+c)*(b+c)^2×(a^2-b×c)^2 in
        cPointhb h_x_3027.
Definition X_3028 :=
        let h_x_3028 a b c := a^2*(a+b-c)*(a-b+c)*(b+c)^2×(a^2-b^2+b×c-c^2)^2 in
        cPointhb h_x_3028.
Definition X_3029 :=
        let h_x_3029 a b c := (b+c)^2*(a^3-a×b^2-b^3+a^2×c)*(a^3+a^2×b-a×c^2-c^3) in
        cPointhb h_x_3029.
Definition X_3030 :=
        let h_x_3030 a b c := a^2*(a×b+b^2+a×c-2×b×c-c^2)*(a×b-b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_3030.
Definition X_3031 :=
        let h_x_3031 a b c := a^2×(b+c)^2*(a^3+b^3+a^2×c-b^2×c-a×c^2-c^3)*(a^3+a^2×b-a×b^2-b^3-b×c^2+c^3) in
        cPointhb h_x_3031.
Definition X_3032 :=
        let h_x_3032 a b c := a*(a^2×b-b^3+a^2×c-a×b×c-b^2×c+a×c^2)*(a^2×b+a×b^2+a^2×c-a×b×c-b×c^2-c^3) in
        cPointhb h_x_3032.
Definition X_3033 :=
        let h_x_3033 a b c := a^2*(a^2×b+b^3+a^2×c-b^2×c-b×c^2-c^3)*(a^2×b-b^3+a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_3033.
Definition X_3034 :=
        let h_x_3034 a b c := a*(a^2×b+b^3+a^2×c-a×b×c-b^2×c-a×c^2)*(a^2×b-a×b^2+a^2×c-a×b×c-b×c^2+c^3) in
        cPointhb h_x_3034.
Definition X_3035 :=
        let h_x_3035 a b c := (a-b)^2*(a+b-c)+(-a+c)^2*(a-b+c) in
        cPointhb h_x_3035.
Definition X_3036 :=
        let h_x_3036 a b c := (a+b-c)*(a-2×b+c)^2*(-a+b+c)+(a+b-2×c)^2*(a-b+c)*(-a+b+c) in
        cPointhb h_x_3036.
Definition X_3037 :=
        let h_x_3037 a b c := ((a^2-b^2)^2×c^4)/(a+b-c)+(b^4×(-a^2+c^2)^2)/(a-b+c) in
        cPointhb h_x_3037.
Definition X_3038 :=
        let h_x_3038 a b c := ((a-b)^2×c^2)/(a+b-c)+(b^2×(-a+c)^2)/(a-b+c) in
        cPointhb h_x_3038.
Definition X_3039 :=
        let h_x_3039 a b c := (a-b)^2/(a+b-c)+(-a+c)^2/(a-b+c) in
        cPointhb h_x_3039.
Definition X_3040 :=
        let h_x_3040 a b c := (c^2×(a×b×c-a*(SA a b c)-b*(SB a b c))^2)/(a+b-c)+(b^2×(a×b×c-a*(SA a b c)-c*(SC a b c))^2)/(a-b+c) in
        cPointhb h_x_3040.
Definition X_3041 :=
        let h_x_3041 a b c := (c^2×(a^2+b^2-a×c-b×c)^2)/(-a-b+c)+(b^2×(a^2-a×b-b×c+c^2)^2)/(-a+b-c) in
        cPointhb h_x_3041.
Definition X_3042 :=
        let h_x_3042 a b c := b^2*(-a+b-c)*(-a+c)^2×(SB a b c)^2+(a-b)^2×c^2*(-a-b+c)*(SC a b c)^2 in
        cPointhb h_x_3042.
Definition X_3043 :=
        let h_x_3043 a b c := a^4×(b^2×c^2-4×(SA a b c)^2)^2*(SB a b c)*(SC a b c) in
        cPointhb h_x_3043.
Definition X_3044 :=
        let h_x_3044 a b c := a^2*(a^4-a^2×b^2+b^4-a^2×c^2)*(a^4-a^2×b^2-a^2×c^2+c^4) in
        cPointhb h_x_3044.
Definition X_3045 :=
        let h_x_3045 a b c := a^3*(a^3-a^2×b-a×b^2+b^3+a×b×c-a×c^2)*(a^3-a×b^2-a^2×c+a×b×c-a×c^2+c^3) in
        cPointhb h_x_3045.
Definition X_3046 :=
        let h_x_3046 a b c := a^4*(a^3-a^2×b-a×b^2+b^3+b×c^2-c^3)*(a^3-b^3-a^2×c+b^2×c-a×c^2+c^3) in
        cPointhb h_x_3046.
Definition X_3047 :=
        let h_x_3047 a b c := a^4*(a^4-2×a^2×b^2+b^4+b^2×c^2-c^4)*(a^4-b^4-2×a^2×c^2+b^2×c^2+c^4) in
        cPointhb h_x_3047.
Definition X_3048 :=
        let h_x_3048 a b c := a^4*(a^4-4×a^2×b^2+b^4+3×b^2×c^2-c^4)*(a^4-b^4-4×a^2×c^2+3×b^2×c^2+c^4) in
        cPointhb h_x_3048.
Definition X_3049 :=
        let h_x_3049 a b c := a^4*(a^2-b^2-c^2)*(b^2-c^2) in
        cPointhb h_x_3049.
Definition X_3050 :=
        let h_x_3050 a b c := a^2*(b^2-c^2)*(a^4-a^2×b^2-a^2×c^2-b^2×c^2) in
        cPointhb h_x_3050.
Definition X_3051 :=
        let h_x_3051 a b c := a^4*(b^2+c^2) in
        cPointhb h_x_3051.
Definition X_3052 :=
        let h_x_3052 a b c := a^2*(3×a-b-c) in
        cPointhb h_x_3052.
Definition X_3053 :=
        let h_x_3053 a b c := a^2*(3×a^2-b^2-c^2) in
        cPointhb h_x_3053.
Definition X_3054 :=
        let h_x_3054 a b c := 4×a^4-5×a^2×b^2+3×b^4-5×a^2×c^2-6×b^2×c^2+3×c^4 in
        cPointhb h_x_3054.
Definition X_3055 :=
        let h_x_3055 a b c := 2×a^4-7×a^2×b^2+3×b^4-7×a^2×c^2-6×b^2×c^2+3×c^4 in
        cPointhb h_x_3055.
Definition X_3056 :=
        let h_x_3056 a b c := a^2*(a-b-c)*(b^2-b×c+c^2) in
        cPointhb h_x_3056.
Definition X_3057 :=
        let h_x_3057 a b c := a*(a-b-c)*(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_3057.
Definition X_3058 :=
        let h_x_3058 a b c := (a-b-c)*(2×a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_3058.
Definition X_3059 :=
        let h_x_3059 a b c := a*(a-b-c)*(-a+b+c)*(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_3059.
Definition X_3060 :=
        let h_x_3060 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+b^2×c^2-c^4) in
        cPointhb h_x_3060.
Definition X_3061 :=
        let h_x_3061 a b c := a*(a-b-c)*(b^2-b×c+c^2) in
        cPointhb h_x_3061.
Definition X_3062 :=
        let h_x_3062 a b c := a*(-a^2-2×a×b+3×b^2+2×a×c-2×b×c-c^2)*(-a^2+2×a×b-b^2-2×a×c-2×b×c+3×c^2) in
        cPointhb h_x_3062.
Definition X_3063 :=
        let h_x_3063 a b c := a^3*(b-c)*(-a+b+c) in
        cPointhb h_x_3063.
Definition X_3064 :=
        let h_x_3064 a b c := (b-c)*(-a+b+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_3064.
Definition X_3065 :=
        let h_x_3065 a b c := a/(a^3+a^2×b-a×b^2-b^3+a^2×c-a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3065.
Definition X_3066 :=
        let h_x_3066 a b c := a^2*(a^2+3×b^2-c^2)*(a^2-b^2+3×c^2) in
        cPointhb h_x_3066.
Definition X_3067 :=
        let h_x_3067 a b c := a^2*((A a b c)-(B a b c))*(B a b c)*((C a b c)-(A a b c))*(C a b c) in
        cPointhb h_x_3067.
Definition X_3068 :=
        let h_x_3068 a b c := a^2+2*(DeltaMaj a b c) in
        cPointhb h_x_3068.
Definition X_3069 :=
        let h_x_3069 a b c := a^2-2*(DeltaMaj a b c) in
        cPointhb h_x_3069.
Definition X_3070 :=
        let h_x_3070 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)+4×a^2*(DeltaMaj a b c) in
        cPointhb h_x_3070.
Definition X_3071 :=
        let h_x_3071 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)-4×a^2*(DeltaMaj a b c) in
        cPointhb h_x_3071.
Definition X_3072 :=
        let h_x_3072 a b c := a*(a^6-2×a^4×b^2+a^2×b^4-a^4×b×c+b^5×c-2×a^4×c^2-2×a^2×b^2×c^2-2×b^3×c^3+a^2×c^4+b×c^5) in
        cPointhb h_x_3072.
Definition X_3073 :=
        let h_x_3073 a b c := a*(-a^6+2×a^4×b^2-a^2×b^4-a^4×b×c+b^5×c+2×a^4×c^2+2×a^2×b^2×c^2-2×b^3×c^3-a^2×c^4+b×c^5) in
        cPointhb h_x_3073.
Definition X_3074 :=
        let h_x_3074 a b c := a*(a^6-2×a^4×b^2+a^2×b^4-a^4×b×c+2×a^2×b^3×c-b^5×c-2×a^4×c^2+2×a^2×b^2×c^2+2×a^2×b×c^3+2×b^3×c^3+a^2×c^4-b×c^5) in
        cPointhb h_x_3074.
Definition X_3075 :=
        let h_x_3075 a b c := a*(a^6-2×a^4×b^2+a^2×b^4+a^4×b×c-2×a^2×b^3×c+b^5×c-2×a^4×c^2+2×a^2×b^2×c^2-2×a^2×b×c^3-2×b^3×c^3+a^2×c^4+b×c^5) in
        cPointhb h_x_3075.
Definition X_3076 :=
        let h_x_3076 a b c := a^3*((a^2-b^2-c^2)^2+8×b×c*(DeltaMaj a b c)) in
        cPointhb h_x_3076.
Definition X_3077 :=
        let h_x_3077 a b c := a^3*((a^2-b^2-c^2)^2-8×b×c*(DeltaMaj a b c)) in
        cPointhb h_x_3077.
Definition X_3078 :=
        let h_x_3078 a b c := (a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)^2*(2×a^4-3×a^2×b^2+b^4-3×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3078.
Definition X_3079 :=
        let h_x_3079 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4)^2 in
        cPointhb h_x_3079.
Definition X_3080 :=
        let h_x_3080 a b c := a^4*(-a^2+b^2-c^2)*(-a^2-b^2+c^2)*(a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3080.
Definition X_3081 :=
        let h_x_3081 a b c := (2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)^3 in
        cPointhb h_x_3081.
Definition X_3082 :=
        let h_x_3082 a b c := a*(-1+sqrt(((s a b c)*(sb a b c))/(a×c)))*(-1+sqrt(((s a b c)*(sc a b c))/(a×b))) in
        cPointhb h_x_3082.
Definition X_3083 :=
        let h_x_3083 a b c := a*(b×c+2*(DeltaMaj a b c)) in
        cPointhb h_x_3083.
Definition X_3084 :=
        let h_x_3084 a b c := a*(b×c-2*(DeltaMaj a b c)) in
        cPointhb h_x_3084.
Definition X_3085 :=
        let h_x_3085 a b c := a^4-2×a^2×b^2+b^4-4×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3085.
Definition X_3086 :=
        let h_x_3086 a b c := a^4-2×a^2×b^2+b^4+4×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3086.
Definition X_3087 :=
        let h_x_3087 a b c := (-a^2+b^2-c^2)*(-a^2-b^2+c^2)*(3×a^4-4×a^2×b^2+b^4-4×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3087.
Definition X_3088 :=
        let h_x_3088 a b c := (-a^2+b^2-c^2)*(-a^2-b^2+c^2)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2+10×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3088.
Definition X_3089 :=
        let h_x_3089 a b c := (-a^2+b^2-c^2)*(-a^2-b^2+c^2)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-6×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3089.
Definition X_3090 :=
        let h_x_3090 a b c := a^4-4×a^2×b^2+3×b^4-4×a^2×c^2-6×b^2×c^2+3×c^4 in
        cPointhb h_x_3090.
Definition X_3091 :=
        let h_x_3091 a b c := a^4+2×a^2×b^2-3×b^4+2×a^2×c^2+6×b^2×c^2-3×c^4 in
        cPointhb h_x_3091.
Definition X_3092 :=
        let h_x_3092 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(b^2×c^2-(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3092.
Definition X_3093 :=
        let h_x_3093 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(b^2×c^2+(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3093.
Definition X_3094 :=
        let h_x_3094 a b c := a^2*(b^4+b^2×c^2+c^4) in
        cPointhb h_x_3094.
Definition X_3095 :=
        let h_x_3095 a b c := a^2*(a^2×b^4-b^6+3×a^2×b^2×c^2+a^2×c^4-c^6) in
        cPointhb h_x_3095.
Definition X_3096 :=
        let h_x_3096 a b c := a^2×b^2+b^4+a^2×c^2+b^2×c^2+c^4 in
        cPointhb h_x_3096.
Definition X_3097 :=
        let h_x_3097 a b c := a*(a^2×b^2+2×a×b^3+2×a×b^2×c+a^2×c^2+2×a×b×c^2-b^2×c^2+2×a×c^3) in
        cPointhb h_x_3097.
Definition X_3098 :=
        let h_x_3098 a b c := a^2*(a^4+a^2×b^2-2×b^4+a^2×c^2-2×b^2×c^2-2×c^4) in
        cPointhb h_x_3098.
Definition X_3099 :=
        let h_x_3099 a b c := a*(a^4+2×a^3×b-a^2×b^2-b^4+2×a^3×c-a^2×c^2-b^2×c^2-c^4) in
        cPointhb h_x_3099.
Definition X_3100 :=
        let h_x_3100 a b c := a*(a-b-c)*(a^4-b^4-a^2×b×c+b^3×c+b×c^3-c^4) in
        cPointhb h_x_3100.
Definition X_3101 :=
        let h_x_3101 a b c := a*(a^5+a^4×b-a×b^4-b^5+a^4×c+a^3×b×c-a^2×b^2×c-a×b^3×c-a^2×b×c^2+b^3×c^2-a×b×c^3+b^2×c^3-a×c^4-c^5) in
        cPointhb h_x_3101.
Definition X_3102 :=
        let h_x_3102 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)+(b^2+c^2)*(SS a b c)) in
        cPointhb h_x_3102.
Definition X_3103 :=
        let h_x_3103 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)-(b^2+c^2)*(SS a b c)) in
        cPointhb h_x_3103.
Definition X_3104 :=
        let h_x_3104 a b c := a^2*(sqrt(3)*((SA a b c)^2-(SB a b c)*(SC a b c))+(b^2+c^2)*(SS a b c)) in
        cPointhb h_x_3104.
Definition X_3105 :=
        let h_x_3105 a b c := a^2*(sqrt(3)*((SA a b c)^2-(SB a b c)*(SC a b c))-(b^2+c^2)*(SS a b c)) in
        cPointhb h_x_3105.
Definition X_3106 :=
        let h_x_3106 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)+sqrt(3)*(b^2+c^2)*(SS a b c)) in
        cPointhb h_x_3106.
Definition X_3107 :=
        let h_x_3107 a b c := a^2*((SA a b c)^2-(SB a b c)*(SC a b c)-sqrt(3)*(b^2+c^2)*(SS a b c)) in
        cPointhb h_x_3107.
Definition X_3108 :=
        let h_x_3108 a b c := a^2/(2×a^2+b^2+c^2) in
        cPointhb h_x_3108.
Definition X_3109 :=
        let h_x_3109 a b c := (a+b)*(a+c)*(2×a^5-2×a^4×b+a^2×b^3-2×a×b^4+b^5-2×a^4×c+2×a^3×b×c-a^2×b^2×c+b^4×c-a^2×b×c^2+4×a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-2×a×c^4+b×c^4+c^5) in
        cPointhb h_x_3109.
Definition X_3110 :=
        let h_x_3110 a b c := a^2*(a+b)*(a+c)*(-a×b^3+b^4+2×a^2×b×c-a×b^2×c-a×b×c^2-a×c^3+c^4) in
        cPointhb h_x_3110.
Definition X_3111 :=
        let h_x_3111 a b c := a^2*(a^4×b^4-a^2×b^6-4×a^4×b^2×c^2+3×a^2×b^4×c^2-b^6×c^2+a^4×c^4+3×a^2×b^2×c^4-a^2×c^6-b^2×c^6) in
        cPointhb h_x_3111.
Definition X_3112 :=
        let h_x_3112 a b c := 1/(a*(b^2+c^2)) in
        cPointhb h_x_3112.
Definition X_3113 :=
        let h_x_3113 a b c := (b^2-c^2)/(a*(b^6-c^6)) in
        cPointhb h_x_3113.
Definition X_3114 :=
        let h_x_3114 a b c := 1/(a^2*(-b^2×c^2+(b^2+c^2)^2)) in
        cPointhb h_x_3114.
Definition X_3115 :=
        let h_x_3115 a b c := (b^2-c^2)/(a^2*(b^8-c^8)) in
        cPointhb h_x_3115.
Definition X_3116 :=
        let h_x_3116 a b c := (a^3*(b^6-c^6))/(b^2-c^2) in
        cPointhb h_x_3116.
Definition X_3117 :=
        let h_x_3117 a b c := a^4*(-b^2×c^2+(b^2+c^2)^2) in
        cPointhb h_x_3117.
Definition X_3118 :=
        let h_x_3118 a b c := (a^4*(b^8-c^8))/(b^2-c^2) in
        cPointhb h_x_3118.
Definition X_3119 :=
        let h_x_3119 a b c := a×(a-b-c)^3×(b-c)^2 in
        cPointhb h_x_3119.
Definition X_3120 :=
        let h_x_3120 a b c := (b-c)^2*(b+c) in
        cPointhb h_x_3120.
Definition X_3121 :=
        let h_x_3121 a b c := a^3×(b-c)^2*(b+c) in
        cPointhb h_x_3121.
Definition X_3122 :=
        let h_x_3122 a b c := a^2×(b-c)^2*(b+c) in
        cPointhb h_x_3122.
Definition X_3123 :=
        let h_x_3123 a b c := a×(b-c)^2*(a×b+a×c-b×c) in
        cPointhb h_x_3123.
Definition X_3124 :=
        let h_x_3124 a b c := a^2×(b-c)^2×(b+c)^2 in
        cPointhb h_x_3124.
Definition X_3125 :=
        let h_x_3125 a b c := a×(b-c)^2*(b+c) in
        cPointhb h_x_3125.
Definition X_3126 :=
        let h_x_3126 a b c := a*(b-c)*(a×b-b^2+a×c-c^2)^2 in
        cPointhb h_x_3126.
Definition X_3127 :=
        let h_x_3127 a b c := (b^2+c^2+2*(DeltaMaj a b c))/(a^2-b^2-c^2) in
        cPointhb h_x_3127.
Definition X_3128 :=
        let h_x_3128 a b c := (b^2+c^2-2*(DeltaMaj a b c))/(a^2-b^2-c^2) in
        cPointhb h_x_3128.
Definition X_3129 :=
        let h_x_3129 a b c := a^2*(2×a^10-4×a^8×b^2+2×a^6×b^4-2×a^4×b^6+4×a^2×b^8-2×b^10-4×a^8×c^2+9×a^6×b^2×c^2-6×a^4×b^4×c^2-5×a^2×b^6×c^2+6×b^8×c^2+2×a^6×c^4-6×a^4×b^2×c^4+2×a^2×b^4×c^4-4×b^6×c^4-2×a^4×c^6-5×a^2×b^2×c^6-4×b^4×c^6+4×a^2×c^8+6×b^2×c^8-2×c^10-4×sqrt(3)×b^2×c^2*(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_3129.
Definition X_3131 :=
        let h_x_3131 a b c := a^2*(a^4-b^4+2×b^2×c^2-c^4-4×sqrt(3)*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3131.
Definition X_3132 :=
        let h_x_3132 a b c := a^2*(a^4-b^4+2×b^2×c^2-c^4+4×sqrt(3)*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3132.
Definition X_3133 :=
        let h_x_3133 a b c := a^4*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4)^2 in
        cPointhb h_x_3133.
Definition X_3134 :=
        let h_x_3134 a b c := (b^2-c^2)^2*(-a^8+3×a^6×b^2-3×a^4×b^4+a^2×b^6+3×a^6×c^2-7×a^4×b^2×c^2+3×a^2×b^4×c^2+b^6×c^2-3×a^4×c^4+3×a^2×b^2×c^4-2×b^4×c^4+a^2×c^6+b^2×c^6) in
        cPointhb h_x_3134.
Definition X_3135 :=
        let h_x_3135 a b c := a^4*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-3×a^4×b^2×c^2+a^2×b^4×c^2+b^6×c^2-3×a^4×c^4+a^2×b^2×c^4+3×a^2×c^6+b^2×c^6-c^8) in
        cPointhb h_x_3135.
Definition X_3136 :=
        let h_x_3136 a b c := (b+c)*(-a^3×b^2+a×b^4-a^2×b^2×c+b^4×c-a^3×c^2-a^2×b×c^2-2×a×b^2×c^2-b^3×c^2-b^2×c^3+a×c^4+b×c^4) in
        cPointhb h_x_3136.
Definition X_3137 :=
        let h_x_3137 a b c := (b-c)^2*(b+c)*(-a^8×b+3×a^6×b^3-3×a^4×b^5+a^2×b^7-a^8×c+a^7×b×c+2×a^6×b^2×c-2×a^5×b^3×c-a^4×b^4×c+a^3×b^5×c+2×a^6×b×c^2+a^5×b^2×c^2-5×a^4×b^3×c^2+2×a^2×b^5×c^2-a×b^6×c^2+b^7×c^2+3×a^6×c^3-2×a^5×b×c^3-5×a^4×b^2×c^3+2×a^3×b^3×c^3+a^2×b^4×c^3+b^6×c^3-a^4×b×c^4+a^2×b^3×c^4+2×a×b^4×c^4-2×b^5×c^4-3×a^4×c^5+a^3×b×c^5+2×a^2×b^2×c^5-2×b^4×c^5-a×b^2×c^6+b^3×c^6+a^2×c^7+b^2×c^7) in
        cPointhb h_x_3137.
Definition X_3138 :=
        let h_x_3138 a b c := (b-c)^2*(b+c)*(-a^7×b+a^6×b^2+2×a^5×b^3-2×a^4×b^4-a^3×b^5+a^2×b^6-a^7×c+a^6×b×c+2×a^5×b^2×c-2×a^4×b^3×c-a^3×b^4×c+a^2×b^5×c+a^6×c^2+2×a^5×b×c^2-5×a^4×b^2×c^2-2×a^3×b^3×c^2+3×a^2×b^4×c^2+b^6×c^2+2×a^5×c^3-2×a^4×b×c^3-2×a^3×b^2×c^3+2×a^2×b^3×c^3-2×a^4×c^4-a^3×b×c^4+3×a^2×b^2×c^4-2×b^4×c^4-a^3×c^5+a^2×b×c^5+a^2×c^6+b^2×c^6) in
        cPointhb h_x_3138.
Definition X_3139 :=
        let h_x_3139 a b c := (b-c)^2*(b+c)*(-a^6+a^5×b+2×a^4×b^2-2×a^3×b^3-a^2×b^4+a×b^5+a^5×c-a^4×b×c-2×a^3×b^2×c+a×b^4×c+b^5×c+2×a^4×c^2-2×a^3×b×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2-2×a^3×c^3+2×a×b^2×c^3-2×b^3×c^3-a^2×c^4+a×b×c^4+a×c^5+b×c^5) in
        cPointhb h_x_3139.
Definition X_3140 :=
        let h_x_3140 a b c := (b-c)^2*(b+c)*(-a^5+a×b^4+a^3×b×c-a^2×b^2×c-a×b^3×c+b^4×c-a^2×b×c^2-2×a×b^2×c^2+b^3×c^2-a×b×c^3+b^2×c^3+a×c^4+b×c^4) in
        cPointhb h_x_3140.
Definition X_3141 :=
        let h_x_3141 a b c := (b^2-c^2)*((a^2×b^2*(a^2-b^2))/((2×a-b-c)*(-a+2×b-c))-(b^2×c^2*(b^2-c^2))/((-a+2×b-c)*(-a-b+2×c))+(a^2×c^2*(-a^2+c^2))/((2×a-b-c)*(-a-b+2×c))) in
        cPointhb h_x_3141.
Definition X_3142 :=
        let h_x_3142 a b c := (b+c)*(-a^4×b^2-a^3×b^3+a^2×b^4+a×b^5-a^2×b^3×c+b^5×c-a^4×c^2-a×b^3×c^2-a^3×c^3-a^2×b×c^3-a×b^2×c^3-2×b^3×c^3+a^2×c^4+a×c^5+b×c^5) in
        cPointhb h_x_3142.
Definition X_3143 :=
        let h_x_3143 a b c := (b^2-c^2)^2*(-a^6+a^2×b^4-3×a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4) in
        cPointhb h_x_3143.
Definition X_3144 :=
        let h_x_3144 a b c := (a^3+2×a^2×b-b^3+2×a^2×c+a×b×c-c^3)/(a^2-b^2-c^2) in
        cPointhb h_x_3144.
Definition X_3145 :=
        let h_x_3145 a b c := a^2*(a^5-a^3×b^2+a^2×b^3-b^5-a^3×b×c+a×b^3×c-a^3×c^2+2×a×b^2×c^2+b^3×c^2+a^2×c^3+a×b×c^3+b^2×c^3-c^5) in
        cPointhb h_x_3145.
Definition X_3146 :=
        let h_x_3146 a b c := 5×a^4-2×a^2×b^2-3×b^4-2×a^2×c^2+6×b^2×c^2-3×c^4 in
        cPointhb h_x_3146.
Definition X_3147 :=
        let h_x_3147 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(3×a^6-7×a^4×b^2+5×a^2×b^4-b^6-7×a^4×c^2+2×a^2×b^2×c^2+b^4×c^2+5×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3147.
Definition X_3148 :=
        let h_x_3148 a b c := a^2*(a^6-a^4×b^2+a^2×b^4-b^6-a^4×c^2+2×a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3148.
Definition X_3149 :=
        let h_x_3149 a b c := a*(a^6-a^5×b-2×a^4×b^2+2×a^3×b^3+a^2×b^4-a×b^5-a^5×c-2×a^2×b^3×c+a×b^4×c+2×b^5×c-2×a^4×c^2+2×a^2×b^2×c^2+2×a^3×c^3-2×a^2×b×c^3-4×b^3×c^3+a^2×c^4+a×b×c^4-a×c^5+2×b×c^5) in
        cPointhb h_x_3149.
Definition X_3150 :=
        let h_x_3150 a b c := (b^2-c^2)^2*(-a^2+b^2+c^2)*(a^8-a^6×b^2-a^4×b^4+a^2×b^6-a^6×c^2-a^4×b^2×c^2+a^2×b^4×c^2+b^6×c^2-a^4×c^4+a^2×b^2×c^4-2×b^4×c^4+a^2×c^6+b^2×c^6) in
        cPointhb h_x_3150.
Definition X_3151 :=
        let h_x_3151 a b c := (a+c)*(b+c)*(SA a b c)*(SB a b c)+(a+b)*(b+c)*(SA a b c)*(SC a b c)-(a+b)*(a+c)*(SB a b c)*(SC a b c) in
        cPointhb h_x_3151.
Definition X_3152 :=
        let h_x_3152 a b c := ((a+c)*(b+c)*(SA a b c)*(SB a b c))/((a-b+c)*(-a+b+c))+((a+b)*(b+c)*(SA a b c)*(SC a b c))/((a+b-c)*(-a+b+c))-((a+b)*(a+c)*(SB a b c)*(SC a b c))/((a+b-c)*(a-b+c)) in
        cPointhb h_x_3152.
Definition X_3153 :=
        let h_x_3153 a b c := a^10-a^8×b^2-2×a^6×b^4+2×a^4×b^6+a^2×b^8-b^10-a^8×c^2+a^6×b^2×c^2-3×a^2×b^6×c^2+3×b^8×c^2-2×a^6×c^4+4×a^2×b^4×c^4-2×b^6×c^4+2×a^4×c^6-3×a^2×b^2×c^6-2×b^4×c^6+a^2×c^8+3×b^2×c^8-c^10 in
        cPointhb h_x_3153.
Definition X_3154 :=
        let h_x_3154 a b c := (b^2-c^2)^2*(-3×a^8+7×a^6×b^2-3×a^4×b^4-3×a^2×b^6+2×b^8+7×a^6×c^2-13×a^4×b^2×c^2+7×a^2×b^4×c^2-b^6×c^2-3×a^4×c^4+7×a^2×b^2×c^4-2×b^4×c^4-3×a^2×c^6-b^2×c^6+2×c^8) in
        cPointhb h_x_3154.
Definition X_3155 :=
        let h_x_3155 a b c := a^2*(a^4-b^4+2×b^2×c^2-c^4-4*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3155.
Definition X_3156 :=
        let h_x_3156 a b c := a^2*(a^4-b^4+2×b^2×c^2-c^4+4*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3156.
Definition X_3157 :=
        let h_x_3157 a b c := a^2*(a^2-b^2-c^2)*(a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3157.
Definition X_3158 :=
        let h_x_3158 a b c := a*(a-b-c)*(3×a-b-c) in
        cPointhb h_x_3158.
Definition X_3159 :=
        let h_x_3159 a b c := (b+c)*(-a^2×b-a×b^2-a^2×c+b^2×c-a×c^2+b×c^2) in
        cPointhb h_x_3159.
Definition X_3160 :=
        let h_x_3160 a b c := (3×a^2-2×a×b-b^2-2×a×c+2×b×c-c^2)/(a-b-c) in
        cPointhb h_x_3160.
Definition X_3161 :=
        let h_x_3161 a b c := (3×a-b-c)*(-a+b+c) in
        cPointhb h_x_3161.
Definition X_3162 :=
        let h_x_3162 a b c := (a^2*(a^6+a^4×b^2-a^2×b^4-b^6+a^4×c^2-2×a^2×b^2×c^2+b^4×c^2-a^2×c^4+b^2×c^4-c^6))/(a^2-b^2-c^2) in
        cPointhb h_x_3162.
Definition X_3163 :=
        let h_x_3163 a b c := (2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)^2 in
        cPointhb h_x_3163.
Definition X_3164 :=
        let h_x_3164 a b c := a^6×b^2-2×a^4×b^4+a^2×b^6+a^6×c^2+a^4×b^2×c^2-a^2×b^4×c^2-b^6×c^2-2×a^4×c^4-a^2×b^2×c^4+2×b^4×c^4+a^2×c^6-b^2×c^6 in
        cPointhb h_x_3164.
Definition X_3165 :=
        let h_x_3165 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c))*(sqrt(3)*(a^2-b^2-c^2)*(a^2+b^2-c^2)*(a^2-b^2+c^2)+4*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_3165.
Definition X_3166 :=
        let h_x_3166 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)+4*(DeltaMaj a b c))*(sqrt(3)*(a^2-b^2-c^2)*(a^2+b^2-c^2)*(a^2-b^2+c^2)-4*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4)*(DeltaMaj a b c)) in
        cPointhb h_x_3166.
Definition X_3167 :=
        let h_x_3167 a b c := a^2*(a^2-b^2-c^2)*(3×a^2-b^2-c^2) in
        cPointhb h_x_3167.
Definition X_3168 :=
        let h_x_3168 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^6×b^2-2×a^4×b^4+a^2×b^6+a^6×c^2+a^4×b^2×c^2-a^2×b^4×c^2-b^6×c^2-2×a^4×c^4-a^2×b^2×c^4+2×b^4×c^4+a^2×c^6-b^2×c^6) in
        cPointhb h_x_3168.
Definition X_3169 :=
        let h_x_3169 a b c := a*(a-b-c)*(a^2×b+a×b^2+a^2×c-a×b×c-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_3169.
Definition X_3170 :=
        let h_x_3170 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c))*(sqrt(3)*(3×a^2-b^2-c^2)+4*(DeltaMaj a b c)) in
        cPointhb h_x_3170.
Definition X_3171 :=
        let h_x_3171 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)+4*(DeltaMaj a b c))*(sqrt(3)*(3×a^2-b^2-c^2)-4*(DeltaMaj a b c)) in
        cPointhb h_x_3171.
Definition X_3172 :=
        let h_x_3172 a b c := (a^2*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4))/(a^2-b^2-c^2) in
        cPointhb h_x_3172.
Definition X_3173 :=
        let h_x_3173 a b c := (a^2*(a^2-b^2-c^2)*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3))/(a-b-c) in
        cPointhb h_x_3173.
Definition X_3174 :=
        let h_x_3174 a b c := a*(-a+b+c)*(a^3-3×a^2×b+3×a×b^2-b^3-3×a^2×c-2×a×b×c+b^2×c+3×a×c^2+b×c^2-c^3) in
        cPointhb h_x_3174.
Definition X_3175 :=
        let h_x_3175 a b c := (b+c)*(-a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_3175.
Definition X_3176 :=
        let h_x_3176 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_3176.
Definition X_3177 :=
        let h_x_3177 a b c := a^3×b-2×a^2×b^2+a×b^3+a^3×c+a^2×b×c-a×b^2×c-b^3×c-2×a^2×c^2-a×b×c^2+2×b^2×c^2+a×c^3-b×c^3 in
        cPointhb h_x_3177.
Definition X_3178 :=
        let h_x_3178 a b c := (b+c)*(-a^3-2×a^2×b+b^3-2×a^2×c-a×b×c+c^3) in
        cPointhb h_x_3178.
Definition X_3179 :=
        let h_x_3179 a b c := a*(c*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))*(b^2*(SB a b c)+4*(SA a b c)*(SC a b c)+2×sqrt(3)×b^2*(DeltaMaj a b c))+b*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c))*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c))+a*(-b^2*(SB a b c)-4*(SA a b c)*(SC a b c)-2×sqrt(3)×b^2*(DeltaMaj a b c))*(4*(SA a b c)*(SB a b c)+c^2*(SC a b c)+2×sqrt(3)×c^2*(DeltaMaj a b c))) in
        cPointhb h_x_3179.
Definition X_3180 :=
        let h_x_3180 a b c := 4×a^8-4×a^6×b^2-6×a^4×b^4+8×a^2×b^6-2×b^8-4×a^6×c^2+a^4×b^2×c^2-5×a^2×b^4×c^2+2×b^6×c^2-6×a^4×c^4-5×a^2×b^2×c^4+8×a^2×c^6+2×b^2×c^6-2×c^8+4×sqrt(3)×a^2*(2×a^4-4×a^2×b^2+2×b^4-4×a^2×c^2-b^2×c^2+2×c^4)*(DeltaMaj a b c) in
        cPointhb h_x_3180.
Definition X_3181 :=
        let h_x_3181 a b c := 4×a^8-4×a^6×b^2-6×a^4×b^4+8×a^2×b^6-2×b^8-4×a^6×c^2+a^4×b^2×c^2-5×a^2×b^4×c^2+2×b^6×c^2-6×a^4×c^4-5×a^2×b^2×c^4+8×a^2×c^6+2×b^2×c^6-2×c^8-4×sqrt(3)×a^2*(2×a^4-4×a^2×b^2+2×b^4-4×a^2×c^2-b^2×c^2+2×c^4)*(DeltaMaj a b c) in
        cPointhb h_x_3181.
Definition X_3182 :=
        let h_x_3182 a b c := a*(a*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(-b^2*(SB a b c)+(SA a b c)*(SC a b c))+b*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))+c*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))) in
        cPointhb h_x_3182.
Definition X_3183 :=
        let h_x_3183 a b c := (SB a b c)*(SC a b c)*((SB a b c)*(SC a b c)*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(-b^2*(SB a b c)+(SA a b c)*(SC a b c))+(SA a b c)*(SC a b c)*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))+(SA a b c)*(SB a b c)*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))) in
        cPointhb h_x_3183.
Definition X_3184 :=
        let h_x_3184 a b c := (a^2-b^2-c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(2×a^10-a^8×b^2-8×a^6×b^4+10×a^4×b^6-2×a^2×b^8-b^10-a^8×c^2+16×a^6×b^2×c^2-10×a^4×b^4×c^2-8×a^2×b^6×c^2+3×b^8×c^2-8×a^6×c^4-10×a^4×b^2×c^4+20×a^2×b^4×c^4-2×b^6×c^4+10×a^4×c^6-8×a^2×b^2×c^6-2×b^4×c^6-2×a^2×c^8+3×b^2×c^8-c^10) in
        cPointhb h_x_3184.
Definition X_3185 :=
        let h_x_3185 a b c := a^3*(a^2×b-b^3+a^2×c-a×b×c-c^3) in
        cPointhb h_x_3185.
Definition X_3186 :=
        let h_x_3186 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2×b^2+a^2×c^2-b^2×c^2) in
        cPointhb h_x_3186.
Definition X_3187 :=
        let h_x_3187 a b c := a^3+a^2×b+a^2×c-b^2×c-b×c^2 in
        cPointhb h_x_3187.
Definition X_3188 :=
        let h_x_3188 a b c := (-a+b-c)*(-a-b+c)*(a^5-a^4×b-a^3×b^2+a^2×b^3-a^4×c+b^4×c-a^3×c^2-b^3×c^2+a^2×c^3-b^2×c^3+b×c^4) in
        cPointhb h_x_3188.
Definition X_3189 :=
        let h_x_3189 a b c := (a-b-c)*(3×a^3+a^2×b-a×b^2+b^3+a^2×c-2×a×b×c-b^2×c-a×c^2-b×c^2+c^3) in
        cPointhb h_x_3189.
Definition X_3190 :=
        let h_x_3190 a b c := a^2*(a-b-c)*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_3190.
Definition X_3191 :=
        let h_x_3191 a b c := a*(b+c)*(a^5-2×a^3×b^2+a×b^4-a^3×b×c-a^2×b^2×c+a×b^3×c+b^4×c-2×a^3×c^2-a^2×b×c^2-b^3×c^2+a×b×c^3-b^2×c^3+a×c^4+b×c^4) in
        cPointhb h_x_3191.
Definition X_3192 :=
        let h_x_3192 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2×b-b^3+a^2×c-a×b×c-c^3) in
        cPointhb h_x_3192.
Definition X_3193 :=
        let h_x_3193 a b c := a*(a+b)*(a-b-c)*(a+c)*(a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3193.
Definition X_3194 :=
        let h_x_3194 a b c := a*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3194.
Definition X_3195 :=
        let h_x_3195 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3195.
Definition X_3196 :=
        let h_x_3196 a b c := a^2*(a^3+a^2×b-a×b^2-b^3+a^2×c-5×a×b×c+3×b^2×c-a×c^2+3×b×c^2-c^3) in
        cPointhb h_x_3196.
Definition X_3197 :=
        let h_x_3197 a b c := a^2*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_3197.
Definition X_3198 :=
        let h_x_3198 a b c := a*(b+c)*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_3198.
Definition X_3199 :=
        let h_x_3199 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_3199.
Definition X_3200 :=
        let h_x_3200 a b c := a^4*(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c))*(sqrt(3)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4)+4*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3200.
Definition X_3201 :=
        let h_x_3201 a b c := a^4*(sqrt(3)*(a^2-b^2-c^2)+4*(DeltaMaj a b c))*(sqrt(3)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4)-4*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3201.
Definition X_3202 :=
        let h_x_3202 a b c := a^6*(a^2×b^2-b^4+a^2×c^2-b^2×c^2-c^4) in
        cPointhb h_x_3202.
Definition X_3203 :=
        let h_x_3203 a b c := a^4*(b^2+c^2)*(a^4-a^2×b^2-a^2×c^2-b^2×c^2) in
        cPointhb h_x_3203.
Definition X_3204 :=
        let h_x_3204 a b c := a^2*(a^3-a×b^2-2×a×b×c+b^2×c-a×c^2+b×c^2) in
        cPointhb h_x_3204.
Definition X_3205 :=
        let h_x_3205 a b c := a^4*(a^2-b^2-c^2-4×sqrt(3)*(DeltaMaj a b c))*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4+4×sqrt(3)*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3205.
Definition X_3206 :=
        let h_x_3206 a b c := a^4*(a^2-b^2-c^2+4×sqrt(3)*(DeltaMaj a b c))*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4-4×sqrt(3)*(a^2-b^2-c^2)*(DeltaMaj a b c)) in
        cPointhb h_x_3206.
Definition X_3207 :=
        let h_x_3207 a b c := a^2*(3×a^2-2×a×b-b^2-2×a×c+2×b×c-c^2) in
        cPointhb h_x_3207.
Definition X_3208 :=
        let h_x_3208 a b c := a*(a-b-c)*(a×b+a×c-b×c) in
        cPointhb h_x_3208.
Definition X_3209 :=
        let h_x_3209 a b c := a^2*(-a+b-c)*(-a-b+c)*(-a^2+b^2-c^2)*(-a^2-b^2+c^2)*(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3209.
Definition X_3210 :=
        let h_x_3210 a b c := a^2×b+a×b^2+a^2×c-a×b×c-b^2×c+a×c^2-b×c^2 in
        cPointhb h_x_3210.
Definition X_3211 :=
        let h_x_3211 a b c := a^2*(a^2-b^2-c^2)*(a^4-2×a^3×b+2×a×b^3-b^4-2×a^3×c-2×a^2×b×c+2×b^2×c^2+2×a×c^3-c^4) in
        cPointhb h_x_3211.
Definition X_3212 :=
        let h_x_3212 a b c := (a+b-c)*(a-b+c)*(a×b+a×c-b×c) in
        cPointhb h_x_3212.
Definition X_3213 :=
        let h_x_3213 a b c := a*(-a+b-c)*(-a-b+c)*(-a^2+b^2-c^2)*(-a^2-b^2+c^2)*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_3213.
Definition X_3214 :=
        let h_x_3214 a b c := a*(b+c)*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_3214.
Definition X_3215 :=
        let h_x_3215 a b c := a^3*(-a+b-c)*(-a-b+c)*(a^2-b^2-c^2)*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_3215.
Definition X_3216 :=
        let h_x_3216 a b c := a*(a^2×b+a×b^2+a^2×c-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_3216.
Definition X_3217 :=
        let h_x_3217 a b c := a^2*(a-b-c)*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_3217.
Definition X_3218 :=
        let h_x_3218 a b c := a*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_3218.
Definition X_3219 :=
        let h_x_3219 a b c := a*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_3219.
Definition X_3220 :=
        let h_x_3220 a b c := a^2*(-a^4+b^4+c^4-b×c*(-a^2+b^2+c^2)) in
        cPointhb h_x_3220.
Definition X_3221 :=
        let h_x_3221 a b c := a^2*(b^2-c^2)*(-a^2×b^2-a^2×c^2+b^2×c^2) in
        cPointhb h_x_3221.
Definition X_3222 :=
        let h_x_3222 a b c := 1/((b^2-c^2)*(-a^2×b^2-a^2×c^2+b^2×c^2)) in
        cPointhb h_x_3222.
Definition X_3223 :=
        let h_x_3223 a b c := a/(-b^2×c^2+a^2*(b^2+c^2)) in
        cPointhb h_x_3223.
Definition X_3224 :=
        let h_x_3224 a b c := a^2/(a^2×b^2+a^2×c^2-b^2×c^2) in
        cPointhb h_x_3224.
Definition X_3225 :=
        let h_x_3225 a b c := 1/(a^2×b^4-b^4×c^2+a^2×c^4-b^2×c^4) in
        cPointhb h_x_3225.
Definition X_3226 :=
        let h_x_3226 a b c := 1/(a×b^2-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_3226.
Definition X_3227 :=
        let h_x_3227 a b c := 1/(a×b+a×c-2×b×c) in
        cPointhb h_x_3227.
Definition X_3228 :=
        let h_x_3228 a b c := 1/(a^2×b^2+a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_3228.
Definition X_3229 :=
        let h_x_3229 a b c := a^2*(a^2×b^4-b^4×c^2+a^2×c^4-b^2×c^4) in
        cPointhb h_x_3229.
Definition X_3230 :=
        let h_x_3230 a b c := a^2*(a×b+a×c-2×b×c) in
        cPointhb h_x_3230.
Definition X_3231 :=
        let h_x_3231 a b c := a^2*(a^2×b^2+a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_3231.
Definition X_3233 :=
        let h_x_3233 a b c := (a^2-b^2)*(a^2-c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)^2 in
        cPointhb h_x_3233.
Definition X_3234 :=
        let h_x_3234 a b c := (2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)^2/(b-c) in
        cPointhb h_x_3234.
Definition X_3235 :=
        let h_x_3235 a b c := a^2×b×c+(2×a^4*(DeltaMaj a b c))/sqrt(a^2×b^2+a^2×c^2+b^2×c^2) in
        cPointhb h_x_3235.
Definition X_3236 :=
        let h_x_3236 a b c := a^2×b×c-(2×a^4*(DeltaMaj a b c))/sqrt(a^2×b^2+a^2×c^2+b^2×c^2) in
        cPointhb h_x_3236.
Definition X_3237 :=
        let h_x_3237 a b c := a^2*(-a^2×b^2+b^4-a^2×c^2+c^4+2×b×c×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_3237.
Definition X_3238 :=
        let h_x_3238 a b c := a^2*(-a^2×b^2+b^4-a^2×c^2+c^4-2×b×c×sqrt(a^2×b^2+a^2×c^2+b^2×c^2)) in
        cPointhb h_x_3238.
Definition X_3239 :=
        let h_x_3239 a b c := (b-c)*(-a+b+c)^2 in
        cPointhb h_x_3239.
Definition X_3240 :=
        let h_x_3240 a b c := a*(2×a×b+2×a×c-b×c) in
        cPointhb h_x_3240.
Definition X_3241 :=
        let h_x_3241 a b c := 5×a-b-c in
        cPointhb h_x_3241.
Definition X_3242 :=
        let h_x_3242 a b c := a*(-a*(a+b+c)+2*(a^2+b^2+c^2)) in
        cPointhb h_x_3242.
Definition X_3243 :=
        let h_x_3243 a b c := a*(a^2-4×a×b+3×b^2-4×a×c-2×b×c+3×c^2) in
        cPointhb h_x_3243.
Definition X_3244 :=
        let h_x_3244 a b c := 4×a-b-c in
        cPointhb h_x_3244.
Definition X_3245 :=
        let h_x_3245 a b c := a*(a^3+2×a^2×b-a×b^2-2×b^3+2×a^2×c-3×a×b×c+2×b^2×c-a×c^2+2×b×c^2-2×c^3) in
        cPointhb h_x_3245.
Definition X_3246 :=
        let h_x_3246 a b c := a*(4×a^2-a×b+b^2-a×c-4×b×c+c^2) in
        cPointhb h_x_3246.
Definition X_3247 :=
        let h_x_3247 a b c := a*(a+3×b+3×c) in
        cPointhb h_x_3247.
Definition X_3248 :=
        let h_x_3248 a b c := a^3×(b-c)^2 in
        cPointhb h_x_3248.
Definition X_3249 :=
        let h_x_3249 a b c := a^4×(b-c)^3 in
        cPointhb h_x_3249.
Definition X_3250 :=
        let h_x_3250 a b c := a^2*(b^3-c^3) in
        cPointhb h_x_3250.
Definition X_3251 :=
        let h_x_3251 a b c := a×(2×a-b-c)^2*(-b+c) in
        cPointhb h_x_3251.
Definition X_3252 :=
        let h_x_3252 a b c := (a^2*(a×b-b^2+a×c-c^2))/(-a^2+b×c) in
        cPointhb h_x_3252.
Definition X_3253 :=
        let h_x_3253 a b c := (a^2-b×c)/(a×b^2-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_3253.
Definition X_3254 :=
        let h_x_3254 a b c := (a-b-c)/(a^2-2×a×b+b^2-2×a×c+b×c+c^2) in
        cPointhb h_x_3254.
Definition X_3255 :=
        let h_x_3255 a b c := (a-b-c)/(a^2-2×a×b+b^2-2×a×c+3×b×c+c^2) in
        cPointhb h_x_3255.
Definition X_3256 :=
        let h_x_3256 a b c := (a^2*(a^2-2×a×b+b^2-2×a×c+3×b×c+c^2))/(a-b-c) in
        cPointhb h_x_3256.
Definition X_3257 :=
        let h_x_3257 a b c := a/((b-c)*(-2×a+b+c)) in
        cPointhb h_x_3257.
Definition X_3258 :=
        let h_x_3258 a b c := (b^2-c^2)^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-b^2×c^2+(a^2-b^2-c^2)^2) in
        cPointhb h_x_3258.
Definition X_3259 :=
        let h_x_3259 a b c := (2×a-b-c)*(b-c)^2*(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_3259.
Definition X_3260 :=
        let h_x_3260 a b c := b^2×c^2*(-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3260.
Definition X_3261 :=
        let h_x_3261 a b c := b^2×c^2*(b-c) in
        cPointhb h_x_3261.
Definition X_3262 :=
        let h_x_3262 a b c := b×c*(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_3262.
Definition X_3263 :=
        let h_x_3263 a b c := b×c*(-a×b+b^2-a×c+c^2) in
        cPointhb h_x_3263.
Definition X_3264 :=
        let h_x_3264 a b c := b^2*(2×a-b-c)*c^2 in
        cPointhb h_x_3264.
Definition X_3265 :=
        let h_x_3265 a b c := (a^2-b^2-c^2)^2*(b^2-c^2) in
        cPointhb h_x_3265.
Definition X_3266 :=
        let h_x_3266 a b c := b^2×c^2*(2×a^2-b^2-c^2) in
        cPointhb h_x_3266.
Definition X_3267 :=
        let h_x_3267 a b c := b^2×c^2*(a^2-b^2-c^2)*(b^2-c^2) in
        cPointhb h_x_3267.
Definition X_3268 :=
        let h_x_3268 a b c := (b^2-c^2)*((a^2-b^2-c^2)^2-b^2×c^2) in
        cPointhb h_x_3268.
Definition X_3269 :=
        let h_x_3269 a b c := a^2×(b-c)^2×(b+c)^2×(a^2-b^2-c^2)^2 in
        cPointhb h_x_3269.
Definition X_3270 :=
        let h_x_3270 a b c := a^2×(b-c)^2×(-a+b+c)^2*(-a^2+b^2+c^2) in
        cPointhb h_x_3270.
Definition X_3271 :=
        let h_x_3271 a b c := a^2*(a-b-c)*(b-c)^2 in
        cPointhb h_x_3271.
Definition X_3272 :=
        let h_x_3272 a b c := cos((B a b c)/3-(C a b c)/3)*(sin(A a b c)) in
        cPointhb h_x_3272.
Definition X_3273 :=
        let h_x_3273 a b c := sin((A a b c)/3+PI/3)*(sin(A a b c)) in
        cPointhb h_x_3273.
Definition X_3274 :=
        let h_x_3274 a b c := sin((A a b c)/3-PI/3)*(sin(A a b c)) in
        cPointhb h_x_3274.
Definition X_3275 :=
        let h_x_3275 a b c := sin((A a b c)/3)*(sin(A a b c)) in
        cPointhb h_x_3275.
Definition X_3276 :=
        let h_x_3276 a b c := (sin(A a b c))*(-sin((B a b c)/3)×sin((C a b c)/3)-sin((A a b c)/3-PI/6)) in
        cPointhb h_x_3276.
Definition X_3277 :=
        let h_x_3277 a b c := (sin(A a b c))*(2×sin((B a b c)/3)×sin((C a b c)/3)-sin((A a b c)/3-PI/6)) in
        cPointhb h_x_3277.
Definition X_3278 :=
        let h_x_3278 a b c := (cos((A a b c)/3)×cos((2*(A a b c))/3)+cos((B a b c)/3)×cos((C a b c)/3))*(sin(A a b c)) in
        cPointhb h_x_3278.
Definition X_3279 :=
        let h_x_3279 a b c := (cos((B a b c)/3)×cos((C a b c)/3)+sin((A a b c)/3)×sin((2*(A a b c))/3))*(sin(A a b c)) in
        cPointhb h_x_3279.
Definition X_3282 :=
        let h_x_3282 a b c := (sin(A a b c))*((cos(A a b c))+cos((A a b c)/3+PI/3)+2×sin((B a b c)/3)×sin((C a b c)/3)) in
        cPointhb h_x_3282.
Definition X_3283 :=
        let h_x_3283 a b c := (sin(A a b c))*((cos(A a b c))-cos((A a b c)/3+PI/3)-2×sin((B a b c)/3)×sin((C a b c)/3)) in
        cPointhb h_x_3283.
Definition X_3280 :=
        let h_x_3280 a b c := (2×cos((A a b c)/3)-(cos(A a b c))-2×cos((B a b c)/3)×cos((C a b c)/3))*(sin(A a b c)) in
        cPointhb h_x_3280.
Definition X_3281 :=
        let h_x_3281 a b c := (sin(A a b c))*((cos(A a b c))+2×cos((A a b c)/3)-2×cos((B a b c)/3)×cos((C a b c)/3)) in
        cPointhb h_x_3281.
Definition X_3284 :=
        let h_x_3284 a b c := a^2*(a^2-b^2-c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_3284.
Definition X_3285 :=
        let h_x_3285 a b c := a^2*(a+b)*(2×a-b-c)*(a+c) in
        cPointhb h_x_3285.
Definition X_3286 :=
        let h_x_3286 a b c := a^2*(a+b)*(a+c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_3286.
Definition X_3287 :=
        let h_x_3287 a b c := a*(a-b-c)*(b-c)*(a^2+b×c) in
        cPointhb h_x_3287.
Definition X_3288 :=
        let h_x_3288 a b c := a^2*(b^2-c^2)*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_3288.
Definition X_3289 :=
        let h_x_3289 a b c := a^4*(a^2-b^2-c^2)*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_3289.
Definition X_3290 :=
        let h_x_3290 a b c := a*(a^2×b+b^3+a^2×c-2×a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_3290.
Definition X_3291 :=
        let h_x_3291 a b c := a^2*(a^2×b^2+b^4+a^2×c^2-4×b^2×c^2+c^4) in
        cPointhb h_x_3291.
Definition X_3292 :=
        let h_x_3292 a b c := a^2*(a^2-b^2-c^2)*(2×a^2-b^2-c^2) in
        cPointhb h_x_3292.
Definition X_3293 :=
        let h_x_3293 a b c := a*(b+c)*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_3293.
Definition X_3294 :=
        let h_x_3294 a b c := a*(b+c)*(a^2-a×b-a×c-b×c) in
        cPointhb h_x_3294.
Definition X_3295 :=
        let h_x_3295 a b c := a^2*(a^2-b^2-4×b×c-c^2) in
        cPointhb h_x_3295.
Definition X_3296 :=
        let h_x_3296 a b c := (a^2+4×a×b+b^2-c^2)*(a^2-b^2+4×a×c+c^2) in
        cPointhb h_x_3296.
Definition X_3297 :=
        let h_x_3297 a b c := a^2*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-2×b^2×c^2+c^4-16×b×c*(DeltaMaj a b c)) in
        cPointhb h_x_3297.
Definition X_3298 :=
        let h_x_3298 a b c := a^2*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-2×b^2×c^2+c^4+16×b×c*(DeltaMaj a b c)) in
        cPointhb h_x_3298.
Definition X_3299 :=
        let h_x_3299 a b c := a^2*(b×c+4*(DeltaMaj a b c)) in
        cPointhb h_x_3299.
Definition X_3300 :=
        let h_x_3300 a b c := (a×b+4*(DeltaMaj a b c))*(a×c+4*(DeltaMaj a b c)) in
        cPointhb h_x_3300.
Definition X_3301 :=
        let h_x_3301 a b c := a^2*(b×c-4*(DeltaMaj a b c)) in
        cPointhb h_x_3301.
Definition X_3302 :=
        let h_x_3302 a b c := (a×b-4*(DeltaMaj a b c))*(a×c-4*(DeltaMaj a b c)) in
        cPointhb h_x_3302.
Definition X_3303 :=
        let h_x_3303 a b c := a^2*(a^2-b^2-6×b×c-c^2) in
        cPointhb h_x_3303.
Definition X_3304 :=
        let h_x_3304 a b c := a^2*(a^2-b^2+6×b×c-c^2) in
        cPointhb h_x_3304.
Definition X_3305 :=
        let h_x_3305 a b c := a*(a^2-b^2-4×b×c-c^2) in
        cPointhb h_x_3305.
Definition X_3306 :=
        let h_x_3306 a b c := a*(a^2-b^2+4×b×c-c^2) in
        cPointhb h_x_3306.
Definition X_3307 :=
        let h_x_3307 a b c := 1/((a×b×c-sqrt(a×b×c*(a×b×c-(a+b-c)*(a-b+c)*(-a+b+c))))*(s a b c)*(SA a b c)-4×b×c×(DeltaMaj a b c)^2) in
        cPointhb h_x_3307.
Definition X_3308 :=
        let h_x_3308 a b c := 1/((a×b×c+sqrt(a×b×c*(a×b×c-(a+b-c)*(a-b+c)*(-a+b+c))))*(s a b c)*(SA a b c)-4×b×c×(DeltaMaj a b c)^2) in
        cPointhb h_x_3308.
Definition X_3309 :=
        let h_x_3309 a b c := a*(b-c)*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_3309.
Definition X_3310 :=
        let h_x_3310 a b c := a^2*(b-c)*(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_3310.
Definition X_3311 :=
        let h_x_3311 a b c := a^2*((SA a b c)+4*(DeltaMaj a b c)) in
        cPointhb h_x_3311.
Definition X_3312 :=
        let h_x_3312 a b c := a^2*((SA a b c)-4*(DeltaMaj a b c)) in
        cPointhb h_x_3312.
Definition X_3313 :=
        let h_x_3313 a b c := a^2*(b^2+c^2)*(a^4-b^4-c^4) in
        cPointhb h_x_3313.
Definition X_3314 :=
        let h_x_3314 a b c := b^4+b^2×c^2+c^4 in
        cPointhb h_x_3314.
Definition X_3315 :=
        let h_x_3315 a b c := a*(a^2-a×b+2×b^2-a×c-3×b×c+2×c^2) in
        cPointhb h_x_3315.
Definition X_3316 :=
        let h_x_3316 a b c := ((SB a b c)+4*(DeltaMaj a b c))*((SC a b c)+4*(DeltaMaj a b c)) in
        cPointhb h_x_3316.
Definition X_3317 :=
        let h_x_3317 a b c := ((SB a b c)-4*(DeltaMaj a b c))*((SC a b c)-4*(DeltaMaj a b c)) in
        cPointhb h_x_3317.
Definition X_3318 :=
        let h_x_3318 a b c := (a-b-c)*(b-c)^2×(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3)^2 in
        cPointhb h_x_3318.
Definition X_3319 :=
        let h_x_3319 a b c := (a+b-c)*(a-b+c)*(2×a^4-2×a^3×b-a^2×b^2+2×a×b^3-b^4-2×a^3×c+4×a^2×b×c-2×a×b^2×c-a^2×c^2-2×a×b×c^2+2×b^2×c^2+2×a×c^3-c^4)^2 in
        cPointhb h_x_3319.
Definition X_3320 :=
        let h_x_3320 a b c := a^2*(a+b-c)*(a-b+c)*(b+c)^2×(a^4-b^4-a^2×b×c+b^3×c+b×c^3-c^4)^2 in
        cPointhb h_x_3320.
Definition X_3321 :=
        let h_x_3321 a b c := (a+b-c)*(a-b+c)*(2×a^2-a×b-b^2-a×c+2×b×c-c^2)^2 in
        cPointhb h_x_3321.
Definition X_3322 :=
        let h_x_3322 a b c := (-a+b-c)*(-a-b+c)*(2×a^3-2×a^2×b+a×b^2-b^3-2×a^2×c+b^2×c+a×c^2+b×c^2-c^3)^2 in
        cPointhb h_x_3322.
Definition X_3323 :=
        let h_x_3323 a b c := (b-c)^2*(a+b-c)*(a-b+c)*(a×b-b^2+a×c-c^2)^2 in
        cPointhb h_x_3323.
Definition X_3324 :=
        let h_x_3324 a b c := (-a+b-c)*(-a-b+c)*(b+c)^2×(a^6-2×a^4×b^2+a^2×b^4+3×a^4×b×c-2×a^2×b^3×c-b^5×c-2×a^4×c^2+2×a^2×b^2×c^2-2×a^2×b×c^3+2×b^3×c^3+a^2×c^4-b×c^5)^2 in
        cPointhb h_x_3324.
Definition X_3325 :=
        let h_x_3325 a b c := a^2×(b-c)^2*(-a+b-c)*(-a-b+c)*(a^2+b^2+3×b×c+c^2)^2 in
        cPointhb h_x_3325.
Definition X_3326 :=
        let h_x_3326 a b c := (a-b-c)*(b-c)^2×(-a^2×b+b^3-a^2×c+2×a×b×c-b^2×c-b×c^2+c^3)^2 in
        cPointhb h_x_3326.
Definition X_3327 :=
        let h_x_3327 a b c := (a-b-c)*(b-c)^2×(a^6-2×a^4×b^2+a^2×b^4-a^2×b^3×c+b^5×c-2×a^4×c^2-a^2×b^2×c^2-a^2×b×c^3-2×b^3×c^3+a^2×c^4+b×c^5)^2 in
        cPointhb h_x_3327.
Definition X_3328 :=
        let h_x_3328 a b c := (a-b-c)*(b-c)^2×(-2×a^2+a×b+b^2+a×c-2×b×c+c^2)^2 in
        cPointhb h_x_3328.
Definition X_3329 :=
        let h_x_3329 a b c := a^4+2×a^2×b^2+2×a^2×c^2+b^2×c^2 in
        cPointhb h_x_3329.
Definition X_3330 :=
        let h_x_3330 a b c := a*(b+c)*(a^6-2×a^4×b^2+a^2×b^4+3×a^4×b×c-2×a^2×b^3×c-b^5×c-2×a^4×c^2+2×a^2×b^2×c^2-2×a^2×b×c^3+2×b^3×c^3+a^2×c^4-b×c^5) in
        cPointhb h_x_3330.
Definition X_3331 :=
        let h_x_3331 a b c := a^2*(a^6×b^2-2×a^4×b^4+a^2×b^6+a^6×c^2+2×a^4×b^2×c^2-a^2×b^4×c^2-2×b^6×c^2-2×a^4×c^4-a^2×b^2×c^4+4×b^4×c^4+a^2×c^6-2×b^2×c^6) in
        cPointhb h_x_3331.
Definition X_3332 :=
        let h_x_3332 a b c := 3×a^6-2×a^5×b-3×a^4×b^2+a^2×b^4+2×a×b^5-b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-3×a^4×c^2-2×a^2×b^2×c^2-4×a×b^3×c^2+b^4×c^2-4×a×b^2×c^3-4×b^3×c^3+a^2×c^4+2×a×b×c^4+b^2×c^4+2×a×c^5+2×b×c^5-c^6 in
        cPointhb h_x_3332.
Definition X_3333 :=
        let h_x_3333 a b c := a*(4×a×b×c+(a+b-c)*(a-b+c)*(a+b+c)) in
        cPointhb h_x_3333.
Definition X_3334 :=
        let h_x_3334 a b c := (sin(A a b c))*((cos(A a b c))+2×sin((B a b c)/3)×sin((C a b c)/3)+sin((A a b c)/3+PI/6)) in
        cPointhb h_x_3334.
Definition X_3335 :=
        let h_x_3335 a b c := (sin(A a b c))*((cos(A a b c))-2×sin((B a b c)/3)×sin((C a b c)/3)-sin((A a b c)/3+PI/6)) in
        cPointhb h_x_3335.
Definition X_3336 :=
        let h_x_3336 a b c := a*((a-b+c)*(a+b-c)*(a+b+c)-a×b×c) in
        cPointhb h_x_3336.
Definition X_3337 :=
        let h_x_3337 a b c := a*((a-b+c)*(a+b-c)*(a+b+c)+a×b×c) in
        cPointhb h_x_3337.
Definition X_3338 :=
        let h_x_3338 a b c := a*((a-b+c)*(a+b-c)*(a+b+c)+2×a×b×c) in
        cPointhb h_x_3338.
Definition X_3339 :=
        let h_x_3339 a b c := (a*(a+3×b+3×c))/(a-b-c) in
        cPointhb h_x_3339.
Definition X_3340 :=
        let h_x_3340 a b c := a*(a-3×b-3×c)*(a+b-c)*(a-b+c) in
        cPointhb h_x_3340.
Definition X_3341 :=
        let h_x_3341 a b c := (a*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6))/(-a^3-a^2×b+a×b^2+b^3-a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_3341.
Definition X_3342 :=
        let h_x_3342 a b c := (a*(-a^3-a^2×b+a×b^2+b^3-a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2+c^3))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_3342.
Definition X_3343 :=
        let h_x_3343 a b c := (a^2*((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2))/((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-(SB a b c)*(SC a b c)) in
        cPointhb h_x_3343.
Definition X_3344 :=
        let h_x_3344 a b c := ((SA a b c)*(SB a b c)+(SA a b c)*(SC a b c)-(SB a b c)*(SC a b c))/((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_3344.
Definition X_3345 :=
        let h_x_3345 a b c := a/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_3345.
Definition X_3346 :=
        let h_x_3346 a b c := 1/(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2-4×a^4×b^2×c^2+4×a^2×b^4×c^2+4×b^6×c^2+6×a^4×c^4+4×a^2×b^2×c^4-10×b^4×c^4-4×a^2×c^6+4×b^2×c^6+c^8) in
        cPointhb h_x_3346.
Definition X_3347 :=
        let h_x_3347 a b c := a/(a^9+3×a^8×b-8×a^6×b^3-6×a^5×b^4+6×a^4×b^5+8×a^3×b^6-3×a×b^8-b^9+3×a^8×c+4×a^6×b^2×c-14×a^4×b^4×c+4×a^2×b^6×c+3×b^8×c+4×a^6×b×c^2+12×a^5×b^2×c^2+8×a^4×b^3×c^2-8×a^3×b^4×c^2-12×a^2×b^5×c^2-4×a×b^6×c^2-8×a^6×c^3+8×a^4×b^2×c^3+8×a^2×b^4×c^3-8×b^6×c^3-6×a^5×c^4-14×a^4×b×c^4-8×a^3×b^2×c^4+8×a^2×b^3×c^4+14×a×b^4×c^4+6×b^5×c^4+6×a^4×c^5-12×a^2×b^2×c^5+6×b^4×c^5+8×a^3×c^6+4×a^2×b×c^6-4×a×b^2×c^6-8×b^3×c^6-3×a×c^8+3×b×c^8-c^9) in
        cPointhb h_x_3347.
Definition X_3348 :=
        let h_x_3348 a b c := a^2/((a^2+b^2-c^2)*(a^2-b^2+c^2)*(5×a^12-10×a^10×b^2-9×a^8×b^4+36×a^6×b^6-29×a^4×b^8+6×a^2×b^10+b^12-10×a^10×c^2+34×a^8×b^2×c^2-36×a^6×b^4×c^2+4×a^4×b^6×c^2+14×a^2×b^8×c^2-6×b^10×c^2-9×a^8×c^4-36×a^6×b^2×c^4+50×a^4×b^4×c^4-20×a^2×b^6×c^4+15×b^8×c^4+36×a^6×c^6+4×a^4×b^2×c^6-20×a^2×b^4×c^6-20×b^6×c^6-29×a^4×c^8+14×a^2×b^2×c^8+15×b^4×c^8+6×a^2×c^10-6×b^2×c^10+c^12)) in
        cPointhb h_x_3348.
Definition X_3349 :=
        let h_x_3349 a b c := (a^2*((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2))/((SA a b c)^3×(SB a b c)^3-(SA a b c)^3×(SB a b c)^2*(SC a b c)+(SA a b c)^2×(SB a b c)^3*(SC a b c)-(SA a b c)^3*(SB a b c)*(SC a b c)^2+2×(SA a b c)^2×(SB a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)^3×(SC a b c)^2+(SA a b c)^3×(SC a b c)^3+(SA a b c)^2*(SB a b c)*(SC a b c)^3-(SA a b c)*(SB a b c)^2×(SC a b c)^3-(SB a b c)^3×(SC a b c)^3) in
        cPointhb h_x_3349.
Definition X_3350 :=
        let h_x_3350 a b c := -((SA a b c)^3×(SB a b c)^3-(SA a b c)^3×(SB a b c)^2*(SC a b c)+(SA a b c)^2×(SB a b c)^3*(SC a b c)-(SA a b c)^3*(SB a b c)*(SC a b c)^2+2×(SA a b c)^2×(SB a b c)^2×(SC a b c)^2-(SA a b c)*(SB a b c)^3×(SC a b c)^2+(SA a b c)^3×(SC a b c)^3+(SA a b c)^2*(SB a b c)*(SC a b c)^3-(SA a b c)*(SB a b c)^2×(SC a b c)^3-(SB a b c)^3×(SC a b c)^3)/((SA a b c)^2×(SB a b c)^2+(SA a b c)^2×(SC a b c)^2-(SB a b c)^2×(SC a b c)^2) in
        cPointhb h_x_3350.
Definition X_3351 :=
        let h_x_3351 a b c := (a*(a-b-c)*(a^9+3×a^8×b-8×a^6×b^3-6×a^5×b^4+6×a^4×b^5+8×a^3×b^6-3×a×b^8-b^9+3×a^8×c+4×a^6×b^2×c-14×a^4×b^4×c+4×a^2×b^6×c+3×b^8×c+4×a^6×b×c^2+12×a^5×b^2×c^2+8×a^4×b^3×c^2-8×a^3×b^4×c^2-12×a^2×b^5×c^2-4×a×b^6×c^2-8×a^6×c^3+8×a^4×b^2×c^3+8×a^2×b^4×c^3-8×b^6×c^3-6×a^5×c^4-14×a^4×b×c^4-8×a^3×b^2×c^4+8×a^2×b^3×c^4+14×a×b^4×c^4+6×b^5×c^4+6×a^4×c^5-12×a^2×b^2×c^5+6×b^4×c^5+8×a^3×c^6+4×a^2×b×c^6-4×a×b^2×c^6-8×b^3×c^6-3×a×c^8+3×b×c^8-c^9))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_3351.
Definition X_3352 :=
        let h_x_3352 a b c := (a*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6))/((a-b-c)*(a^9+3×a^8×b-8×a^6×b^3-6×a^5×b^4+6×a^4×b^5+8×a^3×b^6-3×a×b^8-b^9+3×a^8×c+4×a^6×b^2×c-14×a^4×b^4×c+4×a^2×b^6×c+3×b^8×c+4×a^6×b×c^2+12×a^5×b^2×c^2+8×a^4×b^3×c^2-8×a^3×b^4×c^2-12×a^2×b^5×c^2-4×a×b^6×c^2-8×a^6×c^3+8×a^4×b^2×c^3+8×a^2×b^4×c^3-8×b^6×c^3-6×a^5×c^4-14×a^4×b×c^4-8×a^3×b^2×c^4+8×a^2×b^3×c^4+14×a×b^4×c^4+6×b^5×c^4+6×a^4×c^5-12×a^2×b^2×c^5+6×b^4×c^5+8×a^3×c^6+4×a^2×b×c^6-4×a×b^2×c^6-8×b^3×c^6-3×a×c^8+3×b×c^8-c^9)) in
        cPointhb h_x_3352.
Definition X_3353 :=
        let h_x_3353 a b c := (a*(a^15-3×a^14×b-3×a^13×b^2+17×a^12×b^3-3×a^11×b^4-39×a^10×b^5+25×a^9×b^6+45×a^8×b^7-45×a^7×b^8-25×a^6×b^9+39×a^5×b^10+3×a^4×b^11-17×a^3×b^12+3×a^2×b^13+3×a×b^14-b^15-3×a^14×c-6×a^13×b×c-a^12×b^2×c+4×a^11×b^3×c+21×a^10×b^4×c+38×a^9×b^5×c-17×a^8×b^6×c-72×a^7×b^7×c-17×a^6×b^8×c+38×a^5×b^9×c+21×a^4×b^10×c+4×a^3×b^11×c-a^2×b^12×c-6×a×b^13×c-3×b^14×c-3×a^13×c^2-a^12×b×c^2+14×a^11×b^2×c^2+2×a^10×b^3×c^2-25×a^9×b^4×c^2+5×a^8×b^5×c^2+20×a^7×b^6×c^2-20×a^6×b^7×c^2-5×a^5×b^8×c^2+25×a^4×b^9×c^2-2×a^3×b^10×c^2-14×a^2×b^11×c^2+a×b^12×c^2+3×b^13×c^2+17×a^12×c^3+4×a^11×b×c^3+2×a^10×b^2×c^3-76×a^9×b^3×c^3-33×a^8×b^4×c^3+72×a^7×b^5×c^3+28×a^6×b^6×c^3+72×a^5×b^7×c^3-33×a^4×b^8×c^3-76×a^3×b^9×c^3+2×a^2×b^10×c^3+4×a×b^11×c^3+17×b^12×c^3-3×a^11×c^4+21×a^10×b×c^4-25×a^9×b^2×c^4-33×a^8×b^3×c^4+50×a^7×b^4×c^4+34×a^6×b^5×c^4-34×a^5×b^6×c^4-50×a^4×b^7×c^4+33×a^3×b^8×c^4+25×a^2×b^9×c^4-21×a×b^10×c^4+3×b^11×c^4-39×a^10×c^5+38×a^9×b×c^5+5×a^8×b^2×c^5+72×a^7×b^3×c^5+34×a^6×b^4×c^5-220×a^5×b^5×c^5+34×a^4×b^6×c^5+72×a^3×b^7×c^5+5×a^2×b^8×c^5+38×a×b^9×c^5-39×b^10×c^5+25×a^9×c^6-17×a^8×b×c^6+20×a^7×b^2×c^6+28×a^6×b^3×c^6-34×a^5×b^4×c^6+34×a^4×b^5×c^6-28×a^3×b^6×c^6-20×a^2×b^7×c^6+17×a×b^8×c^6-25×b^9×c^6+45×a^8×c^7-72×a^7×b×c^7-20×a^6×b^2×c^7+72×a^5×b^3×c^7-50×a^4×b^4×c^7+72×a^3×b^5×c^7-20×a^2×b^6×c^7-72×a×b^7×c^7+45×b^8×c^7-45×a^7×c^8-17×a^6×b×c^8-5×a^5×b^2×c^8-33×a^4×b^3×c^8+33×a^3×b^4×c^8+5×a^2×b^5×c^8+17×a×b^6×c^8+45×b^7×c^8-25×a^6×c^9+38×a^5×b×c^9+25×a^4×b^2×c^9-76×a^3×b^3×c^9+25×a^2×b^4×c^9+38×a×b^5×c^9-25×b^6×c^9+39×a^5×c^10+21×a^4×b×c^10-2×a^3×b^2×c^10+2×a^2×b^3×c^10-21×a×b^4×c^10-39×b^5×c^10+3×a^4×c^11+4×a^3×b×c^11-14×a^2×b^2×c^11+4×a×b^3×c^11+3×b^4×c^11-17×a^3×c^12-a^2×b×c^12+a×b^2×c^12+17×b^3×c^12+3×a^2×c^13-6×a×b×c^13+3×b^2×c^13+3×a×c^14-3×b×c^14-c^15))/(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_3353.
Definition X_3354 :=
        let h_x_3354 a b c := (a*(a^3+a^2×b-a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2-c^3))/(a^15-3×a^14×b-3×a^13×b^2+17×a^12×b^3-3×a^11×b^4-39×a^10×b^5+25×a^9×b^6+45×a^8×b^7-45×a^7×b^8-25×a^6×b^9+39×a^5×b^10+3×a^4×b^11-17×a^3×b^12+3×a^2×b^13+3×a×b^14-b^15-3×a^14×c-6×a^13×b×c-a^12×b^2×c+4×a^11×b^3×c+21×a^10×b^4×c+38×a^9×b^5×c-17×a^8×b^6×c-72×a^7×b^7×c-17×a^6×b^8×c+38×a^5×b^9×c+21×a^4×b^10×c+4×a^3×b^11×c-a^2×b^12×c-6×a×b^13×c-3×b^14×c-3×a^13×c^2-a^12×b×c^2+14×a^11×b^2×c^2+2×a^10×b^3×c^2-25×a^9×b^4×c^2+5×a^8×b^5×c^2+20×a^7×b^6×c^2-20×a^6×b^7×c^2-5×a^5×b^8×c^2+25×a^4×b^9×c^2-2×a^3×b^10×c^2-14×a^2×b^11×c^2+a×b^12×c^2+3×b^13×c^2+17×a^12×c^3+4×a^11×b×c^3+2×a^10×b^2×c^3-76×a^9×b^3×c^3-33×a^8×b^4×c^3+72×a^7×b^5×c^3+28×a^6×b^6×c^3+72×a^5×b^7×c^3-33×a^4×b^8×c^3-76×a^3×b^9×c^3+2×a^2×b^10×c^3+4×a×b^11×c^3+17×b^12×c^3-3×a^11×c^4+21×a^10×b×c^4-25×a^9×b^2×c^4-33×a^8×b^3×c^4+50×a^7×b^4×c^4+34×a^6×b^5×c^4-34×a^5×b^6×c^4-50×a^4×b^7×c^4+33×a^3×b^8×c^4+25×a^2×b^9×c^4-21×a×b^10×c^4+3×b^11×c^4-39×a^10×c^5+38×a^9×b×c^5+5×a^8×b^2×c^5+72×a^7×b^3×c^5+34×a^6×b^4×c^5-220×a^5×b^5×c^5+34×a^4×b^6×c^5+72×a^3×b^7×c^5+5×a^2×b^8×c^5+38×a×b^9×c^5-39×b^10×c^5+25×a^9×c^6-17×a^8×b×c^6+20×a^7×b^2×c^6+28×a^6×b^3×c^6-34×a^5×b^4×c^6+34×a^4×b^5×c^6-28×a^3×b^6×c^6-20×a^2×b^7×c^6+17×a×b^8×c^6-25×b^9×c^6+45×a^8×c^7-72×a^7×b×c^7-20×a^6×b^2×c^7+72×a^5×b^3×c^7-50×a^4×b^4×c^7+72×a^3×b^5×c^7-20×a^2×b^6×c^7-72×a×b^7×c^7+45×b^8×c^7-45×a^7×c^8-17×a^6×b×c^8-5×a^5×b^2×c^8-33×a^4×b^3×c^8+33×a^3×b^4×c^8+5×a^2×b^5×c^8+17×a×b^6×c^8+45×b^7×c^8-25×a^6×c^9+38×a^5×b×c^9+25×a^4×b^2×c^9-76×a^3×b^3×c^9+25×a^2×b^4×c^9+38×a×b^5×c^9-25×b^6×c^9+39×a^5×c^10+21×a^4×b×c^10-2×a^3×b^2×c^10+2×a^2×b^3×c^10-21×a×b^4×c^10-39×b^5×c^10+3×a^4×c^11+4×a^3×b×c^11-14×a^2×b^2×c^11+4×a×b^3×c^11+3×b^4×c^11-17×a^3×c^12-a^2×b×c^12+a×b^2×c^12+17×b^3×c^12+3×a^2×c^13-6×a×b×c^13+3×b^2×c^13+3×a×c^14-3×b×c^14-c^15) in
        cPointhb h_x_3354.
Definition X_3355 :=
        let h_x_3355 a b c := -((2×a^2*(SA a b c))/(a^2*(SA a b c)+b^2*(SB a b c)+c^2*(SC a b c)))+1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(-a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2)*(1/((b^2*(SB a b c)-(SA a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))*(a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2-c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2))+1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))*(a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2-b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2))+1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(-a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2)))) in
        cPointhb h_x_3355.
Definition X_3356 :=
        let h_x_3356 a b c := (5×a^12-10×a^10×b^2-9×a^8×b^4+36×a^6×b^6-29×a^4×b^8+6×a^2×b^10+b^12-10×a^10×c^2+34×a^8×b^2×c^2-36×a^6×b^4×c^2+4×a^4×b^6×c^2+14×a^2×b^8×c^2-6×b^10×c^2-9×a^8×c^4-36×a^6×b^2×c^4+50×a^4×b^4×c^4-20×a^2×b^6×c^4+15×b^8×c^4+36×a^6×c^6+4×a^4×b^2×c^6-20×a^2×b^4×c^6-20×b^6×c^6-29×a^4×c^8+14×a^2×b^2×c^8+15×b^4×c^8+6×a^2×c^10-6×b^2×c^10+c^12)/((a^2-b^2-c^2)*(a^16-8×a^14×b^2+28×a^12×b^4-56×a^10×b^6+70×a^8×b^8-56×a^6×b^10+28×a^4×b^12-8×a^2×b^14+b^16-8×a^14×c^2-40×a^12×b^2×c^2+56×a^10×b^4×c^2+88×a^8×b^6×c^2-88×a^6×b^8×c^2-56×a^4×b^10×c^2+40×a^2×b^12×c^2+8×b^14×c^2+28×a^12×c^4+56×a^10×b^2×c^4-316×a^8×b^4×c^4+144×a^6×b^6×c^4+228×a^4×b^8×c^4-72×a^2×b^10×c^4-68×b^12×c^4-56×a^10×c^6+88×a^8×b^2×c^6+144×a^6×b^4×c^6-400×a^4×b^6×c^6+40×a^2×b^8×c^6+184×b^10×c^6+70×a^8×c^8-88×a^6×b^2×c^8+228×a^4×b^4×c^8+40×a^2×b^6×c^8-250×b^8×c^8-56×a^6×c^10-56×a^4×b^2×c^10-72×a^2×b^4×c^10+184×b^6×c^10+28×a^4×c^12+40×a^2×b^2×c^12-68×b^4×c^12-8×a^2×c^14+8×b^2×c^14+c^16)) in
        cPointhb h_x_3356.
Definition X_3357 :=
        let h_x_3357 a b c := a^2*(a^8-a^6×b^2-3×a^4×b^4+5×a^2×b^6-2×b^8-a^6×c^2+8×a^4×b^2×c^2-5×a^2×b^4×c^2-2×b^6×c^2-3×a^4×c^4-5×a^2×b^2×c^4+8×b^4×c^4+5×a^2×c^6-2×b^2×c^6-2×c^8) in
        cPointhb h_x_3357.
Definition X_3358 :=
        let h_x_3358 a b c := a*(a^8-2×a^7×b-2×a^6×b^2+6×a^5×b^3-6×a^3×b^5+2×a^2×b^6+2×a×b^7-b^8-2×a^7×c+4×a^6×b×c-2×a^5×b^2×c+2×a^3×b^4×c-4×a^2×b^5×c+2×a×b^6×c-2×a^6×c^2-2×a^5×b×c^2-8×a^4×b^2×c^2+4×a^3×b^3×c^2+6×a^2×b^4×c^2-2×a×b^5×c^2+4×b^6×c^2+6×a^5×c^3+4×a^3×b^2×c^3-8×a^2×b^3×c^3-2×a×b^4×c^3+2×a^3×b×c^4+6×a^2×b^2×c^4-2×a×b^3×c^4-6×b^4×c^4-6×a^3×c^5-4×a^2×b×c^5-2×a×b^2×c^5+2×a^2×c^6+2×a×b×c^6+4×b^2×c^6+2×a×c^7-c^8) in
        cPointhb h_x_3358.
Definition X_3359 :=
        let h_x_3359 a b c := a*(a^6-3×a^4×b^2+3×a^2×b^4-b^6+2×a^4×b×c+4×a^3×b^2×c-4×a^2×b^3×c-4×a×b^4×c+2×b^5×c-3×a^4×c^2+4×a^3×b×c^2-6×a^2×b^2×c^2+4×a×b^3×c^2+b^4×c^2-4×a^2×b×c^3+4×a×b^2×c^3-4×b^3×c^3+3×a^2×c^4-4×a×b×c^4+b^2×c^4+2×b×c^5-c^6) in
        cPointhb h_x_3359.
Definition X_3360 :=
        let h_x_3360 a b c := a^2*(a^4×b^4-2×a^4×b^2×c^2+2×a^2×b^4×c^2+a^4×c^4+2×a^2×b^2×c^4-3×b^4×c^4) in
        cPointhb h_x_3360.
Definition X_3361 :=
        let h_x_3361 a b c := a*(a+b-c)*(a-b+c)*(3×a+b+c) in
        cPointhb h_x_3361.
Definition X_3362 :=
        let h_x_3362 a b c := a/(a^5×b-2×a^3×b^3+a×b^5+a^5×c+a^4×b×c-a×b^4×c-b^5×c-2×a^3×c^3+2×b^3×c^3-a×b×c^4+a×c^5-b×c^5) in
        cPointhb h_x_3362.
Definition X_3363 :=
        let h_x_3363 a b c := 4×a^4+5×a^2×b^2-5×b^4+5×a^2×c^2+14×b^2×c^2-5×c^4 in
        cPointhb h_x_3363.
Definition X_3364 :=
        let h_x_3364 a b c := a^2*((1-sqrt(3))*(a^2-b^2-c^2)+4*(1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3364.
Definition X_3365 :=
        let h_x_3365 a b c := a^2*((1+sqrt(3))*(a^2-b^2-c^2)+4*(-1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3365.
Definition X_3366 :=
        let h_x_3366 a b c := 1/((-1+sqrt(3))*(a^2-b^2-c^2)-4*(1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3366.
Definition X_3367 :=
        let h_x_3367 a b c := 1/((-1-sqrt(3))*(a^2-b^2-c^2)-4*(-1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3367.
Definition X_3368 :=
        let h_x_3368 a b c := a^2*(-(-1+sqrt(5))*(a^2-b^2-c^2)+4×sqrt(2*(5+sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3368.
Definition X_3369 :=
        let h_x_3369 a b c := a^2*(sqrt(2*(5+sqrt(5)))*(-a^2+b^2+c^2)-4*(-1+sqrt(5))*(DeltaMaj a b c)) in
        cPointhb h_x_3369.
Definition X_3370 :=
        let h_x_3370 a b c := 1/((1-sqrt(5))*(a^2-b^2-c^2)+4×sqrt(2*(5+sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3370.
Definition X_3371 :=
        let h_x_3371 a b c := a^2*(sqrt(2-sqrt(2))*(-a^2+b^2+c^2)+4×sqrt(2+sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3371.
Definition X_3372 :=
        let h_x_3372 a b c := a^2*(sqrt(2+sqrt(2))*(-a^2+b^2+c^2)-4×sqrt(2-sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3372.
Definition X_3373 :=
        let h_x_3373 a b c := 1/(sqrt(2-sqrt(2))*(a^2-b^2-c^2)-4×sqrt(2+sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3373.
Definition X_3374 :=
        let h_x_3374 a b c := 1/(sqrt(2+sqrt(2))*(a^2-b^2-c^2)+4×sqrt(2-sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3374.
Definition X_3375 :=
        let h_x_3375 a b c := (a*(4*(DeltaMaj a b c)+sqrt(3)*(a^2-b^2-c^2)))/(a^2-b^2-c^2-4×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_3375.
Definition X_3376 :=
        let h_x_3376 a b c := (a*(a^2-b^2-c^2-4×sqrt(3)*(DeltaMaj a b c)))/(sqrt(3)*(a^2-b^2-c^2)+4*(DeltaMaj a b c)) in
        cPointhb h_x_3376.
Definition X_3377 :=
        let h_x_3377 a b c := (a*(a^2-b^2-c^2+4*(DeltaMaj a b c)))/(-a^2+b^2+c^2+4*(DeltaMaj a b c)) in
        cPointhb h_x_3377.
Definition X_3378 :=
        let h_x_3378 a b c := (a*(a^2-b^2-c^2-4*(DeltaMaj a b c)))/(-a^2+b^2+c^2-4*(DeltaMaj a b c)) in
        cPointhb h_x_3378.
Definition X_3379 :=
        let h_x_3379 a b c := a^2*((1+sqrt(5))*(a^2-b^2-c^2)-4×sqrt(2*(5-sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3379.
Definition X_3380 :=
        let h_x_3380 a b c := a^2*(sqrt(2*(5-sqrt(5)))*(a^2-b^2-c^2)-4*(-1-sqrt(5))*(DeltaMaj a b c)) in
        cPointhb h_x_3380.
Definition X_3381 :=
        let h_x_3381 a b c := 1/((-1-sqrt(5))*(a^2-b^2-c^2)+4×sqrt(2*(5-sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3381.
Definition X_3382 :=
        let h_x_3382 a b c := 1/(sqrt(2*(5-sqrt(5)))*(a^2-b^2-c^2)-4*(-1-sqrt(5))*(DeltaMaj a b c)) in
        cPointhb h_x_3382.
Definition X_3383 :=
        let h_x_3383 a b c := (a*(a^2-b^2-c^2+4×sqrt(3)*(DeltaMaj a b c)))/(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c)) in
        cPointhb h_x_3383.
Definition X_3384 :=
        let h_x_3384 a b c := (a*(sqrt(3)*(a^2-b^2-c^2)-4*(DeltaMaj a b c)))/(a^2-b^2-c^2+4×sqrt(3)*(DeltaMaj a b c)) in
        cPointhb h_x_3384.
Definition X_3385 :=
        let h_x_3385 a b c := a^2*(sqrt(2+sqrt(2))*(-a^2+b^2+c^2)+4×sqrt(2-sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3385.
Definition X_3386 :=
        let h_x_3386 a b c := a^2*(sqrt(2-sqrt(2))*(a^2-b^2-c^2)+4×sqrt(2+sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3386.
Definition X_3387 :=
        let h_x_3387 a b c := 1/(sqrt(2+sqrt(2))*(a^2-b^2-c^2)-4×sqrt(2-sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3387.
Definition X_3388 :=
        let h_x_3388 a b c := 1/(sqrt(2-sqrt(2))*(a^2-b^2-c^2)+4×sqrt(2+sqrt(2))*(DeltaMaj a b c)) in
        cPointhb h_x_3388.
Definition X_3389 :=
        let h_x_3389 a b c := a^2*((-1-sqrt(3))*(a^2-b^2-c^2)+4*(-1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3389.
Definition X_3390 :=
        let h_x_3390 a b c := a^2*((-1+sqrt(3))*(a^2-b^2-c^2)+4*(1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3390.
Definition X_3391 :=
        let h_x_3391 a b c := 1/((-1-sqrt(3))*(a^2-b^2-c^2)+4*(-1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3391.
Definition X_3392 :=
        let h_x_3392 a b c := 1/((-1+sqrt(3))*(a^2-b^2-c^2)+4*(1+sqrt(3))*(DeltaMaj a b c)) in
        cPointhb h_x_3392.
Definition X_3393 :=
        let h_x_3393 a b c := a^2*((1+sqrt(5))*(a^2-b^2-c^2)+4×sqrt(2*(5-sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3393.
Definition X_3394 :=
        let h_x_3394 a b c := a^2*(sqrt(2*(5-sqrt(5)))*(a^2-b^2-c^2)-4*(1+sqrt(5))*(DeltaMaj a b c)) in
        cPointhb h_x_3394.
Definition X_3395 :=
        let h_x_3395 a b c := a^2*((1-sqrt(5))*(a^2-b^2-c^2)-4×sqrt(2*(5+sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3395.
Definition X_3396 :=
        let h_x_3396 a b c := a^2*(sqrt(2*(5+sqrt(5)))*(a^2-b^2-c^2)-4*(-1+sqrt(5))*(DeltaMaj a b c)) in
        cPointhb h_x_3396.
Definition X_3397 :=
        let h_x_3397 a b c := 1/((1-sqrt(5))*(a^2-b^2-c^2)-4×sqrt(2*(5+sqrt(5)))*(DeltaMaj a b c)) in
        cPointhb h_x_3397.
Definition X_3398 :=
        let h_x_3398 a b c := a^2*(-a^6+a^4×b^2+a^4×c^2+3×a^2×b^2×c^2+b^4×c^2+b^2×c^4) in
        cPointhb h_x_3398.
Definition X_3399 :=
        let h_x_3399 a b c := 1/(a^6-a^4×b^2-a^4×c^2-3×a^2×b^2×c^2-b^4×c^2-b^2×c^4) in
        cPointhb h_x_3399.
Definition X_3400 :=
        let h_x_3400 a b c := (a*(a^4-b^2×c^2))/(-a^6+a^4×b^2+a^4×c^2+3×a^2×b^2×c^2+b^4×c^2+b^2×c^4) in
        cPointhb h_x_3400.
Definition X_3401 :=
        let h_x_3401 a b c := (a*(-a^6+a^4×b^2+a^4×c^2+3×a^2×b^2×c^2+b^4×c^2+b^2×c^4))/(a^4-b^2×c^2) in
        cPointhb h_x_3401.
Definition X_3402 :=
        let h_x_3402 a b c := (a^3) / (-a^4+a^2×b^2+a^2×c^2+2×b^2×c^2) in
        cPointhb h_x_3402.
Definition X_3403 :=
        let h_x_3403 a b c := b×c*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2) in
        cPointhb h_x_3403.
Definition X_3404 :=
        let h_x_3404 a b c := (a*(b^2+c^2))/ (-a^2×b^2+b^4-a^2×c^2+c^4) in
        cPointhb h_x_3404.
Definition X_3405 :=
        let h_x_3405 a b c := (a*(-a^2×b^2+b^4-a^2×c^2+c^4))/(b^2+c^2) in
        cPointhb h_x_3405.
Definition X_3406 :=
        let h_x_3406 a b c := 1/(a^2×b^4-b^6+3×a^2×b^2×c^2+a^2×c^4-c^6) in
        cPointhb h_x_3406.
Definition X_3407 :=
        let h_x_3407 a b c := 1/((b^2-b×c+c^2)*(b^2+b×c+c^2)) in
        cPointhb h_x_3407.
Definition X_3408 :=
        let h_x_3408 a b c := (a*(b^2-b×c+c^2)*(b^2+b×c+c^2))/(a^2×b^4-b^6+3×a^2×b^2×c^2+a^2×c^4-c^6) in
        cPointhb h_x_3408.
Definition X_3409 :=
        let h_x_3409 a b c := (a*(a^2×b^4-b^6+3×a^2×b^2×c^2+a^2×c^4-c^6))/((b^2-b×c+c^2)*(b^2+b×c+c^2)) in
        cPointhb h_x_3409.
Definition X_3410 :=
        let h_x_3410 a b c := a^6-a^4×b^2+a^2×b^4-b^6-a^4×c^2+a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6 in
        cPointhb h_x_3410.
Definition X_3411 :=
        let h_x_3411 a b c := 5×(SS a b c)^2-3×sqrt(3)×a^2*(SS a b c)-(SB a b c)*(SC a b c) in
        cPointhb h_x_3411.
Definition X_3412 :=
        let h_x_3412 a b c := 5×(SS a b c)^2+3×sqrt(3)×a^2*(SS a b c)-(SB a b c)*(SC a b c) in
        cPointhb h_x_3412.
Definition X_3413 :=
        let h_x_3413 a b c := 1/((SA a b c)^2-(SB a b c)*(SC a b c)-(SA a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_3413.
Definition X_3414 :=
        let h_x_3414 a b c := 1/((SA a b c)^2-(SB a b c)*(SC a b c)+(SA a b c)*sqrt((SA a b c)^2+(SB a b c)^2+(SC a b c)^2-4×(DeltaMaj a b c)^2)) in
        cPointhb h_x_3414.
Definition X_3415 :=
        let h_x_3415 a b c := a^2/(a^3-b^3-b^2×c-b×c^2-c^3) in
        cPointhb h_x_3415.
Definition X_3416 :=
        let h_x_3416 a b c := a^3-b^3-b^2×c-b×c^2-c^3 in
        cPointhb h_x_3416.
Definition X_3417 :=
        let h_x_3417 a b c := a^2/(-a^4+a^3×b-a×b^3+b^4+a^3×c-2×a^2×b×c+a×b^2×c+a×b×c^2-2×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_3417.
Definition X_3418 :=
        let h_x_3418 a b c := a^2/(-a^4+a^3×b-a×b^3+b^4+a^3×c-a×b^2×c-a×b×c^2-2×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_3418.
Definition X_3419 :=
        let h_x_3419 a b c := -a^4+a^3×b-a×b^3+b^4+a^3×c-a×b^2×c-a×b×c^2-2×b^2×c^2-a×c^3+c^4 in
        cPointhb h_x_3419.
Definition X_3420 :=
        let h_x_3420 a b c := a^2/(a^4-b^4+4×a^2×b×c-4×a×b^2×c-4×a×b×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_3420.
Definition X_3421 :=
        let h_x_3421 a b c := a^4-b^4+4×a^2×b×c-4×a×b^2×c-4×a×b×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_3421.
Definition X_3422 :=
        let h_x_3422 a b c := -(a^2/(a^4-b^4+2×a^2×b×c+2×b^2×c^2-c^4)) in
        cPointhb h_x_3422.
Definition X_3423 :=
        let h_x_3423 a b c := a^2/(a^3-a^2×b+a×b^2-b^3-a^2×c+2×a×b×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_3423.
Definition X_3424 :=
        let h_x_3424 a b c := 1/(-a^4-2×a^2×b^2+3×b^4-2×a^2×c^2+2×b^2×c^2+3×c^4) in
        cPointhb h_x_3424.
Definition X_3425 :=
        let h_x_3425 a b c := a^2/(-a^6+a^4×b^2-a^2×b^4+b^6+a^4×c^2-2×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_3425.
Definition X_3426 :=
        let h_x_3426 a b c := a^2/(-5×a^4+4×a^2×b^2+b^4+4×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3426.
Definition X_3427 :=
        let h_x_3427 a b c := 1/(-a^5+a^4×b+2×a^3×b^2-2×a^2×b^3-a×b^4+b^5+a^4×c+2×a^2×b^2×c-3×b^4×c+2×a^3×c^2+2×a^2×b×c^2-6×a×b^2×c^2+2×b^3×c^2-2×a^2×c^3+2×b^2×c^3-a×c^4-3×b×c^4+c^5) in
        cPointhb h_x_3427.
Definition X_3428 :=
        let h_x_3428 a b c := a^2*(a^5-a^4×b-2×a^3×b^2+2×a^2×b^3+a×b^4-b^5-a^4×c-2×a^2×b^2×c+3×b^4×c-2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-2×b^3×c^2+2×a^2×c^3-2×b^2×c^3+a×c^4+3×b×c^4-c^5) in
        cPointhb h_x_3428.
Definition X_3429 :=
        let h_x_3429 a b c := 1/(-a^5-2×a^2×b^3+a×b^4+2×b^5-a^3×b×c-a^2×b^2×c+a×b^3×c+b^4×c-a^2×b×c^2+b^3×c^2-2×a^2×c^3+a×b×c^3+b^2×c^3+a×c^4+b×c^4+2×c^5) in
        cPointhb h_x_3429.
Definition X_3430 :=
        let h_x_3430 a b c := a^2*(-a^5-2×a^2×b^3+a×b^4+2×b^5-a^3×b×c-a^2×b^2×c+a×b^3×c+b^4×c-a^2×b×c^2+b^3×c^2-2×a^2×c^3+a×b×c^3+b^2×c^3+a×c^4+b×c^4+2×c^5) in
        cPointhb h_x_3430.
Definition X_3431 :=
        let h_x_3431 a b c := a^2/(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4) in
        cPointhb h_x_3431.
Definition X_3432 :=
        let h_x_3432 a b c := a^2/(-a^10+3×a^8×b^2-4×a^6×b^4+4×a^4×b^6-3×a^2×b^8+b^10+3×a^8×c^2-5×a^6×b^2×c^2+2×a^4×b^4×c^2+3×a^2×b^6×c^2-3×b^8×c^2-4×a^6×c^4+2×a^4×b^2×c^4+2×b^6×c^4+4×a^4×c^6+3×a^2×b^2×c^6+2×b^4×c^6-3×a^2×c^8-3×b^2×c^8+c^10) in
        cPointhb h_x_3432.
Definition X_3433 :=
        let h_x_3433 a b c := a^2/(-a^3+a^2×b-a×b^2+b^3+a^2×c-b^2×c-a×c^2-b×c^2+c^3) in
        cPointhb h_x_3433.
Definition X_3434 :=
        let h_x_3434 a b c := -a^3+a^2×b-a×b^2+b^3+a^2×c-b^2×c-a×c^2-b×c^2+c^3 in
        cPointhb h_x_3434.
Definition X_3435 :=
        let h_x_3435 a b c := a^2/(-a^4+b^4-2×a^2×b×c+2×a×b^2×c+2×a×b×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3435.
Definition X_3436 :=
        let h_x_3436 a b c := -a^4+b^4-2×a^2×b×c+2×a×b^2×c+2×a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3436.
Definition X_3437 :=
        let h_x_3437 a b c := a^2/(-a^4-a^3×b+a×b^3+b^4-a^3×c-a^2×b×c+a×b^2×c+b^3×c+a×b×c^2+a×c^3+b×c^3+c^4) in
        cPointhb h_x_3437.
Definition X_3438 :=
        let h_x_3438 a b c := a^2/(sqrt(3)*(SB a b c)*(SC a b c)+2*(SA a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_3438.
Definition X_3439 :=
        let h_x_3439 a b c := a^2/(sqrt(3)*(SB a b c)*(SC a b c)-2*(SA a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_3439.
Definition X_3440 :=
        let h_x_3440 a b c := a^2/((SB a b c)*(SC a b c)-2*(SA a b c)*(a^2+sqrt(3)*(DeltaMaj a b c))) in
        cPointhb h_x_3440.
Definition X_3441 :=
        let h_x_3441 a b c := a^2/((SB a b c)*(SC a b c)-2*(SA a b c)*(a^2-sqrt(3)*(DeltaMaj a b c))) in
        cPointhb h_x_3441.
Definition X_3442 :=
        let h_x_3442 a b c := a^2/((SB a b c)*(SC a b c)+2×sqrt(3)*(SA a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_3442.
Definition X_3443 :=
        let h_x_3443 a b c := a^2/((SB a b c)*(SC a b c)-2×sqrt(3)*(SA a b c)*(DeltaMaj a b c)) in
        cPointhb h_x_3443.
Definition X_3444 :=
        let h_x_3444 a b c := a^2/(a^3+a^2×b-a×b^2-b^3+a^2×c-a×b×c-b^2×c-a×c^2-b×c^2-c^3) in
        cPointhb h_x_3444.
Definition X_3445 :=
        let h_x_3445 a b c := a^2*(a+b-3×c)*(a-3×b+c) in
        cPointhb h_x_3445.
Definition X_3446 :=
        let h_x_3446 a b c := a^2/(a^3-a^2×b+a×b^2-b^3-a^2×c-a×b×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_3446.
Definition X_3447 :=
        let h_x_3447 a b c := a^2/(-a^6+a^4×b^2-a^2×b^4+b^6+a^4×c^2+a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_3447.
Definition X_3448 :=
        let h_x_3448 a b c := -a^6+a^4×b^2-a^2×b^4+b^6+a^4×c^2+a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6 in
        cPointhb h_x_3448.
Definition X_3449 :=
        let h_x_3449 a b c := a^2/(a×b^2-b^3+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_3449.
Definition X_3450 :=
        let h_x_3450 a b c := a^2/((a-b-c)*(a×b^2+b^3-b^2×c+a×c^2-b×c^2+c^3)) in
        cPointhb h_x_3450.
Definition X_3451 :=
        let h_x_3451 a b c := a^2/((a-b-c)*(a×b+b^2+a×c-2×b×c+c^2)) in
        cPointhb h_x_3451.
Definition X_3452 :=
        let h_x_3452 a b c := (a-b-c)*(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_3452.
Definition X_3453 :=
        let h_x_3453 a b c := a^2/((b+c)*(a×b^2+b^3+a×c^2+c^3)) in
        cPointhb h_x_3453.
Definition X_3454 :=
        let h_x_3454 a b c := (b+c)*(a×b^2+b^3+a×c^2+c^3) in
        cPointhb h_x_3454.
Definition X_3455 :=
        let h_x_3455 a b c := a^2/(-a^4+b^4-b^2×c^2+c^4) in
        cPointhb h_x_3455.
Definition X_3456 :=
        let h_x_3456 a b c := a^2/(-a^4+b^4+b^2×c^2+c^4) in
        cPointhb h_x_3456.
Definition X_3457 :=
        let h_x_3457 a b c := a^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)+2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_3457.
Definition X_3458 :=
        let h_x_3458 a b c := a^2*(a^2*(SA a b c)+4*(SB a b c)*(SC a b c)-2×sqrt(3)×a^2*(DeltaMaj a b c)) in
        cPointhb h_x_3458.
Definition X_3459 :=
        let h_x_3459 a b c := 1/(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2+5×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4+2×b^4×c^4-4×a^2×c^6-2×b^2×c^6+c^8) in
        cPointhb h_x_3459.
Definition X_3460 :=
        let h_x_3460 a b c := a*(a^9-3×a^7×b^2+a^6×b^3+3×a^5×b^4-3×a^4×b^5-a^3×b^6+3×a^2×b^7-b^9+a^6×b^2×c-2×a^4×b^4×c+a^2×b^6×c-3×a^7×c^2+a^6×b×c^2+3×a^5×b^2×c^2-a^4×b^3×c^2+a^3×b^4×c^2-3×a^2×b^5×c^2-a×b^6×c^2+3×b^7×c^2+a^6×c^3-a^4×b^2×c^3-a^2×b^4×c^3+b^6×c^3+3×a^5×c^4-2×a^4×b×c^4+a^3×b^2×c^4-a^2×b^3×c^4+2×a×b^4×c^4-3×b^5×c^4-3×a^4×c^5-3×a^2×b^2×c^5-3×b^4×c^5-a^3×c^6+a^2×b×c^6-a×b^2×c^6+b^3×c^6+3×a^2×c^7+3×b^2×c^7-c^9) in
        cPointhb h_x_3460.
Definition X_3461 :=
        let h_x_3461 a b c := a/(a^9-3×a^7×b^2+a^6×b^3+3×a^5×b^4-3×a^4×b^5-a^3×b^6+3×a^2×b^7-b^9+a^6×b^2×c-2×a^4×b^4×c+a^2×b^6×c-3×a^7×c^2+a^6×b×c^2+3×a^5×b^2×c^2-a^4×b^3×c^2+a^3×b^4×c^2-3×a^2×b^5×c^2-a×b^6×c^2+3×b^7×c^2+a^6×c^3-a^4×b^2×c^3-a^2×b^4×c^3+b^6×c^3+3×a^5×c^4-2×a^4×b×c^4+a^3×b^2×c^4-a^2×b^3×c^4+2×a×b^4×c^4-3×b^5×c^4-3×a^4×c^5-3×a^2×b^2×c^5-3×b^4×c^5-a^3×c^6+a^2×b×c^6-a×b^2×c^6+b^3×c^6+3×a^2×c^7+3×b^2×c^7-c^9) in
        cPointhb h_x_3461.
Definition X_3462 :=
        let h_x_3462 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^12-5×a^10×b^2+9×a^8×b^4-6×a^6×b^6-a^4×b^8+3×a^2×b^10-b^12-5×a^10×c^2+11×a^8×b^2×c^2-6×a^6×b^4×c^2+2×a^4×b^6×c^2-5×a^2×b^8×c^2+3×b^10×c^2+9×a^8×c^4-6×a^6×b^2×c^4-2×a^4×b^4×c^4+2×a^2×b^6×c^4-3×b^8×c^4-6×a^6×c^6+2×a^4×b^2×c^6+2×a^2×b^4×c^6+2×b^6×c^6-a^4×c^8-5×a^2×b^2×c^8-3×b^4×c^8+3×a^2×c^10+3×b^2×c^10-c^12) in
        cPointhb h_x_3462.
Definition X_3463 :=
        let h_x_3463 a b c := a^2/((a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^12-5×a^10×b^2+9×a^8×b^4-6×a^6×b^6-a^4×b^8+3×a^2×b^10-b^12-5×a^10×c^2+11×a^8×b^2×c^2-6×a^6×b^4×c^2+2×a^4×b^6×c^2-5×a^2×b^8×c^2+3×b^10×c^2+9×a^8×c^4-6×a^6×b^2×c^4-2×a^4×b^4×c^4+2×a^2×b^6×c^4-3×b^8×c^4-6×a^6×c^6+2×a^4×b^2×c^6+2×a^2×b^4×c^6+2×b^6×c^6-a^4×c^8-5×a^2×b^2×c^8-3×b^4×c^8+3×a^2×c^10+3×b^2×c^10-c^12)) in
        cPointhb h_x_3463.
Definition X_3464 :=
        let h_x_3464 a b c := a*(a^9+2×a^8×b-a^7×b^2-5×a^6×b^3-3×a^5×b^4+3×a^4×b^5+5×a^3×b^6+a^2×b^7-2×a×b^8-b^9+2×a^8×c+a^6×b^2×c-6×a^4×b^4×c+a^2×b^6×c+2×b^8×c-a^7×c^2+a^6×b×c^2+7×a^5×b^2×c^2+5×a^4×b^3×c^2-5×a^3×b^4×c^2-7×a^2×b^5×c^2-a×b^6×c^2+b^7×c^2-5×a^6×c^3+5×a^4×b^2×c^3+5×a^2×b^4×c^3-5×b^6×c^3-3×a^5×c^4-6×a^4×b×c^4-5×a^3×b^2×c^4+5×a^2×b^3×c^4+6×a×b^4×c^4+3×b^5×c^4+3×a^4×c^5-7×a^2×b^2×c^5+3×b^4×c^5+5×a^3×c^6+a^2×b×c^6-a×b^2×c^6-5×b^3×c^6+a^2×c^7+b^2×c^7-2×a×c^8+2×b×c^8-c^9) in
        cPointhb h_x_3464.
Definition X_3465 :=
        let h_x_3465 a b c := a*(a^6-a^5×b-a^4×b^2+2×a^3×b^3-a^2×b^4-a×b^5+b^6-a^5×c-a^4×b×c+a×b^4×c+b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+2×a^3×c^3-2×b^3×c^3-a^2×c^4+a×b×c^4-b^2×c^4-a×c^5+b×c^5+c^6) in
        cPointhb h_x_3465.
Definition X_3466 :=
        let h_x_3466 a b c := a/(a^6-a^5×b-a^4×b^2+2×a^3×b^3-a^2×b^4-a×b^5+b^6-a^5×c-a^4×b×c+a×b^4×c+b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+2×a^3×c^3-2×b^3×c^3-a^2×c^4+a×b×c^4-b^2×c^4-a×c^5+b×c^5+c^6) in
        cPointhb h_x_3466.
Definition X_3467 :=
        let h_x_3467 a b c := a/(-a×b×c+(a+b-c)*(a-b+c)*(a+b+c)) in
        cPointhb h_x_3467.
Definition X_3468 :=
        let h_x_3468 a b c := a*(a^6+a^5×b-a^4×b^2-2×a^3×b^3-a^2×b^4+a×b^5+b^6+a^5×c+a^4×b×c-a×b^4×c-b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-2×a^3×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4-b^2×c^4+a×c^5-b×c^5+c^6) in
        cPointhb h_x_3468.
Definition X_3469 :=
        let h_x_3469 a b c := a/(a^6+a^5×b-a^4×b^2-2×a^3×b^3-a^2×b^4+a×b^5+b^6+a^5×c+a^4×b×c-a×b^4×c-b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-2×a^3×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4-b^2×c^4+a×c^5-b×c^5+c^6) in
        cPointhb h_x_3469.
Definition X_3470 :=
        let h_x_3470 a b c := a^2*(a^4-2×a^2×b^2+b^4+a^2×c^2+b^2×c^2-2×c^4)*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3470.
Definition X_3471 :=
        let h_x_3471 a b c := (-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4)/(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3471.
Definition X_3472 :=
        let h_x_3472 a b c := (a*((a*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(-b^2*(SB a b c)+(SA a b c)*(SC a b c)))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6)+(b*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6+2×a^5×c+2×a^4×b×c-2×a×b^4×c-2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-4×a^3×c^3+4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4+2×a×c^5-2×b×c^5+c^6)+(c*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))/(a^6+2×a^5×b-a^4×b^2-4×a^3×b^3-a^2×b^4+2×a×b^5+b^6-2×a^5×c+2×a^4×b×c+2×a×b^4×c-2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3+4×b^3×c^3-a^2×c^4-2×a×b×c^4-b^2×c^4-2×a×c^5-2×b×c^5+c^6)))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_3472.
Definition X_3473 :=
        let h_x_3473 a b c := (a*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6))/((a*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(-b^2*(SB a b c)+(SA a b c)*(SC a b c)))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6)+(b*(-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))/(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6+2×a^5×c+2×a^4×b×c-2×a×b^4×c-2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-4×a^3×c^3+4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4+2×a×c^5-2×b×c^5+c^6)+(c*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c)))/(a^6+2×a^5×b-a^4×b^2-4×a^3×b^3-a^2×b^4+2×a×b^5+b^6-2×a^5×c+2×a^4×b×c+2×a×b^4×c-2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3+4×b^3×c^3-a^2×c^4-2×a×b×c^4-b^2×c^4-2×a×c^5-2×b×c^5+c^6)) in
        cPointhb h_x_3473.
Definition X_3474 :=
        let h_x_3474 a b c := 3×a^3-a^2×b-a×b^2-b^3-a^2×c+2×a×b×c+b^2×c-a×c^2+b×c^2-c^3 in
        cPointhb h_x_3474.
Definition X_3475 :=
        let h_x_3475 a b c := a^3-3×a^2×b+a×b^2+b^3-3×a^2×c-2×a×b×c-b^2×c+a×c^2-b×c^2+c^3 in
        cPointhb h_x_3475.
Definition X_3476 :=
        let h_x_3476 a b c := (3×a^2-2×a×b+b^2-2×a×c+2×b×c+c^2)/(a-b-c) in
        cPointhb h_x_3476.
Definition X_3477 :=
        let h_x_3477 a b c := a^2/(a^3-3×a^2×b+a×b^2+b^3-3×a^2×c-2×a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_3477.
Definition X_3478 :=
        let h_x_3478 a b c := (a^2*(a-b-c))/(3×a^2-2×a×b+b^2-2×a×c+2×b×c+c^2) in
        cPointhb h_x_3478.
Definition X_3479 :=
        let h_x_3479 a b c := (sqrt(3)×a^2+2*(SS a b c))/((SS a b c)*(SA a b c)-sqrt(3)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_3479.
Definition X_3480 :=
        let h_x_3480 a b c := (sqrt(3)×a^2-2*(SS a b c))/((SS a b c)*(SA a b c)+sqrt(3)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_3480.
Definition X_3481 :=
        let h_x_3481 a b c := (a^2*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2+5×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4+2×b^4×c^4-4×a^2×c^6-2×b^2×c^6+c^8))/(a^12-5×a^10×b^2+9×a^8×b^4-6×a^6×b^6-a^4×b^8+3×a^2×b^10-b^12-5×a^10×c^2+11×a^8×b^2×c^2-6×a^6×b^4×c^2+2×a^4×b^6×c^2-5×a^2×b^8×c^2+3×b^10×c^2+9×a^8×c^4-6×a^6×b^2×c^4-2×a^4×b^4×c^4+2×a^2×b^6×c^4-3×b^8×c^4-6×a^6×c^6+2×a^4×b^2×c^6+2×a^2×b^4×c^6+2×b^6×c^6-a^4×c^8-5×a^2×b^2×c^8-3×b^4×c^8+3×a^2×c^10+3×b^2×c^10-c^12) in
        cPointhb h_x_3481.
Definition X_3482 :=
        let h_x_3482 a b c := (a^12-5×a^10×b^2+9×a^8×b^4-6×a^6×b^6-a^4×b^8+3×a^2×b^10-b^12-5×a^10×c^2+11×a^8×b^2×c^2-6×a^6×b^4×c^2+2×a^4×b^6×c^2-5×a^2×b^8×c^2+3×b^10×c^2+9×a^8×c^4-6×a^6×b^2×c^4-2×a^4×b^4×c^4+2×a^2×b^6×c^4-3×b^8×c^4-6×a^6×c^6+2×a^4×b^2×c^6+2×a^2×b^4×c^6+2×b^6×c^6-a^4×c^8-5×a^2×b^2×c^8-3×b^4×c^8+3×a^2×c^10+3×b^2×c^10-c^12)/(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2+5×a^4×b^2×c^2+a^2×b^4×c^2-2×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4+2×b^4×c^4-4×a^2×c^6-2×b^2×c^6+c^8) in
        cPointhb h_x_3482.
Definition X_3483 :=
        let h_x_3483 a b c := (a*(a^6+a^5×b-a^4×b^2-2×a^3×b^3-a^2×b^4+a×b^5+b^6+a^5×c+a^4×b×c-a×b^4×c-b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-2×a^3×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4-b^2×c^4+a×c^5-b×c^5+c^6))/(-a^3-a^2×b+a×b^2+b^3-a^2×c-a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_3483.
Definition X_3484 :=
        let h_x_3484 a b c := (a^2*(a^4-2×a^2×b^2+b^4-a^2×c^2-b^2×c^2)*(a^4-a^2×b^2-2×a^2×c^2-b^2×c^2+c^4)*(a^12-3×a^10×b^2+3×a^8×b^4-2×a^6×b^6+3×a^4×b^8-3×a^2×b^10+b^12-3×a^10×c^2+7×a^8×b^2×c^2-2×a^6×b^4×c^2-6×a^4×b^6×c^2+5×a^2×b^8×c^2-b^10×c^2+3×a^8×c^4-2×a^6×b^2×c^4+6×a^4×b^4×c^4-2×a^2×b^6×c^4-5×b^8×c^4-2×a^6×c^6-6×a^4×b^2×c^6-2×a^2×b^4×c^6+10×b^6×c^6+3×a^4×c^8+5×a^2×b^2×c^8-5×b^4×c^8-3×a^2×c^10-b^2×c^10+c^12)) in
        cPointhb h_x_3484.
Definition X_3485 :=
        let h_x_3485 a b c := (a^2-2×a×b-b^2-2×a×c-2×b×c-c^2)/(a-b-c) in
        cPointhb h_x_3485.
Definition X_3486 :=
        let h_x_3486 a b c := (a-b-c)*(3×a^3+a^2×b-a×b^2+b^3+a^2×c+2×a×b×c-b^2×c-a×c^2-b×c^2+c^3) in
        cPointhb h_x_3486.
Definition X_3487 :=
        let h_x_3487 a b c := a^4-2×a^3×b-2×a^2×b^2+2×a×b^3+b^4-2×a^3×c-4×a^2×b×c-2×a×b^2×c-2×a^2×c^2-2×a×b×c^2-2×b^2×c^2+2×a×c^3+c^4 in
        cPointhb h_x_3487.
Definition X_3488 :=
        let h_x_3488 a b c := -3×a^4+2×a^3×b+2×a^2×b^2-2×a×b^3+b^4+2×a^3×c+4×a^2×b×c+2×a×b^2×c+2×a^2×c^2+2×a×b×c^2-2×b^2×c^2-2×a×c^3+c^4 in
        cPointhb h_x_3488.
Definition X_3489 :=
        let h_x_3489 a b c := a^2/((SB a b c)*(SC a b c)+2*(SA a b c)*(a^2+sqrt(3)*(DeltaMaj a b c))) in
        cPointhb h_x_3489.
Definition X_3490 :=
        let h_x_3490 a b c := a^2/((SB a b c)*(SC a b c)+2*(SA a b c)*(a^2-sqrt(3)*(DeltaMaj a b c))) in
        cPointhb h_x_3490.
Definition X_3491 :=
        let h_x_3491 a b c := a^2*(a^4×b^4-a^2×b^6+b^6×c^2+a^4×c^4-a^2×c^6+b^2×c^6) in
        cPointhb h_x_3491.
Definition X_3492 :=
        let h_x_3492 a b c := a^2*(a^8-a^2×b^6-a^4×b^2×c^2-2×b^4×c^4-a^2×c^6) in
        cPointhb h_x_3492.
Definition X_3493 :=
        let h_x_3493 a b c := (a^2*(a^6-b^6+a^2×b^2×c^2-c^6))/(a^4-b^2×c^2) in
        cPointhb h_x_3493.
Definition X_3494 :=
        let h_x_3494 a b c := (a*(a^2-a×b+b^2-a×c+b×c+c^2))/(a×b+a×c-b×c) in
        cPointhb h_x_3494.
Definition X_3495 :=
        let h_x_3495 a b c := (a*(a-b-c))/(a^2×b^2+a^2×b×c-a×b^2×c+a^2×c^2-a×b×c^2+b^2×c^2) in
        cPointhb h_x_3495.
Definition X_3496 :=
        let h_x_3496 a b c := a*(a^3-b^3-a×b×c-c^3) in
        cPointhb h_x_3496.
Definition X_3497 :=
        let h_x_3497 a b c := a/(a^3-b^3-a×b×c-c^3) in
        cPointhb h_x_3497.
Definition X_3498 :=
        let h_x_3498 a b c := (2×a^6×b^2+a^4×b^4+2×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2+a^4×c^4+a^2×b^2×c^4+b^4×c^4)/(-a^4+a^2×b^2+a^2×c^2+2×b^2×c^2) in
        cPointhb h_x_3498.
Definition X_3499 :=
        let h_x_3499 a b c := a^2*(a^4×b^4+a^4×b^2×c^2+a^2×b^4×c^2+a^4×c^4+a^2×b^2×c^4-b^4×c^4) in
        cPointhb h_x_3499.
Definition X_3500 :=
        let h_x_3500 a b c := a/(a^2×b-a×b^2+a^2×c-a×b×c+b^2×c-a×c^2+b×c^2) in
        cPointhb h_x_3500.
Definition X_3501 :=
        let h_x_3501 a b c := a*(a^2×b-a×b^2+a^2×c-a×b×c+b^2×c-a×c^2+b×c^2) in
        cPointhb h_x_3501.
Definition X_3502 :=
        let h_x_3502 a b c := (a*(a×b+a×c-b×c))/(a^2-a×b+b^2-a×c+b×c+c^2) in
        cPointhb h_x_3502.
Definition X_3503 :=
        let h_x_3503 a b c := (a*(a^2×b^2+a^2×b×c-a×b^2×c+a^2×c^2-a×b×c^2+b^2×c^2))/(a-b-c) in
        cPointhb h_x_3503.
Definition X_3504 :=
        let h_x_3504 a b c := (a^2*(-a^2+b^2+c^2))/(a^2×b^2+a^2×c^2-b^2×c^2) in
        cPointhb h_x_3504.
Definition X_3505 :=
        let h_x_3505 a b c := (a^2*(a^6-b^6+a^2×b^2×c^2-c^6))/(a^4+b^2×c^2) in
        cPointhb h_x_3505.
Definition X_3506 :=
        let h_x_3506 a b c := a^2*(a^8-a^2×b^6-a^4×b^2×c^2+2×b^4×c^4-a^2×c^6) in
        cPointhb h_x_3506.
Definition X_3507 :=
        let h_x_3507 a b c := a*(a^3×b-a^2×b^2+a×b^3+a^3×c-a^2×b×c+a×b^2×c-b^3×c-a^2×c^2+a×b×c^2-b^2×c^2+a×c^3-b×c^3) in
        cPointhb h_x_3507.
Definition X_3508 :=
        let h_x_3508 a b c := a*(a^3×b^2-a^2×b^3+a^3×b×c-a^2×b^2×c+a×b^3×c+a^3×c^2-a^2×b×c^2+a×b^2×c^2-b^3×c^2-a^2×c^3+a×b×c^3-b^2×c^3) in
        cPointhb h_x_3508.
Definition X_3509 :=
        let h_x_3509 a b c := a*(a^3-b^3+a×b×c-c^3) in
        cPointhb h_x_3509.
Definition X_3510 :=
        let h_x_3510 a b c := a*(a^3×b^3-a^2×b^2×c^2+a^3×c^3-b^3×c^3) in
        cPointhb h_x_3510.
Definition X_3511 :=
        let h_x_3511 a b c := a^2*(a^6×b^4-a^4×b^6+a^6×b^2×c^2-a^4×b^4×c^2-a^2×b^6×c^2+a^6×c^4-a^4×b^2×c^4+a^2×b^4×c^4+b^6×c^4-a^4×c^6-a^2×b^2×c^6+b^4×c^6) in
        cPointhb h_x_3511.
Definition X_3512 :=
        let h_x_3512 a b c := a/(a^3-b^3+a×b×c-c^3) in
        cPointhb h_x_3512.
Definition X_3513 :=
        let h_x_3513 a b c := a*((a+b-c)*(a-b+c)+4*(r a b c)*sqrt((r a b c)*((r a b c)+4*(RR a b c)))) in
        cPointhb h_x_3513.
Definition X_3514 :=
        let h_x_3514 a b c := a*((a+b-c)*(a-b+c)-4*(r a b c)*sqrt((r a b c)*((r a b c)+4*(RR a b c)))) in
        cPointhb h_x_3514.
Definition X_3515 :=
        let h_x_3515 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(3×a^4-6×a^2×b^2+3×b^4-6×a^2×c^2+2×b^2×c^2+3×c^4) in
        cPointhb h_x_3515.
Definition X_3516 :=
        let h_x_3516 a b c := a^2*(-a^2-b^2+c^2)*(a^2-b^2+c^2)*(3×a^4-6×a^2×b^2+3×b^4-6×a^2×c^2+10×b^2×c^2+3×c^4) in
        cPointhb h_x_3516.
Definition X_3517 :=
        let h_x_3517 a b c := a^2*(-a^2-b^2+c^2)*(a^2-b^2+c^2)*(3×a^4-6×a^2×b^2+3×b^4-6×a^2×c^2-2×b^2×c^2+3×c^4) in
        cPointhb h_x_3517.
Definition X_3518 :=
        let h_x_3518 a b c := a^2*(-a^2-b^2+c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_3518.
Definition X_3519 :=
        let h_x_3519 a b c := (-a^2+b^2+c^2)/(a^4-2×a^2×b^2+b^4-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_3519.
Definition X_3520 :=
        let h_x_3520 a b c := a^2*(-a^2-b^2+c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+3×b^2×c^2+c^4) in
        cPointhb h_x_3520.
Definition X_3521 :=
        let h_x_3521 a b c := (-a^2+b^2+c^2)/(a^4-2×a^2×b^2+b^4-2×a^2×c^2+3×b^2×c^2+c^4) in
        cPointhb h_x_3521.
Definition X_3522 :=
        let h_x_3522 a b c := 7×a^4-6×a^2×b^2-b^4-6×a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_3522.
Definition X_3523 :=
        let h_x_3523 a b c := 5×a^4-6×a^2×b^2+b^4-6×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3523.
Definition X_3524 :=
        let h_x_3524 a b c := 7×a^4-8×a^2×b^2+b^4-8×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3524.
Definition X_3525 :=
        let h_x_3525 a b c := 5×a^4-8×a^2×b^2+3×b^4-8×a^2×c^2-6×b^2×c^2+3×c^4 in
        cPointhb h_x_3525.
Definition X_3526 :=
        let h_x_3526 a b c := 3×a^4-5×a^2×b^2+2×b^4-5×a^2×c^2-4×b^2×c^2+2×c^4 in
        cPointhb h_x_3526.
Definition X_3527 :=
        let h_x_3527 a b c := a^2/(3×a^4-4×a^2×b^2+b^4-4×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3527.
Definition X_3528 :=
        let h_x_3528 a b c := 9×a^4-8×a^2×b^2-b^4-8×a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_3528.
Definition X_3529 :=
        let h_x_3529 a b c := 7×a^4-4×a^2×b^2-3×b^4-4×a^2×c^2+6×b^2×c^2-3×c^4 in
        cPointhb h_x_3529.
Definition X_3530 :=
        let h_x_3530 a b c := 6×a^4-7×a^2×b^2+b^4-7×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3530.
Definition X_3531 :=
        let h_x_3531 a b c := a^2/(7×a^4-8×a^2×b^2+b^4-8×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3531.
Definition X_3532 :=
        let h_x_3532 a b c := a^2/(5×a^4-2×a^2×b^2-3×b^4-2×a^2×c^2+6×b^2×c^2-3×c^4) in
        cPointhb h_x_3532.
Definition X_3533 :=
        let h_x_3533 a b c := 7×a^4-12×a^2×b^2+5×b^4-12×a^2×c^2-10×b^2×c^2+5×c^4 in
        cPointhb h_x_3533.
Definition X_3534 :=
        let h_x_3534 a b c := 7×a^4-5×a^2×b^2-2×b^4-5×a^2×c^2+4×b^2×c^2-2×c^4 in
        cPointhb h_x_3534.
Definition X_3535 :=
        let h_x_3535 a b c := (((SS a b c)+2*(SA a b c))*(SB a b c)*(SC a b c))/((SS a b c)^3-8*(SA a b c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_3535.
Definition X_3536 :=
        let h_x_3536 a b c := (((SS a b c)-2*(SA a b c))*(SB a b c)*(SC a b c))/((SS a b c)^3+8*(SA a b c)*(SB a b c)*(SC a b c)) in
        cPointhb h_x_3536.
Definition X_3537 :=
        let h_x_3537 a b c := (a^2-b^2-c^2)*(a^8-2×a^4×b^4+b^8+36×a^4×b^2×c^2-4×b^6×c^2-2×a^4×c^4+6×b^4×c^4-4×b^2×c^6+c^8) in
        cPointhb h_x_3537.
Definition X_3538 :=
        let h_x_3538 a b c := (a^2-b^2-c^2)*(a^8-2×a^4×b^4+b^8-28×a^4×b^2×c^2-4×b^6×c^2-2×a^4×c^4+6×b^4×c^4-4×b^2×c^6+c^8) in
        cPointhb h_x_3538.
Definition X_3539 :=
        let h_x_3539 a b c := 4×a^2×b^2×c^2+(a^4-(b^2-c^2)^2)*(DeltaMaj a b c) in
        cPointhb h_x_3539.
Definition X_3540 :=
        let h_x_3540 a b c := 4×a^2×b^2×c^2-(a^4-(b^2-c^2)^2)*(DeltaMaj a b c) in
        cPointhb h_x_3540.
Definition X_3541 :=
        let h_x_3541 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2+6×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3541.
Definition X_3542 :=
        let h_x_3542 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_3542.
Definition X_3543 :=
        let h_x_3543 a b c := 7×a^4-2×a^2×b^2-5×b^4-2×a^2×c^2+10×b^2×c^2-5×c^4 in
        cPointhb h_x_3543.
Definition X_3544 :=
        let h_x_3544 a b c := (-2×a+b+c)*(a^2×b+4×a×b^2+3×b^3+a^2×c-4×a×b×c-5×b^2×c+4×a×c^2-5×b×c^2+3×c^3) in
        cPointhb h_x_3544.
Definition X_3545 :=
        let h_x_3545 a b c := -a^4-4×a^2×b^2+5×b^4-4×a^2×c^2-10×b^2×c^2+5×c^4 in
        cPointhb h_x_3545.
Definition X_3546 :=
        let h_x_3546 a b c := (-a^2+b^2+c^2)*(-a^8+2×a^6×b^2-2×a^2×b^6+b^8+2×a^6×c^2-8×a^4×b^2×c^2+2×a^2×b^4×c^2-4×b^6×c^2+2×a^2×b^2×c^4+6×b^4×c^4-2×a^2×c^6-4×b^2×c^6+c^8) in
        cPointhb h_x_3546.
Definition X_3547 :=
        let h_x_3547 a b c := (-a^2+b^2+c^2)*(-a^8+2×a^6×b^2-2×a^2×b^6+b^8+2×a^6×c^2+8×a^4×b^2×c^2+2×a^2×b^4×c^2-4×b^6×c^2+2×a^2×b^2×c^4+6×b^4×c^4-2×a^2×c^6-4×b^2×c^6+c^8) in
        cPointhb h_x_3547.
Definition X_3548 :=
        let h_x_3548 a b c := (-a^2+b^2+c^2)*(-a^8+2×a^6×b^2-2×a^2×b^6+b^8+2×a^6×c^2-4×a^4×b^2×c^2+2×a^2×b^4×c^2-4×b^6×c^2+2×a^2×b^2×c^4+6×b^4×c^4-2×a^2×c^6-4×b^2×c^6+c^8) in
        cPointhb h_x_3548.
Definition X_3549 :=
        let h_x_3549 a b c := (-a^2+b^2+c^2)*(-a^8+2×a^6×b^2-2×a^2×b^6+b^8+2×a^6×c^2+4×a^4×b^2×c^2+2×a^2×b^4×c^2-4×b^6×c^2+2×a^2×b^2×c^4+6×b^4×c^4-2×a^2×c^6-4×b^2×c^6+c^8) in
        cPointhb h_x_3549.
Definition X_3550 :=
        let h_x_3550 a b c := a*(2×a^2-a×b-a×c+b×c) in
        cPointhb h_x_3550.
Definition X_3551 :=
        let h_x_3551 a b c := a/(2×a^2-a×b-a×c+b×c) in
        cPointhb h_x_3551.
Definition X_3552 :=
        let h_x_3552 a b c := 2×a^4-a^2×b^2-a^2×c^2+b^2×c^2 in
        cPointhb h_x_3552.
Definition X_3553 :=
        let h_x_3553 a b c := a*(a^4-2×a^2×b^2+b^4-4×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3553.
Definition X_3554 :=
        let h_x_3554 a b c := a*(a^4-2×a^2×b^2+b^4+4×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3554.
Definition X_3555 :=
        let h_x_3555 a b c := a*(a^2×b-b^3+a^2×c+4×a×b×c-b^2×c-b×c^2-c^3) in
        cPointhb h_x_3555.
Definition X_3556 :=
        let h_x_3556 a b c := a^2*(a^5+a^4×b-a×b^4-b^5+a^4×c-2×a^2×b^2×c+b^4×c-2×a^2×b×c^2+2×a×b^2×c^2-a×c^4+b×c^4-c^5) in
        cPointhb h_x_3556.
Definition X_3557 :=
        let h_x_3557 a b c := a^2*(a^2+sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_3557.
Definition X_3558 :=
        let h_x_3558 a b c := a^2*(a^2-sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_3558.
Definition X_3559 :=
        let h_x_3559 a b c := (a+b)*(a+c)*(-a+b+c)*(-a^2-b^2+c^2)*(a^2-b^2+c^2)*(-a^3-a^2×b+a×b^2+b^3-a^2×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_3559.
Definition X_3560 :=
        let h_x_3560 a b c := a*(-a^6+a^5×b+2×a^4×b^2-2×a^3×b^3-a^2×b^4+a×b^5+a^5×c-2×a^4×b×c-a×b^4×c+2×b^5×c+2×a^4×c^2-2×a^2×b^2×c^2-2×a^3×c^3-4×b^3×c^3-a^2×c^4-a×b×c^4+a×c^5+2×b×c^5) in
        cPointhb h_x_3560.
Definition X_3561 :=
        let h_x_3561 a b c := a^2*(a^2-b^2-c^2)*(a^6-a^5×b-2×a^4×b^2+2×a^3×b^3+a^2×b^4-a×b^5-a^5×c-a^4×b×c+a×b^4×c+b^5×c-2×a^4×c^2+2×a^2×b^2×c^2+2×a^3×c^3-2×b^3×c^3+a^2×c^4+a×b×c^4-a×c^5+b×c^5) in
        cPointhb h_x_3561.
Definition X_3562 :=
        let h_x_3562 a b c := a*(a^6+a^5×b-2×a^4×b^2-2×a^3×b^3+a^2×b^4+a×b^5+a^5×c-a^4×b×c-a×b^4×c+b^5×c-2×a^4×c^2+2×a^2×b^2×c^2-2×a^3×c^3-2×b^3×c^3+a^2×c^4-a×b×c^4+a×c^5+b×c^5) in
        cPointhb h_x_3562.
Definition X_3563 :=
        let h_x_3563 a b c := a^2/((b^2+c^2-a^2)*(2×a^4+c^4+b^4-a^2×b^2-2×b^2×c^2-c^2×a^2)) in
        cPointhb h_x_3563.
Definition X_3564 :=
        let h_x_3564 a b c := (-a^2+b^2+c^2)*(2×a^4-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_3564.
Definition X_3565 :=
        let h_x_3565 a b c := a^2/((3×a^2-b^2-c^2)*(b^2-c^2)) in
        cPointhb h_x_3565.
Definition X_3566 :=
        let h_x_3566 a b c := (3×a^2-b^2-c^2)*(b^2-c^2) in
        cPointhb h_x_3566.
Definition X_3567 :=
        let h_x_3567 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-a^4×b^2×c^2-3×a^2×b^4×c^2+3×b^6×c^2-3×a^4×c^4-3×a^2×b^2×c^4-4×b^4×c^4+3×a^2×c^6+3×b^2×c^6-c^8) in
        cPointhb h_x_3567.
Definition X_3568 :=
        let h_x_3568 a b c := a^12-2×a^10×b^2+a^8×b^4-2×a^6×b^6+3×a^4×b^8-a^2×b^10-2×a^10×c^2+4×a^8×b^2×c^2-3×a^4×b^6×c^2+a^8×c^4+a^4×b^4×c^4+a^2×b^6×c^4+b^8×c^4-2×a^6×c^6-3×a^4×b^2×c^6+a^2×b^4×c^6-2×b^6×c^6+3×a^4×c^8+b^4×c^8-a^2×c^10 in
        cPointhb h_x_3568.
Definition X_3569 :=
        let h_x_3569 a b c := a^2*(b^2-c^2)*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_3569.
Definition X_3570 :=
        let h_x_3570 a b c := (a-b)*(c-a)*(a^2-b×c) in
        cPointhb h_x_3570.
Definition X_3571 :=
        let h_x_3571 a b c := a*(a^2×b^4+a^4×b×c-a^2×b^3×c-2×a^2×b^2×c^2-a^2×b×c^3+b^3×c^3+a^2×c^4) in
        cPointhb h_x_3571.
Definition X_3572 :=
        let h_x_3572 a b c := (a^2*(b-c))/(a^2-b×c) in
        cPointhb h_x_3572.
Definition X_3573 :=
        let h_x_3573 a b c := a*(-a^2+b×c)*(a-b)*(c-a) in
        cPointhb h_x_3573.
Definition X_3574 :=
        let h_x_3574 a b c := (a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(2×a^6-3×a^4×b^2+b^6-3×a^4×c^2-b^4×c^2-b^2×c^4+c^6) in
        cPointhb h_x_3574.
Definition X_3575 :=
        let h_x_3575 a b c := (2×a^6-3×a^4×b^2+b^6-3×a^4×c^2-b^4×c^2-b^2×c^4+c^6)/(a^2-b^2-c^2) in
        cPointhb h_x_3575.
Definition X_3576 :=
        let h_x_3576 a b c := a*(-4×a×b×c+(3×a-b-c)*(a+b-c)*(a-b+c)) in
        cPointhb h_x_3576.
Definition X_3577 :=
        let h_x_3577 a b c := a/(-4×a×b×c+(3×a-b-c)*(a+b-c)*(a-b+c)) in
        cPointhb h_x_3577.
Definition X_3578 :=
        let h_x_3578 a b c := (2×a+b+c)*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_3578.
Definition X_3579 :=
        let h_x_3579 a b c := a*(2×a^3+a^2×b-2×a×b^2-b^3+a^2×c-2×a×b×c+b^2×c-2×a×c^2+b×c^2-c^3) in
        cPointhb h_x_3579.
Definition X_3580 :=
        let h_x_3580 a b c := a^4×b^2-2×a^2×b^4+b^6+a^4×c^2+2×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6 in
        cPointhb h_x_3580.
Definition X_3581 :=
        let h_x_3581 a b c := a^2*(a^2-b^2-b×c-c^2)*(a^2-b^2+b×c-c^2)*(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4) in
        cPointhb h_x_3581.
Definition X_3582 :=
        let h_x_3582 a b c := a^4-2×a^2×b^2+b^4+3×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3582.
Definition X_3583 :=
        let h_x_3583 a b c := a^4-b^4-a^2×b×c+2×b^2×c^2-c^4 in
        cPointhb h_x_3583.
Definition X_3584 :=
        let h_x_3584 a b c := a^4-2×a^2×b^2+b^4-3×a^2×b×c-2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3584.
Definition X_3585 :=
        let h_x_3585 a b c := a^4-b^4+a^2×b×c+2×b^2×c^2-c^4 in
        cPointhb h_x_3585.
Definition X_3586 :=
        let h_x_3586 a b c := 3×a^4-a^3×b-a^2×b^2+a×b^3-2×b^4-a^3×c-2×a^2×b×c-a×b^2×c-a^2×c^2-a×b×c^2+4×b^2×c^2+a×c^3-2×c^4 in
        cPointhb h_x_3586.
Definition X_3587 :=
        let h_x_3587 a b c := a*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-10×a^4×b×c+8×a^2×b^3×c+2×b^5×c-3×a^4×c^2+2×a^2×b^2×c^2+b^4×c^2+8×a^2×b×c^3-4×b^3×c^3+3×a^2×c^4+b^2×c^4+2×b×c^5-c^6) in
        cPointhb h_x_3587.
Definition X_3588 :=
        let h_x_3588 a b c := a^2*(b+c)*(a^4×b+a^3×b^2-a^2×b^3-a×b^4+a^4×c-b^4×c+a^3×c^2-2×a×b^2×c^2+b^3×c^2-a^2×c^3+b^2×c^3-a×c^4-b×c^4) in
        cPointhb h_x_3588.
Definition X_3589 :=
        let h_x_3589 a b c := 2×a^2+b^2+c^2 in
        cPointhb h_x_3589.
Definition X_3590 :=
        let h_x_3590 a b c := (-a^2+b^2-c^2-6*(DeltaMaj a b c))*(-a^2-b^2+c^2-6*(DeltaMaj a b c)) in
        cPointhb h_x_3590.
Definition X_3591 :=
        let h_x_3591 a b c := (-a^2+b^2-c^2+6*(DeltaMaj a b c))*(-a^2-b^2+c^2+6*(DeltaMaj a b c)) in
        cPointhb h_x_3591.
Definition X_3592 :=
        let h_x_3592 a b c := a^2*(a^2-b^2-c^2-6*(DeltaMaj a b c)) in
        cPointhb h_x_3592.
Definition X_3593 :=
        let h_x_3593 a b c := a^2-b^2-c^2-6*(DeltaMaj a b c) in
        cPointhb h_x_3593.
Definition X_3594 :=
        let h_x_3594 a b c := a^2*(a^2-b^2-c^2+6*(DeltaMaj a b c)) in
        cPointhb h_x_3594.
Definition X_3595 :=
        let h_x_3595 a b c := a^2-b^2-c^2+6*(DeltaMaj a b c) in
        cPointhb h_x_3595.
Definition X_3596 :=
        let h_x_3596 a b c := b^2×c^2*(-a+b+c) in
        cPointhb h_x_3596.
Definition X_3597 :=
        let h_x_3597 a b c := 1/(a^5+a^4×b-a^3×b^2-a^2×b^3+a^4×c+2×a^3×b×c-a^2×b^2×c-2×a×b^3×c-a^3×c^2-a^2×b×c^2-2×a×b^2×c^2-2×b^3×c^2-a^2×c^3-2×a×b×c^3-2×b^2×c^3) in
        cPointhb h_x_3597.
Definition X_3598 :=
        let h_x_3598 a b c := (a+b-c)*(a-b+c)*(3×a^2+b^2+c^2-2×b×c) in
        cPointhb h_x_3598.
Definition X_3599 :=
        let h_x_3599 a b c := (a+b-c)*(a-b+c)*(5×a^4-8×a^3×b+2×a^2×b^2+b^4-8×a^3×c+12×a^2×b×c-4×b^3×c+2×a^2×c^2+6×b^2×c^2-4×b×c^3+c^4) in
        cPointhb h_x_3599.
Definition X_3600 :=
        let h_x_3600 a b c := (a+b-c)*(a-b+c)*(3×a^2+b^2+c^2+2×b×c) in
        cPointhb h_x_3600.
Definition X_3601 :=
        let h_x_3601 a b c := a*(a-b-c)*(3×a^2+2×a×b-b^2+2×a×c+2×b×c-c^2) in
        cPointhb h_x_3601.
Definition X_3602 :=
        let h_x_3602 a b c := sec((A a b c)/3+PI/6)*(sin(A a b c)) in
        cPointhb h_x_3602.
Definition X_3603 :=
        let h_x_3603 a b c := csc((A a b c)/3)*(sin(A a b c)) in
        cPointhb h_x_3603.
Definition X_3604 :=
        let h_x_3604 a b c := sec((A a b c)/3-PI/6)*(sin(A a b c)) in
        cPointhb h_x_3604.
Definition X_3605 :=
        let h_x_3605 a b c := (sin(A a b c))/(cos((A a b c)/3)+2×cos((B a b c)/3)×cos((C a b c)/3)) in
        cPointhb h_x_3605.
Definition X_3606 :=
        let h_x_3606 a b c := (sin(A a b c))/(sin((B a b c)/3)×sin((C a b c)/3)+sin(1/6*(2*(A a b c)-PI))) in
        cPointhb h_x_3606.
Definition X_3607 :=
        let h_x_3607 a b c := (sin(A a b c))/(2×sin((B a b c)/3)×sin((C a b c)/3)-sin(1/6*(2*(A a b c)-PI))) in
        cPointhb h_x_3607.
Definition X_3608 :=
        let h_x_3608 a b c := (3×cos((A a b c)/3)+(cos(A a b c))+6×cos((B a b c)/3)×cos((C a b c)/3)+2*(cos(B a b c))*(cos(C a b c))*(sin(A a b c))) in
        cPointhb h_x_3608.
Definition X_3609 :=
        let h_x_3609 a b c := (sin(A a b c))*((cos(A a b c))+2*(cos(B a b c))*(cos(C a b c))+3*(2×sin((B a b c)/3)×sin((C a b c)/3)+sin((A a b c)/3+PI/6))) in
        cPointhb h_x_3609.
Definition X_3610 :=
        let h_x_3610 a b c := (b+c)*(a^2-b^2-c^2)*(a^2+b^2+c^2+2×b×c) in
        cPointhb h_x_3610.
Definition X_3611 :=
        let h_x_3611 a b c := a^2*(b+c)*(b^2+c^2-a^2)*(a^2×(b-c)^2-a^3*(b+c)+a×(b-c)^2*(b+c)-(b^2-c^2)^2) in
        cPointhb h_x_3611.
Definition X_3612 :=
        let h_x_3612 a b c := a*(3×a^3-a^2×b-3×a×b^2+b^3-a^2×c-b^2×c-3×a×c^2-b×c^2+c^3) in
        cPointhb h_x_3612.
Definition X_3613 :=
        let h_x_3613 a b c := (-a^2×b^2+b^4-a^2×c^2-b^2×c^2)*(-a^2×b^2-a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_3613.
Definition X_3614 :=
        let h_x_3614 a b c := 3×a^2×b^2-3×b^4+2×a^2×b×c+3×a^2×c^2+6×b^2×c^2-3×c^4 in
        cPointhb h_x_3614.
Definition X_3615 :=
        let h_x_3615 a b c := (a+b)*(a-b-c)*(a+c)*(a^2+a×b+b^2-c^2)*(a^2-b^2+a×c+c^2) in
        cPointhb h_x_3615.
Definition X_3616 :=
        let h_x_3616 a b c := 3×a+b+c in
        cPointhb h_x_3616.
Definition X_3617 :=
        let h_x_3617 a b c := -a+3×b+3×c in
        cPointhb h_x_3617.
Definition X_3618 :=
        let h_x_3618 a b c := 3×a^2+b^2+c^2 in
        cPointhb h_x_3618.
Definition X_3619 :=
        let h_x_3619 a b c := a^2+3×b^2+3×c^2 in
        cPointhb h_x_3619.
Definition X_3620 :=
        let h_x_3620 a b c := -a^2+3×b^2+3×c^2 in
        cPointhb h_x_3620.
Definition X_3621 :=
        let h_x_3621 a b c := -5×a+3×b+3×c in
        cPointhb h_x_3621.
Definition X_3622 :=
        let h_x_3622 a b c := 5×a+b+c in
        cPointhb h_x_3622.
Definition X_3623 :=
        let h_x_3623 a b c := 7×a-b-c in
        cPointhb h_x_3623.
Definition X_3624 :=
        let h_x_3624 a b c := 3×a+2×b+2×c in
        cPointhb h_x_3624.
Definition X_3625 :=
        let h_x_3625 a b c := -4×a+3×b+3×c in
        cPointhb h_x_3625.
Definition X_3626 :=
        let h_x_3626 a b c := -2×a+3×b+3×c in
        cPointhb h_x_3626.
Definition X_3627 :=
        let h_x_3627 a b c := -4×a^4+a^2×b^2+3×b^4+a^2×c^2-6×b^2×c^2+3×c^4 in
        cPointhb h_x_3627.
Definition X_3628 :=
        let h_x_3628 a b c := 2×a^4-5×a^2×b^2+3×b^4-5×a^2×c^2-6×b^2×c^2+3×c^4 in
        cPointhb h_x_3628.
Definition X_3629 :=
        let h_x_3629 a b c := -4×a^2+b^2+c^2 in
        cPointhb h_x_3629.
Definition X_3630 :=
        let h_x_3630 a b c := -4×a^2+3×b^2+3×c^2 in
        cPointhb h_x_3630.
Definition X_3631 :=
        let h_x_3631 a b c := -2×a^2+3×b^2+3×c^2 in
        cPointhb h_x_3631.
Definition X_3632 :=
        let h_x_3632 a b c := 3×a-2×b-2×c in
        cPointhb h_x_3632.
Definition X_3633 :=
        let h_x_3633 a b c := 5×a-2×b-2×c in
        cPointhb h_x_3633.
Definition X_3634 :=
        let h_x_3634 a b c := 2×a+3×b+3×c in
        cPointhb h_x_3634.
Definition X_3635 :=
        let h_x_3635 a b c := 6×a-b-c in
        cPointhb h_x_3635.
Definition X_3636 :=
        let h_x_3636 a b c := 6×a+b+c in
        cPointhb h_x_3636.
Definition X_3637 :=
        let h_x_3637 a b c := a^2/(-((2×a^2*(SA a b c))/(a^2*(SA a b c)+b^2*(SB a b c)+c^2*(SC a b c)))+1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(-a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2)*(1/((b^2*(SB a b c)-(SA a b c)*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))*(a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2-c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2))+1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(a^2*(SA a b c)-(SB a b c)*(SC a b c))*(a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2-b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2))+1/((-(SA a b c)*(SB a b c)+c^2*(SC a b c))*(b^2*(SB a b c)-(SA a b c)*(SC a b c))*(-a^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2+b^2×(-(SA a b c)*(SB a b c)+c^2*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2+c^2×(b^2*(SB a b c)-(SA a b c)*(SC a b c))^2×(a^2*(SA a b c)-(SB a b c)*(SC a b c))^2))))) in
        cPointhb h_x_3637.
Definition X_3638 :=
        let h_x_3638 a b c := (a+b-c)*(a-b+c)*(a+b+c)*(2×a^2-a×b-b^2-a×c+2×b×c-c^2)-2×sqrt(3)*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)*(SS a b c) in
        cPointhb h_x_3638.
Definition X_3639 :=
        let h_x_3639 a b c := (a+b-c)*(a-b+c)*(a+b+c)*(2×a^2-a×b-b^2-a×c+2×b×c-c^2)+2×sqrt(3)*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3)*(SS a b c) in
        cPointhb h_x_3639.
Definition X_3640 :=
        let h_x_3640 a b c := a*(b^2+c^2-a*(b+c)+(SS a b c)) in
        cPointhb h_x_3640.
Definition X_3641 :=
        let h_x_3641 a b c := a*(b^2+c^2-a*(b+c)-(SS a b c)) in
        cPointhb h_x_3641.
Definition X_3642 :=
        let h_x_3642 a b c := a^6-a^4×b^2+2×a^2×b^4-2×b^6-a^4×c^2+6×a^2×b^2×c^2+2×b^4×c^2+2×a^2×c^4+2×b^2×c^4-2×c^6+2×sqrt(3)*(a^4+2×b^2×c^2)*(SS a b c) in
        cPointhb h_x_3642.
Definition X_3643 :=
        let h_x_3643 a b c := a^6-a^4×b^2+2×a^2×b^4-2×b^6-a^4×c^2+6×a^2×b^2×c^2+2×b^4×c^2+2×a^2×c^4+2×b^2×c^4-2×c^6-2×sqrt(3)*(a^4+2×b^2×c^2)*(SS a b c) in
        cPointhb h_x_3643.
Definition X_3644 :=
        let h_x_3644 a b c := -2×a×b-2×a×c+3×b×c in
        cPointhb h_x_3644.
Definition X_3645 :=
        let h_x_3645 a b c := a*(1+cos((B a b c)/2)+cos((C a b c)/2)-cos((A a b c)/2)) in
        cPointhb h_x_3645.
Definition X_3646 :=
        let h_x_3646 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c-10×a×b×c-7×b^2×c-a×c^2-7×b×c^2-c^3) in
        cPointhb h_x_3646.
Definition X_3647 :=
        let h_x_3647 a b c := a*(2×a+b+c)*(b^2+c^2-a^2+b×c) in
        cPointhb h_x_3647.
Definition X_3648 :=
        let h_x_3648 a b c := -3×a^4-2×a^3×b+2×a^2×b^2+2×a×b^3+b^4-2×a^3×c+a^2×b×c+a×b^2×c+2×a^2×c^2+a×b×c^2-2×b^2×c^2+2×a×c^3+c^4 in
        cPointhb h_x_3648.
Definition X_3649 :=
        let h_x_3649 a b c := (-a+b-c)*(a+b-c)*(b+c)*(2×a+b+c) in
        cPointhb h_x_3649.
Definition X_3650 :=
        let h_x_3650 a b c := (2×a+b+c)*(-2×a^3-a^2×b+2×a×b^2+b^3-a^2×c+2×a×b×c-b^2×c+2×a×c^2-b×c^2+c^3) in
        cPointhb h_x_3650.
Definition X_3651 :=
        let h_x_3651 a b c := a*(a×b×c*(a+b+c)*(b^2+c^2-a^2)+a^2×(b^2+c^2-a^2)^2+(a-b)*(c-a)*(a+b+c)*(2×a×b×c+(a+b-c)*(c+a-b)*(b+c))) in
        cPointhb h_x_3651.
Definition X_3652 :=
        let h_x_3652 a b c := a*(a^6-3×a^4×b^2+3×a^2×b^4-b^6+a^4×b×c+a^3×b^2×c-a×b^4×c-b^5×c-3×a^4×c^2+a^3×b×c^2+a×b^3×c^2+b^4×c^2+a×b^2×c^3+2×b^3×c^3+3×a^2×c^4-a×b×c^4+b^2×c^4-b×c^5-c^6) in
        cPointhb h_x_3652.
Definition X_3653 :=
        let h_x_3653 a b c := 7×a^4-3×a^3×b-8×a^2×b^2+3×a×b^3+b^4-3×a^3×c+6×a^2×b×c-3×a×b^2×c-8×a^2×c^2-3×a×b×c^2-2×b^2×c^2+3×a×c^3+c^4 in
        cPointhb h_x_3653.
Definition X_3654 :=
        let h_x_3654 a b c := a^4+3×a^3×b-2×a^2×b^2-3×a×b^3+b^4+3×a^3×c-6×a^2×b×c+3×a×b^2×c-2×a^2×c^2+3×a×b×c^2-2×b^2×c^2-3×a×c^3+c^4 in
        cPointhb h_x_3654.
Definition X_3655 :=
        let h_x_3655 a b c := 5×a^4-3×a^3×b-4×a^2×b^2+3×a×b^3-b^4-3×a^3×c+6×a^2×b×c-3×a×b^2×c-4×a^2×c^2-3×a×b×c^2+2×b^2×c^2+3×a×c^3-c^4 in
        cPointhb h_x_3655.
Definition X_3656 :=
        let h_x_3656 a b c := a^4-3×a^3×b-2×a^2×b^2+3×a×b^3+b^4-3×a^3×c+6×a^2×b×c-3×a×b^2×c-2×a^2×c^2-3×a×b×c^2-2×b^2×c^2+3×a×c^3+c^4 in
        cPointhb h_x_3656.
Definition X_3657 :=
        let h_x_3657 a b c := a*(b^2-c^2)*(a^4-2×a^2×b^2+b^4-a^3×c+a^2×b×c+a×b^2×c-b^3×c-a^2×c^2-b^2×c^2+a×c^3+b×c^3)*(a^4-a^3×b-a^2×b^2+a×b^3+a^2×b×c+b^3×c-2×a^2×c^2+a×b×c^2-b^2×c^2-b×c^3+c^4) in
        cPointhb h_x_3657.
Definition X_3658 :=
        let h_x_3658 a b c := a*(a^2-b^2)*(a^2-c^2)*(a^3×b-a^2×b^2-a×b^3+b^4+a^3×c+a×b^2×c-a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4) in
        cPointhb h_x_3658.
Definition X_3659 :=
        let h_x_3659 a b c := (a×sqrt(a*(-a+b+c)*(a+b+c)))/(sqrt(b*(a+b-c)*(-a+b+c))-sqrt(c*(a-b+c)*(-a+b+c))) in
        cPointhb h_x_3659.
Definition X_3660 :=
        let h_x_3660 a b c := a*(a+b-c)*(a-b+c)*(a^2×b-2×a×b^2+b^3+a^2×c+2×a×b×c-b^2×c-2×a×c^2-b×c^2+c^3) in
        cPointhb h_x_3660.
Definition X_3661 :=
        let h_x_3661 a b c := b^2+c^2+b×c in
        cPointhb h_x_3661.
Definition X_3662 :=
        let h_x_3662 a b c := b^2+c^2-b×c in
        cPointhb h_x_3662.
Definition X_3663 :=
        let h_x_3663 a b c := a×b+b^2+a×c-2×b×c+c^2 in
        cPointhb h_x_3663.
Definition X_3664 :=
        let h_x_3664 a b c := -2×a^2-a×b+b^2-a×c-2×b×c+c^2 in
        cPointhb h_x_3664.
Definition X_3665 :=
        let h_x_3665 a b c := (-a+b-c)*(a+b-c)*(b^2+c^2) in
        cPointhb h_x_3665.
Definition X_3666 :=
        let h_x_3666 a b c := a*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3666.
Definition X_3667 :=
        let h_x_3667 a b c := (3×a-b-c)*(b-c) in
        cPointhb h_x_3667.
Definition X_3668 :=
        let h_x_3668 a b c := (-a-b+c)^2×(a-b+c)^2*(b+c) in
        cPointhb h_x_3668.
Definition X_3669 :=
        let h_x_3669 a b c := a*(b-c)*(a+b-c)*(a-b+c) in
        cPointhb h_x_3669.
Definition X_3670 :=
        let h_x_3670 a b c := a*(a×b^2+b^3+a×c^2+c^3) in
        cPointhb h_x_3670.
Definition X_3671 :=
        let h_x_3671 a b c := (a+b-c)*(a-b+c)*(b+c)*(3×a+b+c) in
        cPointhb h_x_3671.
Definition X_3672 :=
        let h_x_3672 a b c := a^2+2×a×b+b^2+2×a×c-2×b×c+c^2 in
        cPointhb h_x_3672.
Definition X_3673 :=
        let h_x_3673 a b c := b×c*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_3673.
Definition X_3674 :=
        let h_x_3674 a b c := (a+b-c)*(a-b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3674.
Definition X_3675 :=
        let h_x_3675 a b c := a×(b-c)^2*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_3675.
Definition X_3676 :=
        let h_x_3676 a b c := (b-c)*(a+b-c)*(a-b+c) in
        cPointhb h_x_3676.
Definition X_3677 :=
        let h_x_3677 a b c := a*(a^2+3×b^2-2×b×c+3×c^2) in
        cPointhb h_x_3677.
Definition X_3678 :=
        let h_x_3678 a b c := a*(b+c)*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_3678.
Definition X_3679 :=
        let h_x_3679 a b c := a-2×b-2×c in
        cPointhb h_x_3679.
Definition X_3680 :=
        let h_x_3680 a b c := a*(a+b-3×c)*(a-b-c)*(a-3×b+c) in
        cPointhb h_x_3680.
Definition X_3681 :=
        let h_x_3681 a b c := a*(a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_3681.
Definition X_3682 :=
        let h_x_3682 a b c := a^2*(b+c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_3682.
Definition X_3683 :=
        let h_x_3683 a b c := a*(a-b-c)*(2×a+b+c) in
        cPointhb h_x_3683.
Definition X_3684 :=
        let h_x_3684 a b c := a*(a-b-c)*(a^2-b×c) in
        cPointhb h_x_3684.
Definition X_3685 :=
        let h_x_3685 a b c := (a-b-c)*(a^2-b×c) in
        cPointhb h_x_3685.
Definition X_3686 :=
        let h_x_3686 a b c := (a-b-c)*(2×a+b+c) in
        cPointhb h_x_3686.
Definition X_3687 :=
        let h_x_3687 a b c := (-a+b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3687.
Definition X_3688 :=
        let h_x_3688 a b c := a^2*(a-b-c)*(b^2+c^2) in
        cPointhb h_x_3688.
Definition X_3689 :=
        let h_x_3689 a b c := a*(a-b-c)*(2×a-b-c) in
        cPointhb h_x_3689.
Definition X_3690 :=
        let h_x_3690 a b c := a^2×(b+c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3690.
Definition X_3691 :=
        let h_x_3691 a b c := a*(a-b-c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_3691.
Definition X_3692 :=
        let h_x_3692 a b c := a×(a-b-c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3692.
Definition X_3693 :=
        let h_x_3693 a b c := a*(-a+b+c)*(-(a×b)+b^2-a×c+c^2) in
        cPointhb h_x_3693.
Definition X_3694 :=
        let h_x_3694 a b c := a*(b+c)*(-a+b+c)*(-a^2+b^2+c^2) in
        cPointhb h_x_3694.
Definition X_3695 :=
        let h_x_3695 a b c := (b+c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3695.
Definition X_3696 :=
        let h_x_3696 a b c := (b+c)*(a^2-a×b-a×c-2×b×c) in
        cPointhb h_x_3696.
Definition X_3697 :=
        let h_x_3697 a b c := a*(b+c)*(a^2-b^2-4×b×c-c^2) in
        cPointhb h_x_3697.
Definition X_3698 :=
        let h_x_3698 a b c := a*(b+c)*(a^2-b^2+6×b×c-c^2) in
        cPointhb h_x_3698.
Definition X_3699 :=
        let h_x_3699 a b c := (a-b)*(a-c)*(a-b-c) in
        cPointhb h_x_3699.
Definition X_3700 :=
        let h_x_3700 a b c := (a-b-c)*(b-c)*(b+c) in
        cPointhb h_x_3700.
Definition X_3701 :=
        let h_x_3701 a b c := b*(a-b-c)*c*(b+c) in
        cPointhb h_x_3701.
Definition X_3702 :=
        let h_x_3702 a b c := b*(a-b-c)*c*(2×a+b+c) in
        cPointhb h_x_3702.
Definition X_3703 :=
        let h_x_3703 a b c := (-a+b+c)*(b^2+c^2) in
        cPointhb h_x_3703.
Definition X_3704 :=
        let h_x_3704 a b c := (a-b-c)*(b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3704.
Definition X_3705 :=
        let h_x_3705 a b c := (a-b-c)*(b^2-b×c+c^2) in
        cPointhb h_x_3705.
Definition X_3706 :=
        let h_x_3706 a b c := (a-b-c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_3706.
Definition X_3707 :=
        let h_x_3707 a b c := (a-b-c)*(4×a+b+c) in
        cPointhb h_x_3707.
Definition X_3708 :=
        let h_x_3708 a b c := a×(b-c)^2×(b+c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3708.
Definition X_3709 :=
        let h_x_3709 a b c := a^2*(a-b-c)*(b-c)*(b+c) in
        cPointhb h_x_3709.
Definition X_3710 :=
        let h_x_3710 a b c := (a-b-c)*(b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_3710.
Definition X_3711 :=
        let h_x_3711 a b c := a*(a-2×b-2×c)*(a-b-c) in
        cPointhb h_x_3711.
Definition X_3712 :=
        let h_x_3712 a b c := (a-b-c)*(2×a^2-b^2-c^2) in
        cPointhb h_x_3712.
Definition X_3713 :=
        let h_x_3713 a b c := a×(a-b-c)^2*(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_3713.
Definition X_3714 :=
        let h_x_3714 a b c := (b+c)*(-a+b+c)*(a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_3714.
Definition X_3715 :=
        let h_x_3715 a b c := a*(a-b-c)*(a+2×b+2×c) in
        cPointhb h_x_3715.
Definition X_3716 :=
        let h_x_3716 a b c := (a-b-c)*(-b+c)*(a^2-b×c) in
        cPointhb h_x_3716.
Definition X_3717 :=
        let h_x_3717 a b c := (-a+b+c)*(-(a×b)+b^2-a×c+c^2) in
        cPointhb h_x_3717.
Definition X_3718 :=
        let h_x_3718 a b c := b*(a-b-c)*c*(a^2-b^2-c^2) in
        cPointhb h_x_3718.
Definition X_3719 :=
        let h_x_3719 a b c := a*(a-b-c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_3719.
Definition X_3720 :=
        let h_x_3720 a b c := a*(a×b+a×c+2×b×c) in
        cPointhb h_x_3720.
Definition X_3721 :=
        let h_x_3721 a b c := a*(b+c)*(b^2-b×c+c^2) in
        cPointhb h_x_3721.
Definition X_3722 :=
        let h_x_3722 a b c := a*(2×a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_3722.
Definition X_3723 :=
        let h_x_3723 a b c := a*(2×a+3×b+3×c) in
        cPointhb h_x_3723.
Definition X_3724 :=
        let h_x_3724 a b c := a^3*(b+c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_3724.
Definition X_3725 :=
        let h_x_3725 a b c := a^3*(b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3725.
Definition X_3726 :=
        let h_x_3726 a b c := a*(-b^3+2×a×b×c-c^3) in
        cPointhb h_x_3726.
Definition X_3727 :=
        let h_x_3727 a b c := a*(b^3+2×a×b×c+c^3) in
        cPointhb h_x_3727.
Definition X_3728 :=
        let h_x_3728 a b c := a*(b+c)*(a×b^2+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_3728.
Definition X_3729 :=
        let h_x_3729 a b c := a^2-a×b-a×c+2×b×c in
        cPointhb h_x_3729.
Definition X_3730 :=
        let h_x_3730 a b c := a^2*(a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_3730.
Definition X_3731 :=
        let h_x_3731 a b c := a*(a-3×b-3×c) in
        cPointhb h_x_3731.
Definition X_3732 :=
        let h_x_3732 a b c := (a-b)*(a-c)*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_3732.
Definition X_3733 :=
        let h_x_3733 a b c := a^2*(a+b)*(b-c)*(a+c) in
        cPointhb h_x_3733.
Definition X_3734 :=
        let h_x_3734 a b c := a^4+2×b^2×c^2 in
        cPointhb h_x_3734.
Definition X_3735 :=
        let h_x_3735 a b c := a*(b^3+a×b×c+c^3) in
        cPointhb h_x_3735.
Definition X_3736 :=
        let h_x_3736 a b c := a^2*(a+b)*(a+c)*(b^2+b×c+c^2) in
        cPointhb h_x_3736.
Definition X_3737 :=
        let h_x_3737 a b c := a*(a+b)*(a-b-c)*(b-c)*(a+c) in
        cPointhb h_x_3737.
Definition X_3738 :=
        let h_x_3738 a b c := a*(a-b-c)*(b-c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_3738.
Definition X_3739 :=
        let h_x_3739 a b c := a×b+a×c+2×b×c in
        cPointhb h_x_3739.
Definition X_3740 :=
        let h_x_3740 a b c := a*(-a×b+b^2-a×c+4×b×c+c^2) in
        cPointhb h_x_3740.
Definition X_3741 :=
        let h_x_3741 a b c := a×b^2+b^2×c+a×c^2+b×c^2 in
        cPointhb h_x_3741.
Definition X_3742 :=
        let h_x_3742 a b c := a*(-(a×b)+b^2-a×c-4×b×c+c^2) in
        cPointhb h_x_3742.
Definition X_3743 :=
        let h_x_3743 a b c := a*(b+c)*(a^2+2×a×b+b^2+2×a×c+b×c+c^2) in
        cPointhb h_x_3743.
Definition X_3744 :=
        let h_x_3744 a b c := a*(2×a^2-a×b+b^2-a×c+c^2) in
        cPointhb h_x_3744.
Definition X_3745 :=
        let h_x_3745 a b c := a*(2×a^2+a×b+b^2+a×c+2×b×c+c^2) in
        cPointhb h_x_3745.
Definition X_3746 :=
        let h_x_3746 a b c := a^2*(a^2-b^2-3×b×c-c^2) in
        cPointhb h_x_3746.
Definition X_3747 :=
        let h_x_3747 a b c := a^2*(b+c)*(a^2-b×c) in
        cPointhb h_x_3747.
Definition X_3748 :=
        let h_x_3748 a b c := a*(2×a^2-3×a×b+b^2-3×a×c-2×b×c+c^2) in
        cPointhb h_x_3748.
Definition X_3749 :=
        let h_x_3749 a b c := a*(3×a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_3749.
Definition X_3750 :=
        let h_x_3750 a b c := a*(a^2-2×a×b-2×a×c-b×c) in
        cPointhb h_x_3750.
Definition X_3751 :=
        let h_x_3751 a b c := a*(a^2+2×a×b-b^2+2×a×c-c^2) in
        cPointhb h_x_3751.
Definition X_3752 :=
        let h_x_3752 a b c := a*(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_3752.
Definition X_3753 :=
        let h_x_3753 a b c := a*(b+c)*(a^2-b^2+4×b×c-c^2) in
        cPointhb h_x_3753.
Definition X_3754 :=
        let h_x_3754 a b c := a*(b+c)*(a^2-b^2+3×b×c-c^2) in
        cPointhb h_x_3754.
Definition X_3755 :=
        let h_x_3755 a b c := (b+c)*(3×a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_3755.
Definition X_3756 :=
        let h_x_3756 a b c := (3×a-b-c)*(b-c)^2 in
        cPointhb h_x_3756.
Definition X_3757 :=
        let h_x_3757 a b c := -a^3+a^2×b+a^2×c+a×b×c+b^2×c+b×c^2 in
        cPointhb h_x_3757.
Definition X_3758 :=
        let h_x_3758 a b c := 2×a^2+b×c in
        cPointhb h_x_3758.
Definition X_3759 :=
        let h_x_3759 a b c := -2×a^2+b×c in
        cPointhb h_x_3759.
Definition X_3760 :=
        let h_x_3760 a b c := b×c*(a^2-2×b×c) in
        cPointhb h_x_3760.
Definition X_3761 :=
        let h_x_3761 a b c := b×c*(a^2+2×b×c) in
        cPointhb h_x_3761.
Definition X_3762 :=
        let h_x_3762 a b c := b*(b-c)*c*(-2×a+b+c) in
        cPointhb h_x_3762.
Definition X_3763 :=
        let h_x_3763 a b c := a^2+2×b^2+2×c^2 in
        cPointhb h_x_3763.
Definition X_3764 :=
        let h_x_3764 a b c := a^2*(b^3+a×b×c+c^3) in
        cPointhb h_x_3764.
Definition X_3765 :=
        let h_x_3765 a b c := b×c*(a^3+b^2×c+b×c^2) in
        cPointhb h_x_3765.
Definition X_3766 :=
        let h_x_3766 a b c := b*(b-c)*c*(-a^2+b×c) in
        cPointhb h_x_3766.
Definition X_3767 :=
        let h_x_3767 a b c := a^4+b^4-2×b^2×c^2+c^4 in
        cPointhb h_x_3767.
Definition X_3768 :=
        let h_x_3768 a b c := a^2*(b-c)*(a×b+a×c-2×b×c) in
        cPointhb h_x_3768.
Definition X_3769 :=
        let h_x_3769 a b c := -2×a^3-a×b×c+b^2×c+b×c^2 in
        cPointhb h_x_3769.
Definition X_3770 :=
        let h_x_3770 a b c := b×c*(a^3+a×b×c+b^2×c+b×c^2) in
        cPointhb h_x_3770.
Definition X_3771 :=
        let h_x_3771 a b c := a^3-a^2×b+b^3-a^2×c+c^3 in
        cPointhb h_x_3771.
Definition X_3772 :=
        let h_x_3772 a b c := a^3+b^3-b^2×c-b×c^2+c^3 in
        cPointhb h_x_3772.
Definition X_3773 :=
        let h_x_3773 a b c := (b+c)*(b^2+b×c+c^2) in
        cPointhb h_x_3773.
Definition X_3774 :=
        let h_x_3774 a b c := a^3*(b+c)*(b^2+b×c+c^2) in
        cPointhb h_x_3774.
Definition X_3775 :=
        let h_x_3775 a b c := (2×a+b+c)*(b^2+b×c+c^2) in
        cPointhb h_x_3775.
Definition X_3776 :=
        let h_x_3776 a b c := (b-c)*(b^2-b×c+c^2) in
        cPointhb h_x_3776.
Definition X_3777 :=
        let h_x_3777 a b c := a*(b-c)*(b^2-b×c+c^2) in
        cPointhb h_x_3777.
Definition X_3778 :=
        let h_x_3778 a b c := a^2*(b+c)*(b^2-b×c+c^2) in
        cPointhb h_x_3778.
Definition X_3779 :=
        let h_x_3779 a b c := a^2*(a×b^2-b^3+a×b×c+a×c^2-c^3) in
        cPointhb h_x_3779.
Definition X_3780 :=
        let h_x_3780 a b c := a*(a^2×b+a^2×c+2×a×b×c-b^2×c-b×c^2) in
        cPointhb h_x_3780.
Definition X_3781 :=
        let h_x_3781 a b c := a^2*(a^2-b^2-c^2)*(b^2+b×c+c^2) in
        cPointhb h_x_3781.
Definition X_3782 :=
        let h_x_3782 a b c := a×b^2+b^3-b^2×c+a×c^2-b×c^2+c^3 in
        cPointhb h_x_3782.
Definition X_3783 :=
        let h_x_3783 a b c := a*(a^2-b×c)*(b^2+b×c+c^2) in
        cPointhb h_x_3783.
Definition X_3784 :=
        let h_x_3784 a b c := a^2*(a^2-b^2-c^2)*(b^2-b×c+c^2) in
        cPointhb h_x_3784.
Definition X_3785 :=
        let h_x_3785 a b c := (-a^2+b^2+c^2)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3785.
Definition X_3786 :=
        let h_x_3786 a b c := a*(a+b)*(a-b-c)*(a+c)*(b^2+b×c+c^2) in
        cPointhb h_x_3786.
Definition X_3787 :=
        let h_x_3787 a b c := a^2*(3×a^2-b^2-c^2)*(b^2+c^2) in
        cPointhb h_x_3787.
Definition X_3788 :=
        let h_x_3788 a b c := a^4-a^2×b^2+b^4-a^2×c^2+c^4 in
        cPointhb h_x_3788.
Definition X_3789 :=
        let h_x_3789 a b c := a*(a^2-a×b-a×c-2×b×c)*(b^2+b×c+c^2) in
        cPointhb h_x_3789.
Definition X_3790 :=
        let h_x_3790 a b c := (a-b-c)*(b^2+b×c+c^2) in
        cPointhb h_x_3790.
Definition X_3791 :=
        let h_x_3791 a b c := 2×a^3+a^2×b+a^2×c-b^2×c-b×c^2 in
        cPointhb h_x_3791.
Definition X_3792 :=
        let h_x_3792 a b c := a^2*(a^2-b^2+b×c-c^2)*(b^2+b×c+c^2) in
        cPointhb h_x_3792.
Definition X_3793 :=
        let h_x_3793 a b c := (2×a^2-b^2-c^2)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3793.
Definition X_3794 :=
        let h_x_3794 a b c := a*(a+b)*(a-b-c)*(a+c)*(b^2-b×c+c^2) in
        cPointhb h_x_3794.
Definition X_3795 :=
        let h_x_3795 a b c := a*(2×a^2+a×b+a×c-b×c)*(b^2+b×c+c^2) in
        cPointhb h_x_3795.
Definition X_3796 :=
        let h_x_3796 a b c := a^2*(a^2-b^2-c^2)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3796.
Definition X_3797 :=
        let h_x_3797 a b c := (a^2-b×c)*(b^2+b×c+c^2) in
        cPointhb h_x_3797.
Definition X_3798 :=
        let h_x_3798 a b c := -((b-c)*(-3×a^2+b^2+c^2)) in
        cPointhb h_x_3798.
Definition X_3799 :=
        let h_x_3799 a b c := a*(a-b)*(a-c)*(b^2+b×c+c^2) in
        cPointhb h_x_3799.
Definition X_3800 :=
        let h_x_3800 a b c := -((b-c)*(b+c)*(3×a^2+b^2+c^2)) in
        cPointhb h_x_3800.
Definition X_3801 :=
        let h_x_3801 a b c := -((b-c)*(b+c)*(b^2-b×c+c^2)) in
        cPointhb h_x_3801.
Definition X_3802 :=
        let h_x_3802 a b c := a×(a^2-b×c)^2*(b^2+b×c+c^2) in
        cPointhb h_x_3802.
Definition X_3803 :=
        let h_x_3803 a b c := a*(b-c)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3803.
Definition X_3804 :=
        let h_x_3804 a b c := a^2*(b-c)*(b+c)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3804.
Definition X_3805 :=
        let h_x_3805 a b c := -(a*(b-c)*(a^2+b×c)*(b^2+b×c+c^2)) in
        cPointhb h_x_3805.
Definition X_3806 :=
        let h_x_3806 a b c := (b-c)*(b+c)*(b^2+c^2)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3806.
Definition X_3807 :=
        let h_x_3807 a b c := (a-b)*(a-c)*(b^2+b×c+c^2) in
        cPointhb h_x_3807.
Definition X_3808 :=
        let h_x_3808 a b c := a*(b-c)*(a^2-b×c)*(b^2+c^2-b×c) in
        cPointhb h_x_3808.
Definition X_3809 :=
        let h_x_3809 a b c := a*(2×a^2+b×c)*(b^2+c^2+b×c) in
        cPointhb h_x_3809.
Definition X_3810 :=
        let h_x_3810 a b c := (b-c)*(b+c-a)*(b^2+c^2-b×c) in
        cPointhb h_x_3810.
Definition X_3811 :=
        let h_x_3811 a b c := a*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_3811.
Definition X_3812 :=
        let h_x_3812 a b c := a*(a^2×b-b^3+a^2×c+2×a×b×c+3×b^2×c+3×b×c^2-c^3) in
        cPointhb h_x_3812.
Definition X_3813 :=
        let h_x_3813 a b c := (a-b-c)*(a×b^2+b^3-4×a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_3813.
Definition X_3814 :=
        let h_x_3814 a b c := -(a^2×b^2)+b^4+a×b^2×c-a^2×c^2+a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3814.
Definition X_3815 :=
        let h_x_3815 a b c := -3×a^2×b^2+b^4-3×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3815.
Definition X_3816 :=
        let h_x_3816 a b c := a×b^2-b^3-4×a×b×c+b^2×c+a×c^2+b×c^2-c^3 in
        cPointhb h_x_3816.
Definition X_3817 :=
        let h_x_3817 a b c := a^2×b+2×a×b^2-3×b^3+a^2×c-4×a×b×c+3×b^2×c+2×a×c^2+3×b×c^2-3×c^3 in
        cPointhb h_x_3817.
Definition X_3818 :=
        let h_x_3818 a b c := a^6-b^6+2×a^2×b^2×c^2+b^4×c^2+b^2×c^4-c^6 in
        cPointhb h_x_3818.
Definition X_3819 :=
        let h_x_3819 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-4×b^2×c^2-c^4) in
        cPointhb h_x_3819.
Definition X_3820 :=
        let h_x_3820 a b c := -(a^2×b^2)+b^4+4×a×b^2×c-a^2×c^2+4×a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3820.
Definition X_3821 :=
        let h_x_3821 a b c := a^2×b+a×b^2+b^3+a^2×c+a×c^2+c^3 in
        cPointhb h_x_3821.
Definition X_3822 :=
        let h_x_3822 a b c := (b+c)*(a^2×b-b^3+a^2×c+a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_3822.
Definition X_3823 :=
        let h_x_3823 a b c := a^2×b-a×b^2+2×b^3+a^2×c-4×a×b×c-a×c^2+2×c^3 in
        cPointhb h_x_3823.
Definition X_3824 :=
        let h_x_3824 a b c := (a+2×b+2×c)*(a^2×b-b^3+a^2×c+2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_3824.
Definition X_3825 :=
        let h_x_3825 a b c := -(a^2×b^2)+b^4+2×a^2×b×c+a×b^2×c-a^2×c^2+a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_3825.
Definition X_3826 :=
        let h_x_3826 a b c := a×b^2-b^3+4×a×b×c+b^2×c+a×c^2+b×c^2-c^3 in
        cPointhb h_x_3826.
Definition X_3827 :=
        let h_x_3827 a b c := a*(a^4×b-b^5+a^4×c-2×a^3×b×c+b^4×c+b×c^4-c^5) in
        cPointhb h_x_3827.
Definition X_3828 :=
        let h_x_3828 a b c := -2×a-5×b-5×c in
        cPointhb h_x_3828.
Definition X_3829 :=
        let h_x_3829 a b c := 3×a×b^2-3×b^3-4×a×b×c+3×b^2×c+3×a×c^2+3×b×c^2-3×c^3 in
        cPointhb h_x_3829.
Definition X_3830 :=
        let h_x_3830 a b c := -5×a^4+a^2×b^2+4×b^4+a^2×c^2-8×b^2×c^2+4×c^4 in
        cPointhb h_x_3830.
Definition X_3831 :=
        let h_x_3831 a b c := a^2×b^2+a×b^3+b^3×c+a^2×c^2+2×b^2×c^2+a×c^3+b×c^3 in
        cPointhb h_x_3831.
Definition X_3832 :=
        let h_x_3832 a b c := 3×a^4+2×a^2×b^2-5×b^4+2×a^2×c^2+10×b^2×c^2-5×c^4 in
        cPointhb h_x_3832.
Definition X_3833 :=
        let h_x_3833 a b c := a*(a^2×b-b^3+a^2×c+4×a×b×c+4×b^2×c+4×b×c^2-c^3) in
        cPointhb h_x_3833.
Definition X_3834 :=
        let h_x_3834 a b c := a×b-2×b^2+a×c+2×b×c-2×c^2 in
        cPointhb h_x_3834.
Definition X_3835 :=
        let h_x_3835 a b c := -((-b+c)*(a×b+a×c-b×c)) in
        cPointhb h_x_3835.
Definition X_3836 :=
        let h_x_3836 a b c := b^3-2×a×b×c+c^3 in
        cPointhb h_x_3836.
Definition X_3837 :=
        let h_x_3837 a b c := (b-c)*(-(a×b^2)+b^2×c-a×c^2+b×c^2) in
        cPointhb h_x_3837.
Definition X_3838 :=
        let h_x_3838 a b c := a^2×b+a×b^2-2×b^3+a^2×c+2×b^2×c+a×c^2+2×b×c^2-2×c^3 in
        cPointhb h_x_3838.
Definition X_3839 :=
        let h_x_3839 a b c := 5×a^4+2×a^2×b^2-7×b^4+2×a^2×c^2+14×b^2×c^2-7×c^4 in
        cPointhb h_x_3839.
Definition X_3840 :=
        let h_x_3840 a b c := a×b^2-2×a×b×c+b^2×c+a×c^2+b×c^2 in
        cPointhb h_x_3840.
Definition X_3841 :=
        let h_x_3841 a b c := -((b+c)*(a^2×b-b^3+a^2×c+3×a×b×c+b^2×c+b×c^2-c^3)) in
        cPointhb h_x_3841.
Definition X_3842 :=
        let h_x_3842 a b c := (b+c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_3842.
Definition X_3843 :=
        let h_x_3843 a b c := 3×a^4+a^2×b^2-4×b^4+a^2×c^2+8×b^2×c^2-4×c^4 in
        cPointhb h_x_3843.
Definition X_3844 :=
        let h_x_3844 a b c := a^2×b+a×b^2+2×b^3+a^2×c+2×b^2×c+a×c^2+2×b×c^2+2×c^3 in
        cPointhb h_x_3844.
Definition X_3845 :=
        let h_x_3845 a b c := 4×a^4+a^2×b^2-5×b^4+a^2×c^2+10×b^2×c^2-5×c^4 in
        cPointhb h_x_3845.
Definition X_3846 :=
        let h_x_3846 a b c := a^2×b+3×a×b^2+a^2×c+8×a×b×c+4×b^2×c+3×a×c^2+4×b×c^2 in
        cPointhb h_x_3846.
Definition X_3847 :=
        let h_x_3847 a b c := b^3+2×a×b×c+c^3 in
        cPointhb h_x_3847.
Definition X_3848 :=
        let h_x_3848 a b c := a*(a×b-b^2+a×c+8×b×c-c^2) in
        cPointhb h_x_3848.
Definition X_3849 :=
        let h_x_3849 a b c := -4×a^4+a^2×b^2+2×b^4+a^2×c^2-2×b^2×c^2+2×c^4 in
        cPointhb h_x_3849.
Definition X_3851 :=
        let h_x_3851 a b c := a^4+3×a^2×b^2-4×b^4+3×a^2×c^2+8×b^2×c^2-4×c^4 in
        cPointhb h_x_3851.
Definition X_3852 :=
        let h_x_3852 a b c := a^4*(a^4×b^4-b^8+a^4×c^4-c^8) in
        cPointhb h_x_3852.
Definition X_3853 :=
        let h_x_3853 a b c := -6×a^4+a^2×b^2+5×b^4+a^2×c^2-10×b^2×c^2+5×c^4 in
        cPointhb h_x_3853.
Definition X_3854 :=
        let h_x_3854 a b c := 5×a^4+6×a^2×b^2-11×b^4+6×a^2×c^2+22×b^2×c^2-11×c^4 in
        cPointhb h_x_3854.
Definition X_3855 :=
        let h_x_3855 a b c := 3×a^4+4×a^2×b^2-7×b^4+4×a^2×c^2+14×b^2×c^2-7×c^4 in
        cPointhb h_x_3855.
Definition X_3856 :=
        let h_x_3856 a b c := 6×a^4+5×a^2×b^2-11×b^4+5×a^2×c^2+22×b^2×c^2-11×c^4 in
        cPointhb h_x_3856.
Definition X_3857 :=
        let h_x_3857 a b c := 4×a^4+5×a^2×b^2-9×b^4+5×a^2×c^2+18×b^2×c^2-9×c^4 in
        cPointhb h_x_3857.
Definition X_3858 :=
        let h_x_3858 a b c := -4×a^4-3×a^2×b^2+7×b^4-3×a^2×c^2-14×b^2×c^2+7×c^4 in
        cPointhb h_x_3858.
Definition X_3859 :=
        let h_x_3859 a b c := -6×a^4-7×a^2×b^2+13×b^4-7×a^2×c^2-26×b^2×c^2+13×c^4 in
        cPointhb h_x_3859.
Definition X_3860 :=
        let h_x_3860 a b c := -10×a^4-7×a^2×b^2+17×b^4-7×a^2×c^2-34×b^2×c^2+17×c^4 in
        cPointhb h_x_3860.
Definition X_3861 :=
        let h_x_3861 a b c := 6×a^4+a^2×b^2-7×b^4+a^2×c^2+14×b^2×c^2-7×c^4 in
        cPointhb h_x_3861.
Definition X_3862 :=
        let h_x_3862 a b c := a^2*(-b^2+a×c)*(a×b-c^2)*(b^2+b×c+c^2) in
        cPointhb h_x_3862.
Definition X_3863 :=
        let h_x_3863 a b c := a^2*(b^2+a×c)*(a×b+c^2)*(b^2-b×c+c^2) in
        cPointhb h_x_3863.
Definition X_3864 :=
        let h_x_3864 a b c := a*(-b^2+a×c)*(a×b-c^2)*(b^2+b×c+c^2) in
        cPointhb h_x_3864.
Definition X_3865 :=
        let h_x_3865 a b c := a*(b^2+a×c)*(a×b+c^2)*(b^2-b×c+c^2) in
        cPointhb h_x_3865.
Definition X_3866 :=
        let h_x_3866 a b c := (3×a^2+b^2+c^2)*(b^4+a^2×c^2)*(a^2×b^2+c^4) in
        cPointhb h_x_3866.
Definition X_3867 :=
        let h_x_3867 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(b^2+c^2)*(3×a^2+b^2+c^2) in
        cPointhb h_x_3867.
Definition X_3868 :=
        let h_x_3868 a b c := a*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_3868.
Definition X_3869 :=
        let h_x_3869 a b c := a*(a^2×b-b^3+a^2×c-a×b×c-c^3) in
        cPointhb h_x_3869.
Definition X_3870 :=
        let h_x_3870 a b c := a*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_3870.
Definition X_3871 :=
        let h_x_3871 a b c := a*(a-b-c)*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_3871.
Definition X_3872 :=
        let h_x_3872 a b c := a*(a-b-c)*(a^2-b^2+4×b×c-c^2) in
        cPointhb h_x_3872.
Definition X_3873 :=
        let h_x_3873 a b c := a*(a×b-b^2+a×c+b×c-c^2) in
        cPointhb h_x_3873.
Definition X_3874 :=
        let h_x_3874 a b c := a*(a^2×b-b^3+a^2×c+2×a×b×c-c^3) in
        cPointhb h_x_3874.
Definition X_3875 :=
        let h_x_3875 a b c := a^2+a×b+a×c-2×b×c in
        cPointhb h_x_3875.
Definition X_3876 :=
        let h_x_3876 a b c := a*(a-b-c)*(a×b+b^2+a×c+b×c+c^2) in
        cPointhb h_x_3876.
Definition X_3877 :=
        let h_x_3877 a b c := a*(a-b-c)*(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_3877.
Definition X_3878 :=
        let h_x_3878 a b c := a*(a^2×b-b^3+a^2×c-2×a×b×c-c^3) in
        cPointhb h_x_3878.
Definition X_3879 :=
        let h_x_3879 a b c := -2×a^2-a×b+b^2-a×c+c^2 in
        cPointhb h_x_3879.
Definition X_3880 :=
        let h_x_3880 a b c := a*(a-b-c)*(a×b+b^2+a×c-4×b×c+c^2) in
        cPointhb h_x_3880.
Definition X_3881 :=
        let h_x_3881 a b c := a*(a^2×b-b^3+a^2×c+4×a×b×c-c^3) in
        cPointhb h_x_3881.
Definition X_3882 :=
        let h_x_3882 a b c := a*(a-b)*(a-c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3882.
Definition X_3883 :=
        let h_x_3883 a b c := (a-b-c)*(2×a^2+a×b+b^2+a×c+c^2) in
        cPointhb h_x_3883.
Definition X_3884 :=
        let h_x_3884 a b c := a*(a^2×b-b^3+a^2×c-4×a×b×c-c^3) in
        cPointhb h_x_3884.
Definition X_3885 :=
        let h_x_3885 a b c := a*(a-b-c)*(a×b+b^2+a×c-3×b×c+c^2) in
        cPointhb h_x_3885.
Definition X_3886 :=
        let h_x_3886 a b c := (a-b-c)*(a^2-a×b-a×c-2×b×c) in
        cPointhb h_x_3886.
Definition X_3887 :=
        let h_x_3887 a b c := a*(b-c)*(a^2-2×a×b+b^2-2×a×c+b×c+c^2) in
        cPointhb h_x_3887.
Definition X_3888 :=
        let h_x_3888 a b c := a*(a-b)*(a-c)*(b^2-b×c+c^2) in
        cPointhb h_x_3888.
Definition X_3889 :=
        let h_x_3889 a b c := a*(a^2×b-b^3+a^2×c+5×a×b×c-c^3) in
        cPointhb h_x_3889.
Definition X_3890 :=
        let h_x_3890 a b c := a*(a^2×b-b^3+a^2×c-5×a×b×c-c^3) in
        cPointhb h_x_3890.
Definition X_3891 :=
        let h_x_3891 a b c := a^3+a×b^2-b^2×c+a×c^2-b×c^2 in
        cPointhb h_x_3891.
Definition X_3892 :=
        let h_x_3892 a b c := a*(a^2×b-b^3+a^2×c+6×a×b×c-c^3) in
        cPointhb h_x_3892.
Definition X_3893 :=
        let h_x_3893 a b c := a*(a-b-c)*(a×b+b^2+a×c-6×b×c+c^2) in
        cPointhb h_x_3893.
Definition X_3894 :=
        let h_x_3894 a b c := a*(2×a^2×b-2×b^3+2×a^2×c+3×a×b×c-2×c^3) in
        cPointhb h_x_3894.
Definition X_3895 :=
        let h_x_3895 a b c := a*(a-b-c)*(a^2+2×a×b+b^2+2×a×c-4×b×c+c^2) in
        cPointhb h_x_3895.
Definition X_3896 :=
        let h_x_3896 a b c := (b+c)*(-2×a^2+b×c) in
        cPointhb h_x_3896.
Definition X_3897 :=
        let h_x_3897 a b c := a*(a-b-c)*(2×a^2+a×b-b^2+a×c+3×b×c-c^2) in
        cPointhb h_x_3897.
Definition X_3898 :=
        let h_x_3898 a b c := a*(a^2×b-b^3+a^2×c-6×a×b×c-c^3) in
        cPointhb h_x_3898.
Definition X_3899 :=
        let h_x_3899 a b c := a*(2×a^2×b-2×b^3+2×a^2×c-3×a×b×c-2×c^3) in
        cPointhb h_x_3899.
Definition X_3900 :=
        let h_x_3900 a b c := a×(a-b-c)^2*(b-c) in
        cPointhb h_x_3900.
Definition X_3901 :=
        let h_x_3901 a b c := a*(2×a^2×b-2×b^3+2×a^2×c+a×b×c-2×c^3) in
        cPointhb h_x_3901.
Definition X_3902 :=
        let h_x_3902 a b c := b×c*(-a+b+c)*(4×a+b+c) in
        cPointhb h_x_3902.
Definition X_3903 :=
        let h_x_3903 a b c := a*(a-b)*(a-c)*(b^2+a×c)*(a×b+c^2) in
        cPointhb h_x_3903.
Definition X_3904 :=
        let h_x_3904 a b c := (a-b-c)*(b-c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_3904.
Definition X_3905 :=
        let h_x_3905 a b c := a^4+a×b^3-b^3×c+a×c^3-b×c^3 in
        cPointhb h_x_3905.
Definition X_3906 :=
        let h_x_3906 a b c := (-b+c)*(b+c)*(a^2-2×b^2-2×c^2) in
        cPointhb h_x_3906.
Definition X_3907 :=
        let h_x_3907 a b c := (a-b-c)*(b-c)*(a^2+b×c) in
        cPointhb h_x_3907.
Definition X_3908 :=
        let h_x_3908 a b c := a*(a-b)*(a-c)*(a^2-2×b^2-2×c^2) in
        cPointhb h_x_3908.
Definition X_3909 :=
        let h_x_3909 a b c := a*(a-b)*(a-c)*(a×b^2+b^3+a×c^2+c^3) in
        cPointhb h_x_3909.
Definition X_3910 :=
        let h_x_3910 a b c := (a-b-c)*(b-c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3910.
Definition X_3911 :=
        let h_x_3911 a b c := (2×a-b-c)*(a+b-c)*(a-b+c) in
        cPointhb h_x_3911.
Definition X_3912 :=
        let h_x_3912 a b c := -(a×b)+b^2-a×c+c^2 in
        cPointhb h_x_3912.
Definition X_3913 :=
        let h_x_3913 a b c := a*(a-b-c)*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_3913.
Definition X_3914 :=
        let h_x_3914 a b c := (b+c)*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_3914.
Definition X_3915 :=
        let h_x_3915 a b c := a^2*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_3915.
Definition X_3916 :=
        let h_x_3916 a b c := a*(2×a+b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_3916.
Definition X_3917 :=
        let h_x_3917 a b c := a^2*(a^2-b^2-c^2)*(b^2+c^2) in
        cPointhb h_x_3917.
Definition X_3918 :=
        let h_x_3918 a b c := a*(b+c)*(a^2-b^2+5×b×c-c^2) in
        cPointhb h_x_3918.
Definition X_3919 :=
        let h_x_3919 a b c := a*(b+c)*(2×a^2-2×b^2+5×b×c-2×c^2) in
        cPointhb h_x_3919.
Definition X_3920 :=
        let h_x_3920 a b c := a*(a^2+b^2+b×c+c^2) in
        cPointhb h_x_3920.
Definition X_3921 :=
        let h_x_3921 a b c := a*(b+c)*(a^2-b^2-8×b×c-c^2) in
        cPointhb h_x_3921.
Definition X_3922 :=
        let h_x_3922 a b c := a*(b+c)*(3×a^2-3×b^2+10×b×c-3×c^2) in
        cPointhb h_x_3922.
Definition X_3923 :=
        let h_x_3923 a b c := a^3+b^2×c+b×c^2 in
        cPointhb h_x_3923.
Definition X_3924 :=
        let h_x_3924 a b c := a*(a^3+b^3-b^2×c-b×c^2+c^3) in
        cPointhb h_x_3924.
Definition X_3925 :=
        let h_x_3925 a b c := (b+c)*(-(a×b)+b^2-a×c-2×b×c+c^2) in
        cPointhb h_x_3925.
Definition X_3926 :=
        let h_x_3926 a b c := (a^2-b^2-c^2)^2 in
        cPointhb h_x_3926.
Definition X_3927 :=
        let h_x_3927 a b c := a*(a+2×b+2×c)*(a^2-b^2-c^2) in
        cPointhb h_x_3927.
Definition X_3928 :=
        let h_x_3928 a b c := a*(3×a^2-3×b^2+2×b×c-3×c^2) in
        cPointhb h_x_3928.
Definition X_3929 :=
        let h_x_3929 a b c := a*(3×a^2-3×b^2-2×b×c-3×c^2) in
        cPointhb h_x_3929.
Definition X_3930 :=
        let h_x_3930 a b c := a*(b+c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_3930.
Definition X_3931 :=
        let h_x_3931 a b c := a*(b+c)*(a^2+2×a×b+b^2+2×a×c+c^2) in
        cPointhb h_x_3931.
Definition X_3932 :=
        let h_x_3932 a b c := (b+c)*(-(a×b)+b^2-a×c+c^2) in
        cPointhb h_x_3932.
Definition X_3933 :=
        let h_x_3933 a b c := (a^2-b^2-c^2)*(b^2+c^2) in
        cPointhb h_x_3933.
Definition X_3934 :=
        let h_x_3934 a b c := a^2×b^2+a^2×c^2+2×b^2×c^2 in
        cPointhb h_x_3934.
Definition X_3935 :=
        let h_x_3935 a b c := a*(a^2-2×a×b+b^2-2×a×c+b×c+c^2) in
        cPointhb h_x_3935.
Definition X_3936 :=
        let h_x_3936 a b c := -((b+c)*(-a^2+b^2-b×c+c^2)) in
        cPointhb h_x_3936.
Definition X_3937 :=
        let h_x_3937 a b c := a^2×(b-c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3937.
Definition X_3938 :=
        let h_x_3938 a b c := a*(a^2-a×b+b^2-a×c+c^2) in
        cPointhb h_x_3938.
Definition X_3939 :=
        let h_x_3939 a b c := a^2*(a-b)*(a-c)*(a-b-c) in
        cPointhb h_x_3939.
Definition X_3940 :=
        let h_x_3940 a b c := a*(a-2×b-2×c)*(a^2-b^2-c^2) in
        cPointhb h_x_3940.
Definition X_3941 :=
        let h_x_3941 a b c := a^3*(a×b-b^2+a×c+b×c-c^2) in
        cPointhb h_x_3941.
Definition X_3942 :=
        let h_x_3942 a b c := a×(b-c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3942.
Definition X_3943 :=
        let h_x_3943 a b c := (2×a-b-c)*(b+c) in
        cPointhb h_x_3943.
Definition X_3944 :=
        let h_x_3944 a b c := b^3+a×b×c-b^2×c-b×c^2+c^3 in
        cPointhb h_x_3944.
Definition X_3945 :=
        let h_x_3945 a b c := -3×a^2-2×a×b+b^2-2×a×c-2×b×c+c^2 in
        cPointhb h_x_3945.
Definition X_3946 :=
        let h_x_3946 a b c := 2×a^2+a×b+b^2+a×c-2×b×c+c^2 in
        cPointhb h_x_3946.
Definition X_3947 :=
        let h_x_3947 a b c := (a+b-c)*(a-b+c)*(b+c)*(a+3×b+3×c) in
        cPointhb h_x_3947.
Definition X_3948 :=
        let h_x_3948 a b c := b×c*(b+c)*(-a^2+b×c) in
        cPointhb h_x_3948.
Definition X_3949 :=
        let h_x_3949 a b c := a×(b+c)^2*(a^2-b^2-c^2) in
        cPointhb h_x_3949.
Definition X_3950 :=
        let h_x_3950 a b c := (3×a-b-c)*(b+c) in
        cPointhb h_x_3950.
Definition X_3951 :=
        let h_x_3951 a b c := a*(a+3×b+3×c)*(a^2-b^2-c^2) in
        cPointhb h_x_3951.
Definition X_3952 :=
        let h_x_3952 a b c := (a-b)*(a-c)*(b+c) in
        cPointhb h_x_3952.
Definition X_3953 :=
        let h_x_3953 a b c := a*(a×b^2+b^3-2×a×b×c+a×c^2+c^3) in
        cPointhb h_x_3953.
Definition X_3954 :=
        let h_x_3954 a b c := a*(b+c)*(b^2+c^2) in
        cPointhb h_x_3954.
Definition X_3955 :=
        let h_x_3955 a b c := a^2*(a^2+b×c)*(a^2-b^2-c^2) in
        cPointhb h_x_3955.
Definition X_3956 :=
        let h_x_3956 a b c := a*(b+c)*(a^2-b^2-5×b×c-c^2) in
        cPointhb h_x_3956.
Definition X_3957 :=
        let h_x_3957 a b c := a*(a^2-2×a×b+b^2-2×a×c-b×c+c^2) in
        cPointhb h_x_3957.
Definition X_3958 :=
        let h_x_3958 a b c := a*(b+c)*(2×a+b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_3958.
Definition X_3959 :=
        let h_x_3959 a b c := a*(b^3+a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_3959.
Definition X_3960 :=
        let h_x_3960 a b c := a*(b-c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_3960.
Definition X_3961 :=
        let h_x_3961 a b c := a*(a^2-a×b+b^2-a×c+b×c+c^2) in
        cPointhb h_x_3961.
Definition X_3962 :=
        let h_x_3962 a b c := a*(b+c)*(3×a^2-3×b^2+2×b×c-3×c^2) in
        cPointhb h_x_3962.
Definition X_3963 :=
        let h_x_3963 a b c := b×c*(b+c)*(a^2+b×c) in
        cPointhb h_x_3963.
Definition X_3964 :=
        let h_x_3964 a b c := a^2×(a^2-b^2-c^2)^3 in
        cPointhb h_x_3964.
Definition X_3965 :=
        let h_x_3965 a b c := a×(a-b-c)^2*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_3965.
Definition X_3966 :=
        let h_x_3966 a b c := (a-b-c)*(a^2+a×b+b^2+a×c+c^2) in
        cPointhb h_x_3966.
Definition X_3967 :=
        let h_x_3967 a b c := (b+c)*(a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_3967.
Definition X_3968 :=
        let h_x_3968 a b c := a*(b+c)*(a^2-b^2+7×b×c-c^2) in
        cPointhb h_x_3968.
Definition X_3969 :=
        let h_x_3969 a b c := (b+c)*(-a^2+b^2+b×c+c^2) in
        cPointhb h_x_3969.
Definition X_3970 :=
        let h_x_3970 a b c := a*(b+c)*(a×b-b^2+a×c+b×c-c^2) in
        cPointhb h_x_3970.
Definition X_3971 :=
        let h_x_3971 a b c := (b+c)*(-(a×b)-a×c+b×c) in
        cPointhb h_x_3971.
Definition X_3972 :=
        let h_x_3972 a b c := 2×a^4+b^2×c^2 in
        cPointhb h_x_3972.
Definition X_3973 :=
        let h_x_3973 a b c := a*(5×a-3×b-3×c) in
        cPointhb h_x_3973.
Definition X_3974 :=
        let h_x_3974 a b c := (a-b-c)*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_3974.
Definition X_3975 :=
        let h_x_3975 a b c := b×c*(-a+b+c)*(-a^2+b×c) in
        cPointhb h_x_3975.
Definition X_3976 :=
        let h_x_3976 a b c := a*(a×b^2+b^3-3×a×b×c+a×c^2+c^3) in
        cPointhb h_x_3976.
Definition X_3977 :=
        let h_x_3977 a b c := (2×a-b-c)*(a^2-b^2-c^2) in
        cPointhb h_x_3977.
Definition X_3978 :=
        let h_x_3978 a b c := b^2×c^2*(-a^2+b×c)*(a^2+b×c) in
        cPointhb h_x_3978.
Definition X_3979 :=
        let h_x_3979 a b c := a*(a^2-3×a×b+b^2-3×a×c-b×c+c^2) in
        cPointhb h_x_3979.
Definition X_3980 :=
        let h_x_3980 a b c := a^3+2×a×b×c+b^2×c+b×c^2 in
        cPointhb h_x_3980.
Definition X_3981 :=
        let h_x_3981 a b c := a^2*(b^4-b^2×c^2+c^4) in
        cPointhb h_x_3981.
Definition X_3982 :=
        let h_x_3982 a b c := (a+b-c)*(a-b+c)*(2×a+3×b+3×c) in
        cPointhb h_x_3982.
Definition X_3983 :=
        let h_x_3983 a b c := a*(b+c)*(a^2-b^2-6×b×c-c^2) in
        cPointhb h_x_3983.
Definition X_3984 :=
        let h_x_3984 a b c := a*(a-3×b-3×c)*(a^2-b^2-c^2) in
        cPointhb h_x_3984.
Definition X_3985 :=
        let h_x_3985 a b c := (a-b-c)*(b+c)*(a^2-b×c) in
        cPointhb h_x_3985.
Definition X_3986 :=
        let h_x_3986 a b c := (b+c)*(5×a+b+c) in
        cPointhb h_x_3986.
Definition X_3987 :=
        let h_x_3987 a b c := a*(b+c)*(a×b+b^2+a×c-3×b×c+c^2) in
        cPointhb h_x_3987.
Definition X_3988 :=
        let h_x_3988 a b c := a*(b+c)*(3×a^2-3×b^2-b×c-3×c^2) in
        cPointhb h_x_3988.
Definition X_3989 :=
        let h_x_3989 a b c := a*(a×b+2×b^2+a×c+2×b×c+2×c^2) in
        cPointhb h_x_3989.
Definition X_3990 :=
        let h_x_3990 a b c := a^3*(b+c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_3990.
Definition X_3991 :=
        let h_x_3991 a b c := a*(b+c)*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_3991.
Definition X_3992 :=
        let h_x_3992 a b c := b×c*(b+c)*(-2×a+b+c) in
        cPointhb h_x_3992.
Definition X_3993 :=
        let h_x_3993 a b c := (b+c)*(-2×a^2-a×b-a×c+b×c) in
        cPointhb h_x_3993.
Definition X_3994 :=
        let h_x_3994 a b c := -((b+c)*(a×b+a×c-2×b×c)) in
        cPointhb h_x_3994.
Definition X_3995 :=
        let h_x_3995 a b c := (b+c)*(-a^2-a×b-a×c+b×c) in
        cPointhb h_x_3995.
Definition X_3996 :=
        let h_x_3996 a b c := (a-b-c)*(a^2-a×b-a×c-b×c) in
        cPointhb h_x_3996.
Definition X_3997 :=
        let h_x_3997 a b c := a*(b+c)*(2×a^2+b×c) in
        cPointhb h_x_3997.
Definition X_3998 :=
        let h_x_3998 a b c := a*(b+c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_3998.
Definition X_3999 :=
        let h_x_3999 a b c := a*(a×b-3×b^2+a×c+4×b×c-3×c^2) in
        cPointhb h_x_3999.
Definition X_4000 :=
        let h_x_4000 a b c := a^2+b^2-2×b×c+c^2 in
        cPointhb h_x_4000.
Definition X_4001 :=
        let h_x_4001 a b c := (2×a+b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4001.
Definition X_4002 :=
        let h_x_4002 a b c := a*(b+c)*(a^2-b^2+8×b×c-c^2) in
        cPointhb h_x_4002.
Definition X_4003 :=
        let h_x_4003 a b c := a*(a×b+3×b^2+a×c-2×b×c+3×c^2) in
        cPointhb h_x_4003.
Definition X_4004 :=
        let h_x_4004 a b c := a*(b+c)*(3×a^2-3×b^2+8×b×c-3×c^2) in
        cPointhb h_x_4004.
Definition X_4005 :=
        let h_x_4005 a b c := a*(b+c)*(3×a^2-3×b^2-2×b×c-3×c^2) in
        cPointhb h_x_4005.
Definition X_4006 :=
        let h_x_4006 a b c := a*(b+c)*(a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_4006.
Definition X_4007 :=
        let h_x_4007 a b c := (a-b-c)*(a+2×b+2×c) in
        cPointhb h_x_4007.
Definition X_4008 :=
        let h_x_4008 a b c := b×c*(3×a^4+b^4-2×b^2×c^2+c^4) in
        cPointhb h_x_4008.
Definition X_4009 :=
        let h_x_4009 a b c := (a-b-c)*(a×b+a×c-2×b×c) in
        cPointhb h_x_4009.
Definition X_4010 :=
        let h_x_4010 a b c := -((-b+c)*(b+c)*(a^2-b×c)) in
        cPointhb h_x_4010.
Definition X_4011 :=
        let h_x_4011 a b c := a^3-2×a×b×c+b^2×c+b×c^2 in
        cPointhb h_x_4011.
Definition X_4012 :=
        let h_x_4012 a b c := (a-b-c)^3*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_4012.
Definition X_4013 :=
        let h_x_4013 a b c := (a+b-2×c)*(a-2×b+c)*(b+c)^2 in
        cPointhb h_x_4013.
Definition X_4014 :=
        let h_x_4014 a b c := a×(b-c)^2*(a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_4014.
Definition X_4015 :=
        let h_x_4015 a b c := a*(b+c)*(a^2-b^2-3×b×c-c^2) in
        cPointhb h_x_4015.
Definition X_4016 :=
        let h_x_4016 a b c := a*(b+c)*(a×b^2+b^3+a×c^2+c^3) in
        cPointhb h_x_4016.
Definition X_4017 :=
        let h_x_4017 a b c := a*(b-c)*(a+b-c)*(a-b+c)*(b+c) in
        cPointhb h_x_4017.
Definition X_4018 :=
        let h_x_4018 a b c := a*(b+c)*(3×a^2-3×b^2+4×b×c-3×c^2) in
        cPointhb h_x_4018.
Definition X_4019 :=
        let h_x_4019 a b c := -((b+c)*(a^2+b×c)*(-a^2+b^2+c^2)) in
        cPointhb h_x_4019.
Definition X_4020 :=
        let h_x_4020 a b c := a^3*(a^2-b^2-c^2)*(b^2+c^2) in
        cPointhb h_x_4020.
Definition X_4021 :=
        let h_x_4021 a b c := 2×a^2+3×a×b+b^2+3×a×c-2×b×c+c^2 in
        cPointhb h_x_4021.
Definition X_4022 :=
        let h_x_4022 a b c := a*(a×b^3+b^3×c+a×c^3+b×c^3) in
        cPointhb h_x_4022.
Definition X_4023 :=
        let h_x_4023 a b c := (a-b-c)*(2×a×b+b^2+2×a×c+c^2) in
        cPointhb h_x_4023.
Definition X_4024 :=
        let h_x_4024 a b c := (b-c)*(b+c)^2 in
        cPointhb h_x_4024.
Definition X_4025 :=
        let h_x_4025 a b c := (b-c)*(-a^2+b^2+c^2) in
        cPointhb h_x_4025.
Definition X_4026 :=
        let h_x_4026 a b c := (b+c)*(2×a^2+a×b+b^2+a×c+c^2) in
        cPointhb h_x_4026.
Definition X_4027 :=
        let h_x_4027 a b c := (a^2-b×c)^2×(a^2+b×c)^2 in
        cPointhb h_x_4027.
Definition X_4028 :=
        let h_x_4028 a b c := (b+c)*(-3×a^2+b^2+c^2) in
        cPointhb h_x_4028.
Definition X_4029 :=
        let h_x_4029 a b c := (5×a-b-c)*(b+c) in
        cPointhb h_x_4029.
Definition X_4030 :=
        let h_x_4030 a b c := (a-b-c)*(2×a^2+b^2+c^2) in
        cPointhb h_x_4030.
Definition X_4031 :=
        let h_x_4031 a b c := (a+b-c)*(a-b+c)*(4×a+b+c) in
        cPointhb h_x_4031.
Definition X_4032 :=
        let h_x_4032 a b c := (a+b-c)*(a-b+c)*(b+c)*(a^2+b×c) in
        cPointhb h_x_4032.
Definition X_4033 :=
        let h_x_4033 a b c := (a-b)*b*(a-c)*c*(b+c) in
        cPointhb h_x_4033.
Definition X_4034 :=
        let h_x_4034 a b c := (a-b-c)*(3×a+2×b+2×c) in
        cPointhb h_x_4034.
Definition X_4035 :=
        let h_x_4035 a b c := -((b+c)*(3×a^2-3×b^2+2×b×c-3×c^2)) in
        cPointhb h_x_4035.
Definition X_4036 :=
        let h_x_4036 a b c := b*(b-c)*c×(b+c)^2 in
        cPointhb h_x_4036.
Definition X_4037 :=
        let h_x_4037 a b c := -((b+c)^2*(a^2-b×c)) in
        cPointhb h_x_4037.
Definition X_4038 :=
        let h_x_4038 a b c := a*(a^2+2×a×b+2×a×c+3×b×c) in
        cPointhb h_x_4038.
Definition X_4039 :=
        let h_x_4039 a b c := (b+c)*(-a^2+b×c)*(a^2+b×c) in
        cPointhb h_x_4039.
Definition X_4040 :=
        let h_x_4040 a b c := a*(b-c)*(a^2-a×b-a×c-b×c) in
        cPointhb h_x_4040.
Definition X_4041 :=
        let h_x_4041 a b c := a*(a-b-c)*(b-c)*(b+c) in
        cPointhb h_x_4041.
Definition X_4042 :=
        let h_x_4042 a b c := (a-b-c)*(a^2+2×a×b+2×a×c+2×b×c) in
        cPointhb h_x_4042.
Definition X_4043 :=
        let h_x_4043 a b c := b×c*(b+c)*(-a^2+a×b+a×c+b×c) in
        cPointhb h_x_4043.
Definition X_4044 :=
        let h_x_4044 a b c := b×c*(b+c)*(-a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_4044.
Definition X_4045 :=
        let h_x_4045 a b c := 2×a^2×b^2+b^4+2×a^2×c^2+c^4 in
        cPointhb h_x_4045.
Definition X_4046 :=
        let h_x_4046 a b c := (a-b-c)*(b+c)*(2×a+b+c) in
        cPointhb h_x_4046.
Definition X_4047 :=
        let h_x_4047 a b c := a*(b+c)*(3×a+b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4047.
Definition X_4048 :=
        let h_x_4048 a b c := a^6+b^4×c^2+b^2×c^4 in
        cPointhb h_x_4048.
Definition X_4049 :=
        let h_x_4049 a b c := (a+b-2×c)*(b-c)*(a-2×b+c)*(b+c) in
        cPointhb h_x_4049.
Definition X_4050 :=
        let h_x_4050 a b c := a*(a-b-c)*(a×b+a×c-3×b×c) in
        cPointhb h_x_4050.
Definition X_4051 :=
        let h_x_4051 a b c := a*(a-b-c)*(b^2-3×b×c+c^2) in
        cPointhb h_x_4051.
Definition X_4052 :=
        let h_x_4052 a b c := (a+b-3×c)*(a-3×b+c)*(b+c) in
        cPointhb h_x_4052.
Definition X_4053 :=
        let h_x_4053 a b c := a×(b+c)^2*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4053.
Definition X_4054 :=
        let h_x_4054 a b c := (b+c)*(-a^2+b^2-4×b×c+c^2) in
        cPointhb h_x_4054.
Definition X_4055 :=
        let h_x_4055 a b c := a^4*(b+c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_4055.
Definition X_4056 :=
        let h_x_4056 a b c := a^4-b^4+b^3×c+b×c^3-c^4 in
        cPointhb h_x_4056.
Definition X_4057 :=
        let h_x_4057 a b c := a^2*(b-c)*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_4057.
Definition X_4058 :=
        let h_x_4058 a b c := (a-3×b-3×c)*(b+c) in
        cPointhb h_x_4058.
Definition X_4059 :=
        let h_x_4059 a b c := (a+b-c)*(a-b+c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_4059.
Definition X_4060 :=
        let h_x_4060 a b c := (a-b-c)*(2×a+3×b+3×c) in
        cPointhb h_x_4060.
Definition X_4061 :=
        let h_x_4061 a b c := (a-b-c)*(b+c)*(3×a+b+c) in
        cPointhb h_x_4061.
Definition X_4062 :=
        let h_x_4062 a b c := (b+c)*(-2×a^2+b^2+c^2) in
        cPointhb h_x_4062.
Definition X_4063 :=
        let h_x_4063 a b c := a*(b-c)*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_4063.
Definition X_4064 :=
        let h_x_4064 a b c := (b-c)*(b+c)^2*(-a^2+b^2+c^2) in
        cPointhb h_x_4064.
Definition X_4065 :=
        let h_x_4065 a b c := (b+c)*(2×a+b+c)*(-a^2-a×b-a×c+b×c) in
        cPointhb h_x_4065.
Definition X_4066 :=
        let h_x_4066 a b c := b×c*(b+c)*(a+2×b+2×c) in
        cPointhb h_x_4066.
Definition X_4067 :=
        let h_x_4067 a b c := a*(b+c)*(2×a^2-2×b^2+b×c-2×c^2) in
        cPointhb h_x_4067.
Definition X_4068 :=
        let h_x_4068 a b c := a^2*(b+c)*(a^2-a×b-a×c-3×b×c) in
        cPointhb h_x_4068.
Definition X_4069 :=
        let h_x_4069 a b c := a*(a-b)*(a-c)*(a-b-c)*(b+c) in
        cPointhb h_x_4069.
Definition X_4070 :=
        let h_x_4070 a b c := (a-b-c)*(2×a^3-b^3-c^3) in
        cPointhb h_x_4070.
Definition X_4071 :=
        let h_x_4071 a b c := -((b+c)*(-a^3+b^3-a×b×c+c^3)) in
        cPointhb h_x_4071.
Definition X_4072 :=
        let h_x_4072 a b c := (5×a-3×b-3×c)*(b+c) in
        cPointhb h_x_4072.
Definition X_4073 :=
        let h_x_4073 a b c := a×(a-b-c)^2*(b^2-b×c+c^2) in
        cPointhb h_x_4073.
Definition X_4074 :=
        let h_x_4074 a b c := (b^2+c^2)*(a^4+b^2×c^2) in
        cPointhb h_x_4074.
Definition X_4075 :=
        let h_x_4075 a b c := (b+c)^2*(-a^2-a×b-a×c+b×c) in
        cPointhb h_x_4075.
Definition X_4076 :=
        let h_x_4076 a b c := (a-b)^2×(a-c)^2*(a-b-c) in
        cPointhb h_x_4076.
Definition X_4077 :=
        let h_x_4077 a b c := b*(b-c)*(-a+b-c)*(a+b-c)*c*(b+c) in
        cPointhb h_x_4077.
Definition X_4078 :=
        let h_x_4078 a b c := (b+c)*(-a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4078.
Definition X_4079 :=
        let h_x_4079 a b c := a^2*(b-c)*(b+c)^2 in
        cPointhb h_x_4079.
Definition X_4080 :=
        let h_x_4080 a b c := (a+b-2×c)*(a-2×b+c)*(b+c) in
        cPointhb h_x_4080.
Definition X_4081 :=
        let h_x_4081 a b c := (b-c)^2×(-a+b+c)^3 in
        cPointhb h_x_4081.
Definition X_4082 :=
        let h_x_4082 a b c := (a-b-c)^2*(b+c) in
        cPointhb h_x_4082.
Definition X_4083 :=
        let h_x_4083 a b c := a*(b-c)*(a×b+a×c-b×c) in
        cPointhb h_x_4083.
Definition X_4084 :=
        let h_x_4084 a b c := a*(b+c)*(2×a^2-2×b^2+3×b×c-2×c^2) in
        cPointhb h_x_4084.
Definition X_4085 :=
        let h_x_4085 a b c := (b+c)*(2×a^2+b^2-b×c+c^2) in
        cPointhb h_x_4085.
Definition X_4086 :=
        let h_x_4086 a b c := b*(b-c)*c*(b+c)*(-a+b+c) in
        cPointhb h_x_4086.
Definition X_4087 :=
        let h_x_4087 a b c := b^2*(a-b-c)*c^2*(a^2-b×c) in
        cPointhb h_x_4087.
Definition X_4088 :=
        let h_x_4088 a b c := (b-c)*(b+c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_4088.
Definition X_4089 :=
        let h_x_4089 a b c := (b-c)^2*(-a^2+b^2-b×c+c^2) in
        cPointhb h_x_4089.
Definition X_4090 :=
        let h_x_4090 a b c := (b+c)*(2×a^2-a×b-a×c+b×c) in
        cPointhb h_x_4090.
Definition X_4091 :=
        let h_x_4091 a b c := a^2*(b-c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_4091.
Definition X_4092 :=
        let h_x_4092 a b c := (a-b-c)*(b-c)^2×(b+c)^2 in
        cPointhb h_x_4092.
Definition X_4093 :=
        let h_x_4093 a b c := a^2*(b+c)*(a^2-b×c)*(b^2+c^2) in
        cPointhb h_x_4093.
Definition X_4094 :=
        let h_x_4094 a b c := a×(b+c)^2×(a^2-b×c)^2 in
        cPointhb h_x_4094.
Definition X_4095 :=
        let h_x_4095 a b c := (a-b-c)*(b+c)*(a^2+b×c) in
        cPointhb h_x_4095.
Definition X_4096 :=
        let h_x_4096 a b c := (b+c)*(a^2-2×a×b-2×a×c+b×c) in
        cPointhb h_x_4096.
Definition X_4097 :=
        let h_x_4097 a b c := a*(a-b-c)*(b+c)*(2×a^2-b×c) in
        cPointhb h_x_4097.
Definition X_4098 :=
        let h_x_4098 a b c := (7×a-b-c)*(b+c) in
        cPointhb h_x_4098.
Definition X_4099 :=
        let h_x_4099 a b c := (b+c)^2*(-2×a^2+b×c) in
        cPointhb h_x_4099.
Definition X_4100 :=
        let h_x_4100 a b c := a^5×(a^2-b^2-c^2)^3 in
        cPointhb h_x_4100.
Definition X_4101 :=
        let h_x_4101 a b c := (b+c)*(3×a+b+c)*(-a^2+b^2+c^2) in
        cPointhb h_x_4101.
Definition X_4102 :=
        let h_x_4102 a b c := (a-b-c)*(a+2×b+c)*(a+b+2×c) in
        cPointhb h_x_4102.
Definition X_4103 :=
        let h_x_4103 a b c := (a-b)*(a-c)*(b+c)^2 in
        cPointhb h_x_4103.
Definition X_4104 :=
        let h_x_4104 a b c := (b+c)*(-a^2+2×a×b+b^2+2×a×c+c^2) in
        cPointhb h_x_4104.
Definition X_4105 :=
        let h_x_4105 a b c := a^2×(a-b-c)^3*(b-c) in
        cPointhb h_x_4105.
Definition X_4106 :=
        let h_x_4106 a b c := (b-c)*(-a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_4106.
Definition X_4107 :=
        let h_x_4107 a b c := (b-c)*(-a^2+b×c)*(a^2+b×c) in
        cPointhb h_x_4107.
Definition X_4108 :=
        let h_x_4108 a b c := (b-c)*(b+c)*(2×a^4+b^2×c^2) in
        cPointhb h_x_4108.
Definition X_4109 :=
        let h_x_4109 a b c := (b+c)*(-a^3+b^3+a×b×c+c^3) in
        cPointhb h_x_4109.
Definition X_4110 :=
        let h_x_4110 a b c := -(b×c*(-a+b+c)*(a×b+a×c-b×c)) in
        cPointhb h_x_4110.
Definition X_4111 :=
        let h_x_4111 a b c := a*(a-b-c)*(b+c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_4111.
Definition X_4112 :=
        let h_x_4112 a b c := a^5+b^3×c^2+b^2×c^3 in
        cPointhb h_x_4112.
Definition X_4113 :=
        let h_x_4113 a b c := (a-b-c)*(3×a×b+3×a×c+2×b×c) in
        cPointhb h_x_4113.
Definition X_4114 :=
        let h_x_4114 a b c := (a+b-c)*(a-b+c)*(4×a+3×b+3×c) in
        cPointhb h_x_4114.
Definition X_4115 :=
        let h_x_4115 a b c := (a-b)*(a-c)*(b+c)*(2×a+b+c) in
        cPointhb h_x_4115.
Definition X_4116 :=
        let h_x_4116 a b c := a^3*(a×b^3+b^2×c^2+a×c^3) in
        cPointhb h_x_4116.
Definition X_4117 :=
        let h_x_4117 a b c := a^5×(b-c)^2×(b+c)^2 in
        cPointhb h_x_4117.
Definition X_4118 :=
        let h_x_4118 a b c := a*(b^4+c^4) in
        cPointhb h_x_4118.
Definition X_4119 :=
        let h_x_4119 a b c := (a-b-c)*(-b^3+2×a×b×c-c^3) in
        cPointhb h_x_4119.
Definition X_4120 :=
        let h_x_4120 a b c := (2×a-b-c)*(b-c)*(b+c) in
        cPointhb h_x_4120.
Definition X_4121 :=
        let h_x_4121 a b c := (a^2-b^2-c^2)*(b^4+c^4) in
        cPointhb h_x_4121.
Definition X_4122 :=
        let h_x_4122 a b c := (b-c)*(b+c)*(b^2+b×c+c^2) in
        cPointhb h_x_4122.
Definition X_4123 :=
        let h_x_4123 a b c := a*(a-b-c)*(a^4-b^4-c^4) in
        cPointhb h_x_4123.
Definition X_4124 :=
        let h_x_4124 a b c := (a-b-c)*(b-c)^2*(a^2-b×c) in
        cPointhb h_x_4124.
Definition X_4125 :=
        let h_x_4125 a b c := b×c*(b+c)*(-a+2×b+2×c) in
        cPointhb h_x_4125.
Definition X_4126 :=
        let h_x_4126 a b c := (a-b-c)*(2×a×b-b^2+2×a×c-c^2) in
        cPointhb h_x_4126.
Definition X_4127 :=
        let h_x_4127 a b c := a*(b+c)*(3×a^2-3×b^2+b×c-3×c^2) in
        cPointhb h_x_4127.
Definition X_4128 :=
        let h_x_4128 a b c := a^2×(b-c)^2*(b+c)*(a^2+b×c) in
        cPointhb h_x_4128.
Definition X_4129 :=
        let h_x_4129 a b c := (b-c)*(b+c)*(-a^2-a×b-a×c+b×c) in
        cPointhb h_x_4129.
Definition X_4130 :=
        let h_x_4130 a b c := a×(a-b-c)^3*(b-c) in
        cPointhb h_x_4130.
Definition X_4131 :=
        let h_x_4131 a b c := a*(b-c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_4131.
Definition X_4132 :=
        let h_x_4132 a b c := a*(b-c)*(b+c)*(a^2+a×b+a×c-b×c) in
        cPointhb h_x_4132.
Definition X_4133 :=
        let h_x_4133 a b c := (b+c)*(3×a^2-b^2-4×b×c-c^2) in
        cPointhb h_x_4133.
Definition X_4134 :=
        let h_x_4134 a b c := a*(b+c)*(2×a^2-2×b^2-b×c-2×c^2) in
        cPointhb h_x_4134.
Definition X_4135 :=
        let h_x_4135 a b c := (b+c)*(a×b+a×c-3×b×c) in
        cPointhb h_x_4135.
Definition X_4136 :=
        let h_x_4136 a b c := (a-b-c)*(b+c)*(b^2-b×c+c^2) in
        cPointhb h_x_4136.
Definition X_4137 :=
        let h_x_4137 a b c := a*(b+c)*(a×b^3+b^4+a×c^3+c^4) in
        cPointhb h_x_4137.
Definition X_4138 :=
        let h_x_4138 a b c := (b+c)*(a^2-3×b^2+4×b×c-3×c^2) in
        cPointhb h_x_4138.
Definition X_4139 :=
        let h_x_4139 a b c := a*(b-c)*(b+c)*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_4139.
Definition X_4140 :=
        let h_x_4140 a b c := (a-b-c)*(b-c)*(b+c)*(a^2+b×c) in
        cPointhb h_x_4140.
Definition X_4141 :=
        let h_x_4141 a b c := (2×a-b-c)*(a^2-2×b^2-2×c^2) in
        cPointhb h_x_4141.
Definition X_4142 :=
        let h_x_4142 a b c := -((b-c)*(-a^3+b^3+a×b×c+c^3)) in
        cPointhb h_x_4142.
Definition X_4143 :=
        let h_x_4143 a b c := (b-c)*(b+c)*(-a^2+b^2+c^2)^3 in
        cPointhb h_x_4143.
Definition X_4144 :=
        let h_x_4144 a b c := -((b+c)*(-2×a^3+b^3+c^3)) in
        cPointhb h_x_4144.
Definition X_4145 :=
        let h_x_4145 a b c := a*(b-c)*(b+c)*(a^2+a×b+a×c-3×b×c) in
        cPointhb h_x_4145.
Definition X_4146 :=
        let h_x_4146 a b c := sqrt((b×c)/(-a^2+b^2+2×b×c+c^2)) in
        cPointhb h_x_4146.
Definition X_4147 :=
        let h_x_4147 a b c := (b-c)*(-a+b+c)*(-(a×b)-a×c+b×c) in
        cPointhb h_x_4147.
Definition X_4148 :=
        let h_x_4148 a b c := (a-b-c)^2*(b-c)*(a^2-b×c) in
        cPointhb h_x_4148.
Definition X_4149 :=
        let h_x_4149 a b c := a*(a-b-c)*(a^3-b^3-c^3) in
        cPointhb h_x_4149.
Definition X_4150 :=
        let h_x_4150 a b c := (b+c)*(-a^4+b^4+c^4) in
        cPointhb h_x_4150.
Definition X_4151 :=
        let h_x_4151 a b c := (b-c)*(b+c)*(-a^2+a×b+a×c+b×c) in
        cPointhb h_x_4151.
Definition X_4152 :=
        let h_x_4152 a b c := (a-b-c)*(2×a-b-c)^2 in
        cPointhb h_x_4152.
Definition X_4153 :=
        let h_x_4153 a b c := (b+c)*(-a^3+b^3+c^3) in
        cPointhb h_x_4153.
Definition X_4154 :=
        let h_x_4154 a b c := -((b+c)*(a^2-b×c)^2*(a^2+b×c)) in
        cPointhb h_x_4154.
Definition X_4155 :=
        let h_x_4155 a b c := -(a*(b-c)*(b+c)^2*(a^2-b×c)) in
        cPointhb h_x_4155.
Definition X_4156 :=
        let h_x_4156 a b c := (b+c)*(-2×a^4+b^4+c^4) in
        cPointhb h_x_4156.
Definition X_4157 :=
        let h_x_4157 a b c := (a-b-c)*(2×a^4-b^4-c^4) in
        cPointhb h_x_4157.
Definition X_4158 :=
        let h_x_4158 a b c := a^2×(b+c)^2×(a^2-b^2-c^2)^3 in
        cPointhb h_x_4158.
Definition X_4159 :=
        let h_x_4159 a b c := a^8+b^6×c^2+b^2×c^6 in
        cPointhb h_x_4159.
Definition X_4160 :=
        let h_x_4160 a b c := a*(b-c)*(a^2+b^2+3×b×c+c^2) in
        cPointhb h_x_4160.
Definition X_4161 :=
        let h_x_4161 a b c := a^3*(a×b^3+2×b^2×c^2+a×c^3) in
        cPointhb h_x_4161.
Definition X_4162 :=
        let h_x_4162 a b c := a*(a-b-c)*(3×a-b-c)*(b-c) in
        cPointhb h_x_4162.
Definition X_4163 :=
        let h_x_4163 a b c := -((a-b-c)^3*(b-c)) in
        cPointhb h_x_4163.
Definition X_4164 :=
        let h_x_4164 a b c := -(a*(b-c)*(a^2-b×c)*(a^2+b×c)) in
        cPointhb h_x_4164.
Definition X_4165 :=
        let h_x_4165 a b c := (a-b-c)*(b^3+a×b×c+c^3) in
        cPointhb h_x_4165.
Definition X_4166 :=
        let h_x_4166 a b c := (Rpower a (3/2))*(b+c-a) in
        cPointhb h_x_4166.
Definition X_4167 :=
        let h_x_4167 a b c := (a-b-c)*(b^3+2×a×b×c+c^3) in
        cPointhb h_x_4167.
Definition X_4168 :=
        let h_x_4168 a b c := (a-b-c)*(2×a^3+b^3+c^3) in
        cPointhb h_x_4168.
Definition X_4169 :=
        let h_x_4169 a b c := (a-b)*(a-c)*(2×a-b-c)*(b+c) in
        cPointhb h_x_4169.
Definition X_4170 :=
        let h_x_4170 a b c := (b-c)*(b+c)*(-2×a^2+b×c) in
        cPointhb h_x_4170.
Definition X_4171 :=
        let h_x_4171 a b c := a×(a-b-c)^2*(b-c)*(b+c) in
        cPointhb h_x_4171.
Definition X_4172 :=
        let h_x_4172 a b c := a^7+b^5×c^2+b^2×c^5 in
        cPointhb h_x_4172.
Definition X_4173 :=
        let h_x_4173 a b c := a^4*(a^2-b^2-c^2)*(b^4+c^4) in
        cPointhb h_x_4173.
Definition X_4174 :=
        let h_x_4174 a b c := (b+c)*(b^6+c^6-a^6) in
        cPointhb h_x_4174.
Definition X_4175 :=
        let h_x_4175 a b c := (b^2+c^2-a^2)*(b^2+c^2)^2 in
        cPointhb h_x_4175.
Definition X_4176 :=
        let h_x_4176 a b c := (b^2+c^2-a^2)^3 in
        cPointhb h_x_4176.
Definition X_4177 :=
        let h_x_4177 a b c := (b+c)*(b^5+c^5-a^5) in
        cPointhb h_x_4177.
Definition X_4178 :=
        let h_x_4178 a b c := (b+c-a)*(b^4+c^4) in
        cPointhb h_x_4178.
Definition X_4179 :=
        let h_x_4179 a b c := sqrt(a)*(b+c) in
        cPointhb h_x_4179.
Definition X_4180 :=
        let h_x_4180 a b c := sqrt(a)*(sqrt(b)+sqrt(c))*(-a+b+c) in
        cPointhb h_x_4180.
Definition X_4181 :=
        let h_x_4181 a b c := (sqrt(b)+sqrt(c))*(-a+b+c) in
        cPointhb h_x_4181.
Definition X_4182 :=
        let h_x_4182 a b c := sqrt(a)*(-a+b+c) in
        cPointhb h_x_4182.
Definition X_4183 :=
        let h_x_4183 a b c := a*(a+b)*(a-b-c)^2*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4183.
Definition X_4184 :=
        let h_x_4184 a b c := a^2*(a+b)*(a+c)*(a×b-b^2+a×c-b×c-c^2) in
        cPointhb h_x_4184.
Definition X_4185 :=
        let h_x_4185 a b c := a*(a^2+a×b+a×c+2×b×c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4185.
Definition X_4186 :=
        let h_x_4186 a b c := a*(a^2+a×b+a×c-2×b×c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4186.
Definition X_4187 :=
        let h_x_4187 a b c := -(a^2×b^2)+b^4+2×a^2×b×c+2×a×b^2×c-a^2×c^2+2×a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4187.
Definition X_4188 :=
        let h_x_4188 a b c := a*(2×a^3-2×a×b^2+a×b×c+b^2×c-2×a×c^2+b×c^2) in
        cPointhb h_x_4188.
Definition X_4189 :=
        let h_x_4189 a b c := a*(2×a^3-2×a×b^2-a×b×c-b^2×c-2×a×c^2-b×c^2) in
        cPointhb h_x_4189.
Definition X_4190 :=
        let h_x_4190 a b c := -3×a^4+2×a^2×b^2+b^4-2×a^2×b×c-2×a×b^2×c+2×a^2×c^2-2×a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4190.
Definition X_4191 :=
        let h_x_4191 a b c := a^2*(a^3×b-a×b^3+a^3×c+a^2×b×c-a×b^2×c-b^3×c-a×b×c^2+2×b^2×c^2-a×c^3-b×c^3) in
        cPointhb h_x_4191.
Definition X_4192 :=
        let h_x_4192 a b c := a*(a^4×b-a^2×b^3+a^4×c-b^4×c-2×a×b^2×c^2+b^3×c^2-a^2×c^3+b^2×c^3-b×c^4) in
        cPointhb h_x_4192.
Definition X_4193 :=
        let h_x_4193 a b c := (a-b-c)*(a×b^2+b^3-a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_4193.
Definition X_4194 :=
        let h_x_4194 a b c := (a-b-c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2+2×a×b+b^2+2×a×c+c^2) in
        cPointhb h_x_4194.
Definition X_4195 :=
        let h_x_4195 a b c := 2×a^4+a^3×b+a×b^3+a^3×c+a^2×b×c+a×b^2×c+b^3×c+a×b×c^2+2×b^2×c^2+a×c^3+b×c^3 in
        cPointhb h_x_4195.
Definition X_4196 :=
        let h_x_4196 a b c := (a^2+b^2-c^2)*(a^2+2×a×b-b^2+2×a×c+2×b×c-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4196.
Definition X_4197 :=
        let h_x_4197 a b c := -(a^2×b^2)+b^4-3×a^2×b×c-3×a×b^2×c-a^2×c^2-3×a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4197.
Definition X_4198 :=
        let h_x_4198 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(3×a^3+3×a^2×b+a×b^2+b^3+3×a^2×c+4×a×b×c+b^2×c+a×c^2+b×c^2+c^3) in
        cPointhb h_x_4198.
Definition X_4199 :=
        let h_x_4199 a b c := a*(b+c)*(a^4-a^2×b^2-a^2×b×c-2×a×b^2×c-b^3×c-a^2×c^2-2×a×b×c^2-b×c^3) in
        cPointhb h_x_4199.
Definition X_4200 :=
        let h_x_4200 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^3+a^2×b-a×b^2-b^3+a^2×c+4×a×b×c-b^2×c-a×c^2-b×c^2-c^3) in
        cPointhb h_x_4200.
Definition X_4201 :=
        let h_x_4201 a b c := -a^4+a^3×b+2×a^2×b^2+a×b^3+b^4+a^3×c+a^2×b×c+a×b^2×c+b^3×c+2×a^2×c^2+a×b×c^2+a×c^3+b×c^3+c^4 in
        cPointhb h_x_4201.
Definition X_4202 :=
        let h_x_4202 a b c := a^3×b+a^2×b^2+a×b^3+b^4+a^3×c+b^3×c+a^2×c^2+a×c^3+b×c^3+c^4 in
        cPointhb h_x_4202.
Definition X_4203 :=
        let h_x_4203 a b c := a*(a^4×b-a^2×b^3+a^4×c+a^3×b×c-a×b^2×c^2+b^3×c^2-a^2×c^3+b^2×c^3) in
        cPointhb h_x_4203.
Definition X_4204 :=
        let h_x_4204 a b c := a*(b+c)*(a^4-a^2×b^2-3×a^2×b×c-4×a×b^2×c-b^3×c-a^2×c^2-4×a×b×c^2-2×b^2×c^2-b×c^3) in
        cPointhb h_x_4204.
Definition X_4205 :=
        let h_x_4205 a b c := (b+c)*(2×a^3+3×a^2×b+2×a×b^2+b^3+3×a^2×c+4×a×b×c+b^2×c+2×a×c^2+b×c^2+c^3) in
        cPointhb h_x_4205.
Definition X_4206 :=
        let h_x_4206 a b c := a*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_4206.
Definition X_4207 :=
        let h_x_4207 a b c := (a^2+b^2-c^2)*(a^2-2×a×b-b^2-2×a×c-2×b×c-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4207.
Definition X_4208 :=
        let h_x_4208 a b c := a^4+2×a^2×b^2-3×b^4+8×a^2×b×c+8×a×b^2×c+2×a^2×c^2+8×a×b×c^2+6×b^2×c^2-3×c^4 in
        cPointhb h_x_4208.
Definition X_4209 :=
        let h_x_4209 a b c := -2×a^4+a^3×b+a×b^3+a^3×c-a^2×b×c-a×b^2×c+b^3×c-a×b×c^2-2×b^2×c^2+a×c^3+b×c^3 in
        cPointhb h_x_4209.
Definition X_4210 :=
        let h_x_4210 a b c := a^2*(a^3×b-a×b^3+a^3×c+a^2×b×c-a×b^2×c-b^3×c-a×b×c^2+b^2×c^2-a×c^3-b×c^3) in
        cPointhb h_x_4210.
Definition X_4211 :=
        let h_x_4211 a b c := a*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_4211.
Definition X_4212 :=
        let h_x_4212 a b c := (a^2+b^2-c^2)*(a^2+a×b-b^2+a×c+b×c-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4212.
Definition X_4213 :=
        let h_x_4213 a b c := (a^2+b^2-c^2)*(a^2-a×b-b^2-a×c-b×c-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4213.
Definition X_4214 :=
        let h_x_4214 a b c := a*(a^2+a×b+a×c+4×b×c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4214.
Definition X_4215 :=
        let h_x_4215 a b c := a^3*(a+b)*(a+c)*(a^2×b^2-b^4+a^2×b×c-b^3×c+a^2×c^2-b×c^3-c^4) in
        cPointhb h_x_4215.
Definition X_4216 :=
        let h_x_4216 a b c := a^2*(a^4×b+a^3×b^2-a^2×b^3-a×b^4+a^4×c-b^4×c+a^3×c^2-a×b^2×c^2-a^2×c^3-a×c^4-b×c^4) in
        cPointhb h_x_4216.
Definition X_4217 :=
        let h_x_4217 a b c := -5×a^4-2×a^3×b-2×a×b^3+b^4-2×a^3×c-2×b^3×c-6×b^2×c^2-2×a×c^3-2×b×c^3+c^4 in
        cPointhb h_x_4217.
Definition X_4218 :=
        let h_x_4218 a b c := a^2*(a^5-a^3×b^2+a^2×b^3-b^5-a^3×c^2-a×b^2×c^2-2×b^3×c^2+a^2×c^3-2×b^2×c^3-c^5) in
        cPointhb h_x_4218.
Definition X_4219 :=
        let h_x_4219 a b c := a*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4-a^3×b-a^2×b^2+a×b^3-a^3×c+a^2×b×c+a×b^2×c-b^3×c-a^2×c^2+a×b×c^2+2×b^2×c^2+a×c^3-b×c^3) in
        cPointhb h_x_4219.
Definition X_4220 :=
        let h_x_4220 a b c := a*(a^5-a×b^4+a^3×b×c-a^2×b^2×c-a×b^3×c+b^4×c-a^2×b×c^2-b^3×c^2-a×b×c^3-b^2×c^3-a×c^4+b×c^4) in
        cPointhb h_x_4220.
Definition X_4221 :=
        let h_x_4221 a b c := a*(a+b)*(a+c)*(a^4-b^4+4×a^2×b×c-4×a×b^2×c-4×a×b×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_4221.
Definition X_4222 :=
        let h_x_4222 a b c := a*(a^2+a×b+a×c-b×c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4222.
Definition X_4223 :=
        let h_x_4223 a b c := a*(a^5-a×b^4-a^3×b×c+a^2×b^2×c+a×b^3×c-b^4×c+a^2×b×c^2+4×a×b^2×c^2+b^3×c^2+a×b×c^3+b^2×c^3-a×c^4-b×c^4) in
        cPointhb h_x_4223.
Definition X_4224 :=
        let h_x_4224 a b c := a*(a^5-a×b^4-a^3×b×c+a^2×b^2×c+a×b^3×c-b^4×c+a^2×b×c^2+b^3×c^2+a×b×c^3+b^2×c^3-a×c^4-b×c^4) in
        cPointhb h_x_4224.
Definition X_4225 :=
        let h_x_4225 a b c := a^2*(a+b)*(a+c)*(a^2×b-b^3+a^2×c-a×b×c-c^3) in
        cPointhb h_x_4225.
Definition X_4226 :=
        let h_x_4226 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(2×a^4-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_4226.
Definition X_4227 :=
        let h_x_4227 a b c := a*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^3-a^2×b-a×b^2+b^3-a^2×c+2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_4227.
Definition X_4228 :=
        let h_x_4228 a b c := a*(a+b)*(a+c)*(a^3-a^2×b+a×b^2-b^3-a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_4228.
Definition X_4229 :=
        let h_x_4229 a b c := (a+b)*(a+c)*(a^4+4×a^3×b-4×a^2×b^2-b^4+4×a^3×c-4×a^2×b×c-4×a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_4229.
Definition X_4230 :=
        let h_x_4230 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_4230.
Definition X_4231 :=
        let h_x_4231 a b c := a*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4-a^3×b-a^2×b^2+a×b^3-a^3×c+a^2×b×c-a×b^2×c-b^3×c-a^2×c^2-a×b×c^2+a×c^3-b×c^3) in
        cPointhb h_x_4231.
Definition X_4232 :=
        let h_x_4232 a b c := (5×a^2-b^2-c^2)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4232.
Definition X_4233 :=
        let h_x_4233 a b c := a*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4233.
Definition X_4234 :=
        let h_x_4234 a b c := (a+b)*(a+c)*(3×a^2-2×a×b+b^2-2×a×c+2×b×c+c^2) in
        cPointhb h_x_4234.
Definition X_4235 :=
        let h_x_4235 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(2×a^2-b^2-c^2)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4235.
Definition X_4236 :=
        let h_x_4236 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a^2×b+b^3+a^2×c-2×a×b×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_4236.
Definition X_4237 :=
        let h_x_4237 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(2×a^3-a^2×b+b^3-a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_4237.
Definition X_4238 :=
        let h_x_4238 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a×b-b^2+a×c-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4238.
Definition X_4239 :=
        let h_x_4239 a b c := a*(a^5-a×b^4+a^3×b×c+a^2×b^2×c+a×b^3×c+b^4×c+a^2×b×c^2+4×a×b^2×c^2+b^3×c^2+a×b×c^3+b^2×c^3-a×c^4+b×c^4) in
        cPointhb h_x_4239.
Definition X_4240 :=
        let h_x_4240 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_4240.
Definition X_4241 :=
        let h_x_4241 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(2×a^3-a^2×b-b^3-a^2×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_4241.
Definition X_4242 :=
        let h_x_4242 a b c := a*(a-b)*(a-c)*(a^2+b^2-c^2)*(a^2-b^2+b×c-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4242.
Definition X_4243 :=
        let h_x_4243 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a^3×b^2-a^2×b^3-a×b^4+b^5+a^3×c^2+2×a×b^2×c^2-b^3×c^2-a^2×c^3-b^2×c^3-a×c^4+c^5) in
        cPointhb h_x_4243.
Definition X_4244 :=
        let h_x_4244 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4×b-b^5+a^4×c-2×a^3×b×c+b^4×c+b×c^4-c^5) in
        cPointhb h_x_4244.
Definition X_4245 :=
        let h_x_4245 a b c := a^2*(a^4×b+a^3×b^2-a^2×b^3-a×b^4+a^4×c-b^4×c+a^3×c^2+2×a×b^2×c^2+3×b^3×c^2-a^2×c^3+3×b^2×c^3-a×c^4-b×c^4) in
        cPointhb h_x_4245.
Definition X_4246 :=
        let h_x_4246 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2×b-b^3+a^2×c-2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_4246.
Definition X_4247 :=
        let h_x_4247 a b c := a^2*(a+b)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_4247.
Definition X_4248 :=
        let h_x_4248 a b c := (a+b)*(3×a-b-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2) in
        cPointhb h_x_4248.
Definition X_4249 :=
        let h_x_4249 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a×b^2-b^3+a×c^2-c^3) in
        cPointhb h_x_4249.
Definition X_4250 :=
        let h_x_4250 a b c := a*(a-b)*(a-c)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^3×b-a×b^3+a^3×c-b^3×c+2×b^2×c^2-a×c^3-b×c^3) in
        cPointhb h_x_4250.
Definition X_4251 :=
        let h_x_4251 a b c := a^2*(a^2-a×b-a×c-b×c) in
        cPointhb h_x_4251.
Definition X_4252 :=
        let h_x_4252 a b c := a^2*(3×a^2+2×a×b-b^2+2×a×c+2×b×c-c^2) in
        cPointhb h_x_4252.
Definition X_4253 :=
        let h_x_4253 a b c := a^2*(a×b-b^2+a×c+b×c-c^2) in
        cPointhb h_x_4253.
Definition X_4254 :=
        let h_x_4254 a b c := a^2*(a-b-c)*(a^2+2×a×b+b^2+2×a×c+c^2) in
        cPointhb h_x_4254.
Definition X_4255 :=
        let h_x_4255 a b c := a^2*(a^2-2×a×b-3×b^2-2×a×c-2×b×c-3×c^2) in
        cPointhb h_x_4255.
Definition X_4256 :=
        let h_x_4256 a b c := a^2*(a^2-a×b-2×b^2-a×c-b×c-2×c^2) in
        cPointhb h_x_4256.
Definition X_4257 :=
        let h_x_4257 a b c := a^2*(2×a^2+a×b-b^2+a×c+b×c-c^2) in
        cPointhb h_x_4257.
Definition X_4258 :=
        let h_x_4258 a b c := a^2*(a-b-c)*(3×a+b+c) in
        cPointhb h_x_4258.
Definition X_4259 :=
        let h_x_4259 a b c := a^2*(a^2×b^2-b^4+a^2×b×c+a×b^2×c+a^2×c^2+a×b×c^2-c^4) in
        cPointhb h_x_4259.
Definition X_4260 :=
        let h_x_4260 a b c := a^2*(a^2×b^2-b^4+2×a^2×b×c+2×a×b^2×c+a^2×c^2+2×a×b×c^2-c^4) in
        cPointhb h_x_4260.
Definition X_4261 :=
        let h_x_4261 a b c := a^2*(a×b^2+b^3+a×b×c+b^2×c+a×c^2+b×c^2+c^3) in
        cPointhb h_x_4261.
Definition X_4262 :=
        let h_x_4262 a b c := a^2*(2×a^2-a×b-b^2-a×c-b×c-c^2) in
        cPointhb h_x_4262.
Definition X_4263 :=
        let h_x_4263 a b c := a^2*(a×b^2+b^3+4×a×b×c+b^2×c+a×c^2+b×c^2+c^3) in
        cPointhb h_x_4263.
Definition X_4264 :=
        let h_x_4264 a b c := a^2*(a^3+2×a^2×b+a×b^2+2×a^2×c+a×b×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_4264.
Definition X_4265 :=
        let h_x_4265 a b c := a^2*(a^4-b^4-a^2×b×c-a×b^2×c-a×b×c^2-2×b^2×c^2-c^4) in
        cPointhb h_x_4265.
Definition X_4266 :=
        let h_x_4266 a b c := a^2*(a-b-c)*(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_4266.
Definition X_4267 :=
        let h_x_4267 a b c := a^2*(a+b)*(a-b-c)*(a+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_4267.
Definition X_4268 :=
        let h_x_4268 a b c := a^2*(a^3-a×b^2+2×a×b×c-b^2×c-a×c^2-b×c^2) in
        cPointhb h_x_4268.
Definition X_4269 :=
        let h_x_4269 a b c := a^2*(a+b)*(a+c)*(a^2×b^2-b^4+a^2×b×c-b^3×c+a^2×c^2-b×c^3-c^4) in
        cPointhb h_x_4269.
Definition X_4270 :=
        let h_x_4270 a b c := a^2*(a^2×b+2×a×b^2+b^3+a^2×c+5×a×b×c+2×b^2×c+2×a×c^2+2×b×c^2+c^3) in
        cPointhb h_x_4270.
Definition X_4271 :=
        let h_x_4271 a b c := a^2*(a^2×b-b^3+a^2×c-2×a×b×c-c^3) in
        cPointhb h_x_4271.
Definition X_4272 :=
        let h_x_4272 a b c := a^2*(b+c)*(a^2+2×a×b+b^2+2×a×c+b×c+c^2) in
        cPointhb h_x_4272.
Definition X_4273 :=
        let h_x_4273 a b c := a^2*(a+b)*(a-2×b-2×c)*(a+c) in
        cPointhb h_x_4273.
Definition X_4274 :=
        let h_x_4274 a b c := a^2*(2×a^2×b+a×b^2-b^3+2×a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_4274.
Definition X_4275 :=
        let h_x_4275 a b c := a^2*(a^3+2×a^2×b+a×b^2+2×a^2×c+2×a×b×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_4275.
Definition X_4276 :=
        let h_x_4276 a b c := a^2*(a+b)*(a+c)*(a^2×b-b^3+a^2×c-a×b×c-b^2×c-b×c^2-c^3) in
        cPointhb h_x_4276.
Definition X_4277 :=
        let h_x_4277 a b c := a^2*(a×b^2+b^3+3×a×b×c+b^2×c+a×c^2+b×c^2+c^3) in
        cPointhb h_x_4277.
Definition X_4278 :=
        let h_x_4278 a b c := a^2*(a+b)*(a+c)*(a^2×b-b^3+a^2×c+a×b×c-b^2×c-b×c^2-c^3) in
        cPointhb h_x_4278.
Definition X_4279 :=
        let h_x_4279 a b c := a^2*(a^3×b+a^2×b^2+a^3×c+a^2×b×c+a^2×c^2+b^2×c^2) in
        cPointhb h_x_4279.
Definition X_4280 :=
        let h_x_4280 a b c := a^2*(a+b)*(a+c)*(a^4-b^4-2×b^3×c-2×b^2×c^2-2×b×c^3-c^4) in
        cPointhb h_x_4280.
Definition X_4281 :=
        let h_x_4281 a b c := a^2*(a+b)*(a+c)*(a×b^2+b^3+3×a×b×c+2×b^2×c+a×c^2+2×b×c^2+c^3) in
        cPointhb h_x_4281.
Definition X_4282 :=
        let h_x_4282 a b c := a^3*(a+b)*(a-b-c)*(a+c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4282.
Definition X_4283 :=
        let h_x_4283 a b c := a^2*(-(a×b^3)-b^4+a^2×b×c-b^3×c-b^2×c^2-a×c^3-b×c^3-c^4) in
        cPointhb h_x_4283.
Definition X_4284 :=
        let h_x_4284 a b c := a^2*(a^3+a×b^2+2×b^3-a×b×c+b^2×c+a×c^2+b×c^2+2×c^3) in
        cPointhb h_x_4284.
Definition X_4285 :=
        let h_x_4285 a b c := a^2*(a^2×b+2×a×b^2+b^3+a^2×c+6×a×b×c+2×b^2×c+2×a×c^2+2×b×c^2+c^3) in
        cPointhb h_x_4285.
Definition X_4286 :=
        let h_x_4286 a b c := a^2*(a^2×b-a×b^2-2×b^3+a^2×c-b^2×c-a×c^2-b×c^2-2×c^3) in
        cPointhb h_x_4286.
Definition X_4287 :=
        let h_x_4287 a b c := a^2*(2×a^3-2×a×b^2+a×b×c-2×b^2×c-2×a×c^2-2×b×c^2) in
        cPointhb h_x_4287.
Definition X_4288 :=
        let h_x_4288 a b c := a^2*(a+b)*(a+c)*(a^2-b^2-c^2)*(a^2-2×a×b-b^2-2×a×c-2×b×c-c^2) in
        cPointhb h_x_4288.
Definition X_4289 :=
        let h_x_4289 a b c := a^2*(2×a^3-2×a×b^2-3×a×b×c-2×b^2×c-2×a×c^2-2×b×c^2) in
        cPointhb h_x_4289.
Definition X_4290 :=
        let h_x_4290 a b c := a^2*(a^3+2×a^2×b+a×b^2+2×a^2×c+b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_4290.
Definition X_4291 :=
        let h_x_4291 a b c := a^3*(a^2-b^2-a×c)*(a^2-a×b-c^2) in
        cPointhb h_x_4291.
Definition X_4292 :=
        let h_x_4292 a b c := -2×a^4-a^3×b+a^2×b^2+a×b^3+b^4-a^3×c-2×a^2×b×c-a×b^2×c+a^2×c^2-a×b×c^2-2×b^2×c^2+a×c^3+c^4 in
        cPointhb h_x_4292.
Definition X_4293 :=
        let h_x_4293 a b c := -3×a^4+2×a^2×b^2+b^4-4×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4293.
Definition X_4294 :=
        let h_x_4294 a b c := -3×a^4+2×a^2×b^2+b^4+4×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4294.
Definition X_4295 :=
        let h_x_4295 a b c := -a^4-2×a^3×b+2×a×b^3+b^4-2×a^3×c-2×a×b^2×c-2×a×b×c^2-2×b^2×c^2+2×a×c^3+c^4 in
        cPointhb h_x_4295.
Definition X_4296 :=
        let h_x_4296 a b c := a*(a+b-c)*(a-b+c)*(a^4-b^4+a^2×b×c-b^3×c-b×c^3-c^4) in
        cPointhb h_x_4296.
Definition X_4297 :=
        let h_x_4297 a b c := -4×a^4+a^3×b+3×a^2×b^2-a×b^3+b^4+a^3×c-2×a^2×b×c+a×b^2×c+3×a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4 in
        cPointhb h_x_4297.
Definition X_4298 :=
        let h_x_4298 a b c := (a+b-c)*(a-b+c)*(2×a^2+a×b+b^2+a×c+2×b×c+c^2) in
        cPointhb h_x_4298.
Definition X_4299 :=
        let h_x_4299 a b c := -3×a^4+2×a^2×b^2+b^4-2×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4299.
Definition X_4300 :=
        let h_x_4300 a b c := a^2*(a^4×b-2×a^2×b^3+b^5+a^4×c+2×a^3×b×c-2×a×b^3×c-b^4×c-4×a×b^2×c^2-2×a^2×c^3-2×a×b×c^3-b×c^4+c^5) in
        cPointhb h_x_4300.
Definition X_4301 :=
        let h_x_4301 a b c := -3×a^3×b-a^2×b^2+3×a×b^3+b^4-3×a^3×c+6×a^2×b×c-3×a×b^2×c-a^2×c^2-3×a×b×c^2-2×b^2×c^2+3×a×c^3+c^4 in
        cPointhb h_x_4301.
Definition X_4302 :=
        let h_x_4302 a b c := -3×a^4+2×a^2×b^2+b^4+2×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4302.
Definition X_4303 :=
        let h_x_4303 a b c := a^2*(a^2-b^2-c^2)*(a^2×b-b^3+a^2×c+2×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_4303.
Definition X_4304 :=
        let h_x_4304 a b c := -4×a^4+a^3×b+3×a^2×b^2-a×b^3+b^4+a^3×c+2×a^2×b×c+a×b^2×c+3×a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4 in
        cPointhb h_x_4304.
Definition X_4305 :=
        let h_x_4305 a b c := -5×a^4+2×a^3×b+4×a^2×b^2-2×a×b^3+b^4+2×a^3×c+2×a×b^2×c+4×a^2×c^2+2×a×b×c^2-2×b^2×c^2-2×a×c^3+c^4 in
        cPointhb h_x_4305.
Definition X_4306 :=
        let h_x_4306 a b c := a^2*(a+b-c)*(a-b+c)*(a^2×b-b^3+a^2×c+a×b×c-c^3) in
        cPointhb h_x_4306.
Definition X_4307 :=
        let h_x_4307 a b c := 3×a^3+a^2×b+a×b^2-b^3+a^2×c+2×a×b×c+b^2×c+a×c^2+b×c^2-c^3 in
        cPointhb h_x_4307.
Definition X_4308 :=
        let h_x_4308 a b c := (a+b-c)*(a-b+c)*(5×a^2-2×a×b+b^2-2×a×c+2×b×c+c^2) in
        cPointhb h_x_4308.
Definition X_4309 :=
        let h_x_4309 a b c := -3×a^4+2×a^2×b^2+b^4+6×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4309.
Definition X_4310 :=
        let h_x_4310 a b c := a^3-a^2×b+3×a×b^2+b^3-a^2×c-2×a×b×c-b^2×c+3×a×c^2-b×c^2+c^3 in
        cPointhb h_x_4310.
Definition X_4311 :=
        let h_x_4311 a b c := -4×a^4+a^3×b+3×a^2×b^2-a×b^3+b^4+a^3×c-6×a^2×b×c+a×b^2×c+3×a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3+c^4 in
        cPointhb h_x_4311.
Definition X_4312 :=
        let h_x_4312 a b c := -3×a^3+a×b^2+2×b^3-2×a×b×c-2×b^2×c+a×c^2-2×b×c^2+2×c^3 in
        cPointhb h_x_4312.
Definition X_4313 :=
        let h_x_4313 a b c := (a-b-c)*(5×a^3+3×a^2×b-a×b^2+b^3+3×a^2×c+2×a×b×c-b^2×c-a×c^2-b×c^2+c^3) in
        cPointhb h_x_4313.
Definition X_4314 :=
        let h_x_4314 a b c := (a-b-c)*(4×a^3+3×a^2×b+b^3+3×a^2×c-b^2×c-b×c^2+c^3) in
        cPointhb h_x_4314.
Definition X_4315 :=
        let h_x_4315 a b c := (a+b-c)*(a-b+c)*(4×a^2-a×b+b^2-a×c+2×b×c+c^2) in
        cPointhb h_x_4315.
Definition X_4316 :=
        let h_x_4316 a b c := -3×a^4+2×a^2×b^2+b^4-a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4316.
Definition X_4317 :=
        let h_x_4317 a b c := -3×a^4+2×a^2×b^2+b^4-6×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4317.
Definition X_4318 :=
        let h_x_4318 a b c := a*(a+b-c)*(a-b+c)*(a^3-a^2×b+a×b^2-b^3-a^2×c+a×b×c+a×c^2-c^3) in
        cPointhb h_x_4318.
Definition X_4319 :=
        let h_x_4319 a b c := a×(a-b-c)^2*(a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_4319.
Definition X_4320 :=
        let h_x_4320 a b c := a×(a+b-c)^2×(a-b+c)^2*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_4320.
Definition X_4321 :=
        let h_x_4321 a b c := a*(a+b-c)*(a-b+c)*(a^3-3×a^2×b+3×a×b^2-b^3-3×a^2×c-2×a×b×c-3×b^2×c+3×a×c^2-3×b×c^2-c^3) in
        cPointhb h_x_4321.
Definition X_4322 :=
        let h_x_4322 a b c := a^2*(a+b-c)*(a-b+c)*(a^2×b-b^3+a^2×c+4×a×b×c-3×b^2×c-3×b×c^2-c^3) in
        cPointhb h_x_4322.
Definition X_4323 :=
        let h_x_4323 a b c := (a+b-c)*(a-b+c)*(3×a^2-6×a×b-b^2-6×a×c-2×b×c-c^2) in
        cPointhb h_x_4323.
Definition X_4324 :=
        let h_x_4324 a b c := -3×a^4+2×a^2×b^2+b^4+a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4324.
Definition X_4325 :=
        let h_x_4325 a b c := -3×a^4+2×a^2×b^2+b^4-3×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4325.
Definition X_4326 :=
        let h_x_4326 a b c := a*(a-b-c)*(a^3-3×a^2×b+3×a×b^2-b^3-3×a^2×c-6×a×b×c+b^2×c+3×a×c^2+b×c^2-c^3) in
        cPointhb h_x_4326.
Definition X_4327 :=
        let h_x_4327 a b c := a*(a+b-c)*(a-b+c)*(a^3-a^2×b+a×b^2-b^3-a^2×c-2×a×b×c-3×b^2×c+a×c^2-3×b×c^2-c^3) in
        cPointhb h_x_4327.
Definition X_4328 :=
        let h_x_4328 a b c := a*(a+b-c)*(a-b+c)*(a^2-b^2-6×b×c-c^2) in
        cPointhb h_x_4328.
Definition X_4329 :=
        let h_x_4329 a b c := a^5+a^4×b-a×b^4-b^5+a^4×c-2×a^2×b^2×c+b^4×c-2×a^2×b×c^2+2×a×b^2×c^2-a×c^4+b×c^4-c^5 in
        cPointhb h_x_4329.
Definition X_4330 :=
        let h_x_4330 a b c := -3×a^4+2×a^2×b^2+b^4+3×a^2×b×c+2×a^2×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4330.
Definition X_4331 :=
        let h_x_4331 a b c := (a+b-c)*(a-b+c)*(a^4-2×a^3×b+b^4-2×a^3×c-2×b^2×c^2+c^4) in
        cPointhb h_x_4331.
Definition X_4332 :=
        let h_x_4332 a b c := a*(a+b-c)*(a-b+c)*(a^4-a^3×b+a×b^3-b^4-a^3×c+3×a×b^2×c+3×a×b×c^2+2×b^2×c^2+a×c^3-c^4) in
        cPointhb h_x_4332.
Definition X_4333 :=
        let h_x_4333 a b c := 5×a^4+a^3×b-3×a^2×b^2-a×b^3-2×b^4+a^3×c+a×b^2×c-3×a^2×c^2+a×b×c^2+4×b^2×c^2-a×c^3-2×c^4 in
        cPointhb h_x_4333.
Definition X_4334 :=
        let h_x_4334 a b c := a*(a+b-c)*(a-b+c)*(a^2×b-a×b^2+a^2×c+a×b×c+b^2×c-a×c^2+b×c^2) in
        cPointhb h_x_4334.
Definition X_4335 :=
        let h_x_4335 a b c := a*(a^3×b-2×a^2×b^2+a×b^3+a^3×c-a^2×b×c-3×a×b^2×c-b^3×c-2×a^2×c^2-3×a×b×c^2+2×b^2×c^2+a×c^3-b×c^3) in
        cPointhb h_x_4335.
Definition X_4336 :=
        let h_x_4336 a b c := a*(a-b-c)*(a^3-b^3+b^2×c+b×c^2-c^3) in
        cPointhb h_x_4336.
Definition X_4337 :=
        let h_x_4337 a b c := a^2*(a^4×b-2×a^2×b^3+b^5+a^4×c+2×a^3×b×c-2×a×b^3×c-b^4×c-2×a×b^2×c^2-2×a^2×c^3-2×a×b×c^3-b×c^4+c^5) in
        cPointhb h_x_4337.
Definition X_4338 :=
        let h_x_4338 a b c := -3×a^4-3×a^3×b+a^2×b^2+3×a×b^3+2×b^4-3×a^3×c-3×a×b^2×c+a^2×c^2-3×a×b×c^2-4×b^2×c^2+3×a×c^3+2×c^4 in
        cPointhb h_x_4338.
Definition X_4339 :=
        let h_x_4339 a b c := -5×a^4-2×a^3×b-2×a×b^3+b^4-2×a^3×c-2×a×b^2×c-2×a×b×c^2-2×b^2×c^2-2×a×c^3+c^4 in
        cPointhb h_x_4339.
Definition X_4340 :=
        let h_x_4340 a b c := -3×a^4-4×a^3×b-2×a^2×b^2+b^4-4×a^3×c-8×a^2×b×c-4×a×b^2×c-2×a^2×c^2-4×a×b×c^2-2×b^2×c^2+c^4 in
        cPointhb h_x_4340.
Definition X_4341 :=
        let h_x_4341 a b c := a×(a+b-c)^2×(a-b+c)^2*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_4341.
Definition X_4342 :=
        let h_x_4342 a b c := (a-b-c)*(3×a^2×b+4×a×b^2+b^3+3×a^2×c-8×a×b×c-b^2×c+4×a×c^2-b×c^2+c^3) in
        cPointhb h_x_4342.
Definition X_4343 :=
        let h_x_4343 a b c := a^2*(a^2×b-2×a×b^2+b^3+a^2×c-2×a×b×c-3×b^2×c-2×a×c^2-3×b×c^2+c^3) in
        cPointhb h_x_4343.
Definition X_4344 :=
        let h_x_4344 a b c := 5×a^3+a^2×b+3×a×b^2-b^3+a^2×c+2×a×b×c+b^2×c+3×a×c^2+b×c^2-c^3 in
        cPointhb h_x_4344.
Definition X_4345 :=
        let h_x_4345 a b c := (a-b-c)*(3×a^3-3×a^2×b-7×a×b^2-b^3-3×a^2×c+14×a×b×c+b^2×c-7×a×c^2+b×c^2-c^3) in
        cPointhb h_x_4345.
Definition X_4346 :=
        let h_x_4346 a b c := a^2-2×a×b-3×b^2-2×a×c+6×b×c-3×c^2 in
        cPointhb h_x_4346.
Definition X_4347 :=
        let h_x_4347 a b c := a*(a+b-c)*(a-b+c)*(a^4-b^4+a×b^2×c-b^3×c+a×b×c^2-b×c^3-c^4) in
        cPointhb h_x_4347.
Definition X_4348 :=
        let h_x_4348 a b c := a*(a+b-c)*(a-b+c)*(3×a^4-3×b^4-4×b^3×c-2×b^2×c^2-4×b×c^3-3×c^4) in
        cPointhb h_x_4348.
Definition X_4349 :=
        let h_x_4349 a b c := -4×a^3-3×a^2×b-2×a×b^2+b^3-3×a^2×c-4×a×b×c-b^2×c-2×a×c^2-b×c^2+c^3 in
        cPointhb h_x_4349.
Definition X_4350 :=
        let h_x_4350 a b c := a×(a+b-c)^2×(a-b+c)^2*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4350.
Definition X_4351 :=
        let h_x_4351 a b c := a*(a^2-b^2+b×c-c^2)*(a^4-b^4+2×a^2×b×c+2×b^2×c^2-c^4) in
        cPointhb h_x_4351.
Definition X_4352 :=
        let h_x_4352 a b c := a^3×b+2×a^2×b^2+a×b^3+a^3×c+a^2×b×c+a×b^2×c+b^3×c+2×a^2×c^2+a×b×c^2-2×b^2×c^2+a×c^3+b×c^3 in
        cPointhb h_x_4352.
Definition X_4353 :=
        let h_x_4353 a b c := 2×a^3+a^2×b+4×a×b^2+b^3+a^2×c-b^2×c+4×a×c^2-b×c^2+c^3 in
        cPointhb h_x_4353.
Definition X_4354 :=
        let h_x_4354 a b c := a*(a^2-b^2-b×c-c^2)*(a^4-b^4-2×a^2×b×c+2×b^2×c^2-c^4) in
        cPointhb h_x_4354.
Definition X_4355 :=
        let h_x_4355 a b c := (a+b-c)*(a-b+c)*(3×a^2+3×a×b+2×b^2+3×a×c+4×b×c+2×c^2) in
        cPointhb h_x_4355.
Definition X_4356 :=
        let h_x_4356 a b c := (b+c)*(5×a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_4356.
Definition X_4357 :=
        let h_x_4357 a b c := a×b+b^2+a×c+c^2 in
        cPointhb h_x_4357.
Definition X_4358 :=
        let h_x_4358 a b c := b×c*(-2×a+b+c) in
        cPointhb h_x_4358.
Definition X_4359 :=
        let h_x_4359 a b c := b×c*(2×a+b+c) in
        cPointhb h_x_4359.
Definition X_4360 :=
        let h_x_4360 a b c := a^2+a×b+a×c-b×c in
        cPointhb h_x_4360.
Definition X_4361 :=
        let h_x_4361 a b c := a^2-2×b×c in
        cPointhb h_x_4361.
Definition X_4362 :=
        let h_x_4362 a b c := a^3-b^2×c-b×c^2 in
        cPointhb h_x_4362.
Definition X_4363 :=
        let h_x_4363 a b c := a^2+2×b×c in
        cPointhb h_x_4363.
Definition X_4364 :=
        let h_x_4364 a b c := 2×a×b+b^2+2×a×c+c^2 in
        cPointhb h_x_4364.
Definition X_4365 :=
        let h_x_4365 a b c := (b+c)*(-a^2+2×b×c) in
        cPointhb h_x_4365.
Definition X_4366 :=
        let h_x_4366 a b c := (a^2-b×c)^2 in
        cPointhb h_x_4366.
Definition X_4367 :=
        let h_x_4367 a b c := a*(b-c)*(a^2+b×c) in
        cPointhb h_x_4367.
Definition X_4368 :=
        let h_x_4368 a b c := (b+c)*(a^2-b×c)^2 in
        cPointhb h_x_4368.
Definition X_4369 :=
        let h_x_4369 a b c := (b-c)*(a^2+b×c) in
        cPointhb h_x_4369.
Definition X_4370 :=
        let h_x_4370 a b c := (2×a-b-c)^2 in
        cPointhb h_x_4370.
Definition X_4371 :=
        let h_x_4371 a b c := -3×a^2+b^2+6×b×c+c^2 in
        cPointhb h_x_4371.
Definition X_4372 :=
        let h_x_4372 a b c := a^4-b^3×c-b×c^3 in
        cPointhb h_x_4372.
Definition X_4373 :=
        let h_x_4373 a b c := (a+b-3×c)*(a-3×b+c) in
        cPointhb h_x_4373.
Definition X_4374 :=
        let h_x_4374 a b c := b*(b-c)*c*(a^2+b×c) in
        cPointhb h_x_4374.
Definition X_4375 :=
        let h_x_4375 a b c := (b-c)*(-a^2+b×c)^2 in
        cPointhb h_x_4375.
Definition X_4376 :=
        let h_x_4376 a b c := a^4+b^3×c+b×c^3 in
        cPointhb h_x_4376.
Definition X_4377 :=
        let h_x_4377 a b c := b×c*(b+c)*(a^2+2×b×c) in
        cPointhb h_x_4377.
Definition X_4378 :=
        let h_x_4378 a b c := a*(b-c)*(a^2+2×b×c) in
        cPointhb h_x_4378.
Definition X_4379 :=
        let h_x_4379 a b c := (b-c)*(a^2+2×b×c) in
        cPointhb h_x_4379.
Definition X_4380 :=
        let h_x_4380 a b c := (b-c)*(-2×a^2+b×c) in
        cPointhb h_x_4380.
Definition X_4381 :=
        let h_x_4381 a b c := a^5+b^4×c+b×c^4 in
        cPointhb h_x_4381.
Definition X_4382 :=
        let h_x_4382 a b c := (b-c)*(-a^2+2×b×c) in
        cPointhb h_x_4382.
Definition X_4383 :=
        let h_x_4383 a b c := a*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_4383.
Definition X_4384 :=
        let h_x_4384 a b c := a^2-a×b-a×c-2×b×c in
        cPointhb h_x_4384.
Definition X_4385 :=
        let h_x_4385 a b c := b×c*(a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_4385.
Definition X_4386 :=
        let h_x_4386 a b c := a*(a^3+b^2×c+b×c^2) in
        cPointhb h_x_4386.
Definition X_4387 :=
        let h_x_4387 a b c := (a-b-c)*(a^2-2×b×c) in
        cPointhb h_x_4387.
Definition X_4388 :=
        let h_x_4388 a b c := -a^3+b^3+a×b×c+c^3 in
        cPointhb h_x_4388.
Definition X_4389 :=
        let h_x_4389 a b c := a×b+b^2+a×c-b×c+c^2 in
        cPointhb h_x_4389.
Definition X_4390 :=
        let h_x_4390 a b c := a*(a-b-c)*(a^2+2×b×c) in
        cPointhb h_x_4390.
Definition X_4391 :=
        let h_x_4391 a b c := b*(b-c)*c*(-a+b+c) in
        cPointhb h_x_4391.
Definition X_4392 :=
        let h_x_4392 a b c := a*(2×b^2-b×c+2×c^2) in
        cPointhb h_x_4392.
Definition X_4393 :=
        let h_x_4393 a b c := 2×a^2+a×b+a×c-b×c in
        cPointhb h_x_4393.
Definition X_4394 :=
        let h_x_4394 a b c := a*(3×a-b-c)*(b-c) in
        cPointhb h_x_4394.
Definition X_4395 :=
        let h_x_4395 a b c := 2×a^2+b^2-4×b×c+c^2 in
        cPointhb h_x_4395.
Definition X_4396 :=
        let h_x_4396 a b c := -((a^2-b×c)*(a^2+2×b×c)) in
        cPointhb h_x_4396.
Definition X_4397 :=
        let h_x_4397 a b c := b*(b-c)*c×(-a+b+c)^2 in
        cPointhb h_x_4397.
Definition X_4398 :=
        let h_x_4398 a b c := a×b+b^2+a×c-3×b×c+c^2 in
        cPointhb h_x_4398.
Definition X_4399 :=
        let h_x_4399 a b c := -2×a^2+b^2+4×b×c+c^2 in
        cPointhb h_x_4399.
Definition X_4400 :=
        let h_x_4400 a b c := (a^2-2×b×c)*(a^2+b×c) in
        cPointhb h_x_4400.
Definition X_4401 :=
        let h_x_4401 a b c := a*(b-c)*(2×a^2-b×c) in
        cPointhb h_x_4401.
Definition X_4402 :=
        let h_x_4402 a b c := 3×a^2+b^2-6×b×c+c^2 in
        cPointhb h_x_4402.
Definition X_4403 :=
        let h_x_4403 a b c := (b-c)^2*(a^2+2×b×c) in
        cPointhb h_x_4403.
Definition X_4404 :=
        let h_x_4404 a b c := b*(b-c)*c*(b+c)*(-3×a+b+c) in
        cPointhb h_x_4404.
Definition X_4405 :=
        let h_x_4405 a b c := -4×a^2+b^2+8×b×c+c^2 in
        cPointhb h_x_4405.
Definition X_4406 :=
        let h_x_4406 a b c := b*(b-c)*c*(2×a^2+b×c) in
        cPointhb h_x_4406.
Definition X_4407 :=
        let h_x_4407 a b c := (4×a+b+c)*(b^2+b×c+c^2) in
        cPointhb h_x_4407.
Definition X_4408 :=
        let h_x_4408 a b c := b*(b-c)*c*(-a^2+2×b×c) in
        cPointhb h_x_4408.
Definition X_4409 :=
        let h_x_4409 a b c := (2×a+b-3×c)*(2×a-3×b+c) in
        cPointhb h_x_4409.
Definition X_4410 :=
        let h_x_4410 a b c := b×c*(2×a+b+c)*(a^2+2×b×c) in
        cPointhb h_x_4410.
Definition X_4411 :=
        let h_x_4411 a b c := b*(b-c)*c*(a^2+2×b×c) in
        cPointhb h_x_4411.
Definition X_4412 :=
        let h_x_4412 a b c := a^5-b^4×c-b×c^4 in
        cPointhb h_x_4412.
Definition X_4413 :=
        let h_x_4413 a b c := a*(a^2-a×b-a×c+4×b×c) in
        cPointhb h_x_4413.
Definition X_4414 :=
        let h_x_4414 a b c := a*(a^2-a×b-b^2-a×c-c^2) in
        cPointhb h_x_4414.
Definition X_4415 :=
        let h_x_4415 a b c := (b+c)*(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_4415.
Definition X_4416 :=
        let h_x_4416 a b c := -2×a^2+a×b+b^2+a×c+c^2 in
        cPointhb h_x_4416.
Definition X_4417 :=
        let h_x_4417 a b c := -(a^2×b)+b^3-a^2×c+a×b×c+c^3 in
        cPointhb h_x_4417.
Definition X_4418 :=
        let h_x_4418 a b c := a^3+a×b×c+b^2×c+b×c^2 in
        cPointhb h_x_4418.
Definition X_4419 :=
        let h_x_4419 a b c := -a^2+2×a×b+b^2+2×a×c-2×b×c+c^2 in
        cPointhb h_x_4419.
Definition X_4420 :=
        let h_x_4420 a b c := a*(a-b-c)*(a^2-b^2-b×c-c^2) in
        cPointhb h_x_4420.
Definition X_4421 :=
        let h_x_4421 a b c := a*(3×a^2-3×a×b-3×a×c+2×b×c) in
        cPointhb h_x_4421.
Definition X_4422 :=
        let h_x_4422 a b c := 2×a^2-2×a×b+b^2-2×a×c+c^2 in
        cPointhb h_x_4422.
Definition X_4423 :=
        let h_x_4423 a b c := a*(a^2-a×b-a×c-4×b×c) in
        cPointhb h_x_4423.
Definition X_4424 :=
        let h_x_4424 a b c := a*(b+c)*(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_4424.
Definition X_4425 :=
        let h_x_4425 a b c := (b+c)*(a^2+a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_4425.
Definition X_4426 :=
        let h_x_4426 a b c := a*(a^3-b^2×c-b×c^2) in
        cPointhb h_x_4426.
Definition X_4427 :=
        let h_x_4427 a b c := (a-b)*(a-c)*(2×a+b+c) in
        cPointhb h_x_4427.
Definition X_4428 :=
        let h_x_4428 a b c := a*(3×a^2-3×a×b-3×a×c-2×b×c) in
        cPointhb h_x_4428.
Definition X_4429 :=
        let h_x_4429 a b c := a^2×b+b^3+a^2×c-a×b×c+c^3 in
        cPointhb h_x_4429.
Definition X_4430 :=
        let h_x_4430 a b c := a*(2×a×b-2×b^2+2×a×c+b×c-2×c^2) in
        cPointhb h_x_4430.
Definition X_4431 :=
        let h_x_4431 a b c := -(a×b)+b^2-a×c+4×b×c+c^2 in
        cPointhb h_x_4431.
Definition X_4432 :=
        let h_x_4432 a b c := (2×a-b-c)*(a^2-b×c) in
        cPointhb h_x_4432.
Definition X_4433 :=
        let h_x_4433 a b c := a*(a-b-c)*(b+c)*(a^2-b×c) in
        cPointhb h_x_4433.
Definition X_4434 :=
        let h_x_4434 a b c := (2×a-b-c)*(a^2+b×c) in
        cPointhb h_x_4434.
Definition X_4435 :=
        let h_x_4435 a b c := a*(a-b-c)*(b-c)*(a^2-b×c) in
        cPointhb h_x_4435.
Definition X_4436 :=
        let h_x_4436 a b c := a*(a-b)*(a-c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_4436.
Definition X_4437 :=
        let h_x_4437 a b c := (a×b-b^2+a×c-c^2)^2 in
        cPointhb h_x_4437.
Definition X_4438 :=
        let h_x_4438 a b c := a^3-a×b^2+b^3-a×c^2+c^3 in
        cPointhb h_x_4438.
Definition X_4439 :=
        let h_x_4439 a b c := (2×a-b-c)*(b^2+b×c+c^2) in
        cPointhb h_x_4439.
Definition X_4440 :=
        let h_x_4440 a b c := -a^2+a×b+b^2+a×c-3×b×c+c^2 in
        cPointhb h_x_4440.
Definition X_4441 :=
        let h_x_4441 a b c := b×c*(-a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_4441.
Definition X_4442 :=
        let h_x_4442 a b c := (b+c)*(a^2+b^2-3×b×c+c^2) in
        cPointhb h_x_4442.
Definition X_4443 :=
        let h_x_4443 a b c := a*(a×b^3+b^2×c^2+a×c^3) in
        cPointhb h_x_4443.
Definition X_4444 :=
        let h_x_4444 a b c := (b-c)*(b^2-a×c)*(a×b-c^2) in
        cPointhb h_x_4444.
Definition X_4445 :=
        let h_x_4445 a b c := a^2-2×b^2-2×b×c-2×c^2 in
        cPointhb h_x_4445.
Definition X_4446 :=
        let h_x_4446 a b c := a*(a×b^3-b^2×c^2+a×c^3) in
        cPointhb h_x_4446.
Definition X_4447 :=
        let h_x_4447 a b c := a*(a^2+b×c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_4447.
Definition X_4448 :=
        let h_x_4448 a b c := (2×a-b-c)*(b-c)*(a^2-b×c) in
        cPointhb h_x_4448.
Definition X_4449 :=
        let h_x_4449 a b c := a*(b-c)*(a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_4449.
Definition X_4450 :=
        let h_x_4450 a b c := -2×a^3+a^2×b+b^3+a^2×c+c^3 in
        cPointhb h_x_4450.
Definition X_4451 :=
        let h_x_4451 a b c := (a-b-c)*(b^2+a×c)*(a×b+c^2) in
        cPointhb h_x_4451.
Definition X_4452 :=
        let h_x_4452 a b c := a^2+2×a×b+b^2+2×a×c-6×b×c+c^2 in
        cPointhb h_x_4452.
Definition X_4453 :=
        let h_x_4453 a b c := (b-c)*(-a^2+b^2-b×c+c^2) in
        cPointhb h_x_4453.
Definition X_4454 :=
        let h_x_4454 a b c := -3×a^2+2×a×b+b^2+2×a×c-6×b×c+c^2 in
        cPointhb h_x_4454.
Definition X_4455 :=
        let h_x_4455 a b c := a^2*(b-c)*(b+c)*(a^2-b×c) in
        cPointhb h_x_4455.
Definition X_4456 :=
        let h_x_4456 a b c := a^2*(b+c)*(a^4-b^4-c^4) in
        cPointhb h_x_4456.
Definition X_4457 :=
        let h_x_4457 a b c := (b+c)*(-3×a^2+2×a×b+2×a×c+3×b×c) in
        cPointhb h_x_4457.
Definition X_4458 :=
        let h_x_4458 a b c := (b-c)*(-a^3+b^3-a×b×c+c^3) in
        cPointhb h_x_4458.
Definition X_4459 :=
        let h_x_4459 a b c := (a-b-c)*(-b+c)^2*(a^2+b×c) in
        cPointhb h_x_4459.
Definition X_4460 :=
        let h_x_4460 a b c := -5×a^2-4×a×b+b^2-4×a×c+6×b×c+c^2 in
        cPointhb h_x_4460.
Definition X_4461 :=
        let h_x_4461 a b c := a^2-2×a×b+b^2-2×a×c+6×b×c+c^2 in
        cPointhb h_x_4461.
Definition X_4462 :=
        let h_x_4462 a b c := b*(b-c)*c*(-3×a+b+c) in
        cPointhb h_x_4462.
Definition X_4463 :=
        let h_x_4463 a b c := a*(b+c)*(a^4-b^4-c^4) in
        cPointhb h_x_4463.
Definition X_4464 :=
        let h_x_4464 a b c := -4×a^2-3×a×b+b^2-3×a×c+4×b×c+c^2 in
        cPointhb h_x_4464.
Definition X_4465 :=
        let h_x_4465 a b c := (a×b+a×c-2×b×c)*(a^2-b×c) in
        cPointhb h_x_4465.
Definition X_4466 :=
        let h_x_4466 a b c := -((b-c)^2*(b+c)*(-a^2+b^2+c^2)) in
        cPointhb h_x_4466.
Definition X_4467 :=
        let h_x_4467 a b c := (b-c)*(-a^2+b^2+b×c+c^2) in
        cPointhb h_x_4467.
Definition X_4468 :=
        let h_x_4468 a b c := (b-c)*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4468.
Definition X_4469 :=
        let h_x_4469 a b c := a*(a+b)*(a+c)*(b^2+b×c+c^2)^2 in
        cPointhb h_x_4469.
Definition X_4470 :=
        let h_x_4470 a b c := 3×a^2+2×a×b+b^2+2×a×c+6×b×c+c^2 in
        cPointhb h_x_4470.
Definition X_4471 :=
        let h_x_4471 a b c := a^2*(a^3-b^3-2×a×b×c-c^3) in
        cPointhb h_x_4471.
Definition X_4472 :=
        let h_x_4472 a b c := 2×a^2+2×a×b+b^2+2×a×c+4×b×c+c^2 in
        cPointhb h_x_4472.
Definition X_4473 :=
        let h_x_4473 a b c := 3×a^2-3×a×b+b^2-3×a×c+b×c+c^2 in
        cPointhb h_x_4473.
Definition X_4474 :=
        let h_x_4474 a b c := (a-b-c)*(b-c)*(a^2+2×b×c) in
        cPointhb h_x_4474.
Definition X_4475 :=
        let h_x_4475 a b c := a×(b-c)^2*(b^2+b×c+c^2) in
        cPointhb h_x_4475.
Definition X_4476 :=
        let h_x_4476 a b c := a^2*(a+b)*(a+c)*(b^2+b×c+c^2)^2 in
        cPointhb h_x_4476.
Definition X_4477 :=
        let h_x_4477 a b c := a×(a-b-c)^2*(b-c)*(a^2+b×c) in
        cPointhb h_x_4477.
Definition X_4478 :=
        let h_x_4478 a b c := 2×a^2-3×b^2-4×b×c-3×c^2 in
        cPointhb h_x_4478.
Definition X_4479 :=
        let h_x_4479 a b c := b×c*(2×a^2-a×b-a×c-3×b×c) in
        cPointhb h_x_4479.
Definition X_4480 :=
        let h_x_4480 a b c := -4×a^2+3×a×b+b^2+3×a×c-4×b×c+c^2 in
        cPointhb h_x_4480.
Definition X_4481 :=
        let h_x_4481 a b c := a*(a+b)*(b-c)*(a+c)*(b^2+b×c+c^2) in
        cPointhb h_x_4481.
Definition X_4482 :=
        let h_x_4482 a b c := (a-b)*(a-c)*(a^2+2×b×c) in
        cPointhb h_x_4482.
Definition X_4483 :=
        let h_x_4483 a b c := (a+b)*(a-b-c)*(a+c)*(a^2-2×b×c) in
        cPointhb h_x_4483.
Definition X_4484 :=
        let h_x_4484 a b c := a^2*(-2×b^3+a×b×c-2×c^3) in
        cPointhb h_x_4484.
Definition X_4485 :=
        let h_x_4485 a b c := b^2×c^2*(a^3+b^2×c+b×c^2) in
        cPointhb h_x_4485.
Definition X_4486 :=
        let h_x_4486 a b c := (-b+c)*(a^2-b×c)*(b^2+b×c+c^2) in
        cPointhb h_x_4486.
Definition X_4487 :=
        let h_x_4487 a b c := -(b×c*(-3×a+b+c)*(-2×a+b+c)) in
        cPointhb h_x_4487.
Definition X_4488 :=
        let h_x_4488 a b c := -5×a^2+4×a×b+b^2+4×a×c-6×b×c+c^2 in
        cPointhb h_x_4488.
Definition X_4489 :=
        let h_x_4489 a b c := a*(a^2-b×c)*(b^2+3×b×c+c^2) in
        cPointhb h_x_4489.
Definition X_4490 :=
        let h_x_4490 a b c := -(a*(b-c)*(b^2+3×b×c+c^2)) in
        cPointhb h_x_4490.
Definition X_4491 :=
        let h_x_4491 a b c := a^2*(b-c)*(a^2+a×b+a×c-3×b×c) in
        cPointhb h_x_4491.
Definition X_4492 :=
        let h_x_4492 a b c := a*(2×b^2+a×c)*(a×b+2×c^2) in
        cPointhb h_x_4492.
Definition X_4493 :=
        let h_x_4493 a b c := a*(a^2×b^4+b^3×c^3+a^2×c^4) in
        cPointhb h_x_4493.
Definition X_4494 :=
        let h_x_4494 a b c := b×c*(-a+b+c)*(a^2+2×b×c) in
        cPointhb h_x_4494.
Definition X_4495 :=
        let h_x_4495 a b c := -(b×c*(a^2-b×c)*(a^2+2×b×c)) in
        cPointhb h_x_4495.
Definition X_4496 :=
        let h_x_4496 a b c := (b^2+a×c)*(-a^2+2×b×c)*(a×b+c^2) in
        cPointhb h_x_4496.
Definition X_4497 :=
        let h_x_4497 a b c := a^2*(a^3-b^3+2×a×b×c-c^3) in
        cPointhb h_x_4497.
Definition X_4498 :=
        let h_x_4498 a b c := a*(b-c)*(a^2+a×b+a×c-2×b×c) in
        cPointhb h_x_4498.
Definition X_4499 :=
        let h_x_4499 a b c := 4×a^2+2×a×b+b^2+2×a×c+8×b×c+c^2 in
        cPointhb h_x_4499.
Definition X_4500 :=
        let h_x_4500 a b c := (b-c)*(b^2+3×b×c+c^2) in
        cPointhb h_x_4500.
Definition X_4501 :=
        let h_x_4501 a b c := a*(a-b-c)*(b-c)*(a^2-2×b×c) in
        cPointhb h_x_4501.
Definition X_4502 :=
        let h_x_4502 a b c := a^2*(b-c)*(b^2+3×b×c+c^2) in
        cPointhb h_x_4502.
Definition X_4503 :=
        let h_x_4503 a b c := a*(a^2+2×b×c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_4503.
Definition X_4504 :=
        let h_x_4504 a b c := (3×a-b-c)*(b-c)*(a^2+b×c) in
        cPointhb h_x_4504.
Definition X_4505 :=
        let h_x_4505 a b c := (a-b)*b*(a-c)*c*(b^2+b×c+c^2) in
        cPointhb h_x_4505.
Definition X_4506 :=
        let h_x_4506 a b c := b×c*(-2×a+b+c)*(a^2+2×b×c) in
        cPointhb h_x_4506.
Definition X_4507 :=
        let h_x_4507 a b c := a^3*(b-c)*(b^2+3×b×c+c^2) in
        cPointhb h_x_4507.
Definition X_4508 :=
        let h_x_4508 a b c := (b-c)*(-a^2+b×c)*(a^2+2×b×c) in
        cPointhb h_x_4508.
Definition X_4509 :=
        let h_x_4509 a b c := b*(b-c)*c*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_4509.
Definition X_4510 :=
        let h_x_4510 a b c := (a+b-2×c)*(a-2×b+c)*(a^2+2×b×c) in
        cPointhb h_x_4510.
Definition X_4511 :=
        let h_x_4511 a b c := a*(a-b-c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4511.
Definition X_4512 :=
        let h_x_4512 a b c := a*(a-b-c)*(3×a+b+c) in
        cPointhb h_x_4512.
Definition X_4513 :=
        let h_x_4513 a b c := a*(a-b-c)*(a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_4513.
Definition X_4514 :=
        let h_x_4514 a b c := (a-b-c)*(a^2+b^2-b×c+c^2) in
        cPointhb h_x_4514.
Definition X_4515 :=
        let h_x_4515 a b c := a×(a-b-c)^2*(b+c) in
        cPointhb h_x_4515.
Definition X_4516 :=
        let h_x_4516 a b c := a*(a-b-c)*(-b+c)^2*(b+c) in
        cPointhb h_x_4516.
Definition X_4517 :=
        let h_x_4517 a b c := a^2*(a-b-c)*(b^2+b×c+c^2) in
        cPointhb h_x_4517.
Definition X_4518 :=
        let h_x_4518 a b c := (a-b-c)*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4518.
Definition X_4519 :=
        let h_x_4519 a b c := (a-b-c)*(a×b+a×c+4×b×c) in
        cPointhb h_x_4519.
Definition X_4520 :=
        let h_x_4520 a b c := a*(a-b-c)*(3×a×b+b^2+3×a×c+c^2) in
        cPointhb h_x_4520.
Definition X_4521 :=
        let h_x_4521 a b c := (a-b-c)*(3×a-b-c)*(b-c) in
        cPointhb h_x_4521.
Definition X_4522 :=
        let h_x_4522 a b c := (a-b-c)*(b-c)*(b^2+b×c+c^2) in
        cPointhb h_x_4522.
Definition X_4523 :=
        let h_x_4523 a b c := a*(b+c)*(a^4-b^4-2×a^2×b×c-c^4) in
        cPointhb h_x_4523.
Definition X_4524 :=
        let h_x_4524 a b c := a^2×(a-b-c)^2*(b-c)*(b+c) in
        cPointhb h_x_4524.
Definition X_4525 :=
        let h_x_4525 a b c := a*(b+c)*(4×a^2-4×b^2+b×c-4×c^2) in
        cPointhb h_x_4525.
Definition X_4526 :=
        let h_x_4526 a b c := a*(a-b-c)*(b-c)*(a×b+a×c-2×b×c) in
        cPointhb h_x_4526.
Definition X_4527 :=
        let h_x_4527 a b c := (b+c)*(-2×a^2+b^2+3×b×c+c^2) in
        cPointhb h_x_4527.
Definition X_4528 :=
        let h_x_4528 a b c := (a-b-c)^2*(2×a-b-c)*(b-c) in
        cPointhb h_x_4528.
Definition X_4529 :=
        let h_x_4529 a b c := (a-b-c)^2*(b-c)*(a^2+b×c) in
        cPointhb h_x_4529.
Definition X_4530 :=
        let h_x_4530 a b c := (a-b-c)*(2×a-b-c)*(-b+c)^2 in
        cPointhb h_x_4530.
Definition X_4531 :=
        let h_x_4531 a b c := a^3*(a-b-c)*(b+c)*(b^2-b×c+c^2) in
        cPointhb h_x_4531.
Definition X_4532 :=
        let h_x_4532 a b c := a*(b+c)*(5×a^2-5×b^2-b×c-5×c^2) in
        cPointhb h_x_4532.
Definition X_4533 :=
        let h_x_4533 a b c := a*(b+c)*(3×a^2-3×b^2-4×b×c-3×c^2) in
        cPointhb h_x_4533.
Definition X_4534 :=
        let h_x_4534 a b c := (b-c)^2*(-3×a+b+c)*(-a+b+c) in
        cPointhb h_x_4534.
Definition X_4535 :=
        let h_x_4535 a b c := -((b+c)*(a^2-2×b^2-3×b×c-2×c^2)) in
        cPointhb h_x_4535.
Definition X_4536 :=
        let h_x_4536 a b c := a*(b+c)*(5×a^2-5×b^2+b×c-5×c^2) in
        cPointhb h_x_4536.
Definition X_4537 :=
        let h_x_4537 a b c := a*(b+c)*(4×a^2-4×b^2-b×c-4×c^2) in
        cPointhb h_x_4537.
Definition X_4538 :=
        let h_x_4538 a b c := a*(a-b-c)*(b+c)*(a^2+b^2+b×c+c^2) in
        cPointhb h_x_4538.
Definition X_4539 :=
        let h_x_4539 a b c := a*(b+c)*(5×a^2-5×b^2-4×b×c-5×c^2) in
        cPointhb h_x_4539.
Definition X_4540 :=
        let h_x_4540 a b c := a*(b+c)*(a^2-b^2-7×b×c-c^2) in
        cPointhb h_x_4540.
Definition X_4541 :=
        let h_x_4541 a b c := (a-b-c)*(2×a^3+b^3-4×a×b×c+c^3) in
        cPointhb h_x_4541.
Definition X_4542 :=
        let h_x_4542 a b c := (a-b-c)*(2×a-b-c)^2×(b-c)^2 in
        cPointhb h_x_4542.
Definition X_4543 :=
        let h_x_4543 a b c := (a-b-c)*(2×a-b-c)^2*(b-c) in
        cPointhb h_x_4543.
Definition X_4544 :=
        let h_x_4544 a b c := (a-b-c)*(2×a^3+b^3+2×a×b×c+c^3) in
        cPointhb h_x_4544.
Definition X_4545 :=
        let h_x_4545 a b c := (a-b-c)*(6×a+5×b+5×c) in
        cPointhb h_x_4545.
Definition X_4546 :=
        let h_x_4546 a b c := (b-c)*(-3×a+b+c)*(-a+b+c)^2 in
        cPointhb h_x_4546.
Definition X_4547 :=
        let h_x_4547 a b c := a*(b+c)*(3×a^2-3×b^2-5×b×c-3×c^2) in
        cPointhb h_x_4547.
Definition X_4548 :=
        let h_x_4548 a b c := a^4*(a-b-c)*(a^4-b^4-c^4) in
        cPointhb h_x_4548.
Definition X_4549 :=
        let h_x_4549 a b c := (a^2-b^2-c^2)*(3×a^8-8×a^4×b^4+4×a^2×b^6+b^8+4×a^4×b^2×c^2-4×a^2×b^4×c^2-4×b^6×c^2-8×a^4×c^4-4×a^2×b^2×c^4+6×b^4×c^4+4×a^2×c^6-4×b^2×c^6+c^8) in
        cPointhb h_x_4549.
Definition X_4550 :=
        let h_x_4550 a b c := a^2*(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+4×b^2×c^2+c^4) in
        cPointhb h_x_4550.
Definition X_4551 :=
        let h_x_4551 a b c := a*(a-b)*(a-c)*(a+b-c)*(a-b+c)*(b+c) in
        cPointhb h_x_4551.
Definition X_4552 :=
        let h_x_4552 a b c := (a-b)*(a-c)*(a+b-c)*(a-b+c)*(b+c) in
        cPointhb h_x_4552.
Definition X_4553 :=
        let h_x_4553 a b c := a*(a-b)*(a-c)*(b^2+c^2) in
        cPointhb h_x_4553.
Definition X_4554 :=
        let h_x_4554 a b c := (a-b)*b*(a-c)*(a+b-c)*c*(a-b+c) in
        cPointhb h_x_4554.
Definition X_4555 :=
        let h_x_4555 a b c := (a-b)*(a+b-2×c)*(a-c)*(a-2×b+c) in
        cPointhb h_x_4555.
Definition X_4556 :=
        let h_x_4556 a b c := a^2*(a-b)*(a+b)^2*(a-c)*(a+c)^2 in
        cPointhb h_x_4556.
Definition X_4557 :=
        let h_x_4557 a b c := a^2*(a-b)*(a-c)*(b+c) in
        cPointhb h_x_4557.
Definition X_4558 :=
        let h_x_4558 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4558.
Definition X_4559 :=
        let h_x_4559 a b c := a^2*(a-b)*(a-c)*(a+b-c)*(a-b+c)*(b+c) in
        cPointhb h_x_4559.
Definition X_4560 :=
        let h_x_4560 a b c := (a+b)*(a-b-c)*(b-c)*(a+c) in
        cPointhb h_x_4560.
Definition X_4561 :=
        let h_x_4561 a b c := (a-b)*(a-c)*(a^2-b^2-c^2) in
        cPointhb h_x_4561.
Definition X_4562 :=
        let h_x_4562 a b c := (a-b)*(a-c)*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4562.
Definition X_4563 :=
        let h_x_4563 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4563.
Definition X_4564 :=
        let h_x_4564 a b c := a×(a-b)^2×(a-c)^2*(a+b-c)*(a-b+c) in
        cPointhb h_x_4564.
Definition X_4565 :=
        let h_x_4565 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+b-c)*(a+c)*(a-b+c) in
        cPointhb h_x_4565.
Definition X_4566 :=
        let h_x_4566 a b c := (a-b)*(a-c)*(a+b-c)^2×(a-b+c)^2*(b+c) in
        cPointhb h_x_4566.
Definition X_4567 :=
        let h_x_4567 a b c := a×(a-b)^2*(a+b)*(a-c)^2*(a+c) in
        cPointhb h_x_4567.
Definition X_4568 :=
        let h_x_4568 a b c := (a-b)*(a-c)*(b^2+c^2) in
        cPointhb h_x_4568.
Definition X_4569 :=
        let h_x_4569 a b c := (a-b)*b*(a-c)*(a+b-c)^2×c×(a-b+c)^2 in
        cPointhb h_x_4569.
Definition X_4570 :=
        let h_x_4570 a b c := a^2×(a-b)^2*(a+b)*(a-c)^2*(a+c) in
        cPointhb h_x_4570.
Definition X_4571 :=
        let h_x_4571 a b c := a*(a-b)*(a-c)*(a-b-c)*(a^2-b^2-c^2) in
        cPointhb h_x_4571.
Definition X_4572 :=
        let h_x_4572 a b c := (a-b)*b^2*(a-c)*(a+b-c)*c^2*(a-b+c) in
        cPointhb h_x_4572.
Definition X_4573 :=
        let h_x_4573 a b c := (a-b)*(a+b)*(a-c)*(a+b-c)*(a+c)*(a-b+c) in
        cPointhb h_x_4573.
Definition X_4574 :=
        let h_x_4574 a b c := a^2*(a-b)*(a-c)*(b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4574.
Definition X_4575 :=
        let h_x_4575 a b c := a^3*(a-b)*(a+b)*(a-c)*(a+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4575.
Definition X_4576 :=
        let h_x_4576 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(b^2+c^2) in
        cPointhb h_x_4576.
Definition X_4577 :=
        let h_x_4577 a b c := (a-b)*(a+b)*(a^2+b^2)*(a-c)*(a+c)*(a^2+c^2) in
        cPointhb h_x_4577.
Definition X_4578 :=
        let h_x_4578 a b c := a*(a-b)*(a-c)*(a-b-c)^2 in
        cPointhb h_x_4578.
Definition X_4579 :=
        let h_x_4579 a b c := a*(a-b)*(a-c)*(a^2+b×c) in
        cPointhb h_x_4579.
Definition X_4580 :=
        let h_x_4580 a b c := (a^2+b^2)*(b-c)*(b+c)*(a^2-b^2-c^2)*(a^2+c^2) in
        cPointhb h_x_4580.
Definition X_4581 :=
        let h_x_4581 a b c := (b-c)*(a^2+b^2+a×c+b×c)*(a^2+a×b+b×c+c^2) in
        cPointhb h_x_4581.
Definition X_4582 :=
        let h_x_4582 a b c := (a-b)*(a+b-2×c)*(a-c)*(a-b-c)*(a-2×b+c) in
        cPointhb h_x_4582.
Definition X_4583 :=
        let h_x_4583 a b c := (a-b)*b*(a-c)*c*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4583.
Definition X_4584 :=
        let h_x_4584 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4584.
Definition X_4585 :=
        let h_x_4585 a b c := a*(a-b)*(a-c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4585.
Definition X_4586 :=
        let h_x_4586 a b c := (a-b)*(a^2+a×b+b^2)*(a-c)*(a^2+a×c+c^2) in
        cPointhb h_x_4586.
Definition X_4587 :=
        let h_x_4587 a b c := a^2*(a-b)*(a-c)*(a-b-c)*(a^2-b^2-c^2) in
        cPointhb h_x_4587.
Definition X_4588 :=
        let h_x_4588 a b c := a^2*(a-b)*(a-c)*(2×a+2×b-c)*(2×a-b+2×c) in
        cPointhb h_x_4588.
Definition X_4589 :=
        let h_x_4589 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4589.
Definition X_4590 :=
        let h_x_4590 a b c := (a-b)^2×(a+b)^2×(a-c)^2×(a+c)^2 in
        cPointhb h_x_4590.
Definition X_4591 :=
        let h_x_4591 a b c := a^2*(a-b)*(a+b)*(a+b-2×c)*(a-c)*(a+c)*(a-2×b+c) in
        cPointhb h_x_4591.
Definition X_4592 :=
        let h_x_4592 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4592.
Definition X_4593 :=
        let h_x_4593 a b c := (a-b)*b*(a+b)*(a^2+b^2)*(a-c)*c*(a+c)*(a^2+c^2) in
        cPointhb h_x_4593.
Definition X_4594 :=
        let h_x_4594 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(b^2+a×c)*(a×b+c^2) in
        cPointhb h_x_4594.
Definition X_4595 :=
        let h_x_4595 a b c := (a-b)*(a-c)*(a×b+a×c-b×c) in
        cPointhb h_x_4595.
Definition X_4596 :=
        let h_x_4596 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a+2×b+c)*(a+b+2×c) in
        cPointhb h_x_4596.
Definition X_4597 :=
        let h_x_4597 a b c := (a-b)*(a-c)*(2×a+2×b-c)*(2×a-b+2×c) in
        cPointhb h_x_4597.
Definition X_4598 :=
        let h_x_4598 a b c := (a-b)*(a-c)*(a×b-a×c-b×c)*(a×b-a×c+b×c) in
        cPointhb h_x_4598.
Definition X_4599 :=
        let h_x_4599 a b c := a*(a-b)*(a+b)*(a^2+b^2)*(a-c)*(a+c)*(a^2+c^2) in
        cPointhb h_x_4599.
Definition X_4600 :=
        let h_x_4600 a b c := (a-b)^2*(a+b)*(a-c)^2*(a+c) in
        cPointhb h_x_4600.
Definition X_4601 :=
        let h_x_4601 a b c := (a-b)^2×b*(a+b)*(a-c)^2×c*(a+c) in
        cPointhb h_x_4601.
Definition X_4602 :=
        let h_x_4602 a b c := (a-b)*b^3*(a+b)*(a-c)*c^3*(a+c) in
        cPointhb h_x_4602.
Definition X_4603 :=
        let h_x_4603 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(b^2+a×c)*(a×b+c^2) in
        cPointhb h_x_4603.
Definition X_4604 :=
        let h_x_4604 a b c := a*(a-b)*(a-c)*(2×a+2×b-c)*(2×a-b+2×c) in
        cPointhb h_x_4604.
Definition X_4605 :=
        let h_x_4605 a b c := (a-b)*(a-c)*(a+b-c)^2×(a-b+c)^2×(b+c)^2 in
        cPointhb h_x_4605.
Definition X_4606 :=
        let h_x_4606 a b c := a*(a-b)*(a-c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_4606.
Definition X_4607 :=
        let h_x_4607 a b c := (a-b)*(a-c)*(2×a×b-a×c-b×c)*(a×b-2×a×c+b×c) in
        cPointhb h_x_4607.
Definition X_4608 :=
        let h_x_4608 a b c := (b-c)*(a+2×b+c)*(a+b+2×c) in
        cPointhb h_x_4608.
Definition X_4609 :=
        let h_x_4609 a b c := (a-b)*b^4*(a+b)*(a-c)*c^4*(a+c) in
        cPointhb h_x_4609.
Definition X_4610 :=
        let h_x_4610 a b c := (a-b)*(a+b)^2*(a-c)*(a+c)^2 in
        cPointhb h_x_4610.
Definition X_4611 :=
        let h_x_4611 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a^4-b^4-c^4) in
        cPointhb h_x_4611.
Definition X_4612 :=
        let h_x_4612 a b c := a*(a-b)*(a+b)^2*(a-c)*(a-b-c)*(a+c)^2 in
        cPointhb h_x_4612.
Definition X_4613 :=
        let h_x_4613 a b c := (a-b)*(a^2+a×b+b^2)*(a-c)*(b+c)*(a^2+a×c+c^2) in
        cPointhb h_x_4613.
Definition X_4614 :=
        let h_x_4614 a b c := a*(a-b)*(a+b)*(a-c)*(a+c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_4614.
Definition X_4615 :=
        let h_x_4615 a b c := (a-b)*(a+b)*(a+b-2×c)*(a-c)*(a+c)*(a-2×b+c) in
        cPointhb h_x_4615.
Definition X_4616 :=
        let h_x_4616 a b c := (a-b)*(a+b)*(a-c)*(a+b-c)^2*(a+c)*(a-b+c)^2 in
        cPointhb h_x_4616.
Definition X_4617 :=
        let h_x_4617 a b c := a*(a-b)*(a-c)*(a+b-c)^3×(a-b+c)^3 in
        cPointhb h_x_4617.
Definition X_4618 :=
        let h_x_4618 a b c := a*(a-b)*(a+b-2×c)^2*(a-c)*(a-2×b+c)^2 in
        cPointhb h_x_4618.
Definition X_4619 :=
        let h_x_4619 a b c := a^2×(a-b)^3×(a-c)^3×(a+b-c)^2×(a-b+c)^2 in
        cPointhb h_x_4619.
Definition X_4620 :=
        let h_x_4620 a b c := (a-b)^2*(a+b)*(a-c)^2*(a+b-c)*(a+c)*(a-b+c) in
        cPointhb h_x_4620.
Definition X_4621 :=
        let h_x_4621 a b c := (a-b)*(a^2-a×b+b^2)*(a-c)*(a^2-a×c+c^2) in
        cPointhb h_x_4621.
Definition X_4622 :=
        let h_x_4622 a b c := a*(a-b)*(a+b)*(a+b-2×c)*(a-c)*(a+c)*(a-2×b+c) in
        cPointhb h_x_4622.
Definition X_4623 :=
        let h_x_4623 a b c := (a-b)*b×(a+b)^2*(a-c)*c×(a+c)^2 in
        cPointhb h_x_4623.
Definition X_4624 :=
        let h_x_4624 a b c := (a-b)*(a-c)*(a+b-c)*(a-b+c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_4624.
Definition X_4625 :=
        let h_x_4625 a b c := (a-b)*b*(a+b)*(a-c)*(a+b-c)*c*(a+c)*(a-b+c) in
        cPointhb h_x_4625.
Definition X_4626 :=
        let h_x_4626 a b c := (a-b)*(a-c)*(a+b-c)^3×(a-b+c)^3 in
        cPointhb h_x_4626.
Definition X_4627 :=
        let h_x_4627 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_4627.
Definition X_4628 :=
        let h_x_4628 a b c := a^2*(a-b)*(a^2+b^2)*(a-c)*(a^2+c^2) in
        cPointhb h_x_4628.
Definition X_4629 :=
        let h_x_4629 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a+2×b+c)*(a+b+2×c) in
        cPointhb h_x_4629.
Definition X_4630 :=
        let h_x_4630 a b c := a^4*(a-b)*(a+b)*(a^2+b^2)*(a-c)*(a+c)*(a^2+c^2) in
        cPointhb h_x_4630.
Definition X_4631 :=
        let h_x_4631 a b c := b*(-a+b)*(a+b)^2*(a-c)*c×(a+c)^2*(-a+b+c) in
        cPointhb h_x_4631.
Definition X_4632 :=
        let h_x_4632 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(a+2×b+c)*(a+b+2×c) in
        cPointhb h_x_4632.
Definition X_4633 :=
        let h_x_4633 a b c := (a-b)*(a+b)*(a-c)*(a+c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_4633.
Definition X_4634 :=
        let h_x_4634 a b c := (a-b)*b*(a+b)*(a+b-2×c)*(a-c)*c*(a+c)*(a-2×b+c) in
        cPointhb h_x_4634.
Definition X_4635 :=
        let h_x_4635 a b c := (a-b)*b*(a+b)*(a-c)*(a+b-c)^2×c*(a+c)*(a-b+c)^2 in
        cPointhb h_x_4635.
Definition X_4636 :=
        let h_x_4636 a b c := a^2*(a-b)*(a+b)^2*(a-c)*(a-b-c)*(a+c)^2 in
        cPointhb h_x_4636.
Definition X_4637 :=
        let h_x_4637 a b c := a*(a-b)*(a+b)*(a-c)*(a+b-c)^2*(a+c)*(a-b+c)^2 in
        cPointhb h_x_4637.
Definition X_4638 :=
        let h_x_4638 a b c := a^2*(a-b)*(a+b-2×c)^2*(a-c)*(a-2×b+c)^2 in
        cPointhb h_x_4638.
Definition X_4639 :=
        let h_x_4639 a b c := (a-b)*b*(a+b)*(a-c)*c*(a+c)*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4639.
Definition X_4640 :=
        let h_x_4640 a b c := a*(2×a^2-a×b-b^2-a×c-c^2) in
        cPointhb h_x_4640.
Definition X_4641 :=
        let h_x_4641 a b c := a*(2×a^2+a×b-b^2+a×c-c^2) in
        cPointhb h_x_4641.
Definition X_4642 :=
        let h_x_4642 a b c := a*(b+c)*(a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_4642.
Definition X_4643 :=
        let h_x_4643 a b c := -a^2+a×b+b^2+a×c+c^2 in
        cPointhb h_x_4643.
Definition X_4644 :=
        let h_x_4644 a b c := -3×a^2+b^2-2×b×c+c^2 in
        cPointhb h_x_4644.
Definition X_4645 :=
        let h_x_4645 a b c := -a^3+b^3-a×b×c+c^3 in
        cPointhb h_x_4645.
Definition X_4646 :=
        let h_x_4646 a b c := a*(b+c)*(a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_4646.
Definition X_4647 :=
        let h_x_4647 a b c := b×c*(b+c)*(2×a+b+c) in
        cPointhb h_x_4647.
Definition X_4648 :=
        let h_x_4648 a b c := -a^2-2×a×b+b^2-2×a×c-2×b×c+c^2 in
        cPointhb h_x_4648.
Definition X_4649 :=
        let h_x_4649 a b c := a*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4649.
Definition X_4650 :=
        let h_x_4650 a b c := a*(2×a^2-b^2+b×c-c^2) in
        cPointhb h_x_4650.
Definition X_4651 :=
        let h_x_4651 a b c := (b+c)*(-a^2+a×b+a×c+b×c) in
        cPointhb h_x_4651.
Definition X_4652 :=
        let h_x_4652 a b c := a*(3×a+b+c)*(a^2-b^2-c^2) in
        cPointhb h_x_4652.
Definition X_4653 :=
        let h_x_4653 a b c := a*(a+b)*(a-2×b-2×c)*(a+c) in
        cPointhb h_x_4653.
Definition X_4654 :=
        let h_x_4654 a b c := (a+b-c)*(a-b+c)*(a+2×b+2×c) in
        cPointhb h_x_4654.
Definition X_4655 :=
        let h_x_4655 a b c := -a^3+a×b^2+b^3+a×c^2+c^3 in
        cPointhb h_x_4655.
Definition X_4656 :=
        let h_x_4656 a b c := (b+c)*(a^2+2×a×b+b^2+2×a×c-2×b×c+c^2) in
        cPointhb h_x_4656.
Definition X_4657 :=
        let h_x_4657 a b c := a^2+a×b+b^2+a×c+c^2 in
        cPointhb h_x_4657.
Definition X_4658 :=
        let h_x_4658 a b c := a*(a+b)*(a+c)*(a+2×b+2×c) in
        cPointhb h_x_4658.
Definition X_4659 :=
        let h_x_4659 a b c := -a^2+a×b+a×c-4×b×c in
        cPointhb h_x_4659.
Definition X_4660 :=
        let h_x_4660 a b c := -a^3+a^2×b+b^3+a^2×c+c^3 in
        cPointhb h_x_4660.
Definition X_4661 :=
        let h_x_4661 a b c := a*(2×a×b-2×b^2+2×a×c-b×c-2×c^2) in
        cPointhb h_x_4661.
Definition X_4662 :=
        let h_x_4662 a b c := a*(a-b-c)*(a×b+b^2+a×c+4×b×c+c^2) in
        cPointhb h_x_4662.
Definition X_4663 :=
        let h_x_4663 a b c := a*(2×a^2+3×a×b-b^2+3×a×c-c^2) in
        cPointhb h_x_4663.
Definition X_4664 :=
        let h_x_4664 a b c := -2×a×b-2×a×c+b×c in
        cPointhb h_x_4664.
Definition X_4665 :=
        let h_x_4665 a b c := b^2+4×b×c+c^2 in
        cPointhb h_x_4665.
Definition X_4666 :=
        let h_x_4666 a b c := a*(a^2-2×a×b+b^2-2×a×c-4×b×c+c^2) in
        cPointhb h_x_4666.
Definition X_4667 :=
        let h_x_4667 a b c := -4×a^2-a×b+b^2-a×c-2×b×c+c^2 in
        cPointhb h_x_4667.
Definition X_4668 :=
        let h_x_4668 a b c := 3×a-4×b-4×c in
        cPointhb h_x_4668.
Definition X_4669 :=
        let h_x_4669 a b c := 4×a-5×b-5×c in
        cPointhb h_x_4669.
Definition X_4670 :=
        let h_x_4670 a b c := 2×a^2+a×b+a×c+2×b×c in
        cPointhb h_x_4670.
Definition X_4671 :=
        let h_x_4671 a b c := b×c*(-a+2×b+2×c) in
        cPointhb h_x_4671.
Definition X_4672 :=
        let h_x_4672 a b c := 2×a^3+a^2×b+a^2×c+b^2×c+b×c^2 in
        cPointhb h_x_4672.
Definition X_4673 :=
        let h_x_4673 a b c := b×c*(-a+b+c)*(3×a+b+c) in
        cPointhb h_x_4673.
Definition X_4674 :=
        let h_x_4674 a b c := a*(a+b-2×c)*(a-2×b+c)*(b+c) in
        cPointhb h_x_4674.
Definition X_4675 :=
        let h_x_4675 a b c := a^2+a×b-b^2+a×c+2×b×c-c^2 in
        cPointhb h_x_4675.
Definition X_4676 :=
        let h_x_4676 a b c := 2×a^3-a×b×c+b^2×c+b×c^2 in
        cPointhb h_x_4676.
Definition X_4677 :=
        let h_x_4677 a b c := 5×a-4×b-4×c in
        cPointhb h_x_4677.
Definition X_4678 :=
        let h_x_4678 a b c := 3×a-5×b-5×c in
        cPointhb h_x_4678.
Definition X_4679 :=
        let h_x_4679 a b c := (a-b-c)*(a^2+a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_4679.
Definition X_4680 :=
        let h_x_4680 a b c := -a^4+b^4+b^3×c+b×c^3+c^4 in
        cPointhb h_x_4680.
Definition X_4681 :=
        let h_x_4681 a b c := 3×a×b+3×a×c-2×b×c in
        cPointhb h_x_4681.
Definition X_4682 :=
        let h_x_4682 a b c := a*(2×a^2+a×b+b^2+a×c+4×b×c+c^2) in
        cPointhb h_x_4682.
Definition X_4683 :=
        let h_x_4683 a b c := -a^3+a×b^2+b^3+a×b×c+a×c^2+c^3 in
        cPointhb h_x_4683.
Definition X_4684 :=
        let h_x_4684 a b c := (3×a+b+c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_4684.
Definition X_4685 :=
        let h_x_4685 a b c := (b+c)*(-2×a^2+a×b+a×c+b×c) in
        cPointhb h_x_4685.
Definition X_4686 :=
        let h_x_4686 a b c := a×b+a×c-4×b×c in
        cPointhb h_x_4686.
Definition X_4687 :=
        let h_x_4687 a b c := 2×a×b+2×a×c+b×c in
        cPointhb h_x_4687.
Definition X_4688 :=
        let h_x_4688 a b c := a×b+a×c+4×b×c in
        cPointhb h_x_4688.
Definition X_4689 :=
        let h_x_4689 a b c := a*(2×a^2-3×a×b-b^2-3×a×c-c^2) in
        cPointhb h_x_4689.
Definition X_4690 :=
        let h_x_4690 a b c := -2×a^2+a×b+2×b^2+a×c+2×b×c+2×c^2 in
        cPointhb h_x_4690.
Definition X_4691 :=
        let h_x_4691 a b c := 2×a-5×b-5×c in
        cPointhb h_x_4691.
Definition X_4692 :=
        let h_x_4692 a b c := b×c*(2×a^2+b^2+2×b×c+c^2) in
        cPointhb h_x_4692.
Definition X_4693 :=
        let h_x_4693 a b c := (a-2×b-2×c)*(a^2-b×c) in
        cPointhb h_x_4693.
Definition X_4694 :=
        let h_x_4694 a b c := a*(a×b^2+b^3-4×a×b×c+a×c^2+c^3) in
        cPointhb h_x_4694.
Definition X_4695 :=
        let h_x_4695 a b c := a*(b+c)*(a×b+b^2+a×c-4×b×c+c^2) in
        cPointhb h_x_4695.
Definition X_4696 :=
        let h_x_4696 a b c := b×c*(2×a^2-a×b+b^2-a×c+2×b×c+c^2) in
        cPointhb h_x_4696.
Definition X_4697 :=
        let h_x_4697 a b c := (2×a+b+c)*(a^2+b×c) in
        cPointhb h_x_4697.
Definition X_4698 :=
        let h_x_4698 a b c := -3×a×b-3×a×c-2×b×c in
        cPointhb h_x_4698.
Definition X_4699 :=
        let h_x_4699 a b c := a×b+a×c+3×b×c in
        cPointhb h_x_4699.
Definition X_4700 :=
        let h_x_4700 a b c := (2×a-b-c)*(3×a+b+c) in
        cPointhb h_x_4700.
Definition X_4701 :=
        let h_x_4701 a b c := 6×a-5×b-5×c in
        cPointhb h_x_4701.
Definition X_4702 :=
        let h_x_4702 a b c := (2×a-b-c)*(a^2-a×b-a×c-2×b×c) in
        cPointhb h_x_4702.
Definition X_4703 :=
        let h_x_4703 a b c := -a^3+a×b^2+b^3+2×a×b×c+a×c^2+c^3 in
        cPointhb h_x_4703.
Definition X_4704 :=
        let h_x_4704 a b c := -3×a×b-3×a×c+b×c in
        cPointhb h_x_4704.
Definition X_4705 :=
        let h_x_4705 a b c := a*(b-c)*(b+c)^2 in
        cPointhb h_x_4705.
Definition X_4706 :=
        let h_x_4706 a b c := (3×a+b+c)*(a×b+a×c-2×b×c) in
        cPointhb h_x_4706.
Definition X_4707 :=
        let h_x_4707 a b c := (b-c)*(b+c)*(-a^2+b^2-b×c+c^2) in
        cPointhb h_x_4707.
Definition X_4708 :=
        let h_x_4708 a b c := -3×a×b-2×b^2-3×a×c-2×b×c-2×c^2 in
        cPointhb h_x_4708.
Definition X_4709 :=
        let h_x_4709 a b c := (b+c)*(-2×a^2+a×b+a×c+3×b×c) in
        cPointhb h_x_4709.
Definition X_4710 :=
        let h_x_4710 a b c := b×c*(b+c)*(a^3+b^2×c+b×c^2) in
        cPointhb h_x_4710.
Definition X_4711 :=
        let h_x_4711 a b c := a*(a-b-c)*(a×b+b^2+a×c+8×b×c+c^2) in
        cPointhb h_x_4711.
Definition X_4712 :=
        let h_x_4712 a b c := a×(a×b-b^2+a×c-c^2)^2 in
        cPointhb h_x_4712.
Definition X_4713 :=
        let h_x_4713 a b c := a^3×b+a^3×c-a^2×b×c+2×b^2×c^2 in
        cPointhb h_x_4713.
Definition X_4714 :=
        let h_x_4714 a b c := b×c*(b+c)*(4×a+b+c) in
        cPointhb h_x_4714.
Definition X_4715 :=
        let h_x_4715 a b c := -4×a^2+a×b+2×b^2+a×c-2×b×c+2×c^2 in
        cPointhb h_x_4715.
Definition X_4716 :=
        let h_x_4716 a b c := (a+2×b+2×c)*(a^2-b×c) in
        cPointhb h_x_4716.
Definition X_4717 :=
        let h_x_4717 a b c := -(b*(a-2×b-2×c)*c*(2×a+b+c)) in
        cPointhb h_x_4717.
Definition X_4718 :=
        let h_x_4718 a b c := 3×a×b+3×a×c-4×b×c in
        cPointhb h_x_4718.
Definition X_4719 :=
        let h_x_4719 a b c := a*(3×a+b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_4719.
Definition X_4720 :=
        let h_x_4720 a b c := (a+b)*(a-2×b-2×c)*(a-b-c)*(a+c) in
        cPointhb h_x_4720.
Definition X_4721 :=
        let h_x_4721 a b c := a^3×b+a^3×c+2×b^2×c^2 in
        cPointhb h_x_4721.
Definition X_4722 :=
        let h_x_4722 a b c := a*(2×a^2+2×a×b-b^2+2×a×c-c^2) in
        cPointhb h_x_4722.
Definition X_4723 :=
        let h_x_4723 a b c := b×c*(-2×a+b+c)*(-a+b+c) in
        cPointhb h_x_4723.
Definition X_4724 :=
        let h_x_4724 a b c := a*(b-c)*(a^2-a×b-a×c-2×b×c) in
        cPointhb h_x_4724.
Definition X_4725 :=
        let h_x_4725 a b c := 4×a^2+a×b-2×b^2+a×c-2×b×c-2×c^2 in
        cPointhb h_x_4725.
Definition X_4726 :=
        let h_x_4726 a b c := a×b+a×c-6×b×c in
        cPointhb h_x_4726.
Definition X_4727 :=
        let h_x_4727 a b c := (2×a-b-c)*(a+2×b+2×c) in
        cPointhb h_x_4727.
Definition X_4728 :=
        let h_x_4728 a b c := (b-c)*(-(a×b)-a×c+2×b×c) in
        cPointhb h_x_4728.
Definition X_4729 :=
        let h_x_4729 a b c := a*(3×a-b-c)*(b-c)*(b+c) in
        cPointhb h_x_4729.
Definition X_4730 :=
        let h_x_4730 a b c := a*(2×a-b-c)*(b-c)*(b+c) in
        cPointhb h_x_4730.
Definition X_4731 :=
        let h_x_4731 a b c := a*(b+c)*(a^2-b^2+10×b×c-c^2) in
        cPointhb h_x_4731.
Definition X_4732 :=
        let h_x_4732 a b c := (b+c)*(-a^2+2×a×b+2×a×c+3×b×c) in
        cPointhb h_x_4732.
Definition X_4733 :=
        let h_x_4733 a b c := (b+c)*(3×a×b+b^2+3×a×c+4×b×c+c^2) in
        cPointhb h_x_4733.
Definition X_4734 :=
        let h_x_4734 a b c := (3×a+b+c)*(a×b+a×c-b×c) in
        cPointhb h_x_4734.
Definition X_4735 :=
        let h_x_4735 a b c := a^2*(b+c)*(2×b^2-b×c+2×c^2) in
        cPointhb h_x_4735.
Definition X_4736 :=
        let h_x_4736 a b c := a×(b+c)^2×(a^2-b^2+b×c-c^2)^2 in
        cPointhb h_x_4736.
Definition X_4737 :=
        let h_x_4737 a b c := b×c*(3×a^2-2×a×b+b^2-2×a×c+2×b×c+c^2) in
        cPointhb h_x_4737.
Definition X_4738 :=
        let h_x_4738 a b c := b×c×(-2×a+b+c)^2 in
        cPointhb h_x_4738.
Definition X_4739 :=
        let h_x_4739 a b c := a×b+a×c+6×b×c in
        cPointhb h_x_4739.
Definition X_4740 :=
        let h_x_4740 a b c := a×b+a×c-5×b×c in
        cPointhb h_x_4740.
Definition X_4741 :=
        let h_x_4741 a b c := -2×a^2+a×b+2×b^2+a×c-b×c+2×c^2 in
        cPointhb h_x_4741.
Definition X_4742 :=
        let h_x_4742 a b c := b×c*(-2×a+b+c)*(3×a+b+c) in
        cPointhb h_x_4742.
Definition X_4743 :=
        let h_x_4743 a b c := (b+c)*(4×a^2+b^2-3×b×c+c^2) in
        cPointhb h_x_4743.
Definition X_4744 :=
        let h_x_4744 a b c := a*(b+c)*(4×a^2-4×b^2+7×b×c-4×c^2) in
        cPointhb h_x_4744.
Definition X_4745 :=
        let h_x_4745 a b c := 2×a-7×b-7×c in
        cPointhb h_x_4745.
Definition X_4746 :=
        let h_x_4746 a b c := 6×a-7×b-7×c in
        cPointhb h_x_4746.
Definition X_4747 :=
        let h_x_4747 a b c := -7×a^2-2×a×b+b^2-2×a×c-6×b×c+c^2 in
        cPointhb h_x_4747.
Definition X_4748 :=
        let h_x_4748 a b c := a^2-4×a×b-3×b^2-4×a×c-2×b×c-3×c^2 in
        cPointhb h_x_4748.
Definition X_4749 :=
        let h_x_4749 a b c := a^2*(a^2×b+b^3+a^2×c+2×a×b×c+c^3) in
        cPointhb h_x_4749.
Definition X_4750 :=
        let h_x_4750 a b c := -((b-c)*(-2×a^2+b^2+c^2)) in
        cPointhb h_x_4750.
Definition X_4751 :=
        let h_x_4751 a b c := -2×a×b-2×a×c-3×b×c in
        cPointhb h_x_4751.
Definition X_4752 :=
        let h_x_4752 a b c := a*(a-b)*(a-2×b-2×c)*(a-c) in
        cPointhb h_x_4752.
Definition X_4753 :=
        let h_x_4753 a b c := (2×a-b-c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4753.
Definition X_4754 :=
        let h_x_4754 a b c := (a^2+b×c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_4754.
Definition X_4755 :=
        let h_x_4755 a b c := -5×a×b-5×a×c-2×b×c in
        cPointhb h_x_4755.
Definition X_4756 :=
        let h_x_4756 a b c := (a-b)*(a-c)*(a+2×b+2×c) in
        cPointhb h_x_4756.
Definition X_4757 :=
        let h_x_4757 a b c := a*(b+c)*(3×a^2-3×b^2+5×b×c-3×c^2) in
        cPointhb h_x_4757.
Definition X_4758 :=
        let h_x_4758 a b c := 6×a^2+5×a×b+b^2+5×a×c+6×b×c+c^2 in
        cPointhb h_x_4758.
Definition X_4759 :=
        let h_x_4759 a b c := (2×a-b-c)*(2×a^2+a×b+a×c-b×c) in
        cPointhb h_x_4759.
Definition X_4760 :=
        let h_x_4760 a b c := (a^2-b×c)*(2×a^2-b^2-c^2) in
        cPointhb h_x_4760.
Definition X_4761 :=
        let h_x_4761 a b c := (b-c)*(b+c)*(2×a^2+b×c) in
        cPointhb h_x_4761.
Definition X_4762 :=
        let h_x_4762 a b c := (b-c)*(-a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_4762.
Definition X_4763 :=
        let h_x_4763 a b c := (b-c)*(3×a^2-2×a×b-2×a×c+b×c) in
        cPointhb h_x_4763.
Definition X_4764 :=
        let h_x_4764 a b c := 2×a×b+2×a×c-5×b×c in
        cPointhb h_x_4764.
Definition X_4765 :=
        let h_x_4765 a b c := -((a-b-c)*(b-c)*(3×a+b+c)) in
        cPointhb h_x_4765.
Definition X_4766 :=
        let h_x_4766 a b c := -(a^3×b)+b^4-a^3×c+c^4 in
        cPointhb h_x_4766.
Definition X_4767 :=
        let h_x_4767 a b c := (a-b)*(a-2×b-2×c)*(a-c) in
        cPointhb h_x_4767.
Definition X_4768 :=
        let h_x_4768 a b c := b*(b-c)*c*(-2×a+b+c)*(-a+b+c) in
        cPointhb h_x_4768.
Definition X_4769 :=
        let h_x_4769 a b c := -a^5+b^5+b^4×c+b×c^4+c^5 in
        cPointhb h_x_4769.
Definition X_4770 :=
        let h_x_4770 a b c := a*(a-2×b-2×c)*(b-c)*(b+c) in
        cPointhb h_x_4770.
Definition X_4771 :=
        let h_x_4771 a b c := (b+c)*(3×a+b+c)*(-a^2+b×c) in
        cPointhb h_x_4771.
Definition X_4772 :=
        let h_x_4772 a b c := a×b+a×c+5×b×c in
        cPointhb h_x_4772.
Definition X_4773 :=
        let h_x_4773 a b c := (2×a-b-c)*(b-c)*(3×a+b+c) in
        cPointhb h_x_4773.
Definition X_4774 :=
        let h_x_4774 a b c := (a-2×b-2×c)*(b-c)*(a^2+b×c) in
        cPointhb h_x_4774.
Definition X_4775 :=
        let h_x_4775 a b c := a^2*(a-2×b-2×c)*(b-c) in
        cPointhb h_x_4775.
Definition X_4776 :=
        let h_x_4776 a b c := (b-c)*(-2×a×b-2×a×c+b×c) in
        cPointhb h_x_4776.
Definition X_4777 :=
        let h_x_4777 a b c := (a-2×b-2×c)*(b-c) in
        cPointhb h_x_4777.
Definition X_4778 :=
        let h_x_4778 a b c := (b-c)*(3×a+b+c) in
        cPointhb h_x_4778.
Definition X_4779 :=
        let h_x_4779 a b c := (a-b-c)*(7×a^2+b^2-6×b×c+c^2) in
        cPointhb h_x_4779.
Definition X_4780 :=
        let h_x_4780 a b c := (b+c)*(5×a^2+b^2-4×b×c+c^2) in
        cPointhb h_x_4780.
Definition X_4781 :=
        let h_x_4781 a b c := (a-b)*(a-c)*(4×a+b+c) in
        cPointhb h_x_4781.
Definition X_4782 :=
        let h_x_4782 a b c := a*(b-c)*(2×a^2+a×b+a×c-b×c) in
        cPointhb h_x_4782.
Definition X_4783 :=
        let h_x_4783 a b c := b×c*(b+c)*(-2×a+b+c)*(-a^2+b×c) in
        cPointhb h_x_4783.
Definition X_4784 :=
        let h_x_4784 a b c := a*(b-c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4784.
Definition X_4785 :=
        let h_x_4785 a b c := (b-c)*(-2×a^2-a×b-a×c+b×c) in
        cPointhb h_x_4785.
Definition X_4786 :=
        let h_x_4786 a b c := (b-c)*(-5×a^2+b^2+c^2) in
        cPointhb h_x_4786.
Definition X_4787 :=
        let h_x_4787 a b c := a^2*(a-2×b-2×c)*(b^2-b×c+c^2) in
        cPointhb h_x_4787.
Definition X_4788 :=
        let h_x_4788 a b c := 3×a×b+3×a×c-5×b×c in
        cPointhb h_x_4788.
Definition X_4789 :=
        let h_x_4789 a b c := (b-c)*(a^2+b^2+3×b×c+c^2) in
        cPointhb h_x_4789.
Definition X_4790 :=
        let h_x_4790 a b c := a*(b-c)*(3×a+b+c) in
        cPointhb h_x_4790.
Definition X_4791 :=
        let h_x_4791 a b c := b*(b-c)*c*(-a+2×b+2×c) in
        cPointhb h_x_4791.
Definition X_4792 :=
        let h_x_4792 a b c := a*(a-2×b-2×c)*(a+b-2×c)*(a-2×b+c) in
        cPointhb h_x_4792.
Definition X_4793 :=
        let h_x_4793 a b c := -(b*(a-2×b-2×c)*c*(4×a+b+c)) in
        cPointhb h_x_4793.
Definition X_4794 :=
        let h_x_4794 a b c := a*(b-c)*(2×a^2-2×a×b-2×a×c-b×c) in
        cPointhb h_x_4794.
Definition X_4795 :=
        let h_x_4795 a b c := -5×a^2-a×b+b^2-a×c-4×b×c+c^2 in
        cPointhb h_x_4795.
Definition X_4796 :=
        let h_x_4796 a b c := 8×a^2+a×b-2×b^2+a×c+6×b×c-2×c^2 in
        cPointhb h_x_4796.
Definition X_4797 :=
        let h_x_4797 a b c := 2×a^4+a^3×b+a^3×c+b^3×c+b×c^3 in
        cPointhb h_x_4797.
Definition X_4798 :=
        let h_x_4798 a b c := 3×a^2+3×a×b+b^2+3×a×c+4×b×c+c^2 in
        cPointhb h_x_4798.
Definition X_4799 :=
        let h_x_4799 a b c := -a^4+a×b^3+b^4+a×c^3+c^4 in
        cPointhb h_x_4799.
Definition X_4800 :=
        let h_x_4800 a b c := (a-2×b-2×c)*(b-c)*(a^2-b×c) in
        cPointhb h_x_4800.
Definition X_4801 :=
        let h_x_4801 a b c := b*(b-c)*c*(3×a+b+c) in
        cPointhb h_x_4801.
Definition X_4802 :=
        let h_x_4802 a b c := (b-c)*(a+2×b+2×c) in
        cPointhb h_x_4802.
Definition X_4803 :=
        let h_x_4803 a b c := (a+b)*(a-2×b-2×c)^2*(a+c) in
        cPointhb h_x_4803.
Definition X_4804 :=
        let h_x_4804 a b c := (b-c)*(b+c)*(-a^2+a×b+a×c+2×b×c) in
        cPointhb h_x_4804.
Definition X_4805 :=
        let h_x_4805 a b c := -a^4+a^3×b+b^4+a^3×c+c^4 in
        cPointhb h_x_4805.
Definition X_4806 :=
        let h_x_4806 a b c := -((-b+c)*(b+c)*(2×a^2+a×b+a×c-b×c)) in
        cPointhb h_x_4806.
Definition X_4807 :=
        let h_x_4807 a b c := (b-c)*(b+c)*(3×a^2-a×b-a×c+b×c) in
        cPointhb h_x_4807.
Definition X_4808 :=
        let h_x_4808 a b c := (b-c)*(b+c)*(a^2-a×b+b^2-a×c+c^2) in
        cPointhb h_x_4808.
Definition X_4809 :=
        let h_x_4809 a b c := -((b-c)*(-2×a^3+b^3+c^3)) in
        cPointhb h_x_4809.
Definition X_4810 :=
        let h_x_4810 a b c := (b-c)*(a+2×b+2×c)*(-a^2+b×c) in
        cPointhb h_x_4810.
Definition X_4811 :=
        let h_x_4811 a b c := b*(b-c)*c*(-a+b+c)*(3×a+b+c) in
        cPointhb h_x_4811.
Definition X_4812 :=
        let h_x_4812 a b c := b×c*(a^3+a^2×b+b^3+a^2×c+c^3) in
        cPointhb h_x_4812.
Definition X_4813 :=
        let h_x_4813 a b c := a*(b-c)*(a+2×b+2×c) in
        cPointhb h_x_4813.
Definition X_4814 :=
        let h_x_4814 a b c := a*(a-2×b-2×c)*(a-b-c)*(b-c) in
        cPointhb h_x_4814.
Definition X_4815 :=
        let h_x_4815 a b c := b*(b-c)*c*(b+c)*(3×a+b+c) in
        cPointhb h_x_4815.
Definition X_4816 :=
        let h_x_4816 a b c := 7×a-6×b-6×c in
        cPointhb h_x_4816.
Definition X_4817 :=
        let h_x_4817 a b c := (a^2+a×b+b^2)*(b-c)*(a^2+a×c+c^2) in
        cPointhb h_x_4817.
Definition X_4818 :=
        let h_x_4818 a b c := -((b-c)*(3×a+b+c)*(b^2+b×c+c^2)) in
        cPointhb h_x_4818.
Definition X_4819 :=
        let h_x_4819 a b c := (2×a-b-c)*(b+c)*(3×a+b+c) in
        cPointhb h_x_4819.
Definition X_4820 :=
        let h_x_4820 a b c := -((a-b-c)*(b-c)*(a+2×b+2×c)) in
        cPointhb h_x_4820.
Definition X_4821 :=
        let h_x_4821 a b c := a×b+a×c-7×b×c in
        cPointhb h_x_4821.
Definition X_4822 :=
        let h_x_4822 a b c := -(a*(b-c)*(b+c)*(3×a+b+c)) in
        cPointhb h_x_4822.
Definition X_4823 :=
        let h_x_4823 a b c := b*(b-c)*c*(a+2×b+2×c) in
        cPointhb h_x_4823.
Definition X_4824 :=
        let h_x_4824 a b c := (b-c)*(b+c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4824.
Definition X_4825 :=
        let h_x_4825 a b c := a×(a-2×b-2×c)^2*(b-c) in
        cPointhb h_x_4825.
Definition X_4826 :=
        let h_x_4826 a b c := a^2*(b-c)*(b+c)*(a+2×b+2×c) in
        cPointhb h_x_4826.
Definition X_4827 :=
        let h_x_4827 a b c := a×(a-b-c)^2*(b-c)*(3×a+b+c) in
        cPointhb h_x_4827.
Definition X_4828 :=
        let h_x_4828 a b c := b*(b-c)*c*(a^2+a×b+a×c+3×b×c) in
        cPointhb h_x_4828.
Definition X_4829 :=
        let h_x_4829 a b c := (b+c)^2*(3×a+b+c)*(-a^2+b×c) in
        cPointhb h_x_4829.
Definition X_4830 :=
        let h_x_4830 a b c := (b-c)*(3×a+b+c)*(-a^2+b×c) in
        cPointhb h_x_4830.
Definition X_4831 :=
        let h_x_4831 a b c := (3×a+b+c)*(2×a^2-b^2-c^2) in
        cPointhb h_x_4831.
Definition X_4832 :=
        let h_x_4832 a b c := a^2*(b-c)*(b+c)*(3×a+b+c) in
        cPointhb h_x_4832.
Definition X_4833 :=
        let h_x_4833 a b c := a*(a+b)*(a-2×b-2×c)*(b-c)*(a+c) in
        cPointhb h_x_4833.
Definition X_4834 :=
        let h_x_4834 a b c := a^2*(b-c)*(a+2×b+2×c) in
        cPointhb h_x_4834.
Definition X_4835 :=
        let h_x_4835 a b c := (3×a+b+c)*(b^2+a×c)*(a×b+c^2) in
        cPointhb h_x_4835.
Definition X_4836 :=
        let h_x_4836 a b c := 2×a^5+a^4×b+a^4×c+b^4×c+b×c^4 in
        cPointhb h_x_4836.
Definition X_4837 :=
        let h_x_4837 a b c := -a^5+a×b^4+b^5+a×c^4+c^5 in
        cPointhb h_x_4837.
Definition X_4838 :=
        let h_x_4838 a b c := (b-c)*(b+c)*(a+2×b+2×c) in
        cPointhb h_x_4838.
Definition X_4839 :=
        let h_x_4839 a b c := -((-b+c)*(b+c)*(3×a+b+c)*(a^2-b×c)) in
        cPointhb h_x_4839.
Definition X_4840 :=
        let h_x_4840 a b c := a*(a+b)*(b-c)*(a+c)*(a+2×b+2×c) in
        cPointhb h_x_4840.
Definition X_4841 :=
        let h_x_4841 a b c := (b-c)*(b+c)*(3×a+b+c) in
        cPointhb h_x_4841.
Definition X_4842 :=
        let h_x_4842 a b c := b*(b-c)*c*(a+2×b+2×c)*(a^2+b×c) in
        cPointhb h_x_4842.
Definition X_4843 :=
        let h_x_4843 a b c := (a-b-c)*(b-c)*(b+c)*(3×a+b+c) in
        cPointhb h_x_4843.
Definition X_4844 :=
        let h_x_4844 a b c := (a-2×b-2×c)*(b-c)*(2×a^2+b×c) in
        cPointhb h_x_4844.
Definition X_4845 :=
        let h_x_4845 a b c := a^2*(b+c-a)/(-2×a^2+b^2+c^2+a×b-2×b×c+c×a) in
        cPointhb h_x_4845.
Definition X_4846 :=
        let h_x_4846 a b c := (a^2-b^2-c^2)/(a^4-2×a^2×b^2+b^4-2×a^2×c^2+4×b^2×c^2+c^4) in
        cPointhb h_x_4846.
Definition X_4847 :=
        let h_x_4847 a b c := (a-b-c)*(a×b-b^2+a×c+2×b×c-c^2) in
        cPointhb h_x_4847.
Definition X_4848 :=
        let h_x_4848 a b c := (3×a-b-c)*(a+b-c)*(a-b+c)*(b+c) in
        cPointhb h_x_4848.
Definition X_4849 :=
        let h_x_4849 a b c := a*(3×a-b-c)*(b+c) in
        cPointhb h_x_4849.
Definition X_4850 :=
        let h_x_4850 a b c := a*(a×b+b^2+a×c-b×c+c^2) in
        cPointhb h_x_4850.
Definition X_4851 :=
        let h_x_4851 a b c := a^2+a×b-b^2+a×c-c^2 in
        cPointhb h_x_4851.
Definition X_4852 :=
        let h_x_4852 a b c := 2×a^2+a×b+a×c-2×b×c in
        cPointhb h_x_4852.
Definition X_4853 :=
        let h_x_4853 a b c := a*(a-b-c)*(a^2-b^2+6×b×c-c^2) in
        cPointhb h_x_4853.
Definition X_4854 :=
        let h_x_4854 a b c := (b+c)*(2×a^2+a×b+b^2+a×c-2×b×c+c^2) in
        cPointhb h_x_4854.
Definition X_4855 :=
        let h_x_4855 a b c := a*(3×a-b-c)*(a^2-b^2-c^2) in
        cPointhb h_x_4855.
Definition X_4856 :=
        let h_x_4856 a b c := (3×a-b-c)*(2×a+b+c) in
        cPointhb h_x_4856.
Definition X_4857 :=
        let h_x_4857 a b c := -a^4+b^4+3×a^2×b×c-2×b^2×c^2+c^4 in
        cPointhb h_x_4857.
Definition X_4858 :=
        let h_x_4858 a b c := b×(b-c)^2×c*(-a+b+c) in
        cPointhb h_x_4858.
Definition X_4859 :=
        let h_x_4859 a b c := -a^2+a×b-2×b^2+a×c+4×b×c-2×c^2 in
        cPointhb h_x_4859.
Definition X_4860 :=
        let h_x_4860 a b c := a*(a^2+a×b-2×b^2+a×c+4×b×c-2×c^2) in
        cPointhb h_x_4860.
Definition X_4861 :=
        let h_x_4861 a b c := a*(a-b-c)*(a^2-b^2+3×b×c-c^2) in
        cPointhb h_x_4861.
Definition X_4862 :=
        let h_x_4862 a b c := a^2-a×b-2×b^2-a×c+4×b×c-2×c^2 in
        cPointhb h_x_4862.
Definition X_4863 :=
        let h_x_4863 a b c := (a-b-c)*(a^2-a×b+b^2-a×c-2×b×c+c^2) in
        cPointhb h_x_4863.
Definition X_4864 :=
        let h_x_4864 a b c := a*(2×a^2-3×a×b+3×b^2-3×a×c-2×b×c+3×c^2) in
        cPointhb h_x_4864.
Definition X_4865 :=
        let h_x_4865 a b c := a^3+a×b^2-b^3+a×c^2-c^3 in
        cPointhb h_x_4865.
Definition X_4866 :=
        let h_x_4866 a b c := a*(a-b-c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_4866.
Definition X_4867 :=
        let h_x_4867 a b c := a*(a-2×b-2×c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4867.
Definition X_4868 :=
        let h_x_4868 a b c := a*(b+c)*(a^2+2×a×b+b^2+2×a×c-b×c+c^2) in
        cPointhb h_x_4868.
Definition X_4869 :=
        let h_x_4869 a b c := a^2+2×a×b-3×b^2+2×a×c+2×b×c-3×c^2 in
        cPointhb h_x_4869.
Definition X_4870 :=
        let h_x_4870 a b c := (a-2×b-2×c)*(a+b-c)*(a-b+c)*(2×a+b+c) in
        cPointhb h_x_4870.
Definition X_4871 :=
        let h_x_4871 a b c := a×b^2-4×a×b×c+b^2×c+a×c^2+b×c^2 in
        cPointhb h_x_4871.
Definition X_4872 :=
        let h_x_4872 a b c := -a^4+b^4+a^2×b×c-b^3×c-b×c^3+c^4 in
        cPointhb h_x_4872.
Definition X_4873 :=
        let h_x_4873 a b c := (a-2×b-2×c)*(a-b-c) in
        cPointhb h_x_4873.
Definition X_4874 :=
        let h_x_4874 a b c := (b-c)*(a^3+b^2×c+b×c^2) in
        cPointhb h_x_4874.
Definition X_4875 :=
        let h_x_4875 a b c := a*(a-b-c)*(a×b-b^2+a×c+4×b×c-c^2) in
        cPointhb h_x_4875.
Definition X_4876 :=
        let h_x_4876 a b c := a*(a-b-c)*(-b^2+a×c)*(a×b-c^2) in
        cPointhb h_x_4876.
Definition X_4877 :=
        let h_x_4877 a b c := a*(a+b)*(a-b-c)*(a+c)*(a+2×b+2×c) in
        cPointhb h_x_4877.
Definition X_4878 :=
        let h_x_4878 a b c := a^2*(b+c)*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4878.
Definition X_4879 :=
        let h_x_4879 a b c := a*(b-c)*(a^2-2×a×b-2×a×c+b×c) in
        cPointhb h_x_4879.
Definition X_4880 :=
        let h_x_4880 a b c := a*(a+2×b+2×c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4880.
Definition X_4881 :=
        let h_x_4881 a b c := a*(3×a-b-c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4881.
Definition X_4882 :=
        let h_x_4882 a b c := a*(a-b-c)*(a^2-b^2-6×b×c-c^2) in
        cPointhb h_x_4882.
Definition X_4883 :=
        let h_x_4883 a b c := a*(3×a×b-b^2+3×a×c+4×b×c-c^2) in
        cPointhb h_x_4883.
Definition X_4884 :=
        let h_x_4884 a b c := (3×a-b-c)*(b^2+c^2) in
        cPointhb h_x_4884.
Definition X_4885 :=
        let h_x_4885 a b c := (b-c)*(a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_4885.
Definition X_4886 :=
        let h_x_4886 a b c := (a-b-c)*(a^2+2×a×b+b^2+2×a×c+b×c+c^2) in
        cPointhb h_x_4886.
Definition X_4887 :=
        let h_x_4887 a b c := -2×a^2+a×b+3×b^2+a×c-6×b×c+3×c^2 in
        cPointhb h_x_4887.
Definition X_4888 :=
        let h_x_4888 a b c := 3×a^2+a×b-2×b^2+a×c+4×b×c-2×c^2 in
        cPointhb h_x_4888.
Definition X_4889 :=
        let h_x_4889 a b c := 4×a^2+3×a×b-2×b^2+3×a×c-2×b×c-2×c^2 in
        cPointhb h_x_4889.
Definition X_4890 :=
        let h_x_4890 a b c := a^2*(b+c)*(a×b-b^2+a×c+4×b×c-c^2) in
        cPointhb h_x_4890.
Definition X_4891 :=
        let h_x_4891 a b c := (3×a-b-c)*(a×b+a×c+2×b×c) in
        cPointhb h_x_4891.
Definition X_4892 :=
        let h_x_4892 a b c := (b+c)*(a^2-2×b^2+3×b×c-2×c^2) in
        cPointhb h_x_4892.
Definition X_4893 :=
        let h_x_4893 a b c := a*(a-2×b-2×c)*(b-c) in
        cPointhb h_x_4893.
Definition X_4894 :=
        let h_x_4894 a b c := -a^4+b^4+2×a^2×b×c+b^3×c+b×c^3+c^4 in
        cPointhb h_x_4894.
Definition X_4895 :=
        let h_x_4895 a b c := a*(a-b-c)*(2×a-b-c)*(b-c) in
        cPointhb h_x_4895.
Definition X_4896 :=
        let h_x_4896 a b c := 4×a^2+a×b-3×b^2+a×c+6×b×c-3×c^2 in
        cPointhb h_x_4896.
Definition X_4897 :=
        let h_x_4897 a b c := (b-c)*(-2×a^2-a×b+b^2-a×c+c^2) in
        cPointhb h_x_4897.
Definition X_4898 :=
        let h_x_4898 a b c := (3×a-b-c)*(a+2×b+2×c) in
        cPointhb h_x_4898.
Definition X_4899 :=
        let h_x_4899 a b c := (3×a-b-c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_4899.
Definition X_4900 :=
        let h_x_4900 a b c := a*(a+b-5×c)*(a-b-c)*(a-5×b+c) in
        cPointhb h_x_4900.
Definition X_4901 :=
        let h_x_4901 a b c := (a-b-c)*(a^2-a×b+2×b^2-a×c+2×c^2) in
        cPointhb h_x_4901.
Definition X_4902 :=
        let h_x_4902 a b c := -3×a^2+a×b+4×b^2+a×c-8×b×c+4×c^2 in
        cPointhb h_x_4902.
Definition X_4903 :=
        let h_x_4903 a b c := (a-b-c)*(a×b+a×c-3×b×c) in
        cPointhb h_x_4903.
Definition X_4904 :=
        let h_x_4904 a b c := (b-c)^2*(a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4904.
Definition X_4905 :=
        let h_x_4905 a b c := a*(b-c)*(a×b-b^2+a×c+b×c-c^2) in
        cPointhb h_x_4905.
Definition X_4906 :=
        let h_x_4906 a b c := a*(2×a^2-a×b+3×b^2-a×c-4×b×c+3×c^2) in
        cPointhb h_x_4906.
Definition X_4907 :=
        let h_x_4907 a b c := a×(a-b-c)^2*(a^2+3×b^2-6×b×c+3×c^2) in
        cPointhb h_x_4907.
Definition X_4908 :=
        let h_x_4908 a b c := (a-2×b-2×c)*(2×a-b-c) in
        cPointhb h_x_4908.
Definition X_4909 :=
        let h_x_4909 a b c := -6×a^2-5×a×b+b^2-5×a×c-2×b×c+c^2 in
        cPointhb h_x_4909.
Definition X_4910 :=
        let h_x_4910 a b c := -5×a^2-3×a×b+b^2-3×a×c+4×b×c+c^2 in
        cPointhb h_x_4910.
Definition X_4911 :=
        let h_x_4911 a b c := a^4-b^4+a^2×b×c+b^3×c+b×c^3-c^4 in
        cPointhb h_x_4911.
Definition X_4912 :=
        let h_x_4912 a b c := 4×a^2-3×a×b-2×b^2-3×a×c+6×b×c-2×c^2 in
        cPointhb h_x_4912.
Definition X_4913 :=
        let h_x_4913 a b c := (a-b-c)*(b-c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4913.
Definition X_4914 :=
        let h_x_4914 a b c := (a-b-c)*(2×a^2+a×b+2×b^2+a×c+2×c^2) in
        cPointhb h_x_4914.
Definition X_4915 :=
        let h_x_4915 a b c := a*(a-b-c)*(a^2-b^2+10×b×c-c^2) in
        cPointhb h_x_4915.
Definition X_4916 :=
        let h_x_4916 a b c := 5×a^2+4×a×b-3×b^2+4×a×c-2×b×c-3×c^2 in
        cPointhb h_x_4916.
Definition X_4917 :=
        let h_x_4917 a b c := a*(3×a-b-c)*(a^2-b^2-4×b×c-c^2) in
        cPointhb h_x_4917.
Definition X_4918 :=
        let h_x_4918 a b c := (3×a-b-c)*(b+c)*(a×b+b^2+a×c+c^2) in
        cPointhb h_x_4918.
Definition X_4919 :=
        let h_x_4919 a b c := a*(a-b-c)*(a^2-a×b-b^2-a×c+3×b×c-c^2) in
        cPointhb h_x_4919.
Definition X_4920 :=
        let h_x_4920 a b c := a×b^3+b^4-b^3×c+a×c^3-b×c^3+c^4 in
        cPointhb h_x_4920.
Definition X_4921 :=
        let h_x_4921 a b c := (a+b)*(3×a-2×b-2×c)*(a+c) in
        cPointhb h_x_4921.
Definition X_4922 :=
        let h_x_4922 a b c := (2×a-b-c)*(b-c)*(a^2+b×c) in
        cPointhb h_x_4922.
Definition X_4923 :=
        let h_x_4923 a b c := (a-b-c)*(5×a×b+b^2+5×a×c+6×b×c+c^2) in
        cPointhb h_x_4923.
Definition X_4924 :=
        let h_x_4924 a b c := (3×a-b-c)*(3×a×b-b^2+3×a×c+2×b×c-c^2) in
        cPointhb h_x_4924.
Definition X_4925 :=
        let h_x_4925 a b c := (3×a-b-c)*(b-c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_4925.
Definition X_4926 :=
        let h_x_4926 a b c := (3×a-2×b-2×c)*(b-c) in
        cPointhb h_x_4926.
Definition X_4927 :=
        let h_x_4927 a b c := -((b-c)*(a×b+b^2+a×c-4×b×c+c^2)) in
        cPointhb h_x_4927.
Definition X_4928 :=
        let h_x_4928 a b c := (b-c)*(a^2-2×a×b-2×a×c+3×b×c) in
        cPointhb h_x_4928.
Definition X_4929 :=
        let h_x_4929 a b c := (3×a-b-c)*(a^2-a×b+2×b^2-a×c+2×c^2) in
        cPointhb h_x_4929.
Definition X_4930 :=
        let h_x_4930 a b c := a*(a-2×b-2×c)*(3×a^2-3×b^2+4×b×c-3×c^2) in
        cPointhb h_x_4930.
Definition X_4931 :=
        let h_x_4931 a b c := (a-2×b-2×c)*(b-c)*(b+c) in
        cPointhb h_x_4931.
Definition X_4932 :=
        let h_x_4932 a b c := (b-c)*(2×a^2+a×b+a×c+b×c) in
        cPointhb h_x_4932.
Definition X_4933 :=
        let h_x_4933 a b c := (a-2×b-2×c)*(2×a^2-b^2-c^2) in
        cPointhb h_x_4933.
Definition X_4934 :=
        let h_x_4934 a b c := (b-c)^2*(b+c)*(-2×a^2+a×b+b^2+a×c+c^2) in
        cPointhb h_x_4934.
Definition X_4935 :=
        let h_x_4935 a b c := b×c*(-4×a+b+c)*(-3×a+b+c) in
        cPointhb h_x_4935.
Definition X_4936 :=
        let h_x_4936 a b c := a×(a-b-c)^2*(3×a-b-c) in
        cPointhb h_x_4936.
Definition X_4937 :=
        let h_x_4937 a b c := (a-2×b-2×c)*(a×b+a×c-2×b×c) in
        cPointhb h_x_4937.
Definition X_4938 :=
        let h_x_4938 a b c := (a+2×b+2×c)*(-2×a^2+b^2+c^2) in
        cPointhb h_x_4938.
Definition X_4939 :=
        let h_x_4939 a b c := b×(b-c)^2×c*(-3×a+b+c)*(-a+b+c) in
        cPointhb h_x_4939.
Definition X_4940 :=
        let h_x_4940 a b c := (b-c)*(-a^2-3×a×b-3×a×c+2×b×c) in
        cPointhb h_x_4940.
Definition X_4941 :=
        let h_x_4941 a b c := a*(a×b+a×c-b×c)*(b^2-3×b×c+c^2) in
        cPointhb h_x_4941.
Definition X_4942 :=
        let h_x_4942 a b c := (a+2×b+2×c)*(a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_4942.
Definition X_4943 :=
        let h_x_4943 a b c := (6×a-b-c)*(b-c) in
        cPointhb h_x_4943.
Definition X_4944 :=
        let h_x_4944 a b c := (a-2×b-2×c)*(a-b-c)*(b-c) in
        cPointhb h_x_4944.
Definition X_4945 :=
        let h_x_4945 a b c := (a-2×b-2×c)*(a+b-2×c)*(a-2×b+c) in
        cPointhb h_x_4945.
Definition X_4946 :=
        let h_x_4946 a b c := (b+c)*(-6×a^2+a×b+a×c+b×c) in
        cPointhb h_x_4946.
Definition X_4947 :=
        let h_x_4947 a b c := a*(b^2+a×c-2×b×c)*(a×b-2×b×c+c^2) in
        cPointhb h_x_4947.
Definition X_4948 :=
        let h_x_4948 a b c := (a-2×b-2×c)*(b-c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4948.
Definition X_4949 :=
        let h_x_4949 a b c := -((3×a-b-c)*(b-c)*(a+2×b+2×c)) in
        cPointhb h_x_4949.
Definition X_4950 :=
        let h_x_4950 a b c := a^4+a×b^3-b^4+a×c^3-c^4 in
        cPointhb h_x_4950.
Definition X_4951 :=
        let h_x_4951 a b c := (a-2×b-2×c)*(b-c)*(b^2+b×c+c^2) in
        cPointhb h_x_4951.
Definition X_4952 :=
        let h_x_4952 a b c := (3×a-b-c)*(a^2-a×b+b^2-a×c+c^2) in
        cPointhb h_x_4952.
Definition X_4953 :=
        let h_x_4953 a b c := (a-b-c)^2*(3×a-b-c)*(b-c)^2 in
        cPointhb h_x_4953.
Definition X_4954 :=
        let h_x_4954 a b c := (a-2×b-2×c)*(3×a^2-a×b-a×c-b×c) in
        cPointhb h_x_4954.
Definition X_4955 :=
        let h_x_4955 a b c := (a+b-c)*(a-b+c)*(3×a×b+3×a×c+2×b×c) in
        cPointhb h_x_4955.
Definition X_4956 :=
        let h_x_4956 a b c := (a-2×b-2×c)*(a^2+b^2-3×b×c+c^2) in
        cPointhb h_x_4956.
Definition X_4957 :=
        let h_x_4957 a b c := b×(b-c)^2×c*(-a+2×b+2×c) in
        cPointhb h_x_4957.
Definition X_4958 :=
        let h_x_4958 a b c := (2×a-b-c)*(b-c)*(a+2×b+2×c) in
        cPointhb h_x_4958.
Definition X_4959 :=
        let h_x_4959 a b c := a*(3×a-2×b-2×c)*(a-b-c)*(b-c) in
        cPointhb h_x_4959.
Definition X_4960 :=
        let h_x_4960 a b c := (a+b)*(b-c)*(a+c)*(a+2×b+2×c) in
        cPointhb h_x_4960.
Definition X_4961 :=
        let h_x_4961 a b c := (b-c)*(a+2×b+2×c)*(-2×a^2+b×c) in
        cPointhb h_x_4961.
Definition X_4962 :=
        let h_x_4962 a b c := (5×a-3×b-3×c)*(b-c) in
        cPointhb h_x_4962.
Definition X_4963 :=
        let h_x_4963 a b c := (b-c)*(a+2×b+2×c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_4963.
Definition X_4964 :=
        let h_x_4964 a b c := (3×a-b-c)*(b-c)*(a^2-2×a×b-2×a×c+b×c) in
        cPointhb h_x_4964.
Definition X_4965 :=
        let h_x_4965 a b c := (a-b-c)*(b-c)^2*(2×a^2-b×c) in
        cPointhb h_x_4965.
Definition X_4966 :=
        let h_x_4966 a b c := (2×a+b+c)*(a×b-b^2+a×c-c^2) in
        cPointhb h_x_4966.
Definition X_4967 :=
        let h_x_4967 a b c := a×b+b^2+a×c+4×b×c+c^2 in
        cPointhb h_x_4967.
Definition X_4968 :=
        let h_x_4968 a b c := b×c*(2×a^2+a×b+b^2+a×c+2×b×c+c^2) in
        cPointhb h_x_4968.
Definition X_4969 :=
        let h_x_4969 a b c := (2×a-b-c)*(2×a+b+c) in
        cPointhb h_x_4969.
Definition X_4970 :=
        let h_x_4970 a b c := (2×a+b+c)*(a×b+a×c-b×c) in
        cPointhb h_x_4970.
Definition X_4971 :=
        let h_x_4971 a b c := -2×a^2-2×a×b+b^2-2×a×c+4×b×c+c^2 in
        cPointhb h_x_4971.
Definition X_4972 :=
        let h_x_4972 a b c := (b+c)*(a^2+b^2-b×c+c^2) in
        cPointhb h_x_4972.
Definition X_4973 :=
        let h_x_4973 a b c := a*(2×a+b+c)*(a^2-b^2+b×c-c^2) in
        cPointhb h_x_4973.
Definition X_4974 :=
        let h_x_4974 a b c := (2×a+b+c)*(a^2-b×c) in
        cPointhb h_x_4974.
Definition X_4975 :=
        let h_x_4975 a b c := b×c*(-2×a+b+c)*(2×a+b+c) in
        cPointhb h_x_4975.
Definition X_4976 :=
        let h_x_4976 a b c := -((a-b-c)*(b-c)*(2×a+b+c)) in
        cPointhb h_x_4976.
Definition X_4977 :=
        let h_x_4977 a b c := -((b-c)*(2×a+b+c)) in
        cPointhb h_x_4977.
Definition X_4978 :=
        let h_x_4978 a b c := b*(b-c)*c*(2×a+b+c) in
        cPointhb h_x_4978.
Definition X_4979 :=
        let h_x_4979 a b c := a*(b-c)*(2×a+b+c) in
        cPointhb h_x_4979.
Definition X_4980 :=
        let h_x_4980 a b c := b×c*(2×a+3×b+3×c) in
        cPointhb h_x_4980.
Definition X_4981 :=
        let h_x_4981 a b c := 2×a×b^2+2×a×b×c+b^2×c+2×a×c^2+b×c^2 in
        cPointhb h_x_4981.
Definition X_4982 :=
        let h_x_4982 a b c := (5×a-b-c)*(2×a+b+c) in
        cPointhb h_x_4982.
Definition X_4983 :=
        let h_x_4983 a b c := -(a*(b-c)*(b+c)*(2×a+b+c)) in
        cPointhb h_x_4983.
Definition X_4984 :=
        let h_x_4984 a b c := -((2×a-b-c)*(b-c)*(2×a+b+c)) in
        cPointhb h_x_4984.
Definition X_4985 :=
        let h_x_4985 a b c := b*(b-c)*c*(-a+b+c)*(2×a+b+c) in
        cPointhb h_x_4985.
Definition X_4986 :=
        let h_x_4986 a b c := b×c*(2×a^2-2×a×b+b^2-2×a×c+c^2) in
        cPointhb h_x_4986.
Definition X_4987 :=
        let h_x_4987 a b c := (2×a+b+c)*(a^3-b^3+a×b×c-c^3) in
        cPointhb h_x_4987.
Definition X_4988 :=
        let h_x_4988 a b c := (b-c)*(b+c)*(2×a+b+c) in
        cPointhb h_x_4988.
Definition X_4989 :=
        let h_x_4989 a b c := (2×a+b+c)*(3×a^2+b^2-2×b×c+c^2) in
        cPointhb h_x_4989.
Definition X_4990 :=
        let h_x_4990 a b c := -((a-b-c)^2*(b-c)*(2×a+b+c)) in
        cPointhb h_x_4990.
Definition X_4991 :=
        let h_x_4991 a b c := (2×a+b+c)*(2×a^2+a×b+a×c-b×c) in
        cPointhb h_x_4991.
Definition X_4992 :=
        let h_x_4992 a b c := (-b+c)*(2×a+b+c)*(a×b+a×c-b×c) in
        cPointhb h_x_4992.
Definition X_4993 :=
        let h_x_4993 a b c := (a^4-2×a^2×b^2+b^4-a^2×c^2-b^2×c^2)*(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4)*(a^4-a^2×b^2-2×a^2×c^2-b^2×c^2+c^4) in
        cPointhb h_x_4993.
Definition X_4994 :=
        let h_x_4994 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-a^2×c^2-b^2×c^2)*(a^4-a^2×b^2-2×a^2×c^2-b^2×c^2+c^4)*(a^4-3×a^2×b^2+2×b^4-3×a^2×c^2-4×b^2×c^2+2×c^4) in
        cPointhb h_x_4994.
Definition X_4995 :=
        let h_x_4995 a b c := (a-b-c)*(2×a+b-c)*(2×a-b+c) in
        cPointhb h_x_4995.
Definition X_4996 :=
        let h_x_4996 a b c := a^2*(a-b-c)*(a^2-b^2+b×c-c^2)^2 in
        cPointhb h_x_4996.
Definition X_4997 :=
        let h_x_4997 a b c := (a+b-2×c)*(a-b-c)*(a-2×b+c) in
        cPointhb h_x_4997.
Definition X_4998 :=
        let h_x_4998 a b c := (a-b)^2×(a-c)^2*(a+b-c)*(a-b+c) in
        cPointhb h_x_4998.
Definition X_4999 :=
        let h_x_4999 a b c := (a-b-c)*(2×a^3+2×a^2×b-a×b^2-b^3+2×a^2×c+4×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_4999.
Definition X_5000 :=
        let h_x_5000 a b c := (SS a b c)^2-(SB a b c)*(SC a b c)-(((SS a b c)^2-3*(SB a b c)*(SC a b c))*(3*(SA a b c)*(SB a b c)*(SC a b c)-(SS a b c)^2*(SW a b c)+2×sqrt((SS a b c)^2*(SA a b c)*(SB a b c)*(SC a b c)*(SW a b c))))/(9*(SA a b c)*(SB a b c)*(SC a b c)-(SS a b c)^2*(SW a b c)) in
        cPointhb h_x_5000.
Definition X_5001 :=
        let h_x_5001 a b c := (SS a b c)^2-(SB a b c)*(SC a b c)-(((SS a b c)^2-3*(SB a b c)*(SC a b c))*(3*(SA a b c)*(SB a b c)*(SC a b c)-(SS a b c)^2*(SW a b c)-2×sqrt((SS a b c)^2*(SA a b c)*(SB a b c)*(SC a b c)*(SW a b c))))/(9*(SA a b c)*(SB a b c)*(SC a b c)-(SS a b c)^2*(SW a b c)) in
        cPointhb h_x_5001.
Definition X_5002 :=
        let h_x_5002 a b c := (SS a b c)^2-(SB a b c)*(SC a b c)+(((SS a b c)^2-3*(SB a b c)*(SC a b c))*(3*(SA a b c)*(SB a b c)*(SC a b c)+(SS a b c)^2*(SW a b c)-4×sqrt((SS a b c)^2*(SA a b c)*(SB a b c)*(SC a b c)*(SW a b c))))/(-9*(SA a b c)*(SB a b c)*(SC a b c)+(SS a b c)^2*(SW a b c)) in
        cPointhb h_x_5002.
Definition X_5003 :=
        let h_x_5003 a b c := (SS a b c)^2-(SB a b c)*(SC a b c)+(((SS a b c)^2-3*(SB a b c)*(SC a b c))*(3*(SA a b c)*(SB a b c)*(SC a b c)+(SS a b c)^2*(SW a b c)+4×sqrt((SS a b c)^2*(SA a b c)*(SB a b c)*(SC a b c)*(SW a b c))))/(-9*(SA a b c)*(SB a b c)*(SC a b c)+(SS a b c)^2*(SW a b c)) in
        cPointhb h_x_5003.
Definition X_5004 :=
        let h_x_5004 a b c := a^2*(SS a b c)*((SS a b c)^2+(SA a b c)^2-4*(SB a b c)*(SC a b c))+sqrt(2)×a×b×c*((SS a b c)^2-3*(SB a b c)*(SC a b c))*sqrt(SW a b c) in
        cPointhb h_x_5004.
Definition X_5005 :=
        let h_x_5005 a b c := a^2*(SS a b c)*((SS a b c)^2+(SA a b c)^2-4*(SB a b c)*(SC a b c))-sqrt(2)×a×b×c*((SS a b c)^2-3*(SB a b c)*(SC a b c))*sqrt(SW a b c) in
        cPointhb h_x_5005.
Definition X_5006 :=
        let h_x_5006 a b c := a^2*(a + b)*(a + c)*(a^3 + a×b×c - b^2×c - b×c^2) in
        cPointhb h_x_5006.
Definition X_5007 :=
        let h_x_5007 a b c := a^2*(2×a^2 + b^2 + c^2) in
        cPointhb h_x_5007.
Definition X_5008 :=
        let h_x_5008 a b c := a^2*(4×a^2 + b^2 + c^2) in
        cPointhb h_x_5008.
Definition X_5009 :=
        let h_x_5009 a b c := a^2*(a + b)*(a + c)*(a^2 - b×c) in
        cPointhb h_x_5009.
Definition X_5010 :=
        let h_x_5010 a b c := a^2*(2×a^2 - 2×b^2 - b×c - 2×c^2) in
        cPointhb h_x_5010.
Definition X_5011 :=
        let h_x_5011 a b c := a*(a^3 - b^3 - a×b×c + b^2×c + b×c^2 - c^3) in
        cPointhb h_x_5011.
Definition X_5012 :=
        let h_x_5012 a b c := a^2*(a^4 - a^2×b^2 - a^2×c^2 - b^2×c^2) in
        cPointhb h_x_5012.
Definition X_5013 :=
        let h_x_5013 a b c := a^2*(a^2 - 3×b^2 - 3×c^2) in
        cPointhb h_x_5013.
Definition X_5014 :=
        let h_x_5014 a b c := -a^3 + a^2×b - a×b^2 + b^3 + a^2×c - a×c^2 + c^3 in
        cPointhb h_x_5014.
Definition X_5015 :=
        let h_x_5015 a b c := -a^4 + b^4 + a^2×b×c + b^3×c + b×c^3 + c^4 in
        cPointhb h_x_5015.
Definition X_5016 :=
        let h_x_5016 a b c := -a^4 + b^4 + a×b^2×c + b^3×c + a×b×c^2 + b×c^3 + c^4 in
        cPointhb h_x_5016.
Definition X_5017 :=
        let h_x_5017 a b c := a^2*(a^4 + 2×a^2×b^2 - b^4 + 2×a^2×c^2 - c^4) in
        cPointhb h_x_5017.
Definition X_5018 :=
        let h_x_5018 a b c := a*(a + b - c)*(a - b + c)*(a^3 - b^3 + a×b×c - c^3) in
        cPointhb h_x_5018.
Definition X_5019 :=
        let h_x_5019 a b c := a^3*(a^2 + a×b + a×c + 2×b×c) in
        cPointhb h_x_5019.
Definition X_5020 :=
        let h_x_5020 a b c := a^2*(a^4 - b^4 + 6×b^2×c^2 - c^4) in
        cPointhb h_x_5020.
Definition X_5021 :=
        let h_x_5021 a b c := a^2*(a^2 + 2×a×b - b^2 + 2×a×c + 2×b×c - c^2) in
        cPointhb h_x_5021.
Definition X_5022 :=
        let h_x_5022 a b c := a^2*(a^2 + 2×a×b - 3×b^2 + 2×a×c + 2×b×c - 3×c^2) in
        cPointhb h_x_5022.
Definition X_5023 :=
        let h_x_5023 a b c := a^2*(5×a^2 - 3×b^2 - 3×c^2) in
        cPointhb h_x_5023.
Definition X_5024 :=
        let h_x_5024 a b c := a^2*(a^2 - 5×b^2 - 5×c^2) in
        cPointhb h_x_5024.
Definition X_5025 :=
        let h_x_5025 a b c := b^4 - b^2×c^2 + c^4 in
        cPointhb h_x_5025.
Definition X_5026 :=
        let h_x_5026 a b c := (a^2 - b×c)*(a^2 + b×c)*(2×a^2 - b^2 - c^2) in
        cPointhb h_x_5026.
Definition X_5027 :=
        let h_x_5027 a b c := a^2*(b - c)*(b + c)*(a^2 - b×c)*(a^2 + b×c) in
        cPointhb h_x_5027.
Definition X_5028 :=
        let h_x_5028 a b c := a^2*(a^4 - a^2×b^2 + 2×b^4 - a^2×c^2 + 2×c^4) in
        cPointhb h_x_5028.
Definition X_5029 :=
        let h_x_5029 a b c := a^2*(b - c)*(a^2 + a×b - b^2 + a×c - b×c - c^2) in
        cPointhb h_x_5029.
Definition X_5030 :=
        let h_x_5030 a b c := a^2*(a^2 + a×b - 2×b^2 + a×c + b×c - 2×c^2) in
        cPointhb h_x_5030.
Definition X_5031 :=
        let h_x_5031 a b c := b^6 - 2×a^2×b^2×c^2 + c^6 in
        cPointhb h_x_5031.
Definition X_5032 :=
        let h_x_5032 a b c := -11×a^2 + b^2 + c^2 in
        cPointhb h_x_5032.
Definition X_5033 :=
        let h_x_5033 a b c := a^2*(3×a^4 - a^2×b^2 - a^2×c^2 - 4×b^2×c^2) in
        cPointhb h_x_5033.
Definition X_5034 :=
        let h_x_5034 a b c := a^2*(a^4 - 3×a^2×b^2 - 3×a^2×c^2 - 4×b^2×c^2) in
        cPointhb h_x_5034.
Definition X_5035 :=
        let h_x_5035 a b c := a^3*(a^2 + a×b + a×c + 3×b×c) in
        cPointhb h_x_5035.
Definition X_5036 :=
        let h_x_5036 a b c := a^2*(2×a^2×b - 2×b^3 + 2×a^2×c - a×b×c - 2×c^3) in
        cPointhb h_x_5036.
Definition X_5037 :=
        let h_x_5037 a b c := a^2*(2×a^3 + a^2×b + b^3 + a^2×c - a×b×c + c^3) in
        cPointhb h_x_5037.
Definition X_5038 :=
        let h_x_5038 a b c := a^2*(a^4 - 2×a^2×b^2 - 2×a^2×c^2 - 3×b^2×c^2) in
        cPointhb h_x_5038.
Definition X_5039 :=
        let h_x_5039 a b c := a^2*(a^4 + 3×a^2×b^2 + 3×a^2×c^2 + 2×b^2×c^2) in
        cPointhb h_x_5039.
Definition X_5040 :=
        let h_x_5040 a b c := a^2*(b - c)*(a^3 + a×b×c - b^2×c - b×c^2) in
        cPointhb h_x_5040.
Definition X_5041 :=
        let h_x_5041 a b c := a^2*(2×a^2 + 3×b^2 + 3×c^2) in
        cPointhb h_x_5041.
Definition X_5042 :=
        let h_x_5042 a b c := a^3*(a^2 + a×b + a×c + 4×b×c) in
        cPointhb h_x_5042.
Definition X_5043 :=
        let h_x_5043 a b c := a^2*(2×a^2×b - 2×b^3 + 2×a^2×c + 3×a×b×c - 2×c^3) in
        cPointhb h_x_5043.
Definition X_5044 :=
        let h_x_5044 a b c := a*(a^2×b - b^3 + a^2×c - 2×a×b×c - 3×b^2×c - 3×b×c^2 - c^3) in
        cPointhb h_x_5044.
Definition X_5045 :=
        let h_x_5045 a b c := a*(a^2×b - b^3 + a^2×c + 6×a×b×c + b^2×c + b×c^2 - c^3) in
        cPointhb h_x_5045.
Definition X_5046 :=
        let h_x_5046 a b c := -a^4 + b^4 + a^2×b×c + a×b^2×c + a×b×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5046.
Definition X_5047 :=
        let h_x_5047 a b c := a*(a^3 - a×b^2 - 3×a×b×c - 3×b^2×c - a×c^2 - 3×b×c^2) in
        cPointhb h_x_5047.
Definition X_5048 :=
        let h_x_5048 a b c := a*(a - b - c)*(2×a^2 - a×b - 3×b^2 - a×c + 6×b×c - 3×c^2) in
        cPointhb h_x_5048.
Definition X_5049 :=
        let h_x_5049 a b c := a*(a^2×b - b^3 + a^2×c + 10×a×b×c + b^2×c + b×c^2 - c^3) in
        cPointhb h_x_5049.
Definition X_5050 :=
        let h_x_5050 a b c := a^2*(3×a^4 - 4×a^2×b^2 + b^4 - 4×a^2×c^2 - 6×b^2×c^2 + c^4) in
        cPointhb h_x_5050.
Definition X_5051 :=
        let h_x_5051 a b c := (b + c)*(a^3 + a^2×b + a×b^2 + b^3 + a^2×c + a×b×c + a×c^2 + c^3) in
        cPointhb h_x_5051.
Definition X_5052 :=
        let h_x_5052 a b c := a^2*(3×a^2×b^2 - b^4 + 3×a^2×c^2 + 2×b^2×c^2 - c^4) in
        cPointhb h_x_5052.
Definition X_5053 :=
        let h_x_5053 a b c := a^2*(a^3 - a×b^2 + 3×a×b×c - b^2×c - a×c^2 - b×c^2) in
        cPointhb h_x_5053.
Definition X_5054 :=
        let h_x_5054 a b c := -5×a^4 + 7×a^2×b^2 - 2×b^4 + 7×a^2×c^2 + 4×b^2×c^2 - 2×c^4 in
        cPointhb h_x_5054.
Definition X_5055 :=
        let h_x_5055 a b c := a^4 - 5×a^2×b^2 + 4×b^4 - 5×a^2×c^2 - 8×b^2×c^2 + 4×c^4 in
        cPointhb h_x_5055.
Definition X_5056 :=
        let h_x_5056 a b c := a^4 - 6×a^2×b^2 + 5×b^4 - 6×a^2×c^2 - 10×b^2×c^2 + 5×c^4 in
        cPointhb h_x_5056.
Definition X_5057 :=
        let h_x_5057 a b c := a^3-b^3-a×b×c+b^2×c+b×c^2-c^3 in
        cPointhb h_x_5057.
Definition X_5058 :=
        let h_x_5058 a b c := a^2*(a^2 - sqrt((a + b - c)*(a - b + c)*(-a + b + c)*(a + b + c))) in
        cPointhb h_x_5058.
Definition X_5059 :=
        let h_x_5059 a b c := 11×a^4 - 6×a^2×b^2 - 5×b^4 - 6×a^2×c^2 + 10×b^2×c^2 - 5×c^4 in
        cPointhb h_x_5059.
Definition X_5060 :=
        let h_x_5060 a b c := a^2*(a + b)*(a + c)*(a^3 - 2×a^2×b + b^3 - 2×a^2×c + a×b×c + c^3) in
        cPointhb h_x_5060.
Definition X_5061 :=
        let h_x_5061 a b c := a*(a + b - c)*(a - b + c)*(a^3 + a×b×c - b^2×c - b×c^2) in
        cPointhb h_x_5061.
Definition X_5062 :=
        let h_x_5062 a b c := a^2*(a^2 + sqrt((a + b - c)*(a - b + c)*(-a + b + c)*(a + b + c))) in
        cPointhb h_x_5062.
Definition X_5063 :=
        let h_x_5063 a b c := a^4*(a^4 - 2×a^2×b^2 + b^4 - 2×a^2×c^2 + 4×b^2×c^2 + c^4) in
        cPointhb h_x_5063.
Definition X_5064 :=
        let h_x_5064 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^2 + 2×b^2 + 2×c^2) in
        cPointhb h_x_5064.
Definition X_5065 :=
        let h_x_5065 a b c := a^4*(a^4 - 2×a^2×b^2 + b^4 - 2×a^2×c^2 + 6×b^2×c^2 + c^4) in
        cPointhb h_x_5065.
Definition X_5066 :=
        let h_x_5066 a b c := 2×a^4 + 5×a^2×b^2 - 7×b^4 + 5×a^2×c^2 + 14×b^2×c^2 - 7×c^4 in
        cPointhb h_x_5066.
Definition X_5067 :=
        let h_x_5067 a b c := -3×a^4 + 8×a^2×b^2 - 5×b^4 + 8×a^2×c^2 + 10×b^2×c^2 - 5×c^4 in
        cPointhb h_x_5067.
Definition X_5068 :=
        let h_x_5068 a b c := a^4 + 6×a^2×b^2 - 7×b^4 + 6×a^2×c^2 + 14×b^2×c^2 - 7×c^4 in
        cPointhb h_x_5068.
Definition X_5069 :=
        let h_x_5069 a b c := a^2*(a×b^2 + b^3 - a×b×c + b^2×c + a×c^2 + b×c^2 + c^3) in
        cPointhb h_x_5069.
Definition X_5070 :=
        let h_x_5070 a b c := -3×a^4 + 7×a^2×b^2 - 4×b^4 + 7×a^2×c^2 + 8×b^2×c^2 - 4×c^4 in
        cPointhb h_x_5070.
Definition X_5071 :=
        let h_x_5071 a b c := a^4 - 8×a^2×b^2 + 7×b^4 - 8×a^2×c^2 - 14×b^2×c^2 + 7×c^4 in
        cPointhb h_x_5071.
Definition X_5072 :=
        let h_x_5072 a b c := a^4 + 5×a^2×b^2 - 6×b^4 + 5×a^2×c^2 + 12×b^2×c^2 - 6×c^4 in
        cPointhb h_x_5072.
Definition X_5073 :=
        let h_x_5073 a b c := 7×a^4 - 3×a^2×b^2 - 4×b^4 - 3×a^2×c^2 + 8×b^2×c^2 - 4×c^4 in
        cPointhb h_x_5073.
Definition X_5074 :=
        let h_x_5074 a b c := a^3×b - b^4 + a^3×c - 2×a^2×b×c + b^3×c + b×c^3 - c^4 in
        cPointhb h_x_5074.
Definition X_5075 :=
        let h_x_5075 a b c := a^2*(b - c)*(a^3 - 2×a^2×b + b^3 - 2×a^2×c + a×b×c + c^3) in
        cPointhb h_x_5075.
Definition X_5076 :=
        let h_x_5076 a b c := -7×a^4 + a^2×b^2 + 6×b^4 + a^2×c^2 - 12×b^2×c^2 + 6×c^4 in
        cPointhb h_x_5076.
Definition X_5077 :=
        let h_x_5077 a b c := 5×a^4 - 5×a^2×b^2 - 4×b^4 - 5×a^2×c^2 + 4×b^2×c^2 - 4×c^4 in
        cPointhb h_x_5077.
Definition X_5078 :=
        let h_x_5078 a b c := a^2*(a^4 - b^4 + 3×a^2×b×c - a×b^2×c - a×b×c^2 - c^4) in
        cPointhb h_x_5078.
Definition X_5079 :=
        let h_x_5079 a b c := a^4 - 7×a^2×b^2 + 6×b^4 - 7×a^2×c^2 - 12×b^2×c^2 + 6×c^4 in
        cPointhb h_x_5079.
Definition X_5080 :=
        let h_x_5080 a b c := -a^4 + b^4 - a^2×b×c + a×b^2×c + a×b×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5080.
Definition X_5081 :=
        let h_x_5081 a b c := (a - b - c)*(a^2 + b^2 - c^2)*(a^2 - b^2 + b×c - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5081.
Definition X_5082 :=
        let h_x_5082 a b c := -a^4 + b^4 + 4×a^2×b×c - 4×a×b^2×c - 4×a×b×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5082.
Definition X_5083 :=
        let h_x_5083 a b c := a*(a + b - c)*(a - b + c)*(a^2×b - 2×a×b^2 + b^3 + a^2×c - 2×a×c^2 + c^3) in
        cPointhb h_x_5083.
Definition X_5084 :=
        let h_x_5084 a b c := -a^4 + b^4 + 4×a^2×b×c + 4×a×b^2×c + 4×a×b×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5084.
Definition X_5085 :=
        let h_x_5085 a b c := a^2*(3×a^4 - 2×a^2×b^2 - b^4 - 2×a^2×c^2 - 6×b^2×c^2 - c^4) in
        cPointhb h_x_5085.
Definition X_5086 :=
        let h_x_5086 a b c := -a^4 + a^3×b - a×b^3 + b^4 + a^3×c - a^2×b×c - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5086.
Definition X_5087 :=
        let h_x_5087 a b c := a^2×b + a×b^2 - 2×b^3 + a^2×c - 4×a×b×c + 2×b^2×c + a×c^2 + 2×b×c^2 - 2×c^3 in
        cPointhb h_x_5087.
Definition X_5088 :=
        let h_x_5088 a b c := -a^4 + a^2×b^2 - a^2×b×c + b^3×c + a^2×c^2 - 2×b^2×c^2 + b×c^3 in
        cPointhb h_x_5088.
Definition X_5089 :=
        let h_x_5089 a b c := a*(a^2 + b^2 - c^2)*(a×b - b^2 + a×c - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5089.
Definition X_5090 :=
        let h_x_5090 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^3 + b^3 + b^2×c + b×c^2 + c^3) in
        cPointhb h_x_5090.
Definition X_5091 :=
        let h_x_5091 a b c := a*(a^4 - a^3×b - a^3×c + a^2×b×c + b^3×c - 2×b^2×c^2 + b×c^3) in
        cPointhb h_x_5091.
Definition X_5092 :=
        let h_x_5092 a b c := a^2*(2×a^4 - a^2×b^2 - b^4 - a^2×c^2 - 4×b^2×c^2 - c^4) in
        cPointhb h_x_5092.
Definition X_5093 :=
        let h_x_5093 a b c := a^2*(3×a^4 - 8×a^2×b^2 + 5×b^4 - 8×a^2×c^2 - 6×b^2×c^2 + 5×c^4) in
        cPointhb h_x_5093.
Definition X_5094 :=
        let h_x_5094 a b c := (a^2 - 2×b^2 - 2×c^2)*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5094.
Definition X_5095 :=
        let h_x_5095 a b c := (2×a^2 - b^2 - c^2)^2*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5095.
Definition X_5096 :=
        let h_x_5096 a b c := a^2*(a^4 - b^4 + a^2×b×c + a×b^2×c + a×b×c^2 - 2×b^2×c^2 - c^4) in
        cPointhb h_x_5096.
Definition X_5097 :=
        let h_x_5097 a b c := a^2*(2×a^4 - 5×a^2×b^2 + 3×b^4 - 5×a^2×c^2 - 4×b^2×c^2 + 3×c^4) in
        cPointhb h_x_5097.
Definition X_5098 :=
        let h_x_5098 a b c := a^2*(b - c)*(-(a×b^3) + b^4 + 2×a^2×b×c - a×b^2×c - a×b×c^2 - a×c^3 + c^4) in
        cPointhb h_x_5098.
Definition X_5099 :=
        let h_x_5099 a b c := (b - c)^2×(b + c)^2*(-2×a^2 + b^2 + c^2)*(-a^4 + b^4 - b^2×c^2 + c^4) in
        cPointhb h_x_5099.
Definition X_5100 :=
        let h_x_5100 a b c := -a^4 + b^4 + 3×a^2×b×c - 2×a×b^2×c + b^3×c - 2×a×b×c^2 + b×c^3 + c^4 in
        cPointhb h_x_5100.
Definition X_5101 :=
        let h_x_5101 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^2 - a×b + b^2 - a×c + c^2) in
        cPointhb h_x_5101.
Definition X_5102 :=
        let h_x_5102 a b c := a^2*(3×a^4 - 10×a^2×b^2 + 7×b^4 - 10×a^2×c^2 - 6×b^2×c^2 + 7×c^4) in
        cPointhb h_x_5102.
Definition X_5103 :=
        let h_x_5103 a b c := -(a^4×b^2) + a^2×b^4 + b^6 - a^4×c^2 - 2×a^2×b^2×c^2 + a^2×c^4 + c^6 in
        cPointhb h_x_5103.
Definition X_5104 :=
        let h_x_5104 a b c := a^2*(a^4 + 2×a^2×b^2 - 2×b^4 + 2×a^2×c^2 - b^2×c^2 - 2×c^4) in
        cPointhb h_x_5104.
Definition X_5105 :=
        let h_x_5105 a b c := a^2*(a^2×b + 2×a×b^2 + b^3 + a^2×c + a×b×c + 2×b^2×c + 2×a×c^2 + 2×b×c^2 + c^3) in
        cPointhb h_x_5105.
Definition X_5106 :=
        let h_x_5106 a b c := a^2*(a^4×b^2 - 2×a^2×b^4 + a^4×c^2 + b^4×c^2 - 2×a^2×c^4 + b^2×c^4) in
        cPointhb h_x_5106.
Definition X_5107 :=
        let h_x_5107 a b c := a^2*(2×a^4 - 5×a^2×b^2 + 5×b^4 - 5×a^2×c^2 - 2×b^2×c^2 + 5×c^4) in
        cPointhb h_x_5107.
Definition X_5108 :=
        let h_x_5108 a b c := a^6 - 2×a^4×b^2 - 2×a^4×c^2 + 5×a^2×b^2×c^2 - b^4×c^2 - b^2×c^4 in
        cPointhb h_x_5108.
Definition X_5109 :=
        let h_x_5109 a b c := a^2*(a^2×b + 2×a×b^2 + b^3 + a^2×c + 2×b^2×c + 2×a×c^2 + 2×b×c^2 + c^3) in
        cPointhb h_x_5109.
Definition X_5110 :=
        let h_x_5110 a b c := a^2*(a^3 - 2×a×b^2 - b^3 - a×b×c - 2×b^2×c - 2×a×c^2 - 2×b×c^2 - c^3) in
        cPointhb h_x_5110.
Definition X_5111 :=
        let h_x_5111 a b c := a^2*(a^4 - 2×a^2×b^2 + 2×b^4 - 2×a^2×c^2 - b^2×c^2 + 2×c^4) in
        cPointhb h_x_5111.
Definition X_5112 :=
        let h_x_5112 a b c := (a^2×b^2 - b^4 + a^2×c^2 - c^4)*(3×a^4 - b^4 + 2×b^2×c^2 - c^4) in
        cPointhb h_x_5112.
Definition X_5113 :=
        let h_x_5113 a b c := a^2*(b - c)*(b + c)*(a^4 + a^2×b^2 - b^4 + a^2×c^2 - b^2×c^2 - c^4) in
        cPointhb h_x_5113.
Definition X_5114 :=
        let h_x_5114 a b c := a^2*(a^3 - a^2×b - 2×a×b^2 - a^2×c - 2×b^2×c - 2×a×c^2 - 2×b×c^2) in
        cPointhb h_x_5114.
Definition X_5115 :=
        let h_x_5115 a b c := a^2*(a^3 + 2×a^2×b + a×b^2 + 2×a^2×c + 4×a×b×c + b^2×c + a×c^2 + b×c^2) in
        cPointhb h_x_5115.
Definition X_5116 :=
        let h_x_5116 a b c := a^2*(a^4 - a^2×b^2 - b^4 - a^2×c^2 - 3×b^2×c^2 - c^4) in
        cPointhb h_x_5116.
Definition X_5117 :=
        let h_x_5117 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(b^2 - b×c + c^2)*(b^2 + b×c + c^2) in
        cPointhb h_x_5117.
Definition X_5118 :=
        let h_x_5118 a b c := a^2*(a - b)*(a + b)*(a - c)*(a + c)*(a^2×b^2 + a^2×c^2 - 2×b^2×c^2) in
        cPointhb h_x_5118.
Definition X_5119 :=
        let h_x_5119 a b c := a*(a^3 + a^2×b - a×b^2 - b^3 + a^2×c - 4×a×b×c + b^2×c - a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5119.
Definition X_5120 :=
        let h_x_5120 a b c := a^2*(a^3 + a^2×b - a×b^2 - b^3 + a^2×c + 4×a×b×c - b^2×c - a×c^2 - b×c^2 - c^3) in
        cPointhb h_x_5120.
Definition X_5121 :=
        let h_x_5121 a b c := a^2×b + 2×a×b^2 - b^3 + a^2×c - 6×a×b×c + b^2×c + 2×a×c^2 + b×c^2 - c^3 in
        cPointhb h_x_5121.
Definition X_5122 :=
        let h_x_5122 a b c := a*(4×a^3 + a^2×b - 4×a×b^2 - b^3 + a^2×c + 2×a×b×c + b^2×c - 4×a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5122.
Definition X_5123 :=
        let h_x_5123 a b c := (a - b - c)*(a^2×b - a×b^2 - 2×b^3 + a^2×c + 2×b^2×c - a×c^2 + 2×b×c^2 - 2×c^3) in
        cPointhb h_x_5123.
Definition X_5124 :=
        let h_x_5124 a b c := a^2*(a^3 + a^2×b - a×b^2 - b^3 + a^2×c + a×b×c - b^2×c - a×c^2 - b×c^2 - c^3) in
        cPointhb h_x_5124.
Definition X_5125 :=
        let h_x_5125 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^2×b - b^3 + a^2×c + a×b×c - c^3) in
        cPointhb h_x_5125.
Definition X_5126 :=
        let h_x_5126 a b c := a*(4×a^3 - a^2×b - 4×a×b^2 + b^3 - a^2×c + 6×a×b×c - b^2×c - 4×a×c^2 - b×c^2 + c^3) in
        cPointhb h_x_5126.
Definition X_5127 :=
        let h_x_5127 a b c := a^2*(a + b)*(a + c)*(a^3 - a^2×b - a×b^2 + b^3 - a^2×c - a×b×c + b^2×c - a×c^2 + b×c^2 + c^3) in
        cPointhb h_x_5127.
Definition X_5128 :=
        let h_x_5128 a b c := a*(3×a^3 + 3×a^2×b - 3×a×b^2 - 3×b^3 + 3×a^2×c - 2×a×b×c + 3×b^2×c - 3×a×c^2 + 3×b×c^2 - 3×c^3) in
        cPointhb h_x_5128.
Definition X_5129 :=
        let h_x_5129 a b c := -3×a^4 + 2×a^2×b^2 + b^4 + 8×a^2×b×c + 8×a×b^2×c + 2×a^2×c^2 + 8×a×b×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5129.
Definition X_5130 :=
        let h_x_5130 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^3 + b^3 + 2×a×b×c + b^2×c + b×c^2 + c^3) in
        cPointhb h_x_5130.
Definition X_5131 :=
        let h_x_5131 a b c := a*(3×a^3 + a^2×b - 3×a×b^2 - b^3 + a^2×c + a×b×c + b^2×c - 3×a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5131.
Definition X_5132 :=
        let h_x_5132 a b c := a^2*(a^3×b - a×b^3 + a^3×c - 2×a×b^2×c - b^3×c - 2×a×b×c^2 - a×c^3 - b×c^3) in
        cPointhb h_x_5132.
Definition X_5133 :=
        let h_x_5133 a b c := a^4×b^2 - b^6 + a^4×c^2 + 2×a^2×b^2×c^2 + b^4×c^2 + b^2×c^4 - c^6 in
        cPointhb h_x_5133.
Definition X_5134 :=
        let h_x_5134 a b c := -a^4 - a^3×b + a^2×b^2 + b^4 - a^3×c + a^2×b×c + a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5134.
Definition X_5135 :=
        let h_x_5135 a b c := a^2*(a^4 - a^2×b^2 - a^2×b×c - a×b^2×c - a^2×c^2 - a×b×c^2 - 2×b^2×c^2) in
        cPointhb h_x_5135.
Definition X_5136 :=
        let h_x_5136 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^3 - a×b^2 - b^2×c - a×c^2 - b×c^2) in
        cPointhb h_x_5136.
Definition X_5137 :=
        let h_x_5137 a b c := a*(a^5 - a^3×b^2 + a^3×b×c + b^4×c - a^3×c^2 - b^3×c^2 - b^2×c^3 + b×c^4) in
        cPointhb h_x_5137.
Definition X_5138 :=
        let h_x_5138 a b c := a^2*(a^4 - a^2×b^2 - 2×a^2×b×c - 2×a×b^2×c - a^2×c^2 - 2×a×b×c^2 - 2×b^2×c^2) in
        cPointhb h_x_5138.
Definition X_5139 :=
        let h_x_5139 a b c := (b - c)^2×(b + c)^2*(-a^2 + b^2 - c^2)*(a^2 + b^2 - c^2)*(-3×a^2 + b^2 + c^2) in
        cPointhb h_x_5139.
Definition X_5140 :=
        let h_x_5140 a b c := a^2*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^2×b^2 + b^4 + a^2×c^2 - 4×b^2×c^2 + c^4) in
        cPointhb h_x_5140.
Definition X_5141 :=
        let h_x_5141 a b c := 2×a^2×b^2 - 2×b^4 + a^2×b×c + a×b^2×c + 2×a^2×c^2 + a×b×c^2 + 4×b^2×c^2 - 2×c^4 in
        cPointhb h_x_5141.
Definition X_5142 :=
        let h_x_5142 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a×b^2 + b^3 + a×b×c + b^2×c + a×c^2 + b×c^2 + c^3) in
        cPointhb h_x_5142.
Definition X_5143 :=
        let h_x_5143 a b c := a^2*(a^3×b - a×b^3 + a^3×c - a^2×b×c + a×b^2×c + a×b×c^2 - b^2×c^2 - a×c^3) in
        cPointhb h_x_5143.
Definition X_5144 :=
        let h_x_5144 a b c := a*(2×a^4 - 2×a×b^3 + a×b^2×c - b^3×c + a×b×c^2 + 2×b^2×c^2 - 2×a×c^3 - b×c^3) in
        cPointhb h_x_5144.
Definition X_5145 :=
        let h_x_5145 a b c := a^2*(a^2×b^2 + a×b^3 + a×b^2×c + b^3×c + a^2×c^2 + a×b×c^2 + b^2×c^2 + a×c^3 + b×c^3) in
        cPointhb h_x_5145.
Definition X_5146 :=
        let h_x_5146 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^3 + b^3 - a×b×c - b^2×c - b×c^2 + c^3) in
        cPointhb h_x_5146.
Definition X_5147 :=
        let h_x_5147 a b c := a^2*(b + c)*(a^4 - a^2×b^2 - a×b^3 + a×b^2×c - a^2×c^2 + a×b×c^2 + b^2×c^2 - a×c^3) in
        cPointhb h_x_5147.
Definition X_5148 :=
        let h_x_5148 a b c := a^2*(a - b - c)*(a^2×b^2 + b^4 - 4×a^2×b×c + 2×b^3×c + a^2×c^2 - 4×b^2×c^2 + 2×b×c^3 + c^4) in
        cPointhb h_x_5148.
Definition X_5149 :=
        let h_x_5149 a b c := a^8 - a^4×b^2×c^2 - a^2×b^4×c^2 + b^6×c^2 - a^2×b^2×c^4 + b^2×c^6 in
        cPointhb h_x_5149.
Definition X_5150 :=
        let h_x_5150 a b c := a*(a^5 - a^3×b^2 + a^3×b×c - a^3×c^2 - 2×a×b^2×c^2 + b^3×c^2 + b^2×c^3) in
        cPointhb h_x_5150.
Definition X_5151 :=
        let h_x_5151 a b c := (2×a - b - c)*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a×b + b^2 + a×c - 4×b×c + c^2) in
        cPointhb h_x_5151.
Definition X_5152 :=
        let h_x_5152 a b c := a^8 - a^6×b^2 + a^4×b^4 - a^2×b^6 - a^6×c^2 + a^4×c^4 + b^4×c^4 - a^2×c^6 in
        cPointhb h_x_5152.
Definition X_5153 :=
        let h_x_5153 a b c := a^2*(a^2×b + 2×a×b^2 + b^3 + a^2×c + 2×a×b×c + 2×b^2×c + 2×a×c^2 + 2×b×c^2 + c^3) in
        cPointhb h_x_5153.
Definition X_5154 :=
        let h_x_5154 a b c := -2×a^2×b^2 + 2×b^4 + a^2×b×c + a×b^2×c - 2×a^2×c^2 + a×b×c^2 - 4×b^2×c^2 + 2×c^4 in
        cPointhb h_x_5154.
Definition X_5155 :=
        let h_x_5155 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^3 + b^3 + 4×a×b×c + b^2×c + b×c^2 + c^3) in
        cPointhb h_x_5155.
Definition X_5156 :=
        let h_x_5156 a b c := a^2*(a^3×b + a^2×b^2 + a^3×c + 2×a^2×b×c + a×b^2×c + a^2×c^2 + a×b×c^2 + b^2×c^2) in
        cPointhb h_x_5156.
Definition X_5157 :=
        let h_x_5157 a b c := a^2*(a^6 - a^2×b^4 - 2×a^2×b^2×c^2 - 2×b^4×c^2 - a^2×c^4 - 2×b^2×c^4) in
        cPointhb h_x_5157.
Definition X_5158 :=
        let h_x_5158 a b c := a^2*(a^2 - b^2 - c^2)*(a^4 + a^2×b^2 - 2×b^4 + a^2×c^2 + 4×b^2×c^2 - 2×c^4) in
        cPointhb h_x_5158.
Definition X_5159 :=
        let h_x_5159 a b c := (a^2 - b^2 - c^2)*(2×a^4 - a^2×b^2 - 3×b^4 - a^2×c^2 + 6×b^2×c^2 - 3×c^4) in
        cPointhb h_x_5159.
Definition X_5160 :=
        let h_x_5160 a b c := a*(a - b - c)*(2×a^4 - 2×b^4 - 2×a^2×b×c + b^3×c + 2×b^2×c^2 + b×c^3 - 2×c^4) in
        cPointhb h_x_5160.
Definition X_5161 :=
        let h_x_5161 a b c := a^2*(a^4 + a^3×b + a^3×c + a^2×b×c - a×b^2×c - b^3×c - a×b×c^2 - b×c^3) in
        cPointhb h_x_5161.
Definition X_5162 :=
        let h_x_5162 a b c := a^2*(a^6 + a^2×b^4 - b^6 + a^2×b^2×c^2 - b^4×c^2 + a^2×c^4 - b^2×c^4 - c^6) in
        cPointhb h_x_5162.
Definition X_5163 :=
        let h_x_5163 a b c := a^2*(a^3×b - 2×a×b^3 + a^3×c - 2×a^2×b×c + a×b^2×c + b^3×c + a×b×c^2 - 2×a×c^3 + b×c^3) in
        cPointhb h_x_5163.
Definition X_5164 :=
        let h_x_5164 a b c := a^2*(b + c)*(a^3×b + a^2×b^2 - a×b^3 - b^4 + a^3×c + a^2×c^2 - a×c^3 - c^4) in
        cPointhb h_x_5164.
Definition X_5165 :=
        let h_x_5165 a b c := a^2*(2×a^2×b + a×b^2 - b^3 + 2×a^2×c + 3×a×b×c + b^2×c + a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5165.
Definition X_5166 :=
        let h_x_5166 a b c := a^2*(a^6 - 3×a^4×b^2 - 3×a^2×b^4 + b^6 - 3×a^4×c^2 + 9×a^2×b^2×c^2 - 3×a^2×c^4 + c^6) in
        cPointhb h_x_5166.
Definition X_5167 :=
        let h_x_5167 a b c := a^2*(a^4×b^4 - a^2×b^6 + b^6×c^2 + a^4×c^4 - 2×b^4×c^4 - a^2×c^6 + b^2×c^6) in
        cPointhb h_x_5167.
Definition X_5168 :=
        let h_x_5168 a b c := a^2*(2×a^3 - a^2×b - a×b^2 - b^3 - a^2×c + 2×b^2×c - a×c^2 + 2×b×c^2 - c^3) in
        cPointhb h_x_5168.
Definition X_5169 :=
        let h_x_5169 a b c := a^4×b^2 - b^6 + a^4×c^2 + a^2×b^2×c^2 + b^4×c^2 + b^2×c^4 - c^6 in
        cPointhb h_x_5169.
Definition X_5170 :=
        let h_x_5170 a b c := a^2*(a + b)*(a + c)*(2×a^3 - 2×a^2×b + b^3 - 2×a^2×c + 2×a×b×c - b^2×c - b×c^2 + c^3) in
        cPointhb h_x_5170.
Definition X_5171 :=
        let h_x_5171 a b c := a^2*(a^6 - 4×a^4×b^2 + 3×a^2×b^4 - 4×a^4×c^2 + 2×b^4×c^2 + 3×a^2×c^4 + 2×b^2×c^4) in
        cPointhb h_x_5171.
Definition X_5172 :=
        let h_x_5172 a b c := a^2*(a + b - c)*(a - b + c)*(a^3 - a^2×b - a×b^2 + b^3 - a^2×c - a×b×c + b^2×c - a×c^2 + b×c^2 + c^3) in
        cPointhb h_x_5172.
Definition X_5173 :=
        let h_x_5173 a b c := a*(a + b - c)*(a - b + c)*(a^2×b - 2×a×b^2 + b^3 + a^2×c - 2×a×b×c - b^2×c - 2×a×c^2 - b×c^2 + c^3) in
        cPointhb h_x_5173.
Definition X_5174 :=
        let h_x_5174 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^3 - a^2×b - a×b^2 + b^3 - a^2×c - a×b×c - a×c^2 + c^3) in
        cPointhb h_x_5174.
Definition X_5175 :=
        let h_x_5175 a b c := 3×a^4 - 2×a^3×b + 2×a×b^3 - 3×b^4 - 2×a^3×c + 2×a×b^2×c + 2×a×b×c^2 + 6×b^2×c^2 + 2×a×c^3 - 3×c^4 in
        cPointhb h_x_5175.
Definition X_5176 :=
        let h_x_5176 a b c := -a^4 + a^3×b - a×b^3 + b^4 + a^3×c - 3×a^2×b×c + 2×a×b^2×c + 2×a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5176.
Definition X_5177 :=
        let h_x_5177 a b c := a^4 + 2×a^2×b^2 - 3×b^4 + 4×a^2×b×c + 4×a×b^2×c + 2×a^2×c^2 + 4×a×b×c^2 + 6×b^2×c^2 - 3×c^4 in
        cPointhb h_x_5177.
Definition X_5178 :=
        let h_x_5178 a b c := -a^4 + a^3×b - a×b^3 + b^4 + a^3×c + a^2×b×c - 2×a×b^2×c - 2×a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5178.
Definition X_5179 :=
        let h_x_5179 a b c := -(a^3×b) + a^2×b^2 - a×b^3 + b^4 - a^3×c + a×b^2×c + a^2×c^2 + a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5179.
Definition X_5180 :=
        let h_x_5180 a b c := a^4 + 2×a^3×b - 2×a×b^3 - b^4 + 2×a^3×c - 3×a^2×b×c + a×b^2×c + a×b×c^2 + 2×b^2×c^2 - 2×a×c^3 - c^4 in
        cPointhb h_x_5180.
Definition X_5181 :=
        let h_x_5181 a b c := (2×a^2 - b^2 - c^2)*(a^4×b^2 - b^6 + a^4×c^2 - 2×a^2×b^2×c^2 + b^4×c^2 + b^2×c^4 - c^6) in
        cPointhb h_x_5181.
Definition X_5182 :=
        let h_x_5182 a b c := 3×a^6 - 2×a^4×b^2 + a^2×b^4 - 2×a^4×c^2 - 3×a^2×b^2×c^2 + b^4×c^2 + a^2×c^4 + b^2×c^4 in
        cPointhb h_x_5182.
Definition X_5183 :=
        let h_x_5183 a b c := a*(2×a^3 + 3×a^2×b - 2×a×b^2 - 3×b^3 + 3×a^2×c - 4×a×b×c + 3×b^2×c - 2×a×c^2 + 3×b×c^2 - 3×c^3) in
        cPointhb h_x_5183.
Definition X_5184 :=
        let h_x_5184 a b c := a*(a^4 + 2×a^3×b - a×b^3 - b^4 + 2×a^3×c - a×b^2×c - a×b×c^2 + b^2×c^2 - a×c^3 - c^4) in
        cPointhb h_x_5184.
Definition X_5185 :=
        let h_x_5185 a b c := a^2*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^2×b^2 - 2×a×b^3 + b^4 + a^2×c^2 - 2×a×c^3 + c^4) in
        cPointhb h_x_5185.
Definition X_5186 :=
        let h_x_5186 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^4×b^2 + a^4×c^2 - 4×a^2×b^2×c^2 + b^4×c^2 + b^2×c^4) in
        cPointhb h_x_5186.
Definition X_5187 :=
        let h_x_5187 a b c := a^4 + 2×a^2×b^2 - 3×b^4 - 2×a^2×b×c - 2×a×b^2×c + 2×a^2×c^2 - 2×a×b×c^2 + 6×b^2×c^2 - 3×c^4 in
        cPointhb h_x_5187.
Definition X_5188 :=
        let h_x_5188 a b c := a^2*(3×a^4×b^2 - 2×a^2×b^4 - b^6 + 3×a^4×c^2 - 3×b^4×c^2 - 2×a^2×c^4 - 3×b^2×c^4 - c^6) in
        cPointhb h_x_5188.
Definition X_5189 :=
        let h_x_5189 a b c := -a^6 - a^4×b^2 + a^2×b^4 + b^6 - a^4×c^2 + a^2×b^2×c^2 - b^4×c^2 + a^2×c^4 - b^2×c^4 + c^6 in
        cPointhb h_x_5189.
Definition X_5190 :=
        let h_x_5190 a b c := (a - b - c)*(b - c)^2*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^2×b - b^3 + a^2×c + a×b×c - c^3) in
        cPointhb h_x_5190.
Definition X_5191 :=
        let h_x_5191 a b c := a^2*(2×a^6 - 2×a^4×b^2 + a^2×b^4 - b^6 - 2×a^4×c^2 + b^4×c^2 + a^2×c^4 + b^2×c^4 - c^6) in
        cPointhb h_x_5191.
Definition X_5192 :=
        let h_x_5192 a b c := a^4 + a^3×b + a^2×b^2 + a×b^3 + a^3×c + b^3×c + a^2×c^2 + 2×b^2×c^2 + a×c^3 + b×c^3 in
        cPointhb h_x_5192.
Definition X_5193 :=
        let h_x_5193 a b c := a^2*(a + b - c)*(a - b + c)*(a^3 - a^2×b - a×b^2 + b^3 - a^2×c + 5×a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2 + c^3) in
        cPointhb h_x_5193.
Definition X_5194 :=
        let h_x_5194 a b c := a^2*(a + b - c)*(a - b + c)*(a^2×b^2 + b^4 + 4×a^2×b×c - 2×b^3×c + a^2×c^2 - 4×b^2×c^2 - 2×b×c^3 + c^4) in
        cPointhb h_x_5194.
Definition X_5195 :=
        let h_x_5195 a b c := a^4 + a^3×b - a×b^3 - b^4 + a^3×c - 3×a^2×b×c + a×b^2×c + b^3×c + a×b×c^2 - a×c^3 + b×c^3 - c^4 in
        cPointhb h_x_5195.
Definition X_5196 :=
        let h_x_5196 a b c := (a + b)*(a + c)*(a^4 + a^3×b - a^2×b^2 - b^4 + a^3×c - a^2×b×c - a^2×c^2 + 2×b^2×c^2 - c^4) in
        cPointhb h_x_5196.
Definition X_5197 :=
        let h_x_5197 a b c := a^2*(a^4 - a^2×b^2 + a^2×b×c - a×b^2×c - b^3×c - a^2×c^2 - a×b×c^2 + b^2×c^2 - b×c^3) in
        cPointhb h_x_5197.
Definition X_5198 :=
        let h_x_5198 a b c := a^2*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(a^4 - 2×a^2×b^2 + b^4 - 2×a^2×c^2 - 10×b^2×c^2 + c^4) in
        cPointhb h_x_5198.
Definition X_5199 :=
        let h_x_5199 a b c := (a - b - c)*(2×a^3 - a^2×b + 2×a×b^2 - 3×b^3 - a^2×c - 4×a×b×c + 3×b^2×c + 2×a×c^2 + 3×b×c^2 - 3×c^3) in
        cPointhb h_x_5199.
Definition X_5200 :=
        let h_x_5200 a b c := (a^2 + b^2 - c^2)*(a^2 - b^2 + c^2)*(2×a^2 + sqrt((a + b - c)*(a - b + c)*(-a + b + c)*(a + b + c))) in
        cPointhb h_x_5200.
Definition X_5201 :=
        let h_x_5201 a b c := a^2*(a^4×b^2 - a^2×b^4 + a^4×c^2 + 2×a^2×b^2×c^2 - b^4×c^2 - a^2×c^4 - b^2×c^4) in
        cPointhb h_x_5201.
Definition X_5202 :=
        let h_x_5202 a b c := a^2*(b + c)*(a^5 - a^3×b^2 - b^4×c - a^3×c^2 + a×b^2×c^2 + b^3×c^2 + b^2×c^3 - b×c^4) in
        cPointhb h_x_5202.
Definition X_5203 :=
        let h_x_5203 a b c := (a^2 + b^2 - 3×c^2)*(2×a^2 - b^2 - c^2)*(a^2 + b^2 - c^2)*(a^2 - 3×b^2 + c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5203.
Definition X_5204 :=
        let h_x_5204 a b c := a^2*(3×a^2 - 3×b^2 + 2×b×c - 3×c^2) in
        cPointhb h_x_5204.
Definition X_5205 :=
        let h_x_5205 a b c := -a^3 + a^2×b + a^2×c - 3×a×b×c + b^2×c + b×c^2 in
        cPointhb h_x_5205.
Definition X_5206 :=
        let h_x_5206 a b c := a^2*(3×a^2 - 2×b^2 - 2×c^2) in
        cPointhb h_x_5206.
Definition X_5207 :=
        let h_x_5207 a b c := -a^6 + b^6 - a^2×b^2×c^2 + c^6 in
        cPointhb h_x_5207.
Definition X_5208 :=
        let h_x_5208 a b c := a*(a + b)*(a + c)*(a×b^2 - b^3 + a×b×c + a×c^2 - c^3) in
        cPointhb h_x_5208.
Definition X_5209 :=
        let h_x_5209 a b c := b*(a + b)*c*(a + c)*(-a^3 - a×b×c + b^2×c + b×c^2) in
        cPointhb h_x_5209.
Definition X_5210 :=
        let h_x_5210 a b c := a^2*(7×a^2 - 5×b^2 - 5×c^2) in
        cPointhb h_x_5210.
Definition X_5211 :=
        let h_x_5211 a b c := -a^3 - 2×a×b^2 + b^3 + 3×a×b×c - 2×a×c^2 + c^3 in
        cPointhb h_x_5211.
Definition X_5212 :=
        let h_x_5212 a b c := -5×a^2×b + b^3 - 5×a^2×c + 6×a×b×c + b^2×c + b×c^2 + c^3 in
        cPointhb h_x_5212.
Definition X_5213 :=
        let h_x_5213 a b c := a×(b + c)^2*(a^2 - a×b - b^2 + a×c)*(a^2 + a×b - a×c - c^2) in
        cPointhb h_x_5213.
Definition X_5214 :=
        let h_x_5214 a b c := (a + b)*(b - c)*(a + c)*(a^2 - a×b + 2×b^2 - a×c + 4×b×c + 2×c^2) in
        cPointhb h_x_5214.
Definition X_5215 :=
        let h_x_5215 a b c := -10×a^4 + 7×a^2×b^2 - 4×b^4 + 7×a^2×c^2 + 4×b^2×c^2 - 4×c^4 in
        cPointhb h_x_5215.
Definition X_5216 :=
        let h_x_5216 a b c := a^2*(a + b)*(b - c)*(a + c)*(2×b^2 + 3×b×c + 2×c^2) in
        cPointhb h_x_5216.
Definition X_5217 :=
        let h_x_5217 a b c := a^2*(3×a^2 - 3×b^2 - 2×b×c - 3×c^2) in
        cPointhb h_x_5217.
Definition X_5218 :=
        let h_x_5218 a b c := (a - b - c)*(3×a^2 - b^2 + 2×b×c - c^2) in
        cPointhb h_x_5218.
Definition X_5219 :=
        let h_x_5219 a b c := (a - 2×b - 2×c)*(a + b - c)*(a - b + c) in
        cPointhb h_x_5219.
Definition X_5220 :=
        let h_x_5220 a b c := a*(a^2 + a×b - 2×b^2 + a×c - 2×b×c - 2×c^2) in
        cPointhb h_x_5220.
Definition X_5221 :=
        let h_x_5221 a b c := a*(a + b - c)*(a - b + c)*(a + 2×b + 2×c) in
        cPointhb h_x_5221.
Definition X_5222 :=
        let h_x_5222 a b c := 3×a^2 + b^2 - 2×b×c + c^2 in
        cPointhb h_x_5222.
Definition X_5223 :=
        let h_x_5223 a b c := a*(a^2 + 2×a×b - 3×b^2 + 2×a×c - 2×b×c - 3×c^2) in
        cPointhb h_x_5223.
Definition X_5224 :=
        let h_x_5224 a b c := a×b + b^2 + a×c + b×c + c^2 in
        cPointhb h_x_5224.
Definition X_5225 :=
        let h_x_5225 a b c := 3×a^4 - 3×b^4 - 4×a^2×b×c + 6×b^2×c^2 - 3×c^4 in
        cPointhb h_x_5225.
Definition X_5226 :=
        let h_x_5226 a b c := (a - 3×b - 3×c)*(a + b - c)*(a - b + c) in
        cPointhb h_x_5226.
Definition X_5227 :=
        let h_x_5227 a b c := a*(a^2 - b^2 - c^2)*(a^2 + b^2 + 2×b×c + c^2) in
        cPointhb h_x_5227.
Definition X_5228 :=
        let h_x_5228 a b c := a*(a + b - c)*(a - b + c)*(a^2 - a×b - a×c - 2×b×c) in
        cPointhb h_x_5228.
Definition X_5229 :=
        let h_x_5229 a b c := 3×a^4 - 3×b^4 + 4×a^2×b×c + 6×b^2×c^2 - 3×c^4 in
        cPointhb h_x_5229.
Definition X_5230 :=
        let h_x_5230 a b c := a^4 + 2×a^3×b + b^4 + 2×a^3×c - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5230.
Definition X_5231 :=
        let h_x_5231 a b c := (a - b - c)*(a^2 + a×b - 2×b^2 + a×c + 4×b×c - 2×c^2) in
        cPointhb h_x_5231.
Definition X_5232 :=
        let h_x_5232 a b c := a^2 - 2×a×b - 3×b^2 - 2×a×c - 2×b×c - 3×c^2 in
        cPointhb h_x_5232.
Definition X_5233 :=
        let h_x_5233 a b c := (a - b - c)*(a×b + b^2 + a×c - b×c + c^2) in
        cPointhb h_x_5233.
Definition X_5234 :=
        let h_x_5234 a b c := a*(a - b - c)*(3×a^2 + 4×a×b + b^2 + 4×a×c + 6×b×c + c^2) in
        cPointhb h_x_5234.
Definition X_5235 :=
        let h_x_5235 a b c := (a + b)*(a - 2×b - 2×c)*(a + c) in
        cPointhb h_x_5235.
Definition X_5236 :=
        let h_x_5236 a b c := (a + b - c)*(a - b + c)*(a^2 + b^2 - c^2)*(a×b - b^2 + a×c - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5236.
Definition X_5237 :=
        let h_x_5237 a b c := a^2*(5×a^2 - 5×b^2 - 5×c^2 + 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5237.
Definition X_5238 :=
        let h_x_5238 a b c := a^2*(5×a^2 - 5×b^2 - 5×c^2 - 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5238.
Definition X_5239 :=
        let h_x_5239 a b c := a*(a^2 - b^2 - 2×b×c - c^2 + 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5239.
Definition X_5240 :=
        let h_x_5240 a b c := a*(a^2 - b^2 - 2×b×c - c^2 - 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5240.
Definition X_5241 :=
        let h_x_5241 a b c := a×b^2 + b^3 + 6×a×b×c + b^2×c + a×c^2 + b×c^2 + c^3 in
        cPointhb h_x_5241.
Definition X_5242 :=
        let h_x_5242 a b c := -a^2 + a×b + a×c + 2×sqrt(3)*(SS a b c) in
        cPointhb h_x_5242.
Definition X_5243 :=
        let h_x_5243 a b c := a^2 - a×b - a×c + 2×sqrt(3)*(SS a b c) in
        cPointhb h_x_5243.
Definition X_5244 :=
        let h_x_5244 a b c := (a + b - c)*(a - b + c)*(b + c)*(2×a^2 + a×b + b^2 + a×c + c^2) in
        cPointhb h_x_5244.
Definition X_5245 :=
        let h_x_5245 a b c := (a - b - c)*(a^2 + a×b + a×c + 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5245.
Definition X_5246 :=
        let h_x_5246 a b c := (a - b - c)*(a^2 + a×b + a×c - 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5246.
Definition X_5247 :=
        let h_x_5247 a b c := a*(a^3 + a^2×b + a^2×c + a×b×c - b^2×c - b×c^2) in
        cPointhb h_x_5247.
Definition X_5248 :=
        let h_x_5248 a b c := a*(a^3 - a×b^2 - 2×a×b×c - b^2×c - a×c^2 - b×c^2) in
        cPointhb h_x_5248.
Definition X_5249 :=
        let h_x_5249 a b c := a^2×b - b^3 + a^2×c + 2×a×b×c + b^2×c + b×c^2 - c^3 in
        cPointhb h_x_5249.
Definition X_5250 :=
        let h_x_5250 a b c := a*(a - b - c)*(a^2 + 2×a×b + b^2 + 2×a×c + c^2) in
        cPointhb h_x_5250.
Definition X_5251 :=
        let h_x_5251 a b c := a*(a^3 - a×b^2 - a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2) in
        cPointhb h_x_5251.
Definition X_5252 :=
        let h_x_5252 a b c := (a + b - c)*(a - b + c)*(a^2 - a×b + b^2 - a×c + 2×b×c + c^2) in
        cPointhb h_x_5252.
Definition X_5253 :=
        let h_x_5253 a b c := a*(a^3 - a×b^2 + 3×a×b×c + b^2×c - a×c^2 + b×c^2) in
        cPointhb h_x_5253.
Definition X_5254 :=
        let h_x_5254 a b c := a^2×b^2 + b^4 + a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5254.
Definition X_5255 :=
        let h_x_5255 a b c := a*(a^3 + a^2×b + a^2×c - a×b×c + b^2×c + b×c^2) in
        cPointhb h_x_5255.
Definition X_5256 :=
        let h_x_5256 a b c := a*(a^2 + 2×a×b + b^2 + 2×a×c + c^2) in
        cPointhb h_x_5256.
Definition X_5257 :=
        let h_x_5257 a b c := (b + c)*(3×a + b + c) in
        cPointhb h_x_5257.
Definition X_5258 :=
        let h_x_5258 a b c := a*(a^3 - a×b^2 + a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2) in
        cPointhb h_x_5258.
Definition X_5259 :=
        let h_x_5259 a b c := a*(a^3 - a×b^2 - 3×a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2) in
        cPointhb h_x_5259.
Definition X_5260 :=
        let h_x_5260 a b c := a*(a^3 - a×b^2 - a×b×c - 3×b^2×c - a×c^2 - 3×b×c^2) in
        cPointhb h_x_5260.
Definition X_5261 :=
        let h_x_5261 a b c := (a + b - c)*(a - b + c)*(a^2 + 3×b^2 + 6×b×c + 3×c^2) in
        cPointhb h_x_5261.
Definition X_5262 :=
        let h_x_5262 a b c := a*(a^3 + a^2×b + a×b^2 + b^3 + a^2×c + a×b×c + a×c^2 + c^3) in
        cPointhb h_x_5262.
Definition X_5263 :=
        let h_x_5263 a b c := a^3 + a×b^2 + a×b×c + b^2×c + a×c^2 + b×c^2 in
        cPointhb h_x_5263.
Definition X_5264 :=
        let h_x_5264 a b c := a*(a^3 + a^2×b + a^2×c + b^2×c + b×c^2) in
        cPointhb h_x_5264.
Definition X_5265 :=
        let h_x_5265 a b c := (a + b - c)*(a - b + c)*(5×a^2 - b^2 - 2×b×c - c^2) in
        cPointhb h_x_5265.
Definition X_5266 :=
        let h_x_5266 a b c := a*(2×a^3 + a^2×b + b^3 + a^2×c + b^2×c + b×c^2 + c^3) in
        cPointhb h_x_5266.
Definition X_5267 :=
        let h_x_5267 a b c := a*(2×a^3 - 2×a×b^2 - b^2×c - 2×a×c^2 - b×c^2) in
        cPointhb h_x_5267.
Definition X_5268 :=
        let h_x_5268 a b c := a*(a^2 + b^2 + 4×b×c + c^2) in
        cPointhb h_x_5268.
Definition X_5269 :=
        let h_x_5269 a b c := a*(3×a^2 + b^2 + 2×b×c + c^2) in
        cPointhb h_x_5269.
Definition X_5270 :=
        let h_x_5270 a b c := -a^4 + b^4 - 3×a^2×b×c - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5270.
Definition X_5271 :=
        let h_x_5271 a b c := a^3 - a×b^2 - 2×a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2 in
        cPointhb h_x_5271.
Definition X_5272 :=
        let h_x_5272 a b c := a*(a^2 + b^2 - 4×b×c + c^2) in
        cPointhb h_x_5272.
Definition X_5273 :=
        let h_x_5273 a b c := (a - b - c)*(3×a^2 + 2×a×b - b^2 + 2×a×c + 2×b×c - c^2) in
        cPointhb h_x_5273.
Definition X_5274 :=
        let h_x_5274 a b c := (a - b - c)*(a^2 + 3×b^2 - 6×b×c + 3×c^2) in
        cPointhb h_x_5274.
Definition X_5275 :=
        let h_x_5275 a b c := a*(a^3 + a×b^2 + 2×a×b×c + 2×b^2×c + a×c^2 + 2×b×c^2) in
        cPointhb h_x_5275.
Definition X_5276 :=
        let h_x_5276 a b c := a*(a^3 + a×b^2 + a×b×c + b^2×c + a×c^2 + b×c^2) in
        cPointhb h_x_5276.
Definition X_5277 :=
        let h_x_5277 a b c := a*(a^3 + a×b×c + b^2×c + b×c^2) in
        cPointhb h_x_5277.
Definition X_5278 :=
        let h_x_5278 a b c := -a^3 + a×b^2 + 2×a×b×c + b^2×c + a×c^2 + b×c^2 in
        cPointhb h_x_5278.
Definition X_5279 :=
        let h_x_5279 a b c := a*(a^4 - b^4 + a^2×b×c - b^3×c - b×c^3 - c^4) in
        cPointhb h_x_5279.
Definition X_5280 :=
        let h_x_5280 a b c := a^2*(a^2 + b^2 + b×c + c^2) in
        cPointhb h_x_5280.
Definition X_5281 :=
        let h_x_5281 a b c := (a - b - c)*(5×a^2 - b^2 + 2×b×c - c^2) in
        cPointhb h_x_5281.
Definition X_5282 :=
        let h_x_5282 a b c := a*(a^3 - b^3 - b^2×c - b×c^2 - c^3) in
        cPointhb h_x_5282.
Definition X_5283 :=
        let h_x_5283 a b c := a*(a×b^2 + a×b×c + b^2×c + a×c^2 + b×c^2) in
        cPointhb h_x_5283.
Definition X_5284 :=
        let h_x_5284 a b c := a*(a^2 - a×b - a×c - 3×b×c) in
        cPointhb h_x_5284.
Definition X_5285 :=
        let h_x_5285 a b c := a^2*(a^4 - b^4 + a^2×b×c - b^3×c - b×c^3 - c^4) in
        cPointhb h_x_5285.
Definition X_5286 :=
        let h_x_5286 a b c := (a^2 + b^2 - 2×b×c + c^2)*(a^2 + b^2 + 2×b×c + c^2) in
        cPointhb h_x_5286.
Definition X_5287 :=
        let h_x_5287 a b c := a*(a^2 + 2×a×b + b^2 + 2×a×c + 4×b×c + c^2) in
        cPointhb h_x_5287.
Definition X_5288 :=
        let h_x_5288 a b c := a*(a^3 - a×b^2 + 3×a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2) in
        cPointhb h_x_5288.
Definition X_5289 :=
        let h_x_5289 a b c := a*(a - b - c)*(a^2 - a×b - 2×b^2 - a×c + 2×b×c - 2×c^2) in
        cPointhb h_x_5289.
Definition X_5290 :=
        let h_x_5290 a b c := (a + b - c)*(a - b + c)*(a^2 + a×b + 2×b^2 + a×c + 4×b×c + 2×c^2) in
        cPointhb h_x_5290.
Definition X_5291 :=
        let h_x_5291 a b c := a*(a^3 + a×b×c - b^2×c - b×c^2) in
        cPointhb h_x_5291.
Definition X_5292 :=
        let h_x_5292 a b c := a^4 + 2×a^3×b + b^4 + 2×a^3×c + 2×a^2×b×c - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5292.
Definition X_5293 :=
        let h_x_5293 a b c := a*(a^3 + b^3 + a×b×c + 2×b^2×c + 2×b×c^2 + c^3) in
        cPointhb h_x_5293.
Definition X_5294 :=
        let h_x_5294 a b c := 2×a^3 + a^2×b + b^3 + a^2×c + b^2×c + b×c^2 + c^3 in
        cPointhb h_x_5294.
Definition X_5295 :=
        let h_x_5295 a b c := (b + c)*(-a^3 + a×b^2 + 2×a×b×c + 2×b^2×c + a×c^2 + 2×b×c^2) in
        cPointhb h_x_5295.
Definition X_5296 :=
        let h_x_5296 a b c := -a^2 + 4×a×b + b^2 + 4×a×c + 2×b×c + c^2 in
        cPointhb h_x_5296.
Definition X_5297 :=
        let h_x_5297 a b c := a*(a^2 + b^2 + 3×b×c + c^2) in
        cPointhb h_x_5297.
Definition X_5298 :=
        let h_x_5298 a b c := (2×a - b - c)*(a + b - c)*(a - b + c)*(2×a + b + c) in
        cPointhb h_x_5298.
Definition X_5299 :=
        let h_x_5299 a b c := a^2*(a^2 + b^2 - b×c + c^2) in
        cPointhb h_x_5299.
Definition X_5300 :=
        let h_x_5300 a b c := -a^4 + b^4 - a×b^2×c + b^3×c - a×b×c^2 + b×c^3 + c^4 in
        cPointhb h_x_5300.
Definition X_5301 :=
        let h_x_5301 a b c := a^2*(a^3 + a^2×b + a^2×c - b^2×c - b×c^2) in
        cPointhb h_x_5301.
Definition X_5302 :=
        let h_x_5302 a b c := a*(a - b - c)*(2×a^2 + 3×a×b + b^2 + 3×a×c + 4×b×c + c^2) in
        cPointhb h_x_5302.
Definition X_5303 :=
        let h_x_5303 a b c := a*(3×a^3 - 3×a×b^2 + a×b×c - b^2×c - 3×a×c^2 - b×c^2) in
        cPointhb h_x_5303.
Definition X_5304 :=
        let h_x_5304 a b c := 5×a^4 + 2×a^2×b^2 + b^4 + 2×a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5304.
Definition X_5305 :=
        let h_x_5305 a b c := 2×a^4 + a^2×b^2 + b^4 + a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5305.
Definition X_5306 :=
        let h_x_5306 a b c := 4×a^4 + a^2×b^2 + b^4 + a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5306.
Definition X_5307 :=
        let h_x_5307 a b c := (a^2 + a×b + a×c + 2×b×c)*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5307.
Definition X_5308 :=
        let h_x_5308 a b c := -a^2 - 4×a×b + b^2 - 4×a×c - 2×b×c + c^2 in
        cPointhb h_x_5308.
Definition X_5309 :=
        let h_x_5309 a b c := a^4 + a^2×b^2 + b^4 + a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5309.
Definition X_5310 :=
        let h_x_5310 a b c := a^2*(a^4 - b^4 - a^2×b×c - b^3×c - b×c^3 - c^4) in
        cPointhb h_x_5310.
Definition X_5311 :=
        let h_x_5311 a b c := a*(a^2 + a×b + b^2 + a×c + 2×b×c + c^2) in
        cPointhb h_x_5311.
Definition X_5312 :=
        let h_x_5312 a b c := a^2*(2×a×b + 2×b^2 + 2×a×c + 3×b×c + 2×c^2) in
        cPointhb h_x_5312.
Definition X_5313 :=
        let h_x_5313 a b c := a^2*(2×a×b + 2×b^2 + 2×a×c + b×c + 2×c^2) in
        cPointhb h_x_5313.
Definition X_5314 :=
        let h_x_5314 a b c := a^2*(a^2 - b^2 - c^2)*(a^2 + b^2 + b×c + c^2) in
        cPointhb h_x_5314.
Definition X_5315 :=
        let h_x_5315 a b c := a^2*(a^2 + 2×a×b + b^2 + 2×a×c - b×c + c^2) in
        cPointhb h_x_5315.
Definition X_5316 :=
        let h_x_5316 a b c := a^2×b - b^3 + a^2×c - 8×a×b×c + b^2×c + b×c^2 - c^3 in
        cPointhb h_x_5316.
Definition X_5317 :=
        let h_x_5317 a b c := a*(a + b)*(a + c)*(a^2 + b^2 - c^2)^2×(a^2 - b^2 + c^2)^2 in
        cPointhb h_x_5317.
Definition X_5318 :=
        let h_x_5318 a b c := -(sqrt(3)×a^4) + sqrt(3)×b^4 - 2×sqrt(3)×b^2×c^2 + sqrt(3)×c^4 - 2×a^2*(SS a b c) in
        cPointhb h_x_5318.
Definition X_5319 :=
        let h_x_5319 a b c := 3×a^4 + 2×a^2×b^2 + b^4 + 2×a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5319.
Definition X_5320 :=
        let h_x_5320 a b c := a^3*(a^3 - a×b^2 - 2×a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2) in
        cPointhb h_x_5320.
Definition X_5321 :=
        let h_x_5321 a b c := -(sqrt(3)×a^4) + sqrt(3)×b^4 - 2×sqrt(3)×b^2×c^2 + sqrt(3)×c^4 + 2×a^2*(SS a b c) in
        cPointhb h_x_5321.
Definition X_5322 :=
        let h_x_5322 a b c := a^2*(a^4 - b^4 + a^2×b×c + b^3×c + b×c^3 - c^4) in
        cPointhb h_x_5322.
Definition X_5323 :=
        let h_x_5323 a b c := a*(a + b)*(a + b - c)*(a + c)*(a - b + c)*(a^2 + b^2 + 2×b×c + c^2) in
        cPointhb h_x_5323.
Definition X_5324 :=
        let h_x_5324 a b c := a*(a + b)*(a - b - c)*(a + c)*(a^2 + b^2 - 2×b×c + c^2) in
        cPointhb h_x_5324.
Definition X_5325 :=
        let h_x_5325 a b c := (a - b - c)*(4×a^2 + 3×a×b - b^2 + 3×a×c + 2×b×c - c^2) in
        cPointhb h_x_5325.
Definition X_5326 :=
        let h_x_5326 a b c := (a - b - c)*(4×a^2 - 3×b^2 + 6×b×c - 3×c^2) in
        cPointhb h_x_5326.
Definition X_5327 :=
        let h_x_5327 a b c := (a + b)*(a + c)*(a^4 - 2×a^3×b + b^4 - 2×a^3×c - 2×b^2×c^2 + c^4) in
        cPointhb h_x_5327.
Definition X_5328 :=
        let h_x_5328 a b c := (a - b - c)*(a^2 - 2×a×b - 3×b^2 - 2×a×c + 6×b×c - 3×c^2) in
        cPointhb h_x_5328.
Definition X_5329 :=
        let h_x_5329 a b c := a^2*(a^4 - b^4 + 2×a^2×b×c - c^4) in
        cPointhb h_x_5329.
Definition X_5330 :=
        let h_x_5330 a b c := a*(a - b - c)*(a^2 - a×b - 2×b^2 - a×c + 3×b×c - 2×c^2) in
        cPointhb h_x_5330.
Definition X_5331 :=
        let h_x_5331 a b c := a*(a + b)*(a + c)*(a×b + b^2 + 2×a×c + b×c)*(2×a×b + a×c + b×c + c^2) in
        cPointhb h_x_5331.
Definition X_5332 :=
        let h_x_5332 a b c := a^2*(2×a^2 + b^2 - b×c + c^2) in
        cPointhb h_x_5332.
Definition X_5333 :=
        let h_x_5333 a b c := (a + b)*(a + c)*(a + 2×b + 2×c) in
        cPointhb h_x_5333.
Definition X_5334 :=
        let h_x_5334 a b c := 3×a^4 - 3×b^4 + 6×b^2×c^2 - 3×c^4 - 4×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5334.
Definition X_5335 :=
        let h_x_5335 a b c := -3×a^4 + 3×b^4 - 6×b^2×c^2 + 3×c^4 - 4×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5335.
Definition X_5336 :=
        let h_x_5336 a b c := a*(a^4 + 2×a^3×b + b^4 + 2×a^3×c - 2×b^2×c^2 + c^4) in
        cPointhb h_x_5336.
Definition X_5337 :=
        let h_x_5337 a b c := a*(a^4 + a^3×b + a^3×c + a^2×b×c + b^3×c + b×c^3) in
        cPointhb h_x_5337.
Definition X_5338 :=
        let h_x_5338 a b c := a*(3×a + b + c)*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5338.
Definition X_5339 :=
        let h_x_5339 a b c := -2×a^4 + 2×b^4 - 4×b^2×c^2 + 2×c^4 + 2×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5339.
Definition X_5340 :=
        let h_x_5340 a b c := 2×a^4 - 2×b^4 + 4×b^2×c^2 - 2×c^4 + 2×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5340.
Definition X_5341 :=
        let h_x_5341 a b c := a*(a^4 - b^4 + a^2×b×c + 2×b^2×c^2 - c^4) in
        cPointhb h_x_5341.
Definition X_5342 :=
        let h_x_5342 a b c := b×c*(3×a + b + c)*(-a^2 + b^2 - c^2)*(a^2 + b^2 - c^2) in
        cPointhb h_x_5342.
Definition X_5343 :=
        let h_x_5343 a b c := 5×a^4 - 5×b^4 + 10×b^2×c^2 - 5×c^4 - 4×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5343.
Definition X_5344 :=
        let h_x_5344 a b c := -5×a^4 + 5×b^4 - 10×b^2×c^2 + 5×c^4 - 4×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5344.
Definition X_5345 :=
        let h_x_5345 a b c := a^2*(2×a^4 - 2×b^4 + a^2×b×c + b^3×c + b×c^3 - 2×c^4) in
        cPointhb h_x_5345.
Definition X_5346 :=
        let h_x_5346 a b c := 3×a^4 + a^2×b^2 + b^4 + a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5346.
Definition X_5347 :=
        let h_x_5347 a b c := a^2*(a^4 - b^4 + a^2×b×c + a×b^2×c + a×b×c^2 - c^4) in
        cPointhb h_x_5347.
Definition X_5348 :=
        let h_x_5348 a b c := a*(a - b - c)*(a^2 - b^2 + b×c)*(a^2 + b×c - c^2) in
        cPointhb h_x_5348.
Definition X_5349 :=
        let h_x_5349 a b c := -5×a^4 + 5×b^4 - 10×b^2×c^2 + 5×c^4 + 2×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5349.
Definition X_5350 :=
        let h_x_5350 a b c := 5×a^4 - 5×b^4 + 10×b^2×c^2 - 5×c^4 + 2×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5350.
Definition X_5351 :=
        let h_x_5351 a b c := a^2*(7×a^2 - 7×b^2 - 7×c^2 + 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5351.
Definition X_5352 :=
        let h_x_5352 a b c := a^2*(7×a^2 - 7×b^2 - 7×c^2 - 2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5352.
Definition X_5353 :=
        let h_x_5353 a b c := a^2*(-(sqrt(3)×b×c) + 2*(SS a b c)) in
        cPointhb h_x_5353.
Definition X_5354 :=
        let h_x_5354 a b c := a^2*(a^4 + 2×a^2×b^2 + b^4 + 2×a^2×c^2 - b^2×c^2 + c^4) in
        cPointhb h_x_5354.
Definition X_5355 :=
        let h_x_5355 a b c := 2×a^4 + 2×a^2×b^2 + b^4 + 2×a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5355.
Definition X_5356 :=
        let h_x_5356 a b c := a*(a^4 - b^4 + 3×a^2×b×c + 2×b^2×c^2 - c^4) in
        cPointhb h_x_5356.
Definition X_5357 :=
        let h_x_5357 a b c := a^2*(sqrt(3)×b×c + 2*(SS a b c)) in
        cPointhb h_x_5357.
Definition X_5358 :=
        let h_x_5358 a b c := a*(a + b)*(a + c)*(a^4 - b^4 - 2×a^2×b×c + 2×b^2×c^2 - c^4) in
        cPointhb h_x_5358.
Definition X_5359 :=
        let h_x_5359 a b c := a^2*(a^4 + 2×a^2×b^2 + b^4 + 2×a^2×c^2 + c^4) in
        cPointhb h_x_5359.
Definition X_5360 :=
        let h_x_5360 a b c := a^3*(b + c)*(a^2×b^2 - b^4 + a^2×c^2 - c^4) in
        cPointhb h_x_5360.
Definition X_5361 :=
        let h_x_5361 a b c := -2×a^3 + 2×a×b^2 + a×b×c + 2×b^2×c + 2×a×c^2 + 2×b×c^2 in
        cPointhb h_x_5361.
Definition X_5362 :=
        let h_x_5362 a b c := a*(-(sqrt(3)×a×b×c) - sqrt(3)×b^2×c - sqrt(3)×b×c^2 + 2×a*(SS a b c)) in
        cPointhb h_x_5362.
Definition X_5363 :=
        let h_x_5363 a b c := a^2*(a^4 - b^4 + 3×a^2×b×c + b^2×c^2 - c^4) in
        cPointhb h_x_5363.
Definition X_5364 :=
        let h_x_5364 a b c := a^3*(a×b^2 - b^3 + a×b×c + a×c^2 - c^3) in
        cPointhb h_x_5364.
Definition X_5365 :=
        let h_x_5365 a b c := 7×a^4 - 7×b^4 + 14×b^2×c^2 - 7×c^4 - 4×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5365.
Definition X_5366 :=
        let h_x_5366 a b c := -7×a^4 + 7×b^4 - 14×b^2×c^2 + 7×c^4 - 4×sqrt(3)×a^2*(SS a b c) in
        cPointhb h_x_5366.
Definition X_5367 :=
        let h_x_5367 a b c := a*(sqrt(3)×a×b×c + sqrt(3)×b^2×c + sqrt(3)×b×c^2 + 2×a*(SS a b c)) in
        cPointhb h_x_5367.
Definition X_5368 :=
        let h_x_5368 a b c := 4×a^4 + 2×a^2×b^2 + b^4 + 2×a^2×c^2 - 2×b^2×c^2 + c^4 in
        cPointhb h_x_5368.
Definition X_5369 :=
        let h_x_5369 a b c := a^3*(a×b^3 - b^4 + a×b^2×c + a×b×c^2 + a×c^3 - c^4) in
        cPointhb h_x_5369.
Definition X_5370 :=
        let h_x_5370 a b c := a^2*(3×a^4 - 3×b^4 + a^2×b×c + b^3×c + b×c^3 - 3×c^4) in
        cPointhb h_x_5370.
Definition X_5371 :=
        let h_x_5371 a b c := a^3*(a^3 - a×b×c - b^2×c - b×c^2) in
        cPointhb h_x_5371.
Definition X_5372 :=
        let h_x_5372 a b c := 2×a^3 - 2×a×b^2 + a×b×c - 2×b^2×c - 2×a×c^2 - 2×b×c^2 in
        cPointhb h_x_5372.
Definition X_5374 :=
        let h_x_5374 a b c := a×sqrt(-a^2+b^2+c^2) in
        cPointhb h_x_5374.
Definition X_5375 :=
        let h_x_5375 a b c := a*(a - b)*(a - c)*(a^3 - a^2×b + a×b^2 - b^3 - a^2×c - a×b×c + b^2×c + a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5375.
Definition X_5376 :=
        let h_x_5376 a b c := a×(a - b)^2*(a + b - 2×c)*(a - c)^2*(a - 2×b + c) in
        cPointhb h_x_5376.
Definition X_5377 :=
        let h_x_5377 a b c := a×(a - b)^2×(a - c)^2*(a^2 + b^2 - a×c - b×c)*(a^2 - a×b - b×c + c^2) in
        cPointhb h_x_5377.
Definition X_5378 :=
        let h_x_5378 a b c := a×(a - b)^2×(a - c)^2*(-b^2 + a×c)*(a×b - c^2) in
        cPointhb h_x_5378.
Definition X_5379 :=
        let h_x_5379 a b c := a×(a - b)^2*(a + b)*(a - c)^2*(a + c)*(a^2 + b^2 - c^2)*(a^2 - b^2 + c^2) in
        cPointhb h_x_5379.
Definition X_5380 :=
        let h_x_5380 a b c := a*(a - b)*(a - c)*(a^2 + b^2 - 2×c^2)*(a^2 - 2×b^2 + c^2) in
        cPointhb h_x_5380.
Definition X_5381 :=
        let h_x_5381 a b c := (a - b)^2×(a - c)^2*(2×a×b - a×c - b×c)*(a×b - 2×a×c + b×c) in
        cPointhb h_x_5381.
Definition X_5382 :=
        let h_x_5382 a b c := a×(a - b)^2*(a + b - 3×c)*(a - c)^2*(a - 3×b + c) in
        cPointhb h_x_5382.
Definition X_5383 :=
        let h_x_5383 a b c := (a - b)^2×(a - c)^2*(a×b - a×c - b×c)*(a×b - a×c + b×c) in
        cPointhb h_x_5383.
Definition X_5384 :=
        let h_x_5384 a b c := a×(a - b)^2*(a^2 + a×b + b^2)*(a - c)^2*(a^2 + a×c + c^2) in
        cPointhb h_x_5384.
Definition X_5385 :=
        let h_x_5385 a b c := a×(a - b)^2×(a - c)^2*(2×a + 2×b - c)*(2×a - b + 2×c) in
        cPointhb h_x_5385.
Definition X_5386 :=
        let h_x_5386 a b c := a*(a - b)*(a - c)*(a^3 + b^3 - 2×c^3)*(a^3 - 2×b^3 + c^3) in
        cPointhb h_x_5386.
Definition X_5387 :=
        let h_x_5387 a b c := (a - b)^2×(a - c)^2*(a^2 - 3×a×b + b^2 + c^2)*(a^2 + b^2 - 3×a×c + c^2) in
        cPointhb h_x_5387.
Definition X_5388 :=
        let h_x_5388 a b c := (a - b)^2×b^2*(a^2 + a×b + b^2)*(a - c)^2×c^2*(a^2 + a×c + c^2) in
        cPointhb h_x_5388.
Definition X_5389 :=
        let h_x_5389 a b c := a*(a - b)*(a - c)*(a^4 + b^4 - 2×c^4)*(a^4 - 2×b^4 + c^4) in
        cPointhb h_x_5389.
Definition X_5391 :=
        let h_x_5391 a b c := b×c-(SS a b c) in
        cPointhb h_x_5391.
Definition X_5392 :=
        let h_x_5392 a b c := b^2×c^2*(a^4 - 2×a^2×b^2 + b^4 - 2×b^2×c^2 + c^4)*(a^4 + b^4 - 2×a^2×c^2 - 2×b^2×c^2 + c^4) in
        cPointhb h_x_5392.
Definition X_5393 :=
        let h_x_5393 a b c := a + (2*(SS a b c))/(a + b + c) in
        cPointhb h_x_5393.
Definition X_5395 :=
        let h_x_5395 a b c := (3×a^2 + 3×b^2 - c^2)*(3×a^2 - b^2 + 3×c^2) in
        cPointhb h_x_5395.
Definition X_5396 :=
        let h_x_5396 a b c := a^2*(a^4×b - 2×a^2×b^3 + b^5 + a^4×c - a^2×b^2×c - a^2×b×c^2 - 2×a×b^2×c^2 - b^3×c^2 - 2×a^2×c^3 - b^2×c^3 + c^5) in
        cPointhb h_x_5396.
Definition X_5397 :=
        let h_x_5397 a b c := (a^5 - a^3×b^2 - a^2×b^3 + b^5 - 2×a^2×b^2×c - 2×a^3×c^2 - a^2×b×c^2 - a×b^2×c^2 - 2×b^3×c^2 + a×c^4 + b×c^4)*(a^5 - 2×a^3×b^2 + a×b^4 - a^2×b^2×c + b^4×c - a^3×c^2 - 2×a^2×b×c^2 - a×b^2×c^2 - a^2×c^3 - 2×b^2×c^3 + c^5) in
        cPointhb h_x_5397.
Definition X_5398 :=
        let h_x_5398 a b c := a^2*(a^5 - 2×a^3×b^2 + a×b^4 - a^2×b^2×c + b^4×c - 2×a^3×c^2 - a^2×b×c^2 - b^3×c^2 - b^2×c^3 + a×c^4 + b×c^4) in
        cPointhb h_x_5398.
Definition X_5399 :=
        let h_x_5399 a b c := a^2*(a^4×b - 2×a^2×b^3 + b^5 + a^4×c - a^2×b^2×c - a^2×b×c^2 + 2×a×b^2×c^2 - b^3×c^2 - 2×a^2×c^3 - b^2×c^3 + c^5) in
        cPointhb h_x_5399.
Definition X_5400 :=
        let h_x_5400 a b c := a*(a^4×b - a^3×b^2 - a^2×b^3 + a×b^4 + a^4×c - 2×a^3×b×c + 2×a^2×b^2×c + 2×a×b^3×c - 3×b^4×c - a^3×c^2 + 2×a^2×b×c^2 - 6×a×b^2×c^2 + 3×b^3×c^2 - a^2×c^3 + 2×a×b×c^3 + 3×b^2×c^3 + a×c^4 - 3×b×c^4) in
        cPointhb h_x_5400.
Definition X_5401 :=
        let h_x_5401 a b c := sec(A a b c + PI/5)*(sin(A a b c)) in
        cPointhb h_x_5401.
Definition X_5402 :=
        let h_x_5402 a b c := csc(A a b c + PI/5)*(sin(A a b c)) in
        cPointhb h_x_5402.
Definition X_5403 :=
        let h_x_5403 a b c := (sin(A a b c))*sec(A a b c-w/2) in
        cPointhb h_x_5403.
Definition X_5404 :=
        let h_x_5404 a b c := (sin(A a b c))*csc(A a b c-w/2) in
        cPointhb h_x_5404.
Definition X_5405 :=
        let h_x_5405 a b c := a - (2*(SS a b c))/(a + b + c) in
        cPointhb h_x_5405.
Definition X_5406 :=
        let h_x_5406 a b c := a^2*(a^2 - b^2 - c^2)*(a^2 - b^2 - c^2 - 4*(SS a b c)) in
        cPointhb h_x_5406.
Definition X_5407 :=
        let h_x_5407 a b c := a^2*(a^2 - b^2 - c^2)*(a^2 - b^2 - c^2 + 4*(SS a b c)) in
        cPointhb h_x_5407.
Definition X_5408 :=
        let h_x_5408 a b c := a^2*(a^2 - b^2 - c^2)*(a^2 - b^2 - c^2 - 2*(SS a b c)) in
        cPointhb h_x_5408.
Definition X_5409 :=
        let h_x_5409 a b c := a^2*(a^2 - b^2 - c^2)*(a^2 - b^2 - c^2 + 2*(SS a b c)) in
        cPointhb h_x_5409.
Definition X_5410 :=
        let h_x_5410 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2-b^2-c^2+(SS a b c)) in
        cPointhb h_x_5410.
Definition X_5411 :=
        let h_x_5411 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2-b^2-c^2-(SS a b c)) in
        cPointhb h_x_5411.
Definition X_5412 :=
        let h_x_5412 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2-b^2-c^2+2*(SS a b c)) in
        cPointhb h_x_5412.
Definition X_5413 :=
        let h_x_5413 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^2-b^2-c^2-2*(SS a b c)) in
        cPointhb h_x_5413.
Definition X_5414 :=
        let h_x_5414 a b c := a^2*(a^2-b^2-2×b×c-c^2+2*(SS a b c)) in
        cPointhb h_x_5414.
Definition X_5415 :=
        let h_x_5415 a b c := a^2*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c-b^2×c-a×c^2-b×c^2+c^3+2×a*(SS a b c)-2×b*(SS a b c)-2×c*(SS a b c)) in
        cPointhb h_x_5415.
Definition X_5416 :=
        let h_x_5416 a b c := a^2*(a^3-a^2×b-a×b^2+b^3-a^2×c-2×a×b×c-b^2×c-a×c^2-b×c^2+c^3-2×a*(SS a b c)+2×b*(SS a b c)+2×c*(SS a b c)) in
        cPointhb h_x_5416.
Definition X_5417 :=
        let h_x_5417 a b c := a^2*(a^4-3×a^2×b^2+2×b^4-2×a^2×c^2-3×b^2×c^2+c^4-2×b^2*(SS a b c))*(a^4-2×a^2×b^2+b^4-3×a^2×c^2-3×b^2×c^2+2×c^4-2×c^2*(SS a b c)) in
        cPointhb h_x_5417.
Definition X_5418 :=
        let h_x_5418 a b c := 2×a^4-3×a^2×b^2+b^4-3×a^2×c^2-2×b^2×c^2+c^4-2×a^2*(SS a b c) in
        cPointhb h_x_5418.
Definition X_5419 :=
        let h_x_5419 a b c := a^2*(a^4-3×a^2×b^2+2×b^4-2×a^2×c^2-3×b^2×c^2+c^4+2×b^2*(SS a b c))*(a^4-2×a^2×b^2+b^4-3×a^2×c^2-3×b^2×c^2+2×c^4+2×c^2*(SS a b c)) in
        cPointhb h_x_5419.
Definition X_5420 :=
        let h_x_5420 a b c := 2×a^4-3×a^2×b^2+b^4-3×a^2×c^2-2×b^2×c^2+c^4+2×a^2*(SS a b c) in
        cPointhb h_x_5420.
Definition X_5421 :=
        let h_x_5421 a b c := a^2*(a^4×b^2 - 2×a^2×b^4 + b^6 + a^4×c^2 - 6×a^2×b^2×c^2 - b^4×c^2 - 2×a^2×c^4 - b^2×c^4 + c^6) in
        cPointhb h_x_5421.
Definition X_5422 :=
        let h_x_5422 a b c := a^2*(a^4 - 2×a^2×b^2 + b^4 - 2×a^2×c^2 - 4×b^2×c^2 + c^4) in
        cPointhb h_x_5422.
Definition X_5423 :=
        let h_x_5423 a b c := (a - b - c)^3 in
        cPointhb h_x_5423.
Definition X_5424 :=
        let h_x_5424 a b c := a*(2×a^3 - 2×a^2×b - 2×a×b^2 + 2×b^3 - a^2×c - a×b×c - b^2×c - 2×a×c^2 - 2×b×c^2 + c^3)*(2×a^3 - a^2×b - 2×a×b^2 + b^3 - 2×a^2×c - a×b×c - 2×b^2×c - 2×a×c^2 - b×c^2 + 2×c^3) in
        cPointhb h_x_5424.
Definition X_5425 :=
        let h_x_5425 a b c := a*(a^3 - 2×a^2×b - a×b^2 + 2×b^3 - 2×a^2×c - a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2 + 2×c^3) in
        cPointhb h_x_5425.
Definition X_5426 :=
        let h_x_5426 a b c := a*(3×a^3 - a^2×b - 3×a×b^2 + b^3 - a^2×c - 3×a×b×c - 3×b^2×c - 3×a×c^2 - 3×b×c^2 + c^3) in
        cPointhb h_x_5426.
Definition X_5427 :=
        let h_x_5427 a b c := a*(a + b - c)*(a - b + c)*(2×a^4 - 2×a^3×b - 2×a^2×b^2 + 2×a×b^3 - 2×a^3×c - 2×a^2×b×c + b^3×c - 2×a^2×c^2 + 2×b^2×c^2 + 2×a×c^3 + b×c^3) in
        cPointhb h_x_5427.
Definition X_5428 :=
        let h_x_5428 a b c := a*(2×a^6 - 2×a^5×b - 4×a^4×b^2 + 4×a^3×b^3 + 2×a^2×b^4 - 2×a×b^5 - 2×a^5×c + a^2×b^3×c + 2×a×b^4×c - b^5×c - 4×a^4×c^2 + 4×a^2×b^2×c^2 + 4×a^3×c^3 + a^2×b×c^3 + 2×b^3×c^3 + 2×a^2×c^4 + 2×a×b×c^4 - 2×a×c^5 - b×c^5) in
        cPointhb h_x_5428.
Definition X_5429 :=
        let h_x_5429 a b c := a*(3×a^3 + 2×a^2×b + b^3 + 2×a^2×c + 3×a×b×c + c^3) in
        cPointhb h_x_5429.
Definition X_5430 :=
        let h_x_5430 a b c := (csc((A a b c/2)) + 1)*(csc((B a b c/2)) + csc((C a b c/2))) - cot(A a b c/2)^2 in
        cPointhb h_x_5430.
Definition X_5431 :=
        let h_x_5431 a b c := (sec((A a b c/2)) + 1)*(sec((B a b c/2)) + sec((C a b c/2))) - tan(A a b c/2)^2 in
        cPointhb h_x_5431.
Definition X_5432 :=
        let h_x_5432 a b c := (a - b - c)*(2×a^2 - b^2 + 2×b×c - c^2) in
        cPointhb h_x_5432.
Definition X_5433 :=
        let h_x_5433 a b c := (a + b - c)*(a - b + c)*(2×a^2 - b^2 - 2×b×c - c^2) in
        cPointhb h_x_5433.
Definition X_5434 :=
        let h_x_5434 a b c := (a + b - c)*(a - b + c)*(2×a^2 + b^2 + 2×b×c + c^2) in
        cPointhb h_x_5434.
Definition X_5435 :=
        let h_x_5435 a b c := (3×a - b - c)*(a + b - c)*(a - b + c) in
        cPointhb h_x_5435.
Definition X_5436 :=
        let h_x_5436 a b c := a*(3×a^3 - a^2×b - 3×a×b^2 + b^3 - a^2×c - 6×a×b×c - 5×b^2×c - 3×a×c^2 - 5×b×c^2 + c^3) in
        cPointhb h_x_5436.
Definition X_5437 :=
        let h_x_5437 a b c := a*(a^2 - b^2 + 6×b×c - c^2) in
        cPointhb h_x_5437.
Definition X_5438 :=
        let h_x_5438 a b c := a*(3×a^3 - a^2×b - 3×a×b^2 + b^3 - a^2×c + 2×a×b×c + 3×b^2×c - 3×a×c^2 + 3×b×c^2 + c^3) in
        cPointhb h_x_5438.
Definition X_5439 :=
        let h_x_5439 a b c := a*(a^2×b - b^3 + a^2×c + 4×a×b×c + 3×b^2×c + 3×b×c^2 - c^3) in
        cPointhb h_x_5439.
Definition X_5440 :=
        let h_x_5440 a b c := a*(2×a - b - c)*(a^2 - b^2 - c^2) in
        cPointhb h_x_5440.
Definition X_5441 :=
        let h_x_5441 a b c := -3×a^4 + a^3×b + 2×a^2×b^2 - a×b^3 + b^4 + a^3×c + a^2×b×c + a×b^2×c + 2×a^2×c^2 + a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5441.
Definition X_5442 :=
        let h_x_5442 a b c := 3×a^4 + a^3×b - 4×a^2×b^2 - a×b^3 + b^4 + a^3×c + a^2×b×c + a×b^2×c - 4×a^2×c^2 + a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5442.
Definition X_5443 :=
        let h_x_5443 a b c := a^4 - a^3×b - 2×a^2×b^2 + a×b^3 + b^4 - a^3×c + a^2×b×c - a×b^2×c - 2×a^2×c^2 - a×b×c^2 - 2×b^2×c^2 + a×c^3 + c^4 in
        cPointhb h_x_5443.
Definition X_5444 :=
        let h_x_5444 a b c := 3×a^4 - a^3×b - 4×a^2×b^2 + a×b^3 + b^4 - a^3×c + a^2×b×c - a×b^2×c - 4×a^2×c^2 - a×b×c^2 - 2×b^2×c^2 + a×c^3 + c^4 in
        cPointhb h_x_5444.
Definition X_5445 :=
        let h_x_5445 a b c := a^4 + a^3×b - 2×a^2×b^2 - a×b^3 + b^4 + a^3×c - a^2×b×c + a×b^2×c - 2×a^2×c^2 + a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5445.
Definition X_5446 :=
        let h_x_5446 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-4×a^4×b^2×c^2-a^2×b^4×c^2+4×b^6×c^2-3×a^4×c^4-a^2×b^2×c^4-6×b^4×c^4+3×a^2×c^6+4×b^2×c^6-c^8) in
        cPointhb h_x_5446.
Definition X_5447 :=
        let h_x_5447 a b c := a^2*(a^2-b^2-c^2)*(a^4×b^2-2×a^2×b^4+b^6+a^4×c^2-6×a^2×b^2×c^2-b^4×c^2-2×a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_5447.
Definition X_5448 :=
        let h_x_5448 a b c := (a^2 - b^2 - c^2)*(2×a^6×b^2 - 3×a^4×b^4 + b^8 + 2×a^6×c^2 + 4×a^4×b^2×c^2 - 4×b^6×c^2 - 3×a^4×c^4 + 6×b^4×c^4 - 4×b^2×c^6 + c^8) in
        cPointhb h_x_5448.
Definition X_5449 :=
        let h_x_5449 a b c := (a^2 - b^2 - c^2)*(a^4×b^4 - 2×a^2×b^6 + b^8 + 2×a^2×b^4×c^2 - 4×b^6×c^2 + a^4×c^4 + 2×a^2×b^2×c^4 + 6×b^4×c^4 - 2×a^2×c^6 - 4×b^2×c^6 + c^8) in
        cPointhb h_x_5449.
Definition X_5450 :=
        let h_x_5450 a b c := a*(a^6 - a^5×b - 2×a^4×b^2 + 2×a^3×b^3 + a^2×b^4 - a×b^5 - a^5×c + 4×a^4×b×c - a^3×b^2×c - 3×a^2×b^3×c + 2×a×b^4×c - b^5×c - 2×a^4×c^2 - a^3×b×c^2 + 4×a^2×b^2×c^2 - a×b^3×c^2 + 2×a^3×c^3 - 3×a^2×b×c^3 - a×b^2×c^3 + 2×b^3×c^3 + a^2×c^4 + 2×a×b×c^4 - a×c^5 - b×c^5) in
        cPointhb h_x_5450.
Definition X_5451 :=
        let h_x_5451 a b c := 1/(sec(A a b c/2)+sec(B a b c/2)×sec(C a b c/2)) in
        cPointhb h_x_5451.
Definition X_5452 :=
        let h_x_5452 a b c := a^2*(a-b-c)*(a^3-a^2×b+a×b^2-b^3-a^2×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_5452.
Definition X_5453 :=
        let h_x_5453 a b c := a*(2×a^5×b-4×a^3×b^3+2×a×b^5+2×a^5×c+2×a^4×b×c-2×a^3×b^2×c-3×a^2×b^3×c+b^5×c-2×a^3×b×c^2-4×a^2×b^2×c^2-2×a×b^3×c^2-4×a^3×c^3-3×a^2×b×c^3-2×a×b^2×c^3-2×b^3×c^3+2×a×c^5+b×c^5) in
        cPointhb h_x_5453.
Definition X_5454 :=
        let h_x_5454 a b c := (-(cos((2×A a b c)/3)-cos((4×A a b c)/3)-cos((2×B a b c)/3)+cos((4×B a b c)/3))*(csc(1/6*(2×C a b c+PI))×
(2×cos((C a b c)/3)×sec((A a b c)/3)+sec((B a b c)/3))+(2+cos((C a b c)/3)×sec((A a b c)/3)×sec((B a b c)/3))*sec(1/3*(A a b c+2×PI)))+
(cos((2×A a b c)/3)-cos((4×A a b c)/3)-cos((2×C a b c)/3)+cos((4×C a b c)/3))*(csc(1/6*(2×B a b c +PI))*(2×cos((B a b c)/3)×sec((A a b c)/3)+
sec((C a b c)/3))+(2+cos((B a b c)/3)×sec((A a b c)/3)×sec((C a b c)/3))*sec(1/3*(A a b c+2×PI))))*(sin(A a b c)) in
        cPointhb h_x_5454.
Definition X_5455 :=
        let h_x_5455 a b c := 4×cos((A a b c)/3)*(sin(A a b c))+8×cos((B a b c)/3)×cos((C a b c)/3)*(sin(A a b c))+
cos((B a b c)/3)*(sin(B a b c))+2×cos((A a b c)/3)×cos((C a b c)/3)*(sin(B a b c))+2×cos((A a b c)/3)×cos((B a b c)/3)×
(sin(C a b c))+cos((C a b c)/3)*(sin(C a b c)) in
        cPointhb h_x_5455.
Definition X_5456 :=
        let h_x_5456 a b c := sin((2×A a b c)/3) in
        cPointhb h_x_5456.
Definition X_5457 :=
        let h_x_5457 a b c := (sin(A a b c))/(cos((A a b c)/3)+(cos(A a b c))) in
        cPointhb h_x_5457.
Definition X_5458 :=
        let h_x_5458 a b c := (sin(A a b c))/(4*(cos(A a b c))+sec((A a b c)/3)) in
        cPointhb h_x_5458.
Definition X_5459 :=
        let h_x_5459 a b c := 3×sqrt(3)*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)+2*(4×a^2+b^2+c^2)*(SS a b c) in
        cPointhb h_x_5459.
Definition X_5460 :=
        let h_x_5460 a b c := 3×sqrt(3)*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)-2*(4×a^2+b^2+c^2)*(SS a b c) in
        cPointhb h_x_5460.
Definition X_5461 :=
        let h_x_5461 a b c := 2×a^4-2×a^2×b^2+5×b^4-2×a^2×c^2-8×b^2×c^2+5×c^4 in
        cPointhb h_x_5461.
Definition X_5462 :=
        let h_x_5462 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-5×a^2×b^4×c^2+4×b^6×c^2-3×a^4×c^4-5×a^2×b^2×c^4-6×b^4×c^4+3×a^2×c^6+4×b^2×c^6-c^8) in
        cPointhb h_x_5462.
Definition X_5463 :=
        let h_x_5463 a b c := 3×sqrt(3)×a^2*(a^2-b^2-c^2)+2*(a^2-2×b^2-2×c^2)*(SS a b c) in
        cPointhb h_x_5463.
Definition X_5464 :=
        let h_x_5464 a b c := 3×sqrt(3)×a^2*(a^2-b^2-c^2)-2*(a^2-2×b^2-2×c^2)*(SS a b c) in
        cPointhb h_x_5464.
Definition X_5465 :=
        let h_x_5465 a b c := 2×a^10-4×a^8×b^2+8×a^6×b^4-7×a^4×b^6-a^2×b^8+2×b^10-4×a^8×c^2-4×a^6×b^2×c^2+3×a^4×b^4×c^2+14×a^2×b^6×c^2-7×b^8×c^2+8×a^6×c^4+3×a^4×b^2×c^4-24×a^2×b^4×c^4+5×b^6×c^4-7×a^4×c^6+14×a^2×b^2×c^6+5×b^4×c^6-a^2×c^8-7×b^2×c^8+2×c^10 in
        cPointhb h_x_5465.
Definition X_5466 :=
        let h_x_5466 a b c := (b^2-c^2)*(a^2+b^2-2×c^2)*(a^2-2×b^2+c^2) in
        cPointhb h_x_5466.
Definition X_5467 :=
        let h_x_5467 a b c := a^2*(a^2-b^2)*(a^2-c^2)*(2×a^2-b^2-c^2) in
        cPointhb h_x_5467.
Definition X_5468 :=
        let h_x_5468 a b c := (a^2-b^2)*(a^2-c^2)*(2×a^2-b^2-c^2) in
        cPointhb h_x_5468.
Definition X_5469 :=
        let h_x_5469 a b c := 2×a^6-2×a^4×b^2+a^2×b^4-b^6-2×a^4×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6-6×sqrt(3)×(b-c)^2×(b+c)^2*(SS a b c) in
        cPointhb h_x_5469.
Definition X_5470 :=
        let h_x_5470 a b c := 2×a^6-2×a^4×b^2+a^2×b^4-b^6-2×a^4×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6+6×sqrt(3)×(b-c)^2×(b+c)^2*(SS a b c) in
        cPointhb h_x_5470.
Definition X_5471 :=
        let h_x_5471 a b c := a^2*(2×a^2-b^2-c^2)-2×sqrt(3)×a^2*(SS a b c)+4×(SS a b c)^2 in
        cPointhb h_x_5471.
Definition X_5472 :=
        let h_x_5472 a b c := a^2*(2×a^2-b^2-c^2)+2×sqrt(3)×a^2*(SS a b c)+4×(SS a b c)^2 in
        cPointhb h_x_5472.
Definition X_5473 :=
        let h_x_5473 a b c := sqrt(3)×a^2*(a^4+2×a^2×b^2-3×b^4+2×a^2×c^2-2×b^2×c^2-3×c^4)+2*(7×a^4-5×a^2×b^2-2×b^4-5×a^2×c^2+4×b^2×c^2-2×c^4)*(SS a b c) in
        cPointhb h_x_5473.
Definition X_5474 :=
        let h_x_5474 a b c := sqrt(3)×a^2*(a^4+2×a^2×b^2-3×b^4+2×a^2×c^2-2×b^2×c^2-3×c^4)-2*(7×a^4-5×a^2×b^2-2×b^4-5×a^2×c^2+4×b^2×c^2-2×c^4)*(SS a b c) in
        cPointhb h_x_5474.
Definition X_5475 :=
        let h_x_5475 a b c := a^4+a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4 in
        cPointhb h_x_5475.
Definition X_5476 :=
        let h_x_5476 a b c := a^6-4×a^4×b^2+2×a^2×b^4+b^6-4×a^4×c^2-6×a^2×b^2×c^2-b^4×c^2+2×a^2×c^4-b^2×c^4+c^6 in
        cPointhb h_x_5476.
Definition X_5477 :=
        let h_x_5477 a b c := (2×a^2-b^2-c^2)*(2×a^4-a^2×b^2+b^4-a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_5477.
Definition X_5478 :=
        let h_x_5478 a b c := sqrt(3)*(3×a^4×b^2-2×a^2×b^4-b^6+3×a^4×c^2+4×a^2×b^2×c^2+b^4×c^2-2×a^2×c^4+b^2×c^4-c^6)+2*(4×a^4+a^2×b^2-5×b^4+a^2×c^2+10×b^2×c^2-5×c^4)*(SS a b c) in
        cPointhb h_x_5478.
Definition X_5479 :=
        let h_x_5479 a b c := sqrt(3)*(3×a^4×b^2-2×a^2×b^4-b^6+3×a^4×c^2+4×a^2×b^2×c^2+b^4×c^2-2×a^2×c^4+b^2×c^4-c^6)-2*(4×a^4+a^2×b^2-5×b^4+a^2×c^2+10×b^2×c^2-5×c^4)*(SS a b c) in
        cPointhb h_x_5479.
Definition X_5480 :=
        let h_x_5480 a b c := 3×a^4×b^2-2×a^2×b^4-b^6+3×a^4×c^2+4×a^2×b^2×c^2+b^4×c^2-2×a^2×c^4+b^2×c^4-c^6 in
        cPointhb h_x_5480.
Definition X_5481 :=
        let h_x_5481 a b c := a^2*(a^6-a^4×b^2-a^2×b^4+b^6+2×a^4×c^2-4×a^2×b^2×c^2+2×b^4×c^2-3×a^2×c^4-3×b^2×c^4)*(a^6+2×a^4×b^2-3×a^2×b^4-a^4×c^2-4×a^2×b^2×c^2-3×b^4×c^2-a^2×c^4+2×b^2×c^4+c^6) in
        cPointhb h_x_5481.
Definition X_5482 :=
        let h_x_5482 a b c := a*(a^4×b^2+a^3×b^3-a^2×b^4-a×b^5-2×a^4×b×c+a^3×b^2×c+3×a^2×b^3×c-a×b^4×c-b^5×c+a^4×c^2+a^3×b×c^2+a^3×c^3+3×a^2×b×c^3+2×b^3×c^3-a^2×c^4-a×b×c^4-a×c^5-b×c^5) in
        cPointhb h_x_5482.
Definition X_5483 :=
        let h_x_5483 a b c := a*(a^5+a^4×b-2×a^3×b^2-2×a^2×b^3+a×b^4+b^5+a^4×c-3×a^2×b^2×c-2×a×b^3×c-2×a^3×c^2-3×a^2×b×c^2-3×a×b^2×c^2-b^3×c^2-2×a^2×c^3-2×a×b×c^3-b^2×c^3+a×c^4+c^5) in
        cPointhb h_x_5483.
Definition X_5484 :=
        let h_x_5484 a b c := a^4-a^3×b-2×a^2×b^2-a×b^3-b^4-a^3×c+a^2×b×c-3×a×b^2×c-b^3×c-2×a^2×c^2-3×a×b×c^2-a×c^3-b×c^3-c^4 in
        cPointhb h_x_5484.
Definition X_5485 :=
        let h_x_5485 a b c := (a^2+b^2-5×c^2)*(a^2-5×b^2+c^2) in
        cPointhb h_x_5485.
Definition X_5486 :=
        let h_x_5486 a b c := (a^4-4×a^2×b^2+b^4-c^4)*(a^4-b^4-4×a^2×c^2+c^4) in
        cPointhb h_x_5486.
Definition X_5487 :=
        let h_x_5487 a b c := (a^2+b^2-7×c^2-2×sqrt(3)*(SS a b c))*(a^2-7×b^2+c^2-2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5487.
Definition X_5488 :=
        let h_x_5488 a b c := (a^2+b^2-7×c^2+2×sqrt(3)*(SS a b c))*(a^2-7×b^2+c^2+2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5488.
Definition X_5489 :=
        let h_x_5489 a b c := (b-c)^3×(b+c)^3×(-a^2+b^2+c^2)^2 in
        cPointhb h_x_5489.
Definition X_5490 :=
        let h_x_5490 a b c := (b^2+(SS a b c))*(c^2+(SS a b c)) in
        cPointhb h_x_5490.
Definition X_5491 :=
        let h_x_5491 a b c := (b^2-(SS a b c))*(c^2-(SS a b c)) in
        cPointhb h_x_5491.
Definition X_5492 :=
        let h_x_5492 a b c := a*(a^4×b^2-2×a^2×b^4+b^6-2×a^3×b^2×c-a^2×b^3×c+2×a×b^4×c+b^5×c+a^4×c^2-2×a^3×b×c^2-2×a×b^3×c^2-b^4×c^2-a^2×b×c^3-2×a×b^2×c^3-2×b^3×c^3-2×a^2×c^4+2×a×b×c^4-b^2×c^4+b×c^5+c^6) in
        cPointhb h_x_5492.
Definition X_5493 :=
        let h_x_5493 a b c := -4×a^4 - 3×a^3×b + 3×a^2×b^2 + 3×a×b^3 + b^4 - 3×a^3×c + 6×a^2×b×c - 3×a×b^2×c + 3×a^2×c^2 - 3×a×b×c^2 - 2×b^2×c^2 + 3×a×c^3 + c^4 in
        cPointhb h_x_5493.
Definition X_5494 :=
        let h_x_5494 a b c := a*(a^9-a^8×b-a^7×b^2+2×a^6×b^3-3×a^5×b^4+5×a^3×b^6-2×a^2×b^7-2×a×b^8+b^9-a^8×c+2×a^7×b×c-a^6×b^2×c-a^5×b^3×c+4×a^4×b^4×c-4×a^3×b^5×c-a^2×b^6×c+3×a×b^7×c-b^8×c-a^7×c^2-a^6×b×c^2+7×a^5×b^2×c^2-4×a^4×b^3×c^2-5×a^3×b^4×c^2+7×a^2×b^5×c^2-a×b^6×c^2-2×b^7×c^2+2×a^6×c^3-a^5×b×c^3-4×a^4×b^2×c^3+8×a^3×b^3×c^3-4×a^2×b^4×c^3-3×a×b^5×c^3+2×b^6×c^3-3×a^5×c^4+4×a^4×b×c^4-5×a^3×b^2×c^4-4×a^2×b^3×c^4+6×a×b^4×c^4-4×a^3×b×c^5+7×a^2×b^2×c^5-3×a×b^3×c^5+5×a^3×c^6-a^2×b×c^6-a×b^2×c^6+2×b^3×c^6-2×a^2×c^7+3×a×b×c^7-2×b^2×c^7-2×a×c^8-b×c^8+c^9) in
        cPointhb h_x_5494.
Definition X_5495 :=
        let h_x_5495 a b c := a^2*(a^7×b-a^6×b^2-3×a^5×b^3+3×a^4×b^4+3×a^3×b^5-3×a^2×b^6-a×b^7+b^8+a^7×c-2×a^5×b^2×c-a^4×b^3×c+a^3×b^4×c+2×a^2×b^5×c-b^7×c-a^6×c^2-2×a^5×b×c^2+4×a^4×b^2×c^2+2×a^3×b^3×c^2-3×b^6×c^2-3×a^5×c^3-a^4×b×c^3+2×a^3×b^2×c^3+a×b^4×c^3+b^5×c^3+3×a^4×c^4+a^3×b×c^4+a×b^3×c^4+4×b^4×c^4+3×a^3×c^5+2×a^2×b×c^5+b^3×c^5-3×a^2×c^6-3×b^2×c^6-a×c^7-b×c^7+c^8) in
        cPointhb h_x_5495.
Definition X_5496 :=
        let h_x_5496 a b c := a*(b+c)*(a^5-2×a^3×b^2+a×b^4-a^2×b^2×c+b^4×c-2×a^3×c^2-a^2×b×c^2-a×b^2×c^2-b^3×c^2-b^2×c^3+a×c^4+b×c^4) in
        cPointhb h_x_5496.
Definition X_5497 :=
        let h_x_5497 a b c := a*(a^3+b^3-a×b×c-b^2×c-b×c^2+c^3)*(a^3-a^2×b-a×b^2+b^3-a^2×c-a×b×c+b^2×c-a×c^2+b×c^2+c^3) in
        cPointhb h_x_5497.
Definition X_5498 :=
        let h_x_5498 a b c := 2×a^10-5×a^8×b^2+2×a^6×b^4+4×a^4×b^6-4×a^2×b^8+b^10-5×a^8×c^2+10×a^6×b^2×c^2-5×a^4×b^4×c^2+3×a^2×b^6×c^2-3×b^8×c^2+2×a^6×c^4-5×a^4×b^2×c^4+2×a^2×b^4×c^4+2×b^6×c^4+4×a^4×c^6+3×a^2×b^2×c^6+2×b^4×c^6-4×a^2×c^8-3×b^2×c^8+c^10 in
        cPointhb h_x_5498.
Definition X_5499 :=
        let h_x_5499 a b c := a^5×b^2-a^4×b^3-2×a^3×b^4+2×a^2×b^5+a×b^6-b^7+4×a^5×b×c-a^4×b^2×c-3×a^3×b^3×c-a×b^5×c+b^6×c+a^5×c^2-a^4×b×c^2-2×a^2×b^3×c^2-a×b^4×c^2+3×b^5×c^2-a^4×c^3-3×a^3×b×c^3-2×a^2×b^2×c^3+2×a×b^3×c^3-3×b^4×c^3-2×a^3×c^4-a×b^2×c^4-3×b^3×c^4+2×a^2×c^5-a×b×c^5+3×b^2×c^5+a×c^6+b×c^6-c^7 in
        cPointhb h_x_5499.
Definition X_5500 :=
        let h_x_5500 a b c := 2×a^22-15×a^20×b^2+48×a^18×b^4-81×a^16×b^6+64×a^14×b^8+14×a^12×b^10-84×a^10×b^12+82×a^8×b^14-34×a^6×b^16+a^4×b^18+4×a^2×b^20-b^22-15×a^20×c^2+78×a^18×b^2×c^2-152×a^16×b^4×c^2+111×a^14×b^6×c^2+29×a^12×b^8×c^2-67×a^10×b^10×c^2-23×a^8×b^12×c^2+57×a^6×b^14×c^2-6×a^4×b^16×c^2-19×a^2×b^18×c^2+7×b^20×c^2+48×a^18×c^4-152×a^16×b^2×c^4+128×a^14×b^4×c^4+36×a^12×b^6×c^4-56×a^10×b^8×c^4-31×a^8×b^10×c^4+18×a^6×b^12×c^4-8×a^4×b^14×c^4+38×a^2×b^16×c^4-21×b^18×c^4-81×a^16×c^6+111×a^14×b^2×c^6+36×a^12×b^4×c^6-48×a^10×b^6×c^6-19×a^8×b^8×c^6-36×a^6×b^10×c^6+50×a^4×b^12×c^6-48×a^2×b^14×c^6+35×b^16×c^6+64×a^14×c^8+29×a^12×b^2×c^8-56×a^10×b^4×c^8-19×a^8×b^6×c^8-10×a^6×b^8×c^8-37×a^4×b^10×c^8+54×a^2×b^12×c^8-34×b^14×c^8+14×a^12×c^10-67×a^10×b^2×c^10-31×a^8×b^4×c^10-36×a^6×b^6×c^10-37×a^4×b^8×c^10-58×a^2×b^10×c^10+14×b^12×c^10-84×a^10×c^12-23×a^8×b^2×c^12+18×a^6×b^4×c^12+50×a^4×b^6×c^12+54×a^2×b^8×c^12+14×b^10×c^12+82×a^8×c^14+57×a^6×b^2×c^14-8×a^4×b^4×c^14-48×a^2×b^6×c^14-34×b^8×c^14-34×a^6×c^16-6×a^4×b^2×c^16+38×a^2×b^4×c^16+35×b^6×c^16+a^4×c^18-19×a^2×b^2×c^18-21×b^4×c^18+4×a^2×c^20+7×b^2×c^20-c^22 in
        cPointhb h_x_5500.
Definition X_5501 :=
        let h_x_5501 a b c := 2×a^16-9×a^14×b^2+13×a^12×b^4+a^10×b^6-25×a^8×b^8+33×a^6×b^10-21×a^4×b^12+7×a^2×b^14-b^16-9×a^14×c^2+18×a^12×b^2×c^2+a^10×b^4×c^2-10×a^8×b^6×c^2-31×a^6×b^8×c^2+62×a^4×b^10×c^2-41×a^2×b^12×c^2+10×b^14×c^2+13×a^12×c^4+a^10×b^2×c^4-8×a^8×b^4×c^4-11×a^6×b^6×c^4-36×a^4×b^8×c^4+81×a^2×b^10×c^4-40×b^12×c^4+a^10×c^6-10×a^8×b^2×c^6-11×a^6×b^4×c^6-10×a^4×b^6×c^6-47×a^2×b^8×c^6+86×b^10×c^6-25×a^8×c^8-31×a^6×b^2×c^8-36×a^4×b^4×c^8-47×a^2×b^6×c^8-110×b^8×c^8+33×a^6×c^10+62×a^4×b^2×c^10+81×a^2×b^4×c^10+86×b^6×c^10-21×a^4×c^12-41×a^2×b^2×c^12-40×b^4×c^12+7×a^2×c^14+10×b^2×c^14-c^16 in
        cPointhb h_x_5501.
Definition X_5502 :=
        let h_x_5502 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(2×a^6-a^4×b^2-4×a^2×b^4+3×b^6-a^4×c^2+8×a^2×b^2×c^2-3×b^4×c^2-4×a^2×c^4-3×b^2×c^4+3×c^6) in
        cPointhb h_x_5502.
Definition X_5503 :=
        let h_x_5503 a b c := (a^4-a^2×b^2+4×b^4-4×a^2×c^2-b^2×c^2+c^4)*(a^4-4×a^2×b^2+b^4-a^2×c^2-b^2×c^2+4×c^4) in
        cPointhb h_x_5503.
Definition X_5504 :=
        let h_x_5504 a b c := a^2*(a^2-b^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-2×a^4×c^2+2×a^2×b^2×c^2-2×b^4×c^2+a^2×c^4+b^2×c^4)*(a^6-2×a^4×b^2+a^2×b^4-a^4×c^2+2×a^2×b^2×c^2+b^4×c^2-a^2×c^4-2×b^2×c^4+c^6) in
        cPointhb h_x_5504.
Definition X_5505 :=
        let h_x_5505 a b c := a^2*(a^6-4×a^4×b^2-a^2×b^4+4×b^6-a^4×c^2+6×a^2×b^2×c^2-b^4×c^2-a^2×c^4-4×b^2×c^4+c^6)*(a^6-a^4×b^2-a^2×b^4+b^6-4×a^4×c^2+6×a^2×b^2×c^2-4×b^4×c^2-a^2×c^4-b^2×c^4+4×c^6) in
        cPointhb h_x_5505.
Definition X_5506 :=
        let h_x_5506 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c-5×a×b×c-5×b^2×c-a×c^2-5×b×c^2-c^3) in
        cPointhb h_x_5506.
Definition X_5507 :=
        let h_x_5507 a b c := a^2*(b×c-2*(SS a b c))*(a×b*(a-b-c)*c-2*(a^2-b^2-c^2)*(SS a b c)) in
        cPointhb h_x_5507.
Definition X_5508 :=
        let h_x_5508 a b c := a*(a^5×b-a^3×b^3+a^2×b^4-b^6+b^4×c^2-a^3×c^3-b^3×c^3+b×c^5)*(-a^3×b^3+a^5×c+b^5×c-a^3×c^3-b^3×c^3+a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_5508.
Definition X_5509 :=
        let h_x_5509 a b c := a×(b-c)^2*(a^3-b^2×c-b×c^2)*(a^2×b^2-b^4+a^2×b×c-b^3×c+a^2×c^2-b×c^3-c^4) in
        cPointhb h_x_5509.
Definition X_5510 :=
        let h_x_5510 a b c := (3×a - b - c)*(b - c)^2*(a^2×b - b^3 + a^2×c - 3×a×b×c + 2×b^2×c + 2×b×c^2 - c^3) in
        cPointhb h_x_5510.
Definition X_5511 :=
        let h_x_5511 a b c := (b - c)^2*(a^2 - 2×a×b + b^2 - 2×a×c + c^2)*(-a^3 + a^2×b - a×b^2 + b^3 + a^2×c - b^2×c - a×c^2 - b×c^2 + c^3) in
        cPointhb h_x_5511.
Definition X_5512 :=
        let h_x_5512 a b c := (b - c)^2×(b + c)^2*(-5×a^2 + b^2 + c^2)*(-a^4 + b^4 - 4×b^2×c^2 + c^4) in
        cPointhb h_x_5512.
Definition X_5513 :=
        let h_x_5513 a b c := (a×b^2 - b^3 + a×c^2 - c^3)*(2×a^3 - a^2×b + b^3 - a^2×c - b^2×c - b×c^2 + c^3) in
        cPointhb h_x_5513.
Definition X_5514 :=
        let h_x_5514 a b c := ((a - b - c)^2×(b - c)^2*(a^3 + a^2×b - a×b^2 - b^3 + a^2×c - 2×a×b×c + b^2×c - a×c^2 + b×c^2 - c^3)) in
        cPointhb h_x_5514.
Definition X_5515 :=
        let h_x_5515 a b c := (b - c)^2*(a×b + b^2 + a×c + b×c + c^2)*(a^2 + b^2 + 2×b×c + c^2) in
        cPointhb h_x_5515.
Definition X_5516 :=
        let h_x_5516 a b c := (2×a - b - c)*(3×a - b - c)*(b - c)^2*(a×b + b^2 + a×c - 4×b×c + c^2) in
        cPointhb h_x_5516.
Definition X_5517 :=
        let h_x_5517 a b c := (b - c)^2*(a^2 + b^2 + 2×b×c + c^2)*(-a^3 - a^2×b + a×b^2 + b^3 - a^2×c + 2×a×b×c + b^2×c + a×c^2 + b×c^2 + c^3) in
        cPointhb h_x_5517.
Definition X_5518 :=
        let h_x_5518 a b c := ((b - c)^2*(-(a×b) - a×c + b×c)*(a^2×b - a×b^2 + a^2×c - a×b×c + b^2×c - a×c^2 + b×c^2)) in
        cPointhb h_x_5518.
Definition X_5519 :=
        let h_x_5519 a b c := (b - c)^2*(a^2 - 2×a×b + b^2 - 2×a×c + c^2)*(-(a×b) + b^2 - a×c + c^2)*(2×a^2 - a×b + b^2 - a×c - 2×b×c + c^2) in
        cPointhb h_x_5519.
Definition X_5520 :=
        let h_x_5520 a b c := (b - c)^2*(a^3 - a^2×b - a×b^2 + b^3 - a^2×c - a×b×c + b^2×c - a×c^2 + b×c^2 + c^3)*(-a^4 + b^4 - a^2×b×c + a×b^2×c + a×b×c^2 - 2×b^2×c^2 + c^4) in
        cPointhb h_x_5520.
Definition X_5521 :=
        let h_x_5521 a b c := (b - c)^2*(-a^2 + b^2 - c^2)*(a^2 + b^2 - c^2)*(a^3 - a^2×b - a×b^2 + b^3 - a^2×c - 2×a×b×c + b^2×c - a×c^2 + b×c^2 + c^3) in
        cPointhb h_x_5521.
Definition X_5522 :=
        let h_x_5522 a b c := (b - c)^2×(b + c)^2*(a^4 - 2×a^2×b^2 + b^4 - 2×a^2×c^2 - 4×b^2×c^2 + c^4)*(3×a^4 - 4×a^2×b^2 + b^4 - 4×a^2×c^2 - 2×b^2×c^2 + c^4) in
        cPointhb h_x_5522.
Definition X_5523 :=
        let h_x_5523 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4×b^2-b^6+a^4×c^2-2×a^2×b^2×c^2+b^4×c^2+b^2×c^4-c^6) in
        cPointhb h_x_5523.
Definition X_5524 :=
        let h_x_5524 a b c := a*(a^2-3×a×b+b^2-3×a×c+3×b×c+c^2) in
        cPointhb h_x_5524.
Definition X_5525 :=
        let h_x_5525 a b c := a*(a^3-a^2×b+a×b^2-b^3-a^2×c+3×a×b×c-b^2×c+a×c^2-b×c^2-c^3) in
        cPointhb h_x_5525.
Definition X_5526 :=
        let h_x_5526 a b c := a^2*(a^2-2×a×b+b^2-2×a×c+b×c+c^2) in
        cPointhb h_x_5526.
Definition X_5527 :=
        let h_x_5527 a b c := a*(a^6-3×a^5×b+3×a^4×b^2-2×a^3×b^3+3×a^2×b^4-3×a×b^5+b^6-3×a^5×c+7×a^4×b×c-2×a^3×b^2×c-6×a^2×b^3×c+5×a×b^4×c-b^5×c+3×a^4×c^2-2×a^3×b×c^2+6×a^2×b^2×c^2-2×a×b^3×c^2-5×b^4×c^2-2×a^3×c^3-6×a^2×b×c^3-2×a×b^2×c^3+10×b^3×c^3+3×a^2×c^4+5×a×b×c^4-5×b^2×c^4-3×a×c^5-b×c^5+c^6) in
        cPointhb h_x_5527.
Definition X_5528 :=
        let h_x_5528 a b c := a*(a^4-4×a^3×b+6×a^2×b^2-4×a×b^3+b^4-4×a^3×c+a^2×b×c+a×b^2×c+2×b^3×c+6×a^2×c^2+a×b×c^2-6×b^2×c^2-4×a×c^3+2×b×c^3+c^4) in
        cPointhb h_x_5528.
Definition X_5529 :=
        let h_x_5529 a b c := a*(a^3-2×a^2×b-2×a×b^2+b^3-2×a^2×c+a×b×c+2×b^2×c-2×a×c^2+2×b×c^2+c^3) in
        cPointhb h_x_5529.
Definition X_5530 :=
        let h_x_5530 a b c := a^3×b+3×a^2×b^2+a×b^3-b^4+a^3×c+4×a^2×b×c+a×b^2×c+3×a^2×c^2+a×b×c^2+2×b^2×c^2+a×c^3-c^4 in
        cPointhb h_x_5530.
Definition X_5531 :=
        let h_x_5531 a b c := a*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5-3×a^4×c+5×a^3×b×c-4×a^2×b^2×c+a×b^3×c+b^4×c+2×a^3×c^2-4×a^2×b×c^2+4×a×b^2×c^2-2×b^3×c^2+2×a^2×c^3+a×b×c^3-2×b^2×c^3-3×a×c^4+b×c^4+c^5) in
        cPointhb h_x_5531.
Definition X_5532 :=
        let h_x_5532 a b c := (a-b-c)^3×(b-c)^4 in
        cPointhb h_x_5532.
Definition X_5533 :=
        let h_x_5533 a b c := a^5×b^2-a^4×b^3-2×a^3×b^4+2×a^2×b^5+a×b^6-b^7-4×a^5×b×c+3×a^4×b^2×c+6×a^3×b^3×c-4×a^2×b^4×c-2×a×b^5×c+b^6×c+a^5×c^2+3×a^4×b×c^2-10×a^3×b^2×c^2+2×a^2×b^3×c^2-a×b^4×c^2+3×b^5×c^2-a^4×c^3+6×a^3×b×c^3+2×a^2×b^2×c^3+4×a×b^3×c^3-3×b^4×c^3-2×a^3×c^4-4×a^2×b×c^4-a×b^2×c^4-3×b^3×c^4+2×a^2×c^5-2×a×b×c^5+3×b^2×c^5+a×c^6+b×c^6-c^7 in
        cPointhb h_x_5533.
Definition X_5534 :=
        let h_x_5534 a b c := a*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+4×a^3×b^2×c-2×a×b^4×c+2×b^5×c-a^4×c^2+4×a^3×b×c^2-6×a^2×b^2×c^2+4×a×b^3×c^2-b^4×c^2+4×a^3×c^3+4×a×b^2×c^3-4×b^3×c^3-a^2×c^4-2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_5534.
Definition X_5535 :=
        let h_x_5535 a b c := a*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-a^4×b×c+a^3×b^2×c-a^2×b^3×c-a×b^4×c+2×b^5×c-3×a^4×c^2+a^3×b×c^2+a×b^3×c^2+b^4×c^2-a^2×b×c^3+a×b^2×c^3-4×b^3×c^3+3×a^2×c^4-a×b×c^4+b^2×c^4+2×b×c^5-c^6) in
        cPointhb h_x_5535.
Definition X_5536 :=
        let h_x_5536 a b c := a*(a^5-a^4×b-2×a^3×b^2+2×a^2×b^3+a×b^4-b^5-a^4×c+a^3×b×c-3×a×b^3×c+3×b^4×c-2×a^3×c^2+4×a×b^2×c^2-2×b^3×c^2+2×a^2×c^3-3×a×b×c^3-2×b^2×c^3+a×c^4+3×b×c^4-c^5) in
        cPointhb h_x_5536.
Definition X_5537 :=
        let h_x_5537 a b c := a^2*(a^4-2×a^3×b+2×a×b^3-b^4-2×a^3×c+7×a^2×b×c-4×a×b^2×c-b^3×c-4×a×b×c^2+4×b^2×c^2+2×a×c^3-b×c^3-c^4) in
        cPointhb h_x_5537.
Definition X_5538 :=
        let h_x_5538 a b c := a*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c+7×a^4×b×c-a^3×b^2×c-5×a^2×b^3×c+3×a×b^4×c-2×b^5×c-a^4×c^2-a^3×b×c^2+4×a^2×b^2×c^2-a×b^3×c^2-b^4×c^2+4×a^3×c^3-5×a^2×b×c^3-a×b^2×c^3+4×b^3×c^3-a^2×c^4+3×a×b×c^4-b^2×c^4-2×a×c^5-2×b×c^5+c^6) in
        cPointhb h_x_5538.
Definition X_5539 :=
        let h_x_5539 a b c := a*(-a^3×b^3+a^4×b×c+a^3×b^2×c-a^2×b^3×c-a×b^4×c+a^3×b×c^2+a×b^3×c^2-a^3×c^3-a^2×b×c^3+a×b^2×c^3+b^3×c^3-a×b×c^4) in
        cPointhb h_x_5539.
Definition X_5540 :=
        let h_x_5540 a b c := a*(a^3-a^2×b+a×b^2-b^3-a^2×c-a×b×c+b^2×c+a×c^2+b×c^2-c^3) in
        cPointhb h_x_5540.
Definition X_5541 :=
        let h_x_5541 a b c := a*(a^3+a^2×b-a×b^2-b^3+a^2×c-5×a×b×c+3×b^2×c-a×c^2+3×b×c^2-c^3) in
        cPointhb h_x_5541.
Definition X_5542 :=
        let h_x_5542 a b c := 3×a^2×b-2×a×b^2-b^3+3×a^2×c+4×a×b×c+b^2×c-2×a×c^2+b×c^2-c^3 in
        cPointhb h_x_5542.
Definition X_5543 :=
        let h_x_5543 a b c := (a+b-c)*(a-b+c)*(5×a^2-6×a×b+b^2-6×a×c-2×b×c+c^2) in
        cPointhb h_x_5543.
Definition X_5544 :=
        let h_x_5544 a b c := a^2*(a^4-4×a^2×b^2+3×b^4-4×a^2×c^2-26×b^2×c^2+3×c^4) in
        cPointhb h_x_5544.
Definition X_5545 :=
        let h_x_5545 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+b-c)*(a+c)*(a-b+c)*(a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_5545.
Definition X_5546 :=
        let h_x_5546 a b c := a^2*(a^2-b^2)*(a^2-c^2)*(a-b-c) in
        cPointhb h_x_5546.
Definition X_5547 :=
        let h_x_5547 a b c := a^2*(a-b-c)*(a^2+b^2-2×c^2)*(a^2-2×b^2+c^2) in
        cPointhb h_x_5547.
Definition X_5548 :=
        let h_x_5548 a b c := a^2*(a-b)*(a+b-2×c)*(a-c)*(a-b-c)*(a-2×b+c) in
        cPointhb h_x_5548.
Definition X_5549 :=
        let h_x_5549 a b c := a^2*(a-b)*(a-c)*(a-b-c)*(2×a+2×b-c)*(2×a-b+2×c) in
        cPointhb h_x_5549.
Definition X_5550 :=
        let h_x_5550 a b c := 5×a+3×b+3×c in
        cPointhb h_x_5550.
Definition X_5551 :=
        let h_x_5551 a b c := (3×a^2 + 8×a×b + 3×b^2 - 3×c^2)*(3×a^2 - 3×b^2 + 8×a×c + 3×c^2) in
        cPointhb h_x_5551.
Definition X_5552 :=
        let h_x_5552 a b c := (a - b - c)*(a^3 + a^2×b - a×b^2 - b^3 + a^2×c + b^2×c - a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5552.
Definition X_5553 :=
        let h_x_5553 a b c := (a^5 + a^4×b - 2×a^3×b^2 - 2×a^2×b^3 + a×b^4 + b^5 - a^4×c + 2×a^3×b×c + 2×a^2×b^2×c + 2×a×b^3×c - b^4×c - 2×a^3×c^2 - 2×a^2×b×c^2 - 2×a×b^2×c^2 - 2×b^3×c^2 + 2×a^2×c^3 - 2×a×b×c^3 + 2×b^2×c^3 + a×c^4 + b×c^4 - c^5)*(a^5 - a^4×b - 2×a^3×b^2 + 2×a^2×b^3 + a×b^4 - b^5 + a^4×c + 2×a^3×b×c - 2×a^2×b^2×c - 2×a×b^3×c + b^4×c - 2×a^3×c^2 + 2×a^2×b×c^2 - 2×a×b^2×c^2 + 2×b^3×c^2 - 2×a^2×c^3 + 2×a×b×c^3 - 2×b^2×c^3 + a×c^4 - b×c^4 + c^5) in
        cPointhb h_x_5553.
Definition X_5554 :=
        let h_x_5554 a b c := -a^4 + 2×a^3×b - 2×a×b^3 + b^4 + 2×a^3×c - 2×a^2×b×c + 4×a×b^2×c + 4×a×b×c^2 - 2×b^2×c^2 - 2×a×c^3 + c^4 in
        cPointhb h_x_5554.
Definition X_5555 :=
        let h_x_5555 a b c := (a + b - c)*(a - b + c)*(a^4 - 2×a^3×b + 2×a^2×b^2 - 2×a×b^3 + b^4 + 2×a^2×b×c + 2×a×b^2×c - 2×a^2×c^2 + 4×a×b×c^2 - 2×b^2×c^2 + c^4)*(a^4 - 2×a^2×b^2 + b^4 - 2×a^3×c + 2×a^2×b×c + 4×a×b^2×c + 2×a^2×c^2 + 2×a×b×c^2 - 2×b^2×c^2 - 2×a×c^3 + c^4) in
        cPointhb h_x_5555.
Definition X_5556 :=
        let h_x_5556 a b c := (3×a^2 + 2×a×b + 3×b^2 - 3×c^2)*(3×a^2 - 3×b^2 + 2×a×c + 3×c^2) in
        cPointhb h_x_5556.
Definition X_5557 :=
        let h_x_5557 a b c := (a^2 + 3×a×b + b^2 - c^2)*(a^2 - b^2 + 3×a×c + c^2) in
        cPointhb h_x_5557.
Definition X_5558 :=
        let h_x_5558 a b c := (a^2 + 6×a×b + b^2 - c^2)*(a^2 - b^2 + 6×a×c + c^2) in
        cPointhb h_x_5558.
Definition X_5559 :=
        let h_x_5559 a b c := (a^2 - 3×a×b + b^2 - c^2)*(a^2 - b^2 - 3×a×c + c^2) in
        cPointhb h_x_5559.
Definition X_5560 :=
        let h_x_5560 a b c := (2×a^2 - a×b + 2×b^2 - 2×c^2)*(2×a^2 - 2×b^2 - a×c + 2×c^2) in
        cPointhb h_x_5560.
Definition X_5561 :=
        let h_x_5561 a b c := (2×a^2 + a×b + 2×b^2 - 2×c^2)*(2×a^2 - 2×b^2 + a×c + 2×c^2) in
        cPointhb h_x_5561.
Definition X_5562 :=
        let h_x_5562 a b c := a^2×(a^2-b^2-c^2)^2*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_5562.
Definition X_5563 :=
        let h_x_5563 a b c := a^2*(a^2-b^2+3×b×c-c^2) in
        cPointhb h_x_5563.
Definition X_5564 :=
        let h_x_5564 a b c := a^2-b^2-3×b×c-c^2 in
        cPointhb h_x_5564.
Definition X_5565 :=
        let h_x_5565 a b c := (2×a^4×b^4+a^6×c^2-a^4×b^2×c^2-a^2×b^4×c^2+b^6×c^2-a^4×c^4-b^4×c^4-4×a^3×b×c^2*(SS a b c)-4×a×b^3×c^2*(SS a b c))*(a^6×b^2-a^4×b^4-a^4×b^2×c^2+2×a^4×c^4-a^2×b^2×c^4-b^4×c^4+b^2×c^6-4×a^3×b^2×c*(SS a b c)-4×a×b^2×c^3*(SS a b c)) in
        cPointhb h_x_5565.
Definition X_5566 :=
        let h_x_5566 a b c := (2×a^4×b^4+a^6×c^2-a^4×b^2×c^2-a^2×b^4×c^2+b^6×c^2-a^4×c^4-b^4×c^4+4×a^3×b×c^2*(SS a b c)+4×a×b^3×c^2*(SS a b c))*(a^6×b^2-a^4×b^4-a^4×b^2×c^2+2×a^4×c^4-a^2×b^2×c^4-b^4×c^4+b^2×c^6+4×a^3×b^2×c*(SS a b c)+4×a×b^2×c^3*(SS a b c)) in
        cPointhb h_x_5566.
Definition X_5567 :=
        let h_x_5567 a b c := a^2*(a^6-a^4×b^2-a^2×b^4+b^6+a^4×c^2+b^4×c^2-2×c^6+4×a^3×b*(SS a b c)+4×a×b^3*(SS a b c))*(a^6+a^4×b^2-2×b^6-a^4×c^2-a^2×c^4+b^2×c^4+c^6+4×a^3×c*(SS a b c)+4×a×c^3*(SS a b c)) in
        cPointhb h_x_5567.
Definition X_5568 :=
        let h_x_5568 a b c := a^2*(a^6-a^4×b^2-a^2×b^4+b^6+a^4×c^2+b^4×c^2-2×c^6-4×a^3×b*(SS a b c)-4×a×b^3*(SS a b c))*(a^6+a^4×b^2-2×b^6-a^4×c^2-a^2×c^4+b^2×c^4+c^6-4×a^3×c*(SS a b c)-4×a×c^3*(SS a b c)) in
        cPointhb h_x_5568.
Definition X_5569 :=
        let h_x_5569 a b c := 7×a^4-7×a^2×b^2+b^4-7×a^2×c^2-4×b^2×c^2+c^4 in
        cPointhb h_x_5569.
Definition X_5570 :=
        let h_x_5570 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c-2×a^2×b^3×c-a×b^4×c+2×b^5×c-a^4×c^2+4×a^2×b^2×c^2+b^4×c^2-2×a^3×c^3-2×a^2×b×c^3-4×b^3×c^3+2×a^2×c^4-a×b×c^4+b^2×c^4+a×c^5+2×b×c^5-c^6) in
        cPointhb h_x_5570.
Definition X_5571 :=
        let h_x_5571 a b c := a*((-a+b+c)*(a*(b + c) - (b - c)^2)*sin(A a b c/2) + b×(a-b+c)^2×sin(B a b c/2) + c×(a+b-c)^2×sin(C a b c/2)) in
        cPointhb h_x_5571.
Definition X_5572 :=
        let h_x_5572 a b c := a*(a^3×b-3×a^2×b^2+3×a×b^3-b^4+a^3×c-3×a×b^2×c+2×b^3×c-3×a^2×c^2-3×a×b×c^2-2×b^2×c^2+3×a×c^3+2×b×c^3-c^4) in
        cPointhb h_x_5572.
Definition X_5573 :=
        let h_x_5573 a b c := a*(a^2+3×b^2-6×b×c+3×c^2) in
        cPointhb h_x_5573.
Definition X_5574 :=
        let h_x_5574 a b c := a×(-a+b+c)^3*(a^2+3×b^2-6×b×c+3×c^2) in
        cPointhb h_x_5574.
Definition X_5575 :=
        let h_x_5575 a b c := a*(a+b-c)*(a-b+c)*(a^2+3×b^2-6×b×c+3×c^2) in
        cPointhb h_x_5575.
Definition X_5576 :=
        let h_x_5576 a b c := a^8×b^2-2×a^6×b^4+2×a^2×b^8-b^10+a^8×c^2-2×a^6×b^2×c^2-2×a^4×b^4×c^2+3×b^8×c^2-2×a^6×c^4-2×a^4×b^2×c^4-4×a^2×b^4×c^4-2×b^6×c^4-2×b^4×c^6+2×a^2×c^8+3×b^2×c^8-c^10 in
        cPointhb h_x_5576.
Definition X_5577 :=
        let h_x_5577 a b c := a^2*(a-b-c)*(b-c)^2×(a^2-b^2+4×b×c-c^2)^2 in
        cPointhb h_x_5577.
Definition X_5578 :=
        let h_x_5578 a b c := (a-b-c)*(b-c)^2×(a^5+a^4×b-a^3×b^2-a^2×b^3+a^4×c-a^3×b×c-a×b^3×c+b^4×c-a^3×c^2-2×a×b^2×c^2-b^3×c^2-a^2×c^3-a×b×c^3-b^2×c^3+b×c^4)^2 in
        cPointhb h_x_5578.
Definition X_5579 :=
        let h_x_5579 a b c := (a-b-c)*(a^3×b+a^2×b^2+a^3×c-2×a^2×b×c-a×b^2×c+b^3×c+a^2×c^2-a×b×c^2-2×b^2×c^2+b×c^3)^2 in
        cPointhb h_x_5579.
Definition X_5580 :=
        let h_x_5580 a b c := a^2*(a-b-c)*(a^2×b-2×a×b^2+b^3+a^2×c+2×a×b×c-b^2×c-2×a×c^2-b×c^2+c^3)^2 in
        cPointhb h_x_5580.
Definition X_5581 :=
        let h_x_5581 a b c := a^2*(a-b-c)*(b-c)^2×(2×a^2×b-2×a×b^2+2×a^2×c+a×b×c+b^2×c-2×a×c^2+b×c^2)^2 in
        cPointhb h_x_5581.
Definition X_5582 :=
        let h_x_5582 a b c := a^2*(a-b-c)*(b-c)^2×(a^3-5×a^2×b+5×a×b^2-b^3-5×a^2×c+a×b×c+5×a×c^2-c^3)^2 in
        cPointhb h_x_5582.
Definition X_5583 :=
        let h_x_5583 a b c := (a-b-c)*(-b+c)*(4×a^5-a^4×b-2×a^3×b^2-2×a×b^4+b^5-a^4×c+4×a^2×b^2×c-3×b^4×c-2×a^3×c^2+4×a^2×b×c^2+4×a×b^2×c^2+2×b^3×c^2+2×b^2×c^3-2×a×c^4-3×b×c^4+c^5) in
        cPointhb h_x_5583.
Definition X_5584 :=
        let h_x_5584 a b c := a^2*(a^5-a^4×b-2×a^3×b^2+2×a^2×b^3+a×b^4-b^5-a^4×c-4×a^3×b×c-2×a^2×b^2×c+4×a×b^3×c+3×b^4×c-2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-2×b^3×c^2+2×a^2×c^3+4×a×b×c^3-2×b^2×c^3+a×c^4+3×b×c^4-c^5) in
        cPointhb h_x_5584.
Definition X_5585 :=
        let h_x_5585 a b c := a^2*(13×a^2-11×b^2-11×c^2) in
        cPointhb h_x_5585.
Definition X_5586 :=
        let h_x_5586 a b c := (a+b-c)*(a-b+c)*(3×a+b+c)*(a+2×b+2×c) in
        cPointhb h_x_5586.
Definition X_5587 :=
        let h_x_5587 a b c := a^4-a^3×b+a^2×b^2+a×b^3-2×b^4-a^3×c+2×a^2×b×c-a×b^2×c+a^2×c^2-a×b×c^2+4×b^2×c^2+a×c^3-2×c^4 in
        cPointhb h_x_5587.
Definition X_5588 :=
        let h_x_5588 a b c := a*(a^2+2×a×b-b^2+2×a×c-c^2-(SS a b c)) in
        cPointhb h_x_5588.
Definition X_5589 :=
        let h_x_5589 a b c := a*(a^2+2×a×b-b^2+2×a×c-c^2+(SS a b c)) in
        cPointhb h_x_5589.
Definition X_5590 :=
        let h_x_5590 a b c := b^2+c^2+(SS a b c) in
        cPointhb h_x_5590.
Definition X_5591 :=
        let h_x_5591 a b c := b^2+c^2-(SS a b c) in
        cPointhb h_x_5591.
Definition X_5592 :=
        let h_x_5592 a b c := (b-c)*(3×a^3-2×a^2×b+b^3-2×a^2×c-a×b×c+c^3) in
        cPointhb h_x_5592.
Definition X_5593 :=
        let h_x_5593 a b c := a^2*(a^2-b^2-c^2)*(a^16-4×a^14×b^2+8×a^12×b^4-12×a^10×b^6+14×a^8×b^8-12×a^6×b^10+8×a^4×b^12-4×a^2×b^14+b^16-4×a^14×c^2+12×a^12×b^2×c^2-10×a^10×b^4×c^2-2×a^8×b^6×c^2+12×a^6×b^8×c^2-20×a^4×b^10×c^2+18×a^2×b^12×c^2-6×b^14×c^2+8×a^12×c^4-10×a^10×b^2×c^4+16×a^4×b^8×c^4-30×a^2×b^10×c^4+16×b^12×c^4-12×a^10×c^6-2×a^8×b^2×c^6-8×a^4×b^6×c^6+16×a^2×b^8×c^6-26×b^10×c^6+14×a^8×c^8+12×a^6×b^2×c^8+16×a^4×b^4×c^8+16×a^2×b^6×c^8+30×b^8×c^8-12×a^6×c^10-20×a^4×b^2×c^10-30×a^2×b^4×c^10-26×b^6×c^10+8×a^4×c^12+18×a^2×b^2×c^12+16×b^4×c^12-4×a^2×c^14-6×b^2×c^14+c^16) in
        cPointhb h_x_5593.
Definition X_5594 :=
        let h_x_5594 a b c := a^2*(a^6+a^4×b^2-a^2×b^4-b^6+a^4×c^2-2×a^2×b^2×c^2+b^4×c^2-a^2×c^4+b^2×c^4-c^6+a^4*(SS a b c)-b^4*(SS a b c)+2×b^2×c^2*(SS a b c)-c^4*(SS a b c)) in
        cPointhb h_x_5594.
Definition X_5595 :=
        let h_x_5595 a b c := a^2*(a^6+a^4×b^2-a^2×b^4-b^6+a^4×c^2-2×a^2×b^2×c^2+b^4×c^2-a^2×c^4+b^2×c^4-c^6-a^4*(SS a b c)+b^4*(SS a b c)-2×b^2×c^2*(SS a b c)+c^4*(SS a b c)) in
        cPointhb h_x_5595.
Definition X_5596 :=
        let h_x_5596 a b c := 3×a^8-2×a^4×b^4-b^8-2×a^4×c^4+2×b^4×c^4-c^8 in
        cPointhb h_x_5596.
Definition X_5597 :=
        let h_x_5597 a b c := a*(a*(a-b-c)*(a+b+c)+4×sqrt((RR a b c)*(r a b c+4*(RR a b c)))*(SS a b c)) in
        cPointhb h_x_5597.
Definition X_5598 :=
        let h_x_5598 a b c := a*(a*(a-b-c)*(a+b+c)-4×sqrt((RR a b c)*(r a b c+4*(RR a b c)))*(SS a b c)) in
        cPointhb h_x_5598.
Definition X_5599 :=
        let h_x_5599 a b c := a^2*(a-b-c)*(a+b+c)-4*(b+c)*sqrt((RR a b c)*(r a b c+4×RR a b c))*(SS a b c) in
        cPointhb h_x_5599.
Definition X_5600 :=
        let h_x_5600 a b c := a^2*(a-b-c)*(a+b+c)+4*(b+c)*sqrt(RR a b c*(r a b c+4×RR a b c))*(SS a b c) in
        cPointhb h_x_5600.
Definition X_5601 :=
        let h_x_5601 a b c := (-a+b+c)*(a^2*(a+b+c)+2×sqrt(RR a b c*(r a b c+4×RR a b c))*(SS a b c)) in
        cPointhb h_x_5601.
Definition X_5602 :=
        let h_x_5602 a b c := (-a+b+c)*(a^2*(a+b+c)-2×sqrt(RR a b c*(r a b c+4×RR a b c))*(SS a b c)) in
        cPointhb h_x_5602.
Definition X_5603 :=
        let h_x_5603 a b c := a^4-2×a^3×b-2×a^2×b^2+2×a×b^3+b^4-2×a^3×c+4×a^2×b×c-2×a×b^2×c-2×a^2×c^2-2×a×b×c^2-2×b^2×c^2+2×a×c^3+c^4 in
        cPointhb h_x_5603.
Definition X_5604 :=
        let h_x_5604 a b c := a*(a^2-a×b+2×b^2-a×c+2×c^2+2*(SS a b c)) in
        cPointhb h_x_5604.
Definition X_5605 :=
        let h_x_5605 a b c := a*(a^2-a×b+2×b^2-a×c+2×c^2-2*(SS a b c)) in
        cPointhb h_x_5605.
Definition X_5606 :=
        let h_x_5606 a b c := a*(a-b)*(a-c)*(a^3+3×a^2×b+3×a×b^2+b^3-a^2×c-a×b×c-b^2×c-a×c^2-b×c^2+c^3)*(a^3-a^2×b-a×b^2+b^3+3×a^2×c-a×b×c-b^2×c+3×a×c^2-b×c^2+c^3) in
        cPointhb h_x_5606.
Definition X_5607 :=
        let h_x_5607 a b c := a^2*(b-c)*(b+c)*(2*(SS a b c)*(a^6-4×a^4×b^2+5×a^2×b^4-2×b^6-4×a^4×c^2-3×a^2×b^2×c^2+2×b^4×c^2+5×a^2×c^4+2×b^2×c^4-2×c^6)+ sqrt(3)*(a^8-3×a^6×b^2+3×a^4×b^4-a^2×b^6-3×a^6×c^2-a^4×b^2×c^2+3×a^4×c^4+2×b^4×c^4-a^2×c^6) ) in
        cPointhb h_x_5607.
Definition X_5608 :=
        let h_x_5608 a b c := a^2*(b-c)*(b+c)*(2*(SS a b c)*(a^6-4×a^4×b^2+5×a^2×b^4-2×b^6-4×a^4×c^2-3×a^2×b^2×c^2+2×b^4×c^2+5×a^2×c^4+2×b^2×c^4-2×c^6)- sqrt(3)*(a^8-3×a^6×b^2+3×a^4×b^4-a^2×b^6-3×a^6×c^2-a^4×b^2×c^2+3×a^4×c^4+2×b^4×c^4-a^2×c^6) ) in
        cPointhb h_x_5608.
Definition X_5609 :=
        let h_x_5609 a b c := a^2*(2×a^8-7×a^6×b^2+9×a^4×b^4-5×a^2×b^6+b^8-7×a^6×c^2+4×a^4×b^2×c^2+3×b^6×c^2+9×a^4×c^4-8×b^4×c^4-5×a^2×c^6+3×b^2×c^6+c^8) in
        cPointhb h_x_5609.
Definition X_5610 :=
        let h_x_5610 a b c := a^2*(sqrt(3)*(a-b)*(a+b)*(a-c)*(a+c)*(-4*(SS a b c))*(a^2-2×b^2-2×c^2)-2*(a^8-6×a^6×b^2+13×a^4×b^4-12×a^2×b^6+4×b^8-6×a^6×c^2-5×a^4×b^2×c^2+7×a^2×b^4×c^2+13×a^4×c^4+7×a^2×b^2×c^4-8×b^4×c^4-12×a^2×c^6+4×c^8)) in
        cPointhb h_x_5610.
Definition X_5611 :=
        let h_x_5611 a b c := a^2*(a^4-4×a^2×b^2+3×b^4-4×a^2×c^2-2×b^2×c^2+3×c^4+2×sqrt(3)×a^2*(SS a b c)-2×sqrt(3)×b^2*(SS a b c)-2×sqrt(3)×c^2*(SS a b c)) in
        cPointhb h_x_5611.
Definition X_5612 :=
        let h_x_5612 a b c := a^2*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)*(3×a^2-3×b^2-3×c^2+2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5612.
Definition X_5613 :=
        let h_x_5613 a b c := (a+b-c)^2×(a-b+c)^2×(-a+b+c)^2×(a+b+c)^2-2×sqrt(3)*(a^6-a^4×b^2+a^2×b^4-b^6-a^4×c^2+2×a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6)*(SS a b c) in
        cPointhb h_x_5613.
Definition X_5614 :=
        let h_x_5614 a b c := a^2*(-2*(a^8-6×a^6×b^2+13×a^4×b^4-12×a^2×b^6+4×b^8-6×a^6×c^2-5×a^4×b^2×c^2+7×a^2×b^4×c^2+13×a^4×c^4+7×a^2×b^2×c^4-8×b^4×c^4-12×a^2×c^6+4×c^8)+4×sqrt(3)*(a-b)*(a+b)*(a-c)*(a+c)*(a^2-2×b^2-2×c^2)*(SS a b c)) in
        cPointhb h_x_5614.
Definition X_5615 :=
        let h_x_5615 a b c := a^2*(a^4-4×a^2×b^2+3×b^4-4×a^2×c^2-2×b^2×c^2+3×c^4-2×sqrt(3)×a^2*(SS a b c)+2×sqrt(3)×b^2*(SS a b c)+2×sqrt(3)×c^2*(SS a b c)) in
        cPointhb h_x_5615.
Definition X_5616 :=
        let h_x_5616 a b c := a^2*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)*(3×a^2-3×b^2-3×c^2-2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5616.
Definition X_5617 :=
        let h_x_5617 a b c := (a+b-c)^2×(a-b+c)^2×(-a+b+c)^2×(a+b+c)^2+2×sqrt(3)*(a^6-a^4×b^2+a^2×b^4-b^6-a^4×c^2+2×a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6)*(SS a b c) in
        cPointhb h_x_5617.
Definition X_5618 :=
        let h_x_5618 a b c := (a^2-b^2)*(a^2-c^2)*(3×sqrt(3)×a^2×b^2*(a^2+b^2-c^2)+2*(2×a^4+5×a^2×b^2+2×b^4-4×a^2×c^2-4×b^2×c^2+2×c^4)*(SS a b c))*(3×sqrt(3)×a^2×c^2*(a^2-b^2+c^2)+2*(2×a^4-4×a^2×b^2+2×b^4+5×a^2×c^2-4×b^2×c^2+2×c^4)*(SS a b c)) in
        cPointhb h_x_5618.
Definition X_5619 :=
        let h_x_5619 a b c := (a^2-b^2)*(a^2-c^2)*(3×sqrt(3)×a^2×b^2*(a^2+b^2-c^2)-2*(2×a^4+5×a^2×b^2+2×b^4-4×a^2×c^2-4×b^2×c^2+2×c^4)*(SS a b c))*(3×sqrt(3)×a^2×c^2*(a^2-b^2+c^2)-2*(2×a^4-4×a^2×b^2+2×b^4+5×a^2×c^2-4×b^2×c^2+2×c^4)*(SS a b c)) in
        cPointhb h_x_5619.
Definition X_5620 :=
        let h_x_5620 a b c := (b+c)*(a^3+a^2×b+a×b^2+b^3-a^2×c-a×b×c-b^2×c-a×c^2-b×c^2+c^3)*(a^3-a^2×b-a×b^2+b^3+a^2×c-a×b×c-b^2×c+a×c^2-b×c^2+c^3) in
        cPointhb h_x_5620.
Definition X_5621 :=
        let h_x_5621 a b c := a^2*(a^10-a^8×b^2-2×a^6×b^4+2×a^4×b^6+a^2×b^8-b^10-a^8×c^2+5×a^6×b^2×c^2-2×a^4×b^4×c^2+a^2×b^6×c^2-3×b^8×c^2-2×a^6×c^4-2×a^4×b^2×c^4-4×a^2×b^4×c^4+4×b^6×c^4+2×a^4×c^6+a^2×b^2×c^6+4×b^4×c^6+a^2×c^8-3×b^2×c^8-c^10) in
        cPointhb h_x_5621.
Definition X_5622 :=
        let h_x_5622 a b c := a^2*(a^2-b^2-c^2)*(a^8-a^6×b^2-a^4×b^4+a^2×b^6-a^6×c^2+3×a^4×b^2×c^2-a^2×b^4×c^2+3×b^6×c^2-a^4×c^4-a^2×b^2×c^4-6×b^4×c^4+a^2×c^6+3×b^2×c^6) in
        cPointhb h_x_5622.
Definition X_5623 :=
        let h_x_5623 a b c := (a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4+2×sqrt(3)×a^2*(SS a b c))*((a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4+2×sqrt(3)×a^2*(SS a b c))+(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(-2×a^4+a^2×b^2+b^4+4×a^2×c^2+b^2×c^2-2×c^4+2×sqrt(3)×b^2*(SS a b c))+(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-2×a^4+4×a^2×b^2-2×b^4+a^2×c^2+b^2×c^2+c^4+2×sqrt(3)×c^2*(SS a b c))) in
        cPointhb h_x_5623.
Definition X_5624 :=
        let h_x_5624 a b c := (a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4-2×sqrt(3)×a^2*(SS a b c))*((a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^4+a^2×b^2-2×b^4+a^2×c^2+4×b^2×c^2-2×c^4-2×sqrt(3)×a^2*(SS a b c))+(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(-2×a^4+a^2×b^2+b^4+4×a^2×c^2+b^2×c^2-2×c^4-2×sqrt(3)×b^2*(SS a b c))+(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-2×a^4+4×a^2×b^2-2×b^4+a^2×c^2+b^2×c^2+c^4-2×sqrt(3)×c^2*(SS a b c))) in
        cPointhb h_x_5624.
Definition X_5625 :=
        let h_x_5625 a b c := (2×a+b+c)*(a^2+2×a×b+2×a×c+b×c) in
        cPointhb h_x_5625.
Definition X_5627 :=
        let h_x_5627 a b c := (a^2-a×b+b^2-c^2)*(a^2+a×b+b^2-c^2)*(a^2-b^2-a×c+c^2)*(a^2-b^2+a×c+c^2)*(a^4-2×a^2×b^2+b^4+a^2×c^2+b^2×c^2-2×c^4)*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4) in
        cPointhb h_x_5627.
Definition X_5628 :=
        let h_x_5628 a b c := cos((A a b c)/3)×sec((2×A a b c)/3)*(sin(A a b c)) in
        cPointhb h_x_5628.
Definition X_5629 :=
        let h_x_5629 a b c := (sin(A a b c))*cos(2*(A a b c)/3)×sec((A a b c)/3) in
        cPointhb h_x_5629.
Definition X_5630 :=
        let h_x_5630 a b c := cos(1/3*(A a b c-2×PI))×sec(2/3*(A a b c-2×PI))*(sin(A a b c)) in
        cPointhb h_x_5630.
Definition X_5631 :=
        let h_x_5631 a b c := cos(2/3*(A a b c-2×PI))×sec(1/3*(A a b c-2×PI))*(sin(A a b c)) in
        cPointhb h_x_5631.
Definition X_5632 :=
        let h_x_5632 a b c := cos(1/3*(A a b c-4×PI))×sec((2*(A a b c-PI))/3)*(sin(A a b c)) in
        cPointhb h_x_5632.
Definition X_5633 :=
        let h_x_5633 a b c := cos(2/3*(A a b c-4×PI))×sec((A a b c-PI)/3)*(sin(A a b c)) in
        cPointhb h_x_5633.
Definition X_5634 :=
        let h_x_5634 a b c := (cos((2×A a b c)/3)×cos((B a b c)/3)×cos((C a b c)/3)-cos((A a b c)/3)×cos((2×B a b c)/3)×cos((2×C a b c)/3))*(sin(A a b c)) in
        cPointhb h_x_5634.
Definition X_5635 :=
        let h_x_5635 a b c := (-cos(1/3*(2×B a b c-4×PI))×cos(1/3*(2×C a b c-4×PI))×cos(1/3*(A a b c-2×PI))+cos(2/3*(A a b c-2×PI))×cos(1/3*(B a b c-2×PI))×cos(1/3*(C a b c-2×PI)))*(sin(A a b c)) in
        cPointhb h_x_5635.
Definition X_5636 :=
        let h_x_5636 a b c := (-cos(1/3*(2×B a b c-8×PI))×cos(1/3*(2×C a b c-8×PI))×cos(1/3*(A a b c-4×PI))+cos(1/3*(2×A a b c-8×PI))×cos(1/3*(B a b c-4×PI))×cos(1/3*(C a b c-4×PI)))*(sin(A a b c)) in
        cPointhb h_x_5636.
Definition X_5637 :=
        let h_x_5637 a b c := (cos((A a b c)/3)-2×cos((B a b c)/3)×cos((C a b c)/3))*(sin(A a b c))*sin((B a b c)/3-(C a b c)/3)×sin((B a b c)/3+(C a b c)/3) in
        cPointhb h_x_5637.
Definition X_5638 :=
        let h_x_5638 a b c := a^2*((2×a^2-b^2-c^2)*(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)-(2×a^4-2×a^2×b^2-b^4-2×a^2×c^2+4×b^2×c^2-c^4)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_5638.
Definition X_5639 :=
        let h_x_5639 a b c := a^2*((2×a^2-b^2-c^2)*(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)+(2×a^4-2×a^2×b^2-b^4-2×a^2×c^2+4×b^2×c^2-c^4)*sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)) in
        cPointhb h_x_5639.
Definition X_5640 :=
        let h_x_5640 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+3×b^2×c^2-c^4) in
        cPointhb h_x_5640.
Definition X_5641 :=
        let h_x_5641 a b c := (a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2-b^4×c^2+2×a^2×c^4+2×b^2×c^4-2×c^6)*(a^6-a^4×b^2+2×a^2×b^4-2×b^6-a^4×c^2+2×b^4×c^2-a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_5641.
Definition X_5642 :=
        let h_x_5642 a b c := (2×a^2-b^2-c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_5642.
Definition X_5643 :=
        let h_x_5643 a b c := a^2*(a^4-3×a^2×b^2+2×b^4-3×a^2×c^2-11×b^2×c^2+2×c^4) in
        cPointhb h_x_5643.
Definition X_5644 :=
        let h_x_5644 a b c := a^2*(3×a^4-8×a^2×b^2+5×b^4-8×a^2×c^2-22×b^2×c^2+5×c^4) in
        cPointhb h_x_5644.
Definition X_5645 :=
        let h_x_5645 a b c := a^2*(4×a^4-10×a^2×b^2+6×b^4-10×a^2×c^2-23×b^2×c^2+6×c^4) in
        cPointhb h_x_5645.
Definition X_5646 :=
        let h_x_5646 a b c := a^2*(a^4+2×a^2×b^2-3×b^4+2×a^2×c^2-26×b^2×c^2-3×c^4) in
        cPointhb h_x_5646.
Definition X_5647 :=
        let h_x_5647 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^12-4×a^10×b^2+7×a^8×b^4-8×a^6×b^6+7×a^4×b^8-4×a^2×b^10+b^12-4×a^10×c^2+13×a^8×b^2×c^2-18×a^6×b^4×c^2+12×a^4×b^6×c^2-2×a^2×b^8×c^2-b^10×c^2+7×a^8×c^4-18×a^6×b^2×c^4+10×a^4×b^4×c^4+6×a^2×b^6×c^4-5×b^8×c^4-8×a^6×c^6+12×a^4×b^2×c^6+6×a^2×b^4×c^6+10×b^6×c^6+7×a^4×c^8-2×a^2×b^2×c^8-5×b^4×c^8-4×a^2×c^10-b^2×c^10+c^12) in
        cPointhb h_x_5647.
Definition X_5648 :=
        let h_x_5648 a b c := a^8+3×a^6×b^2-2×a^4×b^4-3×a^2×b^6+b^8+3×a^6×c^2-11×a^4×b^2×c^2+7×a^2×b^4×c^2-2×a^4×c^4+7×a^2×b^2×c^4-2×b^4×c^4-3×a^2×c^6+c^8 in
        cPointhb h_x_5648.
Definition X_5649 :=
        let h_x_5649 a b c := a^2*(a-b)*(a+b)*(a-c)*(a+c)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2-b^4×c^2+2×a^2×c^4+2×b^2×c^4-2×c^6)*(a^6-a^4×b^2+2×a^2×b^4-2×b^6-a^4×c^2+2×b^4×c^2-a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_5649.
Definition X_5650 :=
        let h_x_5650 a b c := a^2*(a^2×b^2-b^4+a^2×c^2-6×b^2×c^2-c^4) in
        cPointhb h_x_5650.
Definition X_5651 :=
        let h_x_5651 a b c := a^2*(a^4-a^2×b^2-a^2×c^2+4×b^2×c^2) in
        cPointhb h_x_5651.
Definition X_5652 :=
        let h_x_5652 a b c := (b-c)*(b+c)*(3×a^6-2×a^4×b^2+a^2×b^4-2×a^4×c^2-3×a^2×b^2×c^2+b^4×c^2+a^2×c^4+b^2×c^4) in
        cPointhb h_x_5652.
Definition X_5653 :=
        let h_x_5653 a b c := a^2*(b-c)*(b+c)*(a^10+a^8×b^2-5×a^6×b^4+a^4×b^6+4×a^2×b^8-2×b^10+a^8×c^2-8×a^6×b^2×c^2+15×a^4×b^4×c^2-14×a^2×b^6×c^2+4×b^8×c^2-5×a^6×c^4+15×a^4×b^2×c^4-3×a^2×b^4×c^4+b^6×c^4+a^4×c^6-14×a^2×b^2×c^6+b^4×c^6+4×a^2×c^8+4×b^2×c^8-2×c^10) in
        cPointhb h_x_5653.
Definition X_5654 :=
        let h_x_5654 a b c := (a^2-b^2-c^2)*(a^8-4×a^6×b^2+4×a^4×b^4-b^8-4×a^6×c^2-4×a^4×b^2×c^2+4×b^6×c^2+4×a^4×c^4-6×b^4×c^4+4×b^2×c^6-c^8) in
        cPointhb h_x_5654.
Definition X_5655 :=
        let h_x_5655 a b c := a^10-6×a^8×b^2+11×a^6×b^4-7×a^4×b^6+b^10-6×a^8×c^2-a^6×b^2×c^2+2×a^4×b^4×c^2+8×a^2×b^6×c^2-3×b^8×c^2+11×a^6×c^4+2×a^4×b^2×c^4-16×a^2×b^4×c^4+2×b^6×c^4-7×a^4×c^6+8×a^2×b^2×c^6+2×b^4×c^6-3×b^2×c^8+c^10 in
        cPointhb h_x_5655.
Definition X_5656 :=
        let h_x_5656 a b c := a^10-7×a^8×b^2+14×a^6×b^4-10×a^4×b^6+a^2×b^8+b^10-7×a^8×c^2-12×a^6×b^2×c^2+10×a^4×b^4×c^2+12×a^2×b^6×c^2-3×b^8×c^2+14×a^6×c^4+10×a^4×b^2×c^4-26×a^2×b^4×c^4+2×b^6×c^4-10×a^4×c^6+12×a^2×b^2×c^6+2×b^4×c^6+a^2×c^8-3×b^2×c^8+c^10 in
        cPointhb h_x_5656.
Definition X_5657 :=
        let h_x_5657 a b c := a^4+2×a^3×b-2×a^2×b^2-2×a×b^3+b^4+2×a^3×c-4×a^2×b×c+2×a×b^2×c-2×a^2×c^2+2×a×b×c^2-2×b^2×c^2-2×a×c^3+c^4 in
        cPointhb h_x_5657.
Definition X_5658 :=
        let h_x_5658 a b c := a^6-4×a^5×b+3×a^4×b^2+4×a^3×b^3-5×a^2×b^4+b^6-4×a^5×c+2×a^4×b×c-4×a^3×b^2×c+8×a×b^4×c-2×b^5×c+3×a^4×c^2-4×a^3×b×c^2+10×a^2×b^2×c^2-8×a×b^3×c^2-b^4×c^2+4×a^3×c^3-8×a×b^2×c^3+4×b^3×c^3-5×a^2×c^4+8×a×b×c^4-b^2×c^4-2×b×c^5+c^6 in
        cPointhb h_x_5658.
Definition X_5659 :=
        let h_x_5659 a b c := a^6-a^5×b-3×a^4×b^2+4×a^3×b^3+a^2×b^4-3×a×b^5+b^6-a^5×c-a^4×b×c+2×a^3×b^2×c-3×a^2×b^3×c+5×a×b^4×c-2×b^5×c-3×a^4×c^2+2×a^3×b×c^2+4×a^2×b^2×c^2-2×a×b^3×c^2-b^4×c^2+4×a^3×c^3-3×a^2×b×c^3-2×a×b^2×c^3+4×b^3×c^3+a^2×c^4+5×a×b×c^4-b^2×c^4-3×a×c^5-2×b×c^5+c^6 in
        cPointhb h_x_5659.
Definition X_5660 :=
        let h_x_5660 a b c := a^6-3×a^5×b+a^4×b^2+4×a^3×b^3-3×a^2×b^4-a×b^5+b^6-3×a^5×c+7×a^4×b×c-6×a^3×b^2×c-3×a^2×b^3×c+7×a×b^4×c-2×b^5×c+a^4×c^2-6×a^3×b×c^2+12×a^2×b^2×c^2-6×a×b^3×c^2-b^4×c^2+4×a^3×c^3-3×a^2×b×c^3-6×a×b^2×c^3+4×b^3×c^3-3×a^2×c^4+7×a×b×c^4-b^2×c^4-a×c^5-2×b×c^5+c^6 in
        cPointhb h_x_5660.
Definition X_5661 :=
        let h_x_5661 a b c := a^2*(a^6×b^4-2×a^4×b^6+a^2×b^8-a^2×b^6×c^2+b^8×c^2+a^6×c^4+2×a^2×b^4×c^4-b^6×c^4-2×a^4×c^6-a^2×b^2×c^6-b^4×c^6+a^2×c^8+b^2×c^8) in
        cPointhb h_x_5661.
Definition X_5662 :=
        let h_x_5662 a b c := a*(a^5×b^2-2×a^3×b^4+a×b^6-2×a^4×b^2×c+3×a^3×b^3×c+a^2×b^4×c-3×a×b^5×c+b^6×c+a^5×c^2-2×a^4×b×c^2-a^2×b^3×c^2+3×a×b^4×c^2-b^5×c^2+3×a^3×b×c^3-a^2×b^2×c^3-2×a×b^3×c^3-2×a^3×c^4+a^2×b×c^4+3×a×b^2×c^4-3×a×b×c^5-b^2×c^5+a×c^6+b×c^6) in
        cPointhb h_x_5662.
Definition X_5663 :=
        let h_x_5663 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+2×a^4×b^2×c^2-2×a^2×b^4×c^2-b^6×c^2-3×a^4×c^4-2×a^2×b^2×c^4+4×b^4×c^4+3×a^2×c^6-b^2×c^6-c^8) in
        cPointhb h_x_5663.
Definition X_5664 :=
        let h_x_5664 a b c := (b^2-c^2)*(-a^2+b^2-b×c+c^2)*(-a^2+b^2+b×c+c^2)*(-2×a^4+a^2×b^2+b^4+a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_5664.
Definition X_5665 :=
        let h_x_5665 a b c := a*(a+b-c)*(a-b+c)*(a^2-2×a×b+b^2-2×a×c-2×b×c-3×c^2)*(a^2-2×a×b-3×b^2-2×a×c-2×b×c+c^2) in
        cPointhb h_x_5665.
Definition X_5666 :=
        let h_x_5666 a b c := a*(a+b-c)*(a-b+c)*(3×a^4-6×a^3×b-4×a^2×b^2+6×a×b^3+b^4-6×a^3×c-14×a×b^2×c-4×b^3×c-4×a^2×c^2-14×a×b×c^2-10×b^2×c^2+6×a×c^3-4×b×c^3+c^4) in
        cPointhb h_x_5666.
Definition X_5667 :=
        let h_x_5667 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*((a^2-b^2+c^2)*(-a^2+b^2+c^2)*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)+(a^2+b^2-c^2)*(-a^2+b^2+c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)+(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)) in
        cPointhb h_x_5667.
Definition X_5668 :=
        let h_x_5668 a b c := a^2*(a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)*(a^2-b^2-c^2)-2*(SS a b c))+b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)*(-a^2+b^2-c^2)-2*(SS a b c))+c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(sqrt(3)*(-a^2-b^2+c^2)-2*(SS a b c)))*(sqrt(3)*(a^2-b^2-c^2)-2*(SS a b c)) in
        cPointhb h_x_5668.
Definition X_5669 :=
        let h_x_5669 a b c := a^2*(sqrt(3)*(a^2-b^2-c^2)+2*(SS a b c))*(a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)*(a^2-b^2-c^2)+2*(SS a b c))+b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)*(-a^2+b^2-c^2)+2*(SS a b c))+c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(sqrt(3)*(-a^2-b^2+c^2)+2*(SS a b c))) in
        cPointhb h_x_5669.
Definition X_5670 :=
        let h_x_5670 a b c := (a^8+2×a^6×b^2-6×a^4×b^4+2×a^2×b^6+b^8-4×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4-4×a^2×c^6-4×b^2×c^6+c^8)*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8+2×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2-6×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4+2×a^2×c^6-4×b^2×c^6+c^8)*((a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^8+2×a^6×b^2-6×a^4×b^4+2×a^2×b^6+b^8-4×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4-4×a^2×c^6-4×b^2×c^6+c^8)*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8+2×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2-6×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4+2×a^2×c^6-4×b^2×c^6+c^8)+(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^8+2×a^6×b^2-6×a^4×b^4+2×a^2×b^6+b^8-4×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4-4×a^2×c^6-4×b^2×c^6+c^8)*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2+2×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4-6×b^4×c^4-4×a^2×c^6+2×b^2×c^6+c^8)+(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8+2×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2-6×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4+2×a^2×c^6-4×b^2×c^6+c^8)*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2+2×b^6×c^2+6×a^4×c^4+a^2×b^2×c^4-6×b^4×c^4-4×a^2×c^6+2×b^2×c^6+c^8)) in
        cPointhb h_x_5670.
Definition X_5671 :=
        let h_x_5671 a b c := (a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^6-a^4×b^2-a^2×b^4+b^6-3×a^4×c^2+a^2×b^2×c^2-3×b^4×c^2+3×a^2×c^4+3×b^2×c^4-c^6)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-a^4×c^2+a^2×b^2×c^2+3×b^4×c^2-a^2×c^4-3×b^2×c^4+c^6)*((2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^4-a^2×b^2-2×a^2×c^2-b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)*(a^6-a^4×b^2-a^2×b^4+b^6-3×a^4×c^2+a^2×b^2×c^2-3×b^4×c^2+3×a^2×c^4+3×b^2×c^4-c^6)+(a^4-2×a^2×b^2+b^4-a^2×c^2-b^2×c^2)*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-3×a^4×c^2-a^2×b^2×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-a^4×c^2+a^2×b^2×c^2+3×b^4×c^2-a^2×c^4-3×b^2×c^4+c^6)+(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^6-a^4×b^2-a^2×b^4+b^6-3×a^4×c^2+a^2×b^2×c^2-3×b^4×c^2+3×a^2×c^4+3×b^2×c^4-c^6)*(a^6-3×a^4×b^2+3×a^2×b^4-b^6-a^4×c^2+a^2×b^2×c^2+3×b^4×c^2-a^2×c^4-3×b^2×c^4+c^6)) in
        cPointhb h_x_5671.
Definition X_5672 :=
        let h_x_5672 a b c := a*( sqrt(3)*(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a×(b+c)^2)+2*(-a+b+c)*(SS a b c))*(c*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(- sqrt(3)*(a^3-a×(b-c)^2+a^2*(-b+c)+(b-c)*(b+c)^2)+2*(a+b-c)*(SS a b c))+b*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*( sqrt(3)*(-a^3+a×(b-c)^2+a^2*(-b+c)+(b-c)*(b+c)^2)+2*(a-b+c)*(SS a b c))+a*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*( sqrt(3)*(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a×(b+c)^2)+2*(-a+b+c)*(SS a b c))) in
        cPointhb h_x_5672.
Definition X_5673 :=
        let h_x_5673 a b c := a*(sqrt(3)*(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a×(b+c)^2)-2*(-a+b+c)*(SS a b c))*(c*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-sqrt(3)*(a^3-a×(b-c)^2+a^2*(-b+c)+(b-c)*(b+c)^2)-2*(a+b-c)*(SS a b c))+b*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)*(-a^3+a×(b-c)^2+a^2*(-b+c)+(b-c)*(b+c)^2)-2*(a-b+c)*(SS a b c))+a*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)*(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a×(b+c)^2)-2*(-a+b+c)*(SS a b c))) in
        cPointhb h_x_5673.
Definition X_5674 :=
        let h_x_5674 a b c := a^2*(sqrt(3)×b^2+2*(SS a b c))*(sqrt(3)×c^2+2*(SS a b c))*(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)+2*(-a^2+b^2+c^2)*(SS a b c))*(c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(sqrt(3)×a^2+2*(SS a b c))*(sqrt(3)×b^2+2*(SS a b c))*(-sqrt(3)*(a^2-b^2+c^2)*(-a^2+b^2+c^2)+2*(a^2+b^2-c^2)*(SS a b c))+b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×a^2+2*(SS a b c))*(sqrt(3)×c^2+2*(SS a b c))*(-sqrt(3)*(a^2+b^2-c^2)*(-a^2+b^2+c^2)+2*(a^2-b^2+c^2)*(SS a b c))+a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×b^2+2*(SS a b c))*(sqrt(3)×c^2+2*(SS a b c))*(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)+2*(-a^2+b^2+c^2)*(SS a b c))) in
        cPointhb h_x_5674.
Definition X_5675 :=
        let h_x_5675 a b c := a^2*(sqrt(3)×b^2-2*(SS a b c))*(sqrt(3)×c^2-2*(SS a b c))*(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(SS a b c))*(c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(sqrt(3)×a^2-2*(SS a b c))*(sqrt(3)×b^2-2*(SS a b c))*(-sqrt(3)*(a^2-b^2+c^2)*(-a^2+b^2+c^2)-2*(a^2+b^2-c^2)*(SS a b c))+b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×a^2-2*(SS a b c))*(sqrt(3)×c^2-2*(SS a b c))*(-sqrt(3)*(a^2+b^2-c^2)*(-a^2+b^2+c^2)-2*(a^2-b^2+c^2)*(SS a b c))+a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×b^2-2*(SS a b c))*(sqrt(3)×c^2-2*(SS a b c))*(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(SS a b c))) in
        cPointhb h_x_5675.
Definition X_5676 :=
        let h_x_5676 a b c := (((a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/((a^4-2×b^4+b^2×c^2+c^4+a^2*(b^2-2×c^2))*(a^4+b^4+b^2×c^2-2×c^4+a^2*(-2×b^2+c^2))*(a^18-6×a^16*(b^2+c^2)+a^14*(15×b^4+8×b^2×c^2+15×c^4)-(b^2-c^2)^6*(b^6+8×b^4×c^2+8×b^2×c^4+c^6)-a^12*(21×b^6+5×b^4×c^2+5×b^2×c^4+21×c^6)+a^2×(b^2-c^2)^4*(6×b^8+8×b^6×c^2-19×b^4×c^4+8×b^2×c^6+6×c^8)+3×a^10*(7×b^8+12×b^6×c^2-27×b^4×c^4+12×b^2×c^6+7×c^8)+a^6×(b^2-c^2)^2*(21×b^8+22×b^6×c^2+120×b^4×c^4+22×b^2×c^6+21×c^8)-3×a^4×(b^2-c^2)^2*(5×b^10-7×b^8×c^2+14×b^6×c^4+14×b^4×c^6-7×b^2×c^8+5×c^10)-a^8*(21×b^10+46×b^8×c^2-63×b^6×c^4-63×b^4×c^6+46×b^2×c^8+21×c^10)))-((-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4))/((a^4-2×b^4+b^2×c^2+c^4+a^2*(b^2-2×c^2))*(-2×a^4+(b^2-c^2)^2+a^2*(b^2+c^2))*(a^18+2×a^16*(b^2-3×c^2)+(b^2-c^2)^7*(b^4+b^2×c^2+c^4)+a^14*(-25×b^4+16×b^2×c^2+15×c^4)+a^12*(53×b^6+15×b^4×c^2-51×b^2×c^4-21×c^6)-a^4×(b^2-c^2)^3*(25×b^8+60×b^6×c^2+6×b^4×c^4-40×b^2×c^6-15×c^8)+a^2×(b^2-c^2)^4*(2×b^8+24×b^6×c^2+33×b^4×c^4+16×b^2×c^6+6×c^8)+a^10*(-31×b^8-108×b^6×c^2+99×b^4×c^4+20×b^2×c^6+21×c^8)-a^8*(31×b^10-166×b^8×c^2+63×b^6×c^4+97×b^4×c^6-46×b^2×c^8+21×c^10)+a^6*(53×b^12-108×b^10×c^2-63×b^8×c^4+196×b^6×c^6-63×b^4×c^8-36×b^2×c^10+21×c^12)))-((2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/((a^4+b^4+b^2×c^2-2×c^4+a^2*(-2×b^2+c^2))*(-2×a^4+(b^2-c^2)^2+a^2*(b^2+c^2))*(a^18+a^16*(-6×b^2+2×c^2)+a^14*(15×b^4+16×b^2×c^2-25×c^4)-(b^2-c^2)^7*(b^4+b^2×c^2+c^4)+a^12*(-21×b^6-51×b^4×c^2+15×b^2×c^4+53×c^6)+a^10*(21×b^8+20×b^6×c^2+99×b^4×c^4-108×b^2×c^6-31×c^8)-a^4×(b^2-c^2)^3*(15×b^8+40×b^6×c^2-6×b^4×c^4-60×b^2×c^6-25×c^8)+a^2×(b^2-c^2)^4*(6×b^8+16×b^6×c^2+33×b^4×c^4+24×b^2×c^6+2×c^8)-a^8*(21×b^10-46×b^8×c^2+97×b^6×c^4+63×b^4×c^6-166×b^2×c^8+31×c^10)+a^6*(21×b^12-36×b^10×c^2-63×b^8×c^4+196×b^6×c^6-63×b^4×c^8-108×b^2×c^10+53×c^12))))/((a^4-2×b^4+b^2×c^2+c^4+a^2*(b^2-2×c^2))*(a^4+b^4+b^2×c^2-2×c^4+a^2*(-2×b^2+c^2))*(a^18-6×a^16*(b^2+c^2)+a^14*(15×b^4+8×b^2×c^2+15×c^4)-(b^2-c^2)^6*(b^6+8×b^4×c^2+8×b^2×c^4+c^6)-a^12*(21×b^6+5×b^4×c^2+5×b^2×c^4+21×c^6)+a^2×(b^2-c^2)^4*(6×b^8+8×b^6×c^2-19×b^4×c^4+8×b^2×c^6+6×c^8)+3×a^10*(7×b^8+12×b^6×c^2-27×b^4×c^4+12×b^2×c^6+7×c^8)+a^6×(b^2-c^2)^2*(21×b^8+22×b^6×c^2+120×b^4×c^4+22×b^2×c^6+21×c^8)-3×a^4×(b^2-c^2)^2*(5×b^10-7×b^8×c^2+14×b^6×c^4+14×b^4×c^6-7×b^2×c^8+5×c^10)-a^8*(21×b^10+46×b^8×c^2-63×b^6×c^4-63×b^4×c^6+46×b^2×c^8+21×c^10))) in
        cPointhb h_x_5676.
Definition X_5677 :=
        let h_x_5677 a b c := (a*(-((c*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4))/(a^3+a^2*(-b+c)+(b-c)*(b+c)^2-a*(b^2-b×c+c^2)))+(b*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/(-a^3+a^2*(-b+c)+(b-c)*(b+c)^2+a*(b^2-b×c+c^2))+(a*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a*(b^2+b×c+c^2))))/(a^3+a^2*(b+c)-(b-c)^2*(b+c)-a*(b^2+b×c+c^2)) in
        cPointhb h_x_5677.
Definition X_5678 :=
        let h_x_5678 a b c := (a^2*((a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/((a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(2×a^2+sqrt(3)*(SS a b c)))-(b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/(a^4-b^4-2×a^2×c^2+c^4+2*(a^2-b^2+c^2)*(2×b^2+sqrt(3)*(SS a b c)))-(c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4))/(a^4-2×a^2×b^2+b^4-c^4+2*(a^2+b^2-c^2)*(2×c^2+sqrt(3)*(SS a b c)))))/((a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(2×a^2+sqrt(3)*(SS a b c))) in
        cPointhb h_x_5678.
Definition X_5679 :=
        let h_x_5679 a b c := (a^2*((a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/((a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(2×a^2-sqrt(3)*(SS a b c)))-(b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/(a^4-b^4-2×a^2×c^2+c^4+2*(a^2-b^2+c^2)*(2×b^2-sqrt(3)*(SS a b c)))-(c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4))/(a^4-2×a^2×b^2+b^4-c^4+2*(a^2+b^2-c^2)*(2×c^2-sqrt(3)*(SS a b c)))))/((a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(2×a^2-sqrt(3)*(SS a b c))) in
        cPointhb h_x_5679.
Definition X_5680 :=
        let h_x_5680 a b c := (a*((c*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4))/(a^6+a^5*(b-c)-a^2×(b^2-c^2)^2-a^4*(b^2-b×c+c^2)+(b^2-c^2)^2*(b^2-b×c+c^2)-2×a^3*(b^3-c^3)+a*(b^5+b^4×c-b×c^4-c^5))+(a*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/(a^6-a^5*(b+c)-a^2×(b^2-c^2)^2-a^4*(b^2+b×c+c^2)+(b^2-c^2)^2*(b^2+b×c+c^2)+2×a^3*(b^3+c^3)-a*(b^5-b^4×c-b×c^4+c^5))+(b*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4))/(a^6+a^5*(-b+c)-a^2×(b^2-c^2)^2-a^4*(b^2-b×c+c^2)+(b^2-c^2)^2*(b^2-b×c+c^2)+2×a^3*(b^3-c^3)+a*(-b^5-b^4×c+b×c^4+c^5))))/(a^6-a^5*(b+c)-a^2×(b^2-c^2)^2-a^4*(b^2+b×c+c^2)+(b^2-c^2)^2*(b^2+b×c+c^2)+2×a^3*(b^3+c^3)-a*(b^5-b^4×c-b×c^4+c^5)) in
        cPointhb h_x_5680.
Definition X_5681 :=
        let h_x_5681 a b c := ((sqrt(3)×a^2+2*(SS a b c))*(((-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(sqrt(3)×c^2+2*(SS a b c)))/(-sqrt(3)*(a^2-b^2+c^2)*(-a^2+b^2+c^2)+2*(a^2+b^2-c^2)*(SS a b c))+((2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×b^2+2*(SS a b c)))/(-sqrt(3)*(a^2+b^2-c^2)*(-a^2+b^2+c^2)+2*(a^2-b^2+c^2)*(SS a b c))+((a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×a^2+2*(SS a b c)))/(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)+2*(-a^2+b^2+c^2)*(SS a b c))))/(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)+2*(-a^2+b^2+c^2)*(SS a b c)) in
        cPointhb h_x_5681.
Definition X_5682 :=
        let h_x_5682 a b c := ((sqrt(3)×a^2-2*(SS a b c))*(((-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(sqrt(3)×c^2-2*(SS a b c)))/(-sqrt(3)*(a^2-b^2+c^2)*(-a^2+b^2+c^2)-2*(a^2+b^2-c^2)*(SS a b c))+((2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×b^2-2*(SS a b c)))/(-sqrt(3)*(a^2+b^2-c^2)*(-a^2+b^2+c^2)-2*(a^2-b^2+c^2)*(SS a b c))+((a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(sqrt(3)×a^2-2*(SS a b c)))/(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(SS a b c))))/(-sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)-2*(-a^2+b^2+c^2)*(SS a b c)) in
        cPointhb h_x_5682.
Definition X_5683 :=
        let h_x_5683 a b c := (a^2*(a^8-4×a^6*(b^2+c^2)+(b^2-c^2)^2*(b^4+c^4)+a^4*(6×b^4+5×b^2×c^2+6×c^4)+a^2*(-4×b^6+b^4×c^2+b^2×c^4-4×c^6))*((a^2*(a^4+a^2×b^2-2×b^4-2×a^2×c^2+b^2×c^2+c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^8-4×a^6*(b^2+c^2)+(b^2-c^2)^2*(b^4+c^4)+a^4*(6×b^4+5×b^2×c^2+6×c^4)+a^2*(-4×b^6+b^4×c^2+b^2×c^4-4×c^6)))/(a^12-5×a^10*(b^2+c^2)-a^4×(b^2-c^2)^2*(b^4+c^4)-(b^2-c^2)^4*(b^4+b^2×c^2+c^4)+a^8*(9×b^4+11×b^2×c^2+9×c^4)-6×a^6*(b^6+b^4×c^2+b^2×c^4+c^6)+a^2×(b^2-c^2)^2*(3×b^6+b^4×c^2+b^2×c^4+3×c^6))-(c^2*(-a^4-a^2×b^2+2×b^4+2×a^2×c^2-b^2×c^2-c^4)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(a^8+(b^2-c^2)^4-2×a^6*(b^2+2×c^2)+a^4*(2×b^4+b^2×c^2+6×c^4)+a^2*(-2×b^6+b^4×c^2+5×b^2×c^4-4×c^6)))/(a^12-3×a^10*(b^2+c^2)+(b^2-c^2)^4*(b^4+b^2×c^2-c^4)+a^8*(3×b^4+5×b^2×c^2+c^4)-a^2×(b^2-c^2)^3*(3×b^4+4×b^2×c^2+5×c^4)-2×a^6*(b^6+b^4×c^2+b^2×c^4-3×c^6)+a^4*(3×b^8-2×b^6×c^2+2×b^4×c^4+6×b^2×c^6-9×c^8))+(b^2*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)*(-a^4+2×a^2×b^2-b^4-a^2×c^2-b^2×c^2+2×c^4)*(a^8+(b^2-c^2)^4-2×a^6*(2×b^2+c^2)+a^4*(6×b^4+b^2×c^2+2×c^4)+a^2*(-4×b^6+5×b^4×c^2+b^2×c^4-2×c^6)))/(-a^12+3×a^10*(b^2+c^2)+(b^2-c^2)^4*(b^4-b^2×c^2-c^4)-a^2×(b^2-c^2)^3*(5×b^4+4×b^2×c^2+3×c^4)-a^8*(b^4+5×b^2×c^2+3×c^4)+2×a^6*(-3×b^6+b^4×c^2+b^2×c^4+c^6)+a^4*(9×b^8-6×b^6×c^2-2×b^4×c^4+2×b^2×c^6-3×c^8))))/(a^12-5×a^10*(b^2+c^2)-a^4×(b^2-c^2)^2*(b^4+c^4)-(b^2-c^2)^4*(b^4+b^2×c^2+c^4)+a^8*(9×b^4+11×b^2×c^2+9×c^4)-6×a^6*(b^6+b^4×c^2+b^2×c^4+c^6)+a^2×(b^2-c^2)^2*(3×b^6+b^4×c^2+b^2×c^4+3×c^6)) in
        cPointhb h_x_5683.
Definition X_5684 :=
        let h_x_5684 a b c := (a^8-2×a^6×b^2+2×a^4×b^4-2×a^2×b^6+b^8-4×a^6×c^2+a^4×b^2×c^2+a^2×b^4×c^2-4×b^6×c^2+6×a^4×c^4+5×a^2×b^2×c^4+6×b^4×c^4-4×a^2×c^6-4×b^2×c^6+c^8)*(a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-2×a^6×c^2+a^4×b^2×c^2+5×a^2×b^4×c^2-4×b^6×c^2+2×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4-2×a^2×c^6-4×b^2×c^6+c^8)*(3×a^12-14×a^10×b^2+25×a^8×b^4-20×a^6×b^6+5×a^4×b^8+2×a^2×b^10-b^12-14×a^10×c^2+36×a^8×b^2×c^2-30×a^6×b^4×c^2+14×a^4×b^6×c^2-12×a^2×b^8×c^2+6×b^10×c^2+25×a^8×c^4-30×a^6×b^2×c^4+a^4×b^4×c^4+10×a^2×b^6×c^4-15×b^8×c^4-20×a^6×c^6+14×a^4×b^2×c^6+10×a^2×b^4×c^6+20×b^6×c^6+5×a^4×c^8-12×a^2×b^2×c^8-15×b^4×c^8+2×a^2×c^10+6×b^2×c^10-c^12) in
        cPointhb h_x_5684.
Definition X_5685 :=
        let h_x_5685 a b c := a*(a^3-a^2×b-a×b^2+b^3+a^2×c-a×b×c+b^2×c-a×c^2-b×c^2-c^3)*(a^3+a^2×b-a×b^2-b^3-a^2×c-a×b×c-b^2×c-a×c^2+b×c^2+c^3)*(a^9-a^8×b-4×a^7×b^2+4×a^6×b^3+6×a^5×b^4-6×a^4×b^5-4×a^3×b^6+4×a^2×b^7+a×b^8-b^9-a^8×c-3×a^7×b×c-2×a^6×b^2×c+3×a^5×b^3×c+6×a^4×b^4×c+3×a^3×b^5×c-2×a^2×b^6×c-3×a×b^7×c-b^8×c-4×a^7×c^2-2×a^6×b×c^2+a^5×b^2×c^2-a^4×b^3×c^2+a^3×b^4×c^2-a^2×b^5×c^2+2×a×b^6×c^2+4×b^7×c^2+4×a^6×c^3+3×a^5×b×c^3-a^4×b^2×c^3-9×a^3×b^3×c^3-a^2×b^4×c^3+3×a×b^5×c^3+4×b^6×c^3+6×a^5×c^4+6×a^4×b×c^4+a^3×b^2×c^4-a^2×b^3×c^4-6×a×b^4×c^4-6×b^5×c^4-6×a^4×c^5+3×a^3×b×c^5-a^2×b^2×c^5+3×a×b^3×c^5-6×b^4×c^5-4×a^3×c^6-2×a^2×b×c^6+2×a×b^2×c^6+4×b^3×c^6+4×a^2×c^7-3×a×b×c^7+4×b^2×c^7+a×c^8-b×c^8-c^9) in
        cPointhb h_x_5685.
Definition X_5686 :=
        let h_x_5686 a b c := (a-b-c)*(a^2+4×a×b-b^2+4×a×c+2×b×c-c^2) in
        cPointhb h_x_5686.
Definition X_5687 :=
        let h_x_5687 a b c := a*(a^3-a×b^2-2×a×b×c+2×b^2×c-a×c^2+2×b×c^2) in
        cPointhb h_x_5687.
Definition X_5688 :=
        let h_x_5688 a b c := a^3-b^3-b^2×c-b×c^2-c^3-b*(SS a b c)-c*(SS a b c) in
        cPointhb h_x_5688.
Definition X_5689 :=
        let h_x_5689 a b c := a^3-b^3-b^2×c-b×c^2-c^3+b*(SS a b c)+c*(SS a b c) in
        cPointhb h_x_5689.
Definition X_5690 :=
        let h_x_5690 a b c := 2×a^3×b-a^2×b^2-2×a×b^3+b^4+2×a^3×c-4×a^2×b×c+2×a×b^2×c-a^2×c^2+2×a×b×c^2-2×b^2×c^2-2×a×c^3+c^4 in
        cPointhb h_x_5690.
Definition X_5691 :=
        let h_x_5691 a b c := 3×a^4-a^3×b-a^2×b^2+a×b^3-2×b^4-a^3×c+2×a^2×b×c-a×b^2×c-a^2×c^2-a×b×c^2+4×b^2×c^2+a×c^3-2×c^4 in
        cPointhb h_x_5691.
Definition X_5692 :=
        let h_x_5692 a b c := a*(a^2×b-b^3+a^2×c-a×b×c-b^2×c-b×c^2-c^3) in
        cPointhb h_x_5692.
Definition X_5693 :=
        let h_x_5693 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c-a^4×b×c+a^3×b^2×c+a^2×b^3×c-2×a×b^4×c-a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2+b^4×c^2-2×a^3×c^3+a^2×b×c^3+a×b^2×c^3+2×a^2×c^4-2×a×b×c^4+b^2×c^4+a×c^5-c^6) in
        cPointhb h_x_5693.
Definition X_5694 :=
        let h_x_5694 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c-2×a^4×b×c+a^3×b^2×c+2×a^2×b^3×c-2×a×b^4×c-a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2+b^4×c^2-2×a^3×c^3+2×a^2×b×c^3+a×b^2×c^3+2×a^2×c^4-2×a×b×c^4+b^2×c^4+a×c^5-c^6) in
        cPointhb h_x_5694.
Definition X_5695 :=
        let h_x_5695 a b c := a^3-a^2×b-a^2×c+2×b^2×c+2×b×c^2 in
        cPointhb h_x_5695.
Definition X_5696 :=
        let h_x_5696 a b c := a*(a^4×b-2×a^3×b^2+2×a×b^4-b^5+a^4×c+a^3×b×c-2×a^2×b^2×c+a×b^3×c-b^4×c-2×a^3×c^2-2×a^2×b×c^2+2×a×b^2×c^2+2×b^3×c^2+a×b×c^3+2×b^2×c^3+2×a×c^4-b×c^4-c^5) in
        cPointhb h_x_5696.
Definition X_5697 :=
        let h_x_5697 a b c := a*(a^2×b-b^3+a^2×c-3×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_5697.
Definition X_5698 :=
        let h_x_5698 a b c := -3×a^3+a^2×b+a×b^2+b^3+a^2×c+2×a×b×c-b^2×c+a×c^2-b×c^2+c^3 in
        cPointhb h_x_5698.
Definition X_5699 :=
        let h_x_5699 a b c := 3×a^2*(a+b+c)*(a^2-b^2-c^2)-2×sqrt(3)*(a^3-a^2×b-a^2×c+2×b^2×c+2×b×c^2)*(SS a b c) in
        cPointhb h_x_5699.
Definition X_5700 :=
        let h_x_5700 a b c := 3×a^2*(a+b+c)*(a^2-b^2-c^2)+2×sqrt(3)*(a^3-a^2×b-a^2×c+2×b^2×c+2×b×c^2)*(SS a b c) in
        cPointhb h_x_5700.
Definition X_5701 :=
        let h_x_5701 a b c := (-a^2×b+a×b^2)*(-a^2×b+a×b^2+b^2×c-b×c^2)-(a^2×c-a×c^2)*(-a^2×c-b^2×c+a×c^2+b×c^2) in
        cPointhb h_x_5701.
Definition X_5702 :=
        let h_x_5702 a b c := (a^2+b^2-c^2)*(a^2-b^2+c^2)*(11×a^4-10×a^2×b^2-b^4-10×a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_5702.
Definition X_5703 :=
        let h_x_5703 a b c := 3×a^4 - 2×a^3×b - 4×a^2×b^2 + 2×a×b^3 + b^4 - 2×a^3×c - 4×a^2×b×c - 2×a×b^2×c - 4×a^2×c^2 - 2×a×b×c^2 - 2×b^2×c^2 + 2×a×c^3 + c^4 in
        cPointhb h_x_5703.
Definition X_5704 :=
        let h_x_5704 a b c := a^4 + 2×a^3×b - 4×a^2×b^2 - 2×a×b^3 + 3×b^4 + 2×a^3×c + 4×a^2×b×c + 2×a×b^2×c - 4×a^2×c^2 + 2×a×b×c^2 - 6×b^2×c^2 - 2×a×c^3 + 3×c^4 in
        cPointhb h_x_5704.
Definition X_5705 :=
        let h_x_5705 a b c := a^4 + a^3×b - 3×a^2×b^2 - a×b^3 + 2×b^4 + a^3×c - 2×a^2×b×c - 3×a×b^2×c - 3×a^2×c^2 - 3×a×b×c^2 - 4×b^2×c^2 - a×c^3 + 2×c^4 in
        cPointhb h_x_5705.
Definition X_5706 :=
        let h_x_5706 a b c := a*(a^6 + a^5×b - 2×a^4×b^2 - 2×a^3×b^3 + a^2×b^4 + a×b^5 + a^5×c - 2×a^4×b×c - 2×a^3×b^2×c + a×b^4×c + 2×b^5×c - 2×a^4×c^2 - 2×a^3×b×c^2 - 2×a^2×b^2×c^2 - 2×a×b^3×c^2 - 2×a^3×c^3 - 2×a×b^2×c^3 - 4×b^3×c^3 + a^2×c^4 + a×b×c^4 + a×c^5 + 2×b×c^5) in
        cPointhb h_x_5706.
Definition X_5707 :=
        let h_x_5707 a b c := a*(a^6 + a^5×b - 2×a^4×b^2 - 2×a^3×b^3 + a^2×b^4 + a×b^5 + a^5×c - 2×a^3×b^2×c - 2×a^2×b^3×c + a×b^4×c + 2×b^5×c - 2×a^4×c^2 - 2×a^3×b×c^2 - 2×a^2×b^2×c^2 - 2×a×b^3×c^2 - 2×a^3×c^3 - 2×a^2×b×c^3 - 2×a×b^2×c^3 - 4×b^3×c^3 + a^2×c^4 + a×b×c^4 + a×c^5 + 2×b×c^5) in
        cPointhb h_x_5707.
Definition X_5708 :=
        let h_x_5708 a b c := a*(a^3 + 2×a^2×b - a×b^2 - 2×b^3 + 2×a^2×c + 4×a×b×c + 2×b^2×c - a×c^2 + 2×b×c^2 - 2×c^3) in
        cPointhb h_x_5708.
Definition X_5709 :=
        let h_x_5709 a b c := a*(a^6 - 3×a^4×b^2 + 3×a^2×b^4 - b^6 - 2×a^4×b×c + 2×b^5×c - 3×a^4×c^2 + 2×a^2×b^2×c^2 + b^4×c^2 - 4×b^3×c^3 + 3×a^2×c^4 + b^2×c^4 + 2×b×c^5 - c^6) in
        cPointhb h_x_5709.
Definition X_5710 :=
        let h_x_5710 a b c := a*(a^3 + 2×a^2×b + a×b^2 + 2×a^2×c + 2×b^2×c + a×c^2 + 2×b×c^2) in
        cPointhb h_x_5710.
Definition X_5711 :=
        let h_x_5711 a b c := a*(a^3 + 2×a^2×b + a×b^2 + 2×a^2×c + 2×a×b×c + 2×b^2×c + a×c^2 + 2×b×c^2) in
        cPointhb h_x_5711.
Definition X_5712 :=
        let h_x_5712 a b c := a^3 + 3×a^2×b + a×b^2 - b^3 + 3×a^2×c + 2×a×b×c + b^2×c + a×c^2 + b×c^2 - c^3 in
        cPointhb h_x_5712.
Definition X_5713 :=
        let h_x_5713 a b c := a^7 + a^6×b - a^5×b^2 - 3×a^4×b^3 - a^3×b^4 + 3×a^2×b^5 + a×b^6 - b^7 + a^6×c - 3×a^4×b^2×c - 2×a^3×b^3×c + a^2×b^4×c + 2×a×b^5×c + b^6×c - a^5×c^2 - 3×a^4×b×c^2 - 2×a^3×b^2×c^2 - 4×a^2×b^3×c^2 - a×b^4×c^2 + 3×b^5×c^2 - 3×a^4×c^3 - 2×a^3×b×c^3 - 4×a^2×b^2×c^3 - 4×a×b^3×c^3 - 3×b^4×c^3 - a^3×c^4 + a^2×b×c^4 - a×b^2×c^4 - 3×b^3×c^4 + 3×a^2×c^5 + 2×a×b×c^5 + 3×b^2×c^5 + a×c^6 + b×c^6 - c^7 in
        cPointhb h_x_5713.
Definition X_5714 :=
        let h_x_5714 a b c := a^4 + 2×a^3×b + 2×a^2×b^2 - 2×a×b^3 - 3×b^4 + 2×a^3×c + 4×a^2×b×c + 2×a×b^2×c + 2×a^2×c^2 + 2×a×b×c^2 + 6×b^2×c^2 - 2×a×c^3 - 3×c^4 in
        cPointhb h_x_5714.
Definition X_5715 :=
        let h_x_5715 a b c := -a^7 + a^5×b^2 + 2×a^4×b^3 + a^3×b^4 - 4×a^2×b^5 - a×b^6 + 2×b^7 + 2×a^5×b×c + 2×a^4×b^2×c - 2×a×b^5×c - 2×b^6×c + a^5×c^2 + 2×a^4×b×c^2 - 2×a^3×b^2×c^2 + 4×a^2×b^3×c^2 + a×b^4×c^2 - 6×b^5×c^2 + 2×a^4×c^3 + 4×a^2×b^2×c^3 + 4×a×b^3×c^3 + 6×b^4×c^3 + a^3×c^4 + a×b^2×c^4 + 6×b^3×c^4 - 4×a^2×c^5 - 2×a×b×c^5 - 6×b^2×c^5 - a×c^6 - 2×b×c^6 + 2×c^7 in
        cPointhb h_x_5715.
Definition X_5716 :=
        let h_x_5716 a b c := -3×a^4 - 2×a^3×b - 2×a^2×b^2 - 2×a×b^3 + b^4 - 2×a^3×c - 4×a^2×b×c - 2×a×b^2×c - 2×a^2×c^2 - 2×a×b×c^2 - 2×b^2×c^2 - 2×a×c^3 + c^4 in
        cPointhb h_x_5716.
Definition X_5717 :=
        let h_x_5717 a b c := -2×a^4 - 3×a^3×b - 3×a^2×b^2 - a×b^3 + b^4 - 3×a^3×c - 6×a^2×b×c - 3×a×b^2×c - 3×a^2×c^2 - 3×a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5717.
Definition X_5718 :=
        let h_x_5718 a b c := 2×a^2×b + a×b^2 - b^3 + 2×a^2×c + b^2×c + a×c^2 + b×c^2 - c^3 in
        cPointhb h_x_5718.
Definition X_5719 :=
        let h_x_5719 a b c := 2×a^4 - 2×a^3×b - 3×a^2×b^2 + 2×a×b^3 + b^4 - 2×a^3×c - 4×a^2×b×c - 2×a×b^2×c - 3×a^2×c^2 - 2×a×b×c^2 - 2×b^2×c^2 + 2×a×c^3 + c^4 in
        cPointhb h_x_5719.
Definition X_5720 :=
        let h_x_5720 a b c := a*(a^6 - 2×a^5×b - a^4×b^2 + 4×a^3×b^3 - a^2×b^4 - 2×a×b^5 + b^6 - 2×a^5×c + 2×a^4×b×c - 4×a^2×b^3×c + 2×a×b^4×c + 2×b^5×c - a^4×c^2 + 2×a^2×b^2×c^2 - b^4×c^2 + 4×a^3×c^3 - 4×a^2×b×c^3 - 4×b^3×c^3 - a^2×c^4 + 2×a×b×c^4 - b^2×c^4 - 2×a×c^5 + 2×b×c^5 + c^6) in
        cPointhb h_x_5720.
Definition X_5721 :=
        let h_x_5721 a b c := -2×a^6×b + a^5×b^2 + 3×a^4×b^3 - 2×a^3×b^4 + a×b^6 - b^7 - 2×a^6×c + a^4×b^2×c + b^6×c + a^5×c^2 + a^4×b×c^2 + 4×a^3×b^2×c^2 - a×b^4×c^2 + 3×b^5×c^2 + 3×a^4×c^3 - 3×b^4×c^3 - 2×a^3×c^4 - a×b^2×c^4 - 3×b^3×c^4 + 3×b^2×c^5 + a×c^6 + b×c^6 - c^7 in
        cPointhb h_x_5721.
Definition X_5722 :=
        let h_x_5722 a b c := -a^4 + a^3×b - a×b^3 + b^4 + a^3×c + 2×a^2×b×c + a×b^2×c + a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5722.
Definition X_5723 :=
        let h_x_5723 a b c := (a + b - c)*(a - b + c)*(2×a^3 - 2×a^2×b + a×b^2 - b^3 - 2×a^2×c + b^2×c + a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5723.
Definition X_5724 :=
        let h_x_5724 a b c := -2×a^4 - a^2×b^2 - 2×a×b^3 + b^4 - 4×a^2×b×c - a^2×c^2 - 2×b^2×c^2 - 2×a×c^3 + c^4 in
        cPointhb h_x_5724.
Definition X_5725 :=
        let h_x_5725 a b c := a^4 + a^3×b + 2×a^2×b^2 + a×b^3 - b^4 + a^3×c + 4×a^2×b×c + a×b^2×c + 2×a^2×c^2 + a×b×c^2 + 2×b^2×c^2 + a×c^3 - c^4 in
        cPointhb h_x_5725.
Definition X_5726 :=
        let h_x_5726 a b c := (a + b - c)*(a - b + c)*(a^2 - a×b + 4×b^2 - a×c + 8×b×c + 4×c^2) in
        cPointhb h_x_5726.
Definition X_5727 :=
        let h_x_5727 a b c := (a - b - c)*(3×a^3 - a×b^2 + 2×b^3 + 2×a×b×c - 2×b^2×c - a×c^2 - 2×b×c^2 + 2×c^3) in
        cPointhb h_x_5727.
Definition X_5728 :=
        let h_x_5728 a b c := a*(a^4×b - 2×a^3×b^2 + 2×a×b^4 - b^5 + a^4×c - 2×a^2×b^2×c + b^4×c - 2×a^3×c^2 - 2×a^2×b×c^2 - 4×a×b^2×c^2 + 2×a×c^4 + b×c^4 - c^5) in
        cPointhb h_x_5728.
Definition X_5729 :=
        let h_x_5729 a b c := a*(a^5 - 4×a^3×b^2 + 2×a^2×b^3 + 3×a×b^4 - 2×b^5 - 4×a^3×c^2 - 6×a×b^2×c^2 + 2×b^3×c^2 + 2×a^2×c^3 + 2×b^2×c^3 + 3×a×c^4 - 2×c^5) in
        cPointhb h_x_5729.
Definition X_5730 :=
        let h_x_5730 a b c := a*(a^3 - 2×a^2×b - a×b^2 + 2×b^3 - 2×a^2×c + 2×a×b×c - a×c^2 + 2×c^3) in
        cPointhb h_x_5730.
Definition X_5731 :=
        let h_x_5731 a b c := -5×a^4 + 2×a^3×b + 4×a^2×b^2 - 2×a×b^3 + b^4 + 2×a^3×c - 4×a^2×b×c + 2×a×b^2×c + 4×a^2×c^2 + 2×a×b×c^2 - 2×b^2×c^2 - 2×a×c^3 + c^4 in
        cPointhb h_x_5731.
Definition X_5732 :=
        let h_x_5732 a b c := a*(a^5 - 3×a^4×b + 2×a^3×b^2 + 2×a^2×b^3 - 3×a×b^4 + b^5 - 3×a^4×c - 4×a^3×b×c + 2×a^2×b^2×c + 4×a×b^3×c + b^4×c + 2×a^3×c^2 + 2×a^2×b×c^2 - 2×a×b^2×c^2 - 2×b^3×c^2 + 2×a^2×c^3 + 4×a×b×c^3 - 2×b^2×c^3 - 3×a×c^4 + b×c^4 + c^5) in
        cPointhb h_x_5732.
Definition X_5733 :=
        let h_x_5733 a b c := -3×a^6 + 5×a^4×b^2 + 2×a^3×b^3 - 3×a^2×b^4 - 2×a×b^5 + b^6 + 2×a^3×b^2×c + 2×a^2×b^3×c - 2×a×b^4×c - 2×b^5×c + 5×a^4×c^2 + 2×a^3×b×c^2 + 2×a^2×b^2×c^2 + 4×a×b^3×c^2 - b^4×c^2 + 2×a^3×c^3 + 2×a^2×b×c^3 + 4×a×b^2×c^3 + 4×b^3×c^3 - 3×a^2×c^4 - 2×a×b×c^4 - b^2×c^4 - 2×a×c^5 - 2×b×c^5 + c^6 in
        cPointhb h_x_5733.
Definition X_5734 :=
        let h_x_5734 a b c := 3×a^4 - 6×a^3×b - 4×a^2×b^2 + 6×a×b^3 + b^4 - 6×a^3×c + 12×a^2×b×c - 6×a×b^2×c - 4×a^2×c^2 - 6×a×b×c^2 - 2×b^2×c^2 + 6×a×c^3 + c^4 in
        cPointhb h_x_5734.
Definition X_5735 :=
        let h_x_5735 a b c := 3×a^6 - 3×a^5×b - 4×a^4×b^2 + 2×a^3×b^3 + 3×a^2×b^4 + a×b^5 - 2×b^6 - 3×a^5×c + 2×a^3×b^2×c - 4×a^2×b^3×c + a×b^4×c + 4×b^5×c - 4×a^4×c^2 + 2×a^3×b×c^2 + 2×a^2×b^2×c^2 - 2×a×b^3×c^2 + 2×b^4×c^2 + 2×a^3×c^3 - 4×a^2×b×c^3 - 2×a×b^2×c^3 - 8×b^3×c^3 + 3×a^2×c^4 + a×b×c^4 + 2×b^2×c^4 + a×c^5 + 4×b×c^5 - 2×c^6 in
        cPointhb h_x_5735.
Definition X_5736 :=
        let h_x_5736 a b c := a^5 - 2×a^3×b^2 + a×b^4 - 2×a^3×b×c - 3×a^2×b^2×c + b^4×c - 2×a^3×c^2 - 3×a^2×b×c^2 - 2×a×b^2×c^2 - b^3×c^2 - b^2×c^3 + a×c^4 + b×c^4 in
        cPointhb h_x_5736.
Definition X_5737 :=
        let h_x_5737 a b c := a^3 - a^2×b - 2×a×b^2 - a^2×c - 2×a×b×c - 2×b^2×c - 2×a×c^2 - 2×b×c^2 in
        cPointhb h_x_5737.
Definition X_5738 :=
        let h_x_5738 a b c := a^5 - a^4×b - 2×a^3×b^2 + 2×a^2×b^3 + a×b^4 - b^5 - a^4×c - 4×a^3×b×c - 4×a^2×b^2×c + b^4×c - 2×a^3×c^2 - 4×a^2×b×c^2 - 2×a×b^2×c^2 + 2×a^2×c^3 + a×c^4 + b×c^4 - c^5 in
        cPointhb h_x_5738.
Definition X_5739 :=
        let h_x_5739 a b c := -a^3 - a^2×b + a×b^2 + b^3 - a^2×c + 2×a×b×c + b^2×c + a×c^2 + b×c^2 + c^3 in
        cPointhb h_x_5739.
Definition X_5740 :=
        let h_x_5740 a b c := a^4×b - 2×a^2×b^3 + b^5 + a^4×c + 2×a^3×b×c + a^2×b^2×c + a^2×b×c^2 - b^3×c^2 - 2×a^2×c^3 - b^2×c^3 + c^5 in
        cPointhb h_x_5740.
Definition X_5741 :=
        let h_x_5741 a b c := -(a^2×b) + b^3 - a^2×c + 2×a×b×c + c^3 in
        cPointhb h_x_5741.
Definition X_5742 :=
        let h_x_5742 a b c := 2×a^4×b - a^3×b^2 - 3×a^2×b^3 + a×b^4 + b^5 + 2×a^4×c - 5×a^2×b^2×c - 2×a×b^3×c + b^4×c - a^3×c^2 - 5×a^2×b×c^2 - 6×a×b^2×c^2 - 2×b^3×c^2 - 3×a^2×c^3 - 2×a×b×c^3 - 2×b^2×c^3 + a×c^4 + b×c^4 + c^5 in
        cPointhb h_x_5742.
Definition X_5743 :=
        let h_x_5743 a b c := a×b^2 + b^3 + 4×a×b×c + b^2×c + a×c^2 + b×c^2 + c^3 in
        cPointhb h_x_5743.
Definition X_5744 :=
        let h_x_5744 a b c := -3×a^3 + a^2×b + 3×a×b^2 - b^3 + a^2×c - 2×a×b×c + b^2×c + 3×a×c^2 + b×c^2 - c^3 in
        cPointhb h_x_5744.
Definition X_5745 :=
        let h_x_5745 a b c := (a - b - c)*(2×a^2 + a×b - b^2 + a×c + 2×b×c - c^2) in
        cPointhb h_x_5745.
Definition X_5746 :=
        let h_x_5746 a b c := a^5 - 3×a^4×b - 2×a^3×b^2 + 2×a^2×b^3 + a×b^4 + b^5 - 3×a^4×c - 4×a^3×b×c - 2×a^2×b^2×c + b^4×c - 2×a^3×c^2 - 2×a^2×b×c^2 - 2×a×b^2×c^2 - 2×b^3×c^2 + 2×a^2×c^3 - 2×b^2×c^3 + a×c^4 + b×c^4 + c^5 in
        cPointhb h_x_5746.
Definition X_5747 :=
        let h_x_5747 a b c := a^5 - a^4×b - 2×a^3×b^2 + a×b^4 + b^5 - a^4×c - 2×a^3×b×c - 2×a^2×b^2×c + b^4×c - 2×a^3×c^2 - 2×a^2×b×c^2 - 2×a×b^2×c^2 - 2×b^3×c^2 - 2×b^2×c^3 + a×c^4 + b×c^4 + c^5 in
        cPointhb h_x_5747.
Definition X_5748 :=
        let h_x_5748 a b c := -a^3 + 3×a^2×b + a×b^2 - 3×b^3 + 3×a^2×c - 6×a×b×c + 3×b^2×c + a×c^2 + 3×b×c^2 - 3×c^3 in
        cPointhb h_x_5748.
Definition X_5749 :=
        let h_x_5749 a b c := 3×a^2 + b^2 + 2×b×c + c^2 in
        cPointhb h_x_5749.
Definition X_5750 :=
        let h_x_5750 a b c := 2×a^2 + a×b + b^2 + a×c + 2×b×c + c^2 in
        cPointhb h_x_5750.
Definition X_5751 :=
        let h_x_5751 a b c := a^2*(a^5×b^2 - a^4×b^3 - 2×a^3×b^4 + 2×a^2×b^5 + a×b^6 - b^7 + a^5×b×c + a^4×b^2×c - 2×a^3×b^3×c - 2×a^2×b^4×c + a×b^5×c + b^6×c + a^5×c^2 + a^4×b×c^2 - 2×a^2×b^3×c^2 - a×b^4×c^2 + b^5×c^2 - a^4×c^3 - 2×a^3×b×c^3 - 2×a^2×b^2×c^3 - 2×a×b^3×c^3 - b^4×c^3 - 2×a^3×c^4 - 2×a^2×b×c^4 - a×b^2×c^4 - b^3×c^4 + 2×a^2×c^5 + a×b×c^5 + b^2×c^5 + a×c^6 + b×c^6 - c^7) in
        cPointhb h_x_5751.
Definition X_5752 :=
        let h_x_5752 a b c := a^2*(a^3×b^2 + a^2×b^3 - a×b^4 - b^5 + a^3×b×c + a^2×b^2×c - a×b^3×c - b^4×c + a^3×c^2 + a^2×b×c^2 + a^2×c^3 - a×b×c^3 - a×c^4 - b×c^4 - c^5) in
        cPointhb h_x_5752.
Definition X_5753 :=
        let h_x_5753 a b c := a^2*(a^6×b + a^5×b^2 - 4×a^4×b^3 - 2×a^3×b^4 + 5×a^2×b^5 + a×b^6 - 2×b^7 + a^6×c + 2×a^5×b×c - a^4×b^2×c - 4×a^3×b^3×c - a^2×b^4×c + 2×a×b^5×c + b^6×c + a^5×c^2 - a^4×b×c^2 - 2×a^2×b^3×c^2 - a×b^4×c^2 + 3×b^5×c^2 - 4×a^4×c^3 - 4×a^3×b×c^3 - 2×a^2×b^2×c^3 - 4×a×b^3×c^3 - 2×b^4×c^3 - 2×a^3×c^4 - a^2×b×c^4 - a×b^2×c^4 - 2×b^3×c^4 + 5×a^2×c^5 + 2×a×b×c^5 + 3×b^2×c^5 + a×c^6 + b×c^6 - 2×c^7) in
        cPointhb h_x_5753.
Definition X_5754 :=
        let h_x_5754 a b c := a^2*(a^4×b - a^3×b^2 - 3×a^2×b^3 + a×b^4 + 2×b^5 + a^4×c - 2×a^3×b×c - 2×a^2×b^2×c + 2×a×b^3×c + b^4×c - a^3×c^2 - 2×a^2×b×c^2 - 2×a×b^2×c^2 - b^3×c^2 - 3×a^2×c^3 + 2×a×b×c^3 - b^2×c^3 + a×c^4 + b×c^4 + 2×c^5) in
        cPointhb h_x_5754.
Definition X_5755 :=
        let h_x_5755 a b c := a^2*(a^5×b - a^4×b^2 - 2×a^3×b^3 + 2×a^2×b^4 + a×b^5 - b^6 + a^5×c - 2×a^4×b×c - a^3×b^2×c + a^2×b^3×c + b^5×c - a^4×c^2 - a^3×b×c^2 + a×b^3×c^2 + b^4×c^2 - 2×a^3×c^3 + a^2×b×c^3 + a×b^2×c^3 - 2×b^3×c^3 + 2×a^2×c^4 + b^2×c^4 + a×c^5 + b×c^5 - c^6) in
        cPointhb h_x_5755.
Definition X_5756 :=
        let h_x_5756 a b c := a^2*(a^3×b + 3×a^2×b^2 - a×b^3 - 3×b^4 + a^3×c + 5×a^2×b×c + 3×a×b^2×c - b^3×c + 3×a^2×c^2 + 3×a×b×c^2 - a×c^3 - b×c^3 - 3×c^4) in
        cPointhb h_x_5756.
Definition X_5757 :=
        let h_x_5757 a b c := a^9 - 2×a^8×b - 2×a^7×b^2 + 4×a^6×b^3 + 2×a^5×b^4 - 2×a^4×b^5 - 2×a^3×b^6 + a×b^8 - 2×a^8×c - 2×a^7×b×c + 3×a^6×b^2×c + 4×a^5×b^3×c + a^4×b^4×c - 2×a^3×b^5×c - 3×a^2×b^6×c + b^8×c - 2×a^7×c^2 + 3×a^6×b×c^2 + 4×a^5×b^2×c^2 + a^4×b^3×c^2 + 2×a^3×b^4×c^2 - 3×a^2×b^5×c^2 - 4×a×b^6×c^2 - b^7×c^2 + 4×a^6×c^3 + 4×a^5×b×c^3 + a^4×b^2×c^3 + 4×a^3×b^3×c^3 + 6×a^2×b^4×c^3 - 3×b^6×c^3 + 2×a^5×c^4 + a^4×b×c^4 + 2×a^3×b^2×c^4 + 6×a^2×b^3×c^4 + 6×a×b^4×c^4 + 3×b^5×c^4 - 2×a^4×c^5 - 2×a^3×b×c^5 - 3×a^2×b^2×c^5 + 3×b^4×c^5 - 2×a^3×c^6 - 3×a^2×b×c^6 - 4×a×b^2×c^6 - 3×b^3×c^6 - b^2×c^7 + a×c^8 + b×c^8 in
        cPointhb h_x_5757.
Definition X_5758 :=
        let h_x_5758 a b c := -a^7 - a^6×b + 3×a^5×b^2 + 3×a^4×b^3 - 3×a^3×b^4 - 3×a^2×b^5 + a×b^6 + b^7 - a^6×c + 6×a^5×b×c + a^4×b^2×c - 4×a^3×b^3×c + a^2×b^4×c - 2×a×b^5×c - b^6×c + 3×a^5×c^2 + a^4×b×c^2 - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 - a×b^4×c^2 - 3×b^5×c^2 + 3×a^4×c^3 - 4×a^3×b×c^3 + 2×a^2×b^2×c^3 + 4×a×b^3×c^3 + 3×b^4×c^3 - 3×a^3×c^4 + a^2×b×c^4 - a×b^2×c^4 + 3×b^3×c^4 - 3×a^2×c^5 - 2×a×b×c^5 - 3×b^2×c^5 + a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5758.
Definition X_5759 :=
        let h_x_5759 a b c := 3×a^6 - 4×a^5×b - 3×a^4×b^2 + 4×a^3×b^3 + a^2×b^4 - b^6 - 4×a^5×c - 2×a^4×b×c + 4×a^3×b^2×c + 2×b^5×c - 3×a^4×c^2 + 4×a^3×b×c^2 - 2×a^2×b^2×c^2 + b^4×c^2 + 4×a^3×c^3 - 4×b^3×c^3 + a^2×c^4 + b^2×c^4 + 2×b×c^5 - c^6 in
        cPointhb h_x_5759.
Definition X_5760 :=
        let h_x_5760 a b c := -a^9 + a^8×b + 3×a^7×b^2 - 2×a^6×b^3 - 4×a^5×b^4 + a^4×b^5 + 3×a^3×b^6 - a×b^8 + a^8×c + 2×a^7×b×c - 4×a^5×b^3×c - 4×a^4×b^4×c + 2×a^3×b^5×c + 4×a^2×b^6×c - b^8×c + 3×a^7×c^2 - 4×a^5×b^2×c^2 - 3×a^4×b^3×c^2 - 3×a^3×b^4×c^2 + 2×a^2×b^5×c^2 + 4×a×b^6×c^2 + b^7×c^2 - 2×a^6×c^3 - 4×a^5×b×c^3 - 3×a^4×b^2×c^3 - 4×a^3×b^3×c^3 - 6×a^2×b^4×c^3 + 3×b^6×c^3 - 4×a^5×c^4 - 4×a^4×b×c^4 - 3×a^3×b^2×c^4 - 6×a^2×b^3×c^4 - 6×a×b^4×c^4 - 3×b^5×c^4 + a^4×c^5 + 2×a^3×b×c^5 + 2×a^2×b^2×c^5 - 3×b^4×c^5 + 3×a^3×c^6 + 4×a^2×b×c^6 + 4×a×b^2×c^6 + 3×b^3×c^6 + b^2×c^7 - a×c^8 - b×c^8 in
        cPointhb h_x_5760.
Definition X_5761 :=
        let h_x_5761 a b c := a^7 - 3×a^6×b - a^5×b^2 + 7×a^4×b^3 - a^3×b^4 - 5×a^2×b^5 + a×b^6 + b^7 - 3×a^6×c + 6×a^5×b×c + a^4×b^2×c - 4×a^3×b^3×c + 3×a^2×b^4×c - 2×a×b^5×c - b^6×c - a^5×c^2 + a^4×b×c^2 + 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 - a×b^4×c^2 - 3×b^5×c^2 + 7×a^4×c^3 - 4×a^3×b×c^3 + 2×a^2×b^2×c^3 + 4×a×b^3×c^3 + 3×b^4×c^3 - a^3×c^4 + 3×a^2×b×c^4 - a×b^2×c^4 + 3×b^3×c^4 - 5×a^2×c^5 - 2×a×b×c^5 - 3×b^2×c^5 + a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5761.
Definition X_5762 :=
        let h_x_5762 a b c := -2×a^6 + 2×a^5×b + 3×a^4×b^2 - 2×a^3×b^3 - 2×a^2×b^4 + b^6 + 2×a^5×c - 2×a^3×b^2×c + 2×a^2×b^3×c - 2×b^5×c + 3×a^4×c^2 - 2×a^3×b×c^2 - b^4×c^2 - 2×a^3×c^3 + 2×a^2×b×c^3 + 4×b^3×c^3 - 2×a^2×c^4 - b^2×c^4 - 2×b×c^5 + c^6 in
        cPointhb h_x_5762.
Definition X_5763 :=
        let h_x_5763 a b c := -2×a^6×b + a^5×b^2 + 5×a^4×b^3 - 2×a^3×b^4 - 4×a^2×b^5 + a×b^6 + b^7 - 2×a^6×c + 8×a^5×b×c + a^4×b^2×c - 6×a^3×b^3×c + 2×a^2×b^4×c - 2×a×b^5×c - b^6×c + a^5×c^2 + a^4×b×c^2 + 2×a^2×b^3×c^2 - a×b^4×c^2 - 3×b^5×c^2 + 5×a^4×c^3 - 6×a^3×b×c^3 + 2×a^2×b^2×c^3 + 4×a×b^3×c^3 + 3×b^4×c^3 - 2×a^3×c^4 + 2×a^2×b×c^4 - a×b^2×c^4 + 3×b^3×c^4 - 4×a^2×c^5 - 2×a×b×c^5 - 3×b^2×c^5 + a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5763.
Definition X_5764 :=
        let h_x_5764 a b c := -2×a^6 + a^5×b + 2×a^4×b^2 - a×b^5 + a^5×c + 2×a^4×b×c + 3×a^3×b^2×c + 3×a^2×b^3×c - b^5×c + 2×a^4×c^2 + 3×a^3×b×c^2 + 6×a^2×b^2×c^2 + a×b^3×c^2 + 3×a^2×b×c^3 + a×b^2×c^3 + 2×b^3×c^3 - a×c^5 - b×c^5 in
        cPointhb h_x_5764.
Definition X_5765 :=
        let h_x_5765 a b c := 3×a^6 - 4×a^4×b^2 - 2×a^3×b^3 + a^2×b^4 + 2×a×b^5 - 4×a^4×b×c - 10×a^3×b^2×c - 6×a^2×b^3×c + 2×a×b^4×c + 2×b^5×c - 4×a^4×c^2 - 10×a^3×b×c^2 - 14×a^2×b^2×c^2 - 4×a×b^3×c^2 - 2×a^3×c^3 - 6×a^2×b×c^3 - 4×a×b^2×c^3 - 4×b^3×c^3 + a^2×c^4 + 2×a×b×c^4 + 2×a×c^5 + 2×b×c^5 in
        cPointhb h_x_5765.
Definition X_5766 :=
        let h_x_5766 a b c := (a - b - c)*(5×a^5 - 3×a^4×b - 6×a^3×b^2 + 2×a^2×b^3 + a×b^4 + b^5 - 3×a^4×c - 8×a^3×b×c - 2×a^2×b^2×c - 3×b^4×c - 6×a^3×c^2 - 2×a^2×b×c^2 - 2×a×b^2×c^2 + 2×b^3×c^2 + 2×a^2×c^3 + 2×b^2×c^3 + a×c^4 - 3×b×c^4 + c^5) in
        cPointhb h_x_5766.
Definition X_5767 :=
        let h_x_5767 a b c := -a^7 - 2×a^6×b + a^5×b^2 + 2×a^4×b^3 - a^3×b^4 + a×b^6 - 2×a^6×c + a^4×b^2×c + b^6×c + a^5×c^2 + a^4×b×c^2 + 2×a^3×b^2×c^2 - a×b^4×c^2 + b^5×c^2 + 2×a^4×c^3 - 2×b^4×c^3 - a^3×c^4 - a×b^2×c^4 - 2×b^3×c^4 + b^2×c^5 + a×c^6 + b×c^6 in
        cPointhb h_x_5767.
Definition X_5768 :=
        let h_x_5768 a b c := -a^7 + 3×a^6×b - a^5×b^2 - 5×a^4×b^3 + 5×a^3×b^4 + a^2×b^5 - 3×a×b^6 + b^7 + 3×a^6×c + 2×a^5×b×c + a^4×b^2×c - 4×a^3×b^3×c - 3×a^2×b^4×c + 2×a×b^5×c - b^6×c - a^5×c^2 + a^4×b×c^2 - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + 3×a×b^4×c^2 - 3×b^5×c^2 - 5×a^4×c^3 - 4×a^3×b×c^3 + 2×a^2×b^2×c^3 - 4×a×b^3×c^3 + 3×b^4×c^3 + 5×a^3×c^4 - 3×a^2×b×c^4 + 3×a×b^2×c^4 + 3×b^3×c^4 + a^2×c^5 + 2×a×b×c^5 - 3×b^2×c^5 - 3×a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5768.
Definition X_5769 :=
        let h_x_5769 a b c := a^7 + a^6×b - 2×a^5×b^2 - a^4×b^3 + 2×a^3×b^4 - a×b^6 + a^6×c - a^4×b^2×c + a^2×b^4×c - b^6×c - 2×a^5×c^2 - a^4×b×c^2 + a^2×b^3×c^2 + a×b^4×c^2 - b^5×c^2 - a^4×c^3 + a^2×b^2×c^3 + 2×b^4×c^3 + 2×a^3×c^4 + a^2×b×c^4 + a×b^2×c^4 + 2×b^3×c^4 - b^2×c^5 - a×c^6 - b×c^6 in
        cPointhb h_x_5769.
Definition X_5770 :=
        let h_x_5770 a b c := a^7 + a^6×b - 5×a^5×b^2 - a^4×b^3 + 7×a^3×b^4 - a^2×b^5 - 3×a×b^6 + b^7 + a^6×c + 2×a^5×b×c + a^4×b^2×c - 4×a^3×b^3×c - a^2×b^4×c + 2×a×b^5×c - b^6×c - 5×a^5×c^2 + a^4×b×c^2 + 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + 3×a×b^4×c^2 - 3×b^5×c^2 - a^4×c^3 - 4×a^3×b×c^3 + 2×a^2×b^2×c^3 - 4×a×b^3×c^3 + 3×b^4×c^3 + 7×a^3×c^4 - a^2×b×c^4 + 3×a×b^2×c^4 + 3×b^3×c^4 - a^2×c^5 + 2×a×b×c^5 - 3×b^2×c^5 - 3×a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5770.
Definition X_5771 :=
        let h_x_5771 a b c := 2×a^7 - 7×a^5×b^2 + a^4×b^3 + 8×a^3×b^4 - 2×a^2×b^5 - 3×a×b^6 + b^7 - 4×a^5×b×c + a^4×b^2×c + 2×a^3×b^3×c + 2×a×b^5×c - b^6×c - 7×a^5×c^2 + a^4×b×c^2 + 4×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + 3×a×b^4×c^2 - 3×b^5×c^2 + a^4×c^3 + 2×a^3×b×c^3 + 2×a^2×b^2×c^3 - 4×a×b^3×c^3 + 3×b^4×c^3 + 8×a^3×c^4 + 3×a×b^2×c^4 + 3×b^3×c^4 - 2×a^2×c^5 + 2×a×b×c^5 - 3×b^2×c^5 - 3×a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5771.
Definition X_5772 :=
        let h_x_5772 a b c := -a^3 - 5×a^2×b + a×b^2 - 3×b^3 - 5×a^2×c - 2×a×b×c - 5×b^2×c + a×c^2 - 5×b×c^2 - 3×c^3 in
        cPointhb h_x_5772.
Definition X_5773 :=
        let h_x_5773 a b c := -2×a^5 + a^4×b + a^3×b^2 - a^2×b^3 + a×b^4 + a^4×c - 2×a×b^3×c + b^4×c + a^3×c^2 + 2×a×b^2×c^2 - b^3×c^2 - a^2×c^3 - 2×a×b×c^3 - b^2×c^3 + a×c^4 + b×c^4 in
        cPointhb h_x_5773.
Definition X_5774 :=
        let h_x_5774 a b c := a^4 + 2×a^3×b - a^2×b^2 - 2×a×b^3 + 2×a^3×c - 2×a^2×b×c - 2×a×b^2×c - 2×b^3×c - a^2×c^2 - 2×a×b×c^2 - 4×b^2×c^2 - 2×a×c^3 - 2×b×c^3 in
        cPointhb h_x_5774.
Definition X_5775 :=
        let h_x_5775 a b c := a^4 + 6×a^3×b - 4×a^2×b^2 - 6×a×b^3 + 3×b^4 + 6×a^3×c - 4×a^2×b×c - 2×a×b^2×c - 4×a^2×c^2 - 2×a×b×c^2 - 6×b^2×c^2 - 6×a×c^3 + 3×c^4 in
        cPointhb h_x_5775.
Definition X_5776 :=
        let h_x_5776 a b c := a*(a^7 - 2×a^6×b - a^5×b^2 + 4×a^4×b^3 - a^3×b^4 - 2×a^2×b^5 + a×b^6 - 2×a^6×c - 2×a^4×b^2×c + 2×a^2×b^4×c + 2×b^6×c - a^5×c^2 - 2×a^4×b×c^2 + 2×a^3×b^2×c^2 - a×b^4×c^2 + 2×b^5×c^2 + 4×a^4×c^3 - 4×b^4×c^3 - a^3×c^4 + 2×a^2×b×c^4 - a×b^2×c^4 - 4×b^3×c^4 - 2×a^2×c^5 + 2×b^2×c^5 + a×c^6 + 2×b×c^6) in
        cPointhb h_x_5776.
Definition X_5777 :=
        let h_x_5777 a b c := a*(a^5×b - a^4×b^2 - 2×a^3×b^3 + 2×a^2×b^4 + a×b^5 - b^6 + a^5×c + 2×a^2×b^3×c - a×b^4×c - 2×b^5×c - a^4×c^2 + b^4×c^2 - 2×a^3×c^3 + 2×a^2×b×c^3 + 4×b^3×c^3 + 2×a^2×c^4 - a×b×c^4 + b^2×c^4 + a×c^5 - 2×b×c^5 - c^6) in
        cPointhb h_x_5777.
Definition X_5778 :=
        let h_x_5778 a b c := a*(a^7 - 2×a^6×b - a^5×b^2 + 4×a^4×b^3 - a^3×b^4 - 2×a^2×b^5 + a×b^6 - 2×a^6×c + 2×a^5×b×c - 2×a^3×b^3×c + 2×b^6×c - a^5×c^2 + 2×a^3×b^2×c^2 - 2×a^2×b^3×c^2 - a×b^4×c^2 + 2×b^5×c^2 + 4×a^4×c^3 - 2×a^3×b×c^3 - 2×a^2×b^2×c^3 - 4×b^4×c^3 - a^3×c^4 - a×b^2×c^4 - 4×b^3×c^4 - 2×a^2×c^5 + 2×b^2×c^5 + a×c^6 + 2×b×c^6) in
        cPointhb h_x_5778.
Definition X_5779 :=
        let h_x_5779 a b c := a*(a^5 - 4×a^3×b^2 + 2×a^2×b^3 + 3×a×b^4 - 2×b^5 + 2×a^3×b×c + 2×a^2×b^2×c - 2×a×b^3×c - 2×b^4×c - 4×a^3×c^2 + 2×a^2×b×c^2 - 2×a×b^2×c^2 + 4×b^3×c^2 + 2×a^2×c^3 - 2×a×b×c^3 + 4×b^2×c^3 + 3×a×c^4 - 2×b×c^4 - 2×c^5) in
        cPointhb h_x_5779.
Definition X_5780 :=
        let h_x_5780 a b c := a*(a^6 - 3×a^5×b + 6×a^3×b^3 - 3×a^2×b^4 - 3×a×b^5 + 2×b^6 - 3×a^5×c + 6×a^4×b×c - 10×a^2×b^3×c + 3×a×b^4×c + 4×b^5×c + 2×a^2×b^2×c^2 - 2×b^4×c^2 + 6×a^3×c^3 - 10×a^2×b×c^3 - 8×b^3×c^3 - 3×a^2×c^4 + 3×a×b×c^4 - 2×b^2×c^4 - 3×a×c^5 + 4×b×c^5 + 2×c^6) in
        cPointhb h_x_5780.
Definition X_5781 :=
        let h_x_5781 a b c := a*(a^6 - 3×a^5×b + 2×a^4×b^2 + 2×a^3×b^3 - 3×a^2×b^4 + a×b^5 - 3×a^5×c - 2×a^4×b×c + 2×a^3×b^2×c + a×b^4×c + 2×b^5×c + 2×a^4×c^2 + 2×a^3×b×c^2 - 2×a^2×b^2×c^2 - 2×a×b^3×c^2 + 2×a^3×c^3 - 2×a×b^2×c^3 - 4×b^3×c^3 - 3×a^2×c^4 + a×b×c^4 + a×c^5 + 2×b×c^5) in
        cPointhb h_x_5781.
Definition X_5782 :=
        let h_x_5782 a b c := a*(a^4 - a^3×b - a^2×b^2 + a×b^3 - a^3×c + 4×a^2×b×c - a×b^2×c + 2×b^3×c - a^2×c^2 - a×b×c^2 + 4×b^2×c^2 + a×c^3 + 2×b×c^3) in
        cPointhb h_x_5782.
Definition X_5783 :=
        let h_x_5783 a b c := a*(a^4 - a^3×b - a^2×b^2 + a×b^3 - a^3×c + 2×a^2×b×c + a×b^2×c + 2×b^3×c - a^2×c^2 + a×b×c^2 + 4×b^2×c^2 + a×c^3 + 2×b×c^3) in
        cPointhb h_x_5783.
Definition X_5784 :=
        let h_x_5784 a b c := a*(a^4×b - 2×a^3×b^2 + 2×a×b^4 - b^5 + a^4×c - b^4×c - 2×a^3×c^2 + 4×a×b^2×c^2 + 2×b^3×c^2 + 2×b^2×c^3 + 2×a×c^4 - b×c^4 - c^5) in
        cPointhb h_x_5784.
Definition X_5785 :=
        let h_x_5785 a b c := a*(a^5 + a^4×b - 6×a^3×b^2 + 2×a^2×b^3 + 5×a×b^4 - 3×b^5 + a^4×c - 4×a^3×b×c + 2×a^2×b^2×c + 4×a×b^3×c - 3×b^4×c - 6×a^3×c^2 + 2×a^2×b×c^2 + 14×a×b^2×c^2 + 6×b^3×c^2 + 2×a^2×c^3 + 4×a×b×c^3 + 6×b^2×c^3 + 5×a×c^4 - 3×b×c^4 - 3×c^5) in
        cPointhb h_x_5785.
Definition X_5786 :=
        let h_x_5786 a b c := a^7 + 3×a^6×b - 2×a^4×b^3 + a^3×b^4 - a^2×b^5 - 2×a×b^6 + 3×a^6×c + 2×a^5×b×c - a^2×b^4×c - 2×a×b^5×c - 2×b^6×c - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + 2×a×b^4×c^2 - 2×b^5×c^2 - 2×a^4×c^3 + 2×a^2×b^2×c^3 + 4×a×b^3×c^3 + 4×b^4×c^3 + a^3×c^4 - a^2×b×c^4 + 2×a×b^2×c^4 + 4×b^3×c^4 - a^2×c^5 - 2×a×b×c^5 - 2×b^2×c^5 - 2×a×c^6 - 2×b×c^6 in
        cPointhb h_x_5786.
Definition X_5787 :=
        let h_x_5787 a b c := -a^7 + 2×a^6×b - 3×a^4×b^3 + 3×a^3×b^4 - 2×a×b^6 + b^7 + 2×a^6×c + 2×a^5×b×c + a^4×b^2×c - 2×a^3×b^3×c - 2×a^2×b^4×c - b^6×c + a^4×b×c^2 - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + 2×a×b^4×c^2 - 3×b^5×c^2 - 3×a^4×c^3 - 2×a^3×b×c^3 + 2×a^2×b^2×c^3 + 3×b^4×c^3 + 3×a^3×c^4 - 2×a^2×b×c^4 + 2×a×b^2×c^4 + 3×b^3×c^4 - 3×b^2×c^5 - 2×a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5787.
Definition X_5788 :=
        let h_x_5788 a b c := a^7 + a^6×b - 2×a^5×b^2 + 3×a^3×b^4 - a^2×b^5 - 2×a×b^6 + a^6×c + 2×a^3×b^3×c + a^2×b^4×c - 2×a×b^5×c - 2×b^6×c - 2×a^5×c^2 + 2×a^3×b^2×c^2 + 4×a^2×b^3×c^2 + 2×a×b^4×c^2 - 2×b^5×c^2 + 2×a^3×b×c^3 + 4×a^2×b^2×c^3 + 4×a×b^3×c^3 + 4×b^4×c^3 + 3×a^3×c^4 + a^2×b×c^4 + 2×a×b^2×c^4 + 4×b^3×c^4 - a^2×c^5 - 2×a×b×c^5 - 2×b^2×c^5 - 2×a×c^6 - 2×b×c^6 in
        cPointhb h_x_5788.
Definition X_5789 :=
        let h_x_5789 a b c := a^7 + a^6×b - 6×a^5×b^2 + 9×a^3×b^4 - 3×a^2×b^5 - 4×a×b^6 + 2×b^7 + a^6×c + 2×a^5×b×c + 2×a^4×b^2×c - 2×a^3×b^3×c - a^2×b^4×c - 2×b^6×c - 6×a^5×c^2 + 2×a^4×b×c^2 + 2×a^3×b^2×c^2 + 4×a^2×b^3×c^2 + 4×a×b^4×c^2 - 6×b^5×c^2 - 2×a^3×b×c^3 + 4×a^2×b^2×c^3 + 6×b^4×c^3 + 9×a^3×c^4 - a^2×b×c^4 + 4×a×b^2×c^4 + 6×b^3×c^4 - 3×a^2×c^5 - 6×b^2×c^5 - 4×a×c^6 - 2×b×c^6 + 2×c^7 in
        cPointhb h_x_5789.
Definition X_5790 :=
        let h_x_5790 a b c := a^4 - 2×a^3×b + a^2×b^2 + 2×a×b^3 - 2×b^4 - 2×a^3×c + 4×a^2×b×c - 2×a×b^2×c + a^2×c^2 - 2×a×b×c^2 + 4×b^2×c^2 + 2×a×c^3 - 2×c^4 in
        cPointhb h_x_5790.
Definition X_5791 :=
        let h_x_5791 a b c := a^4 + a^3×b - 2×a^2×b^2 - a×b^3 + b^4 + a^3×c - 2×a^2×b×c - 3×a×b^2×c - 2×a^2×c^2 - 3×a×b×c^2 - 2×b^2×c^2 - a×c^3 + c^4 in
        cPointhb h_x_5791.
Definition X_5792 :=
        let h_x_5792 a b c := 3×a^5 - a^4×b - a^3×b^2 + a^2×b^3 - 2×a×b^4 - a^4×c + a^2×b^2×c + 2×a×b^3×c - 2×b^4×c - a^3×c^2 + a^2×b×c^2 + 2×b^3×c^2 + a^2×c^3 + 2×a×b×c^3 + 2×b^2×c^3 - 2×a×c^4 - 2×b×c^4 in
        cPointhb h_x_5792.
Definition X_5793 :=
        let h_x_5793 a b c := a^4 + a^2×b^2 + 2×a×b^3 + 4×a^2×b×c + 2×a×b^2×c + 2×b^3×c + a^2×c^2 + 2×a×b×c^2 + 4×b^2×c^2 + 2×a×c^3 + 2×b×c^3 in
        cPointhb h_x_5793.
Definition X_5794 :=
        let h_x_5794 a b c := a^4 - a^3×b + a×b^3 - b^4 - a^3×c + 2×a^2×b×c + a×b^2×c + a×b×c^2 + 2×b^2×c^2 + a×c^3 - c^4 in
        cPointhb h_x_5794.
Definition X_5795 :=
        let h_x_5795 a b c := (a - b - c)*(2×a^3 + a^2×b + b^3 + a^2×c + 4×a×b×c - b^2×c - b×c^2 + c^3) in
        cPointhb h_x_5795.
Definition X_5796 :=
        let h_x_5796 a b c := a^8×b + 2×a^7×b^2 - 4×a^6×b^3 - 4×a^5×b^4 + 4×a^4×b^5 + 2×a^3×b^6 - b^9 + a^8×c + 2×a^7×b×c - a^6×b^2×c - 4×a^5×b^3×c - a^4×b^4×c + 2×a^3×b^5×c + a^2×b^6×c + 2×a^7×c^2 - a^6×b×c^2 - 3×a^4×b^3×c^2 - 2×a^3×b^4×c^2 + a^2×b^5×c^2 + 3×b^7×c^2 - 4×a^6×c^3 - 4×a^5×b×c^3 - 3×a^4×b^2×c^3 - 4×a^3×b^3×c^3 - 2×a^2×b^4×c^3 + b^6×c^3 - 4×a^5×c^4 - a^4×b×c^4 - 2×a^3×b^2×c^4 - 2×a^2×b^3×c^4 - 3×b^5×c^4 + 4×a^4×c^5 + 2×a^3×b×c^5 + a^2×b^2×c^5 - 3×b^4×c^5 + 2×a^3×c^6 + a^2×b×c^6 + b^3×c^6 + 3×b^2×c^7 - c^9 in
        cPointhb h_x_5796.
Definition X_5797 :=
        let h_x_5797 a b c := a^6×b - 2×a^5×b^2 - 3×a^4×b^3 + 2×a^3×b^4 + a^2×b^5 + b^7 + a^6×c - 2×a^5×b×c - 2×a^4×b^2×c + a^2×b^4×c + 2×a×b^5×c - 2×a^5×c^2 - 2×a^4×b×c^2 - 4×a^3×b^2×c^2 - 2×a^2×b^3×c^2 - 2×b^5×c^2 - 3×a^4×c^3 - 2×a^2×b^2×c^3 - 4×a×b^3×c^3 + b^4×c^3 + 2×a^3×c^4 + a^2×b×c^4 + b^3×c^4 + a^2×c^5 + 2×a×b×c^5 - 2×b^2×c^5 + c^7 in
        cPointhb h_x_5797.
Definition X_5798 :=
        let h_x_5798 a b c := -2×a^7×b + a^6×b^2 + 4×a^5×b^3 - a^4×b^4 - 2×a^3×b^5 - a^2×b^6 + b^8 - 2×a^7×c + 4×a^6×b×c + 2×a^5×b^2×c + 2×a^3×b^4×c - 4×a^2×b^5×c - 2×a×b^6×c + a^6×c^2 + 2×a^5×b×c^2 + 2×a^4×b^2×c^2 + a^2×b^4×c^2 - 2×a×b^5×c^2 - 4×b^6×c^2 + 4×a^5×c^3 + 8×a^2×b^3×c^3 + 4×a×b^4×c^3 - a^4×c^4 + 2×a^3×b×c^4 + a^2×b^2×c^4 + 4×a×b^3×c^4 + 6×b^4×c^4 - 2×a^3×c^5 - 4×a^2×b×c^5 - 2×a×b^2×c^5 - a^2×c^6 - 2×a×b×c^6 - 4×b^2×c^6 + c^8 in
        cPointhb h_x_5798.
Definition X_5799 :=
        let h_x_5799 a b c := -3×a^5×b^2 - 3×a^4×b^3 + 2×a^3×b^4 + 2×a^2×b^5 + a×b^6 + b^7 - 4×a^5×b×c - 3×a^4×b^2×c + 2×a^2×b^4×c + 4×a×b^5×c + b^6×c - 3×a^5×c^2 - 3×a^4×b×c^2 - 4×a^3×b^2×c^2 - 4×a^2×b^3×c^2 - a×b^4×c^2 - b^5×c^2 - 3×a^4×c^3 - 4×a^2×b^2×c^3 - 8×a×b^3×c^3 - b^4×c^3 + 2×a^3×c^4 + 2×a^2×b×c^4 - a×b^2×c^4 - b^3×c^4 + 2×a^2×c^5 + 4×a×b×c^5 - b^2×c^5 + a×c^6 + b×c^6 + c^7 in
        cPointhb h_x_5799.
Definition X_5800 :=
        let h_x_5800 a b c := a^6 + a^4×b^2 - a^2×b^4 - b^6 + 4×a^4×b×c + 4×a^3×b^2×c + a^4×c^2 + 4×a^3×b×c^2 + 2×a^2×b^2×c^2 + b^4×c^2 - a^2×c^4 + b^2×c^4 - c^6 in
        cPointhb h_x_5800.
Definition X_5801 :=
        let h_x_5801 a b c := a^6 + 2×a^5×b + 7×a^4×b^2 - 5×a^2×b^4 - 2×a×b^5 - 3×b^6 + 2×a^5×c + 18×a^4×b×c + 16×a^3×b^2×c - 2×a×b^4×c - 2×b^5×c + 7×a^4×c^2 + 16×a^3×b×c^2 + 10×a^2×b^2×c^2 + 4×a×b^3×c^2 + 3×b^4×c^2 + 4×a×b^2×c^3 + 4×b^3×c^3 - 5×a^2×c^4 - 2×a×b×c^4 + 3×b^2×c^4 - 2×a×c^5 - 2×b×c^5 - 3×c^6 in
        cPointhb h_x_5801.
Definition X_5802 :=
        let h_x_5802 a b c := (a - b - c)*(3×a^4 + 2×a^3×b + 2×a×b^3 + b^4 + 2×a^3×c - 2×a×b^2×c - 2×a×b×c^2 - 2×b^2×c^2 + 2×a×c^3 + c^4) in
        cPointhb h_x_5802.
Definition X_5803 :=
        let h_x_5803 a b c := a^9 - a^8×b - 2×a^7×b^2 + 2×a^6×b^3 + 2×a^5×b^4 - 2×a^4×b^5 - 2×a^3×b^6 + 2×a^2×b^7 + a×b^8 - b^9 - a^8×c - 2×a^7×b×c + 4×a^5×b^3×c + 4×a^4×b^4×c - 2×a^3×b^5×c - 4×a^2×b^6×c + b^8×c - 2×a^7×c^2 + 4×a^5×b^2×c^2 + 2×a^4×b^3×c^2 + 2×a^3×b^4×c^2 - 4×a^2×b^5×c^2 - 4×a×b^6×c^2 + 2×b^7×c^2 + 2×a^6×c^3 + 4×a^5×b×c^3 + 2×a^4×b^2×c^3 + 4×a^3×b^3×c^3 + 6×a^2×b^4×c^3 - 2×b^6×c^3 + 2×a^5×c^4 + 4×a^4×b×c^4 + 2×a^3×b^2×c^4 + 6×a^2×b^3×c^4 + 6×a×b^4×c^4 - 2×a^4×c^5 - 2×a^3×b×c^5 - 4×a^2×b^2×c^5 - 2×a^3×c^6 - 4×a^2×b×c^6 - 4×a×b^2×c^6 - 2×b^3×c^6 + 2×a^2×c^7 + 2×b^2×c^7 + a×c^8 + b×c^8 - c^9 in
        cPointhb h_x_5803.
Definition X_5804 :=
        let h_x_5804 a b c := -a^7 + 3×a^6×b - a^5×b^2 - 5×a^4×b^3 + 5×a^3×b^4 + a^2×b^5 - 3×a×b^6 + b^7 + 3×a^6×c - 6×a^5×b×c + a^4×b^2×c - 4×a^3×b^3×c - 3×a^2×b^4×c + 10×a×b^5×c - b^6×c - a^5×c^2 + a^4×b×c^2 - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + 3×a×b^4×c^2 - 3×b^5×c^2 - 5×a^4×c^3 - 4×a^3×b×c^3 + 2×a^2×b^2×c^3 - 20×a×b^3×c^3 + 3×b^4×c^3 + 5×a^3×c^4 - 3×a^2×b×c^4 + 3×a×b^2×c^4 + 3×b^3×c^4 + a^2×c^5 + 10×a×b×c^5 - 3×b^2×c^5 - 3×a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5804.
Definition X_5805 :=
        let h_x_5805 a b c := a^6 - a^5×b - a^4×b^2 + a^2×b^4 + a×b^5 - b^6 - a^5×c - 2×a^2×b^3×c + a×b^4×c + 2×b^5×c - a^4×c^2 + 2×a^2×b^2×c^2 - 2×a×b^3×c^2 + b^4×c^2 - 2×a^2×b×c^3 - 2×a×b^2×c^3 - 4×b^3×c^3 + a^2×c^4 + a×b×c^4 + b^2×c^4 + a×c^5 + 2×b×c^5 - c^6 in
        cPointhb h_x_5805.
Definition X_5806 :=
        let h_x_5806 a b c := a*(a^5×b - a^4×b^2 - 2×a^3×b^3 + 2×a^2×b^4 + a×b^5 - b^6 + a^5×c - 4×a^4×b×c - 2×a^2×b^3×c - a×b^4×c + 6×b^5×c - a^4×c^2 + b^4×c^2 - 2×a^3×c^3 - 2×a^2×b×c^3 - 12×b^3×c^3 + 2×a^2×c^4 - a×b×c^4 + b^2×c^4 + a×c^5 + 6×b×c^5 - c^6) in
        cPointhb h_x_5806.
Definition X_5807 :=
        let h_x_5807 a b c := a^6 - 2×a^5×b + a^4×b^2 - a^2×b^4 + 2×a×b^5 - b^6 - 2×a^5×c - 6×a^4×b×c - 6×a^3×b^2×c - 2×a^2×b^3×c + a^4×c^2 - 6×a^3×b×c^2 - 2×a^2×b^2×c^2 - 2×a×b^3×c^2 + b^4×c^2 - 2×a^2×b×c^3 - 2×a×b^2×c^3 - a^2×c^4 + b^2×c^4 + 2×a×c^5 - c^6 in
        cPointhb h_x_5807.
Definition X_5808 :=
        let h_x_5808 a b c := a^6 - a^5×b - a^4×b^2 + a^2×b^4 + a×b^5 - b^6 - a^5×c - 6×a^4×b×c - 8×a^3×b^2×c - 2×a^2×b^3×c + a×b^4×c - a^4×c^2 - 8×a^3×b×c^2 - 6×a^2×b^2×c^2 - 2×a×b^3×c^2 + b^4×c^2 - 2×a^2×b×c^3 - 2×a×b^2×c^3 + a^2×c^4 + a×b×c^4 + b^2×c^4 + a×c^5 - c^6 in
        cPointhb h_x_5808.
Definition X_5809 :=
        let h_x_5809 a b c := (a - b - c)*(a^5 - 3×a^4×b + 2×a^3×b^2 + 2×a^2×b^3 - 3×a×b^4 + b^5 - 3×a^4×c - 8×a^3×b×c - 2×a^2×b^2×c - 3×b^4×c + 2×a^3×c^2 - 2×a^2×b×c^2 + 6×a×b^2×c^2 + 2×b^3×c^2 + 2×a^2×c^3 + 2×b^2×c^3 - 3×a×c^4 - 3×b×c^4 + c^5) in
        cPointhb h_x_5809.
Definition X_5810 :=
        let h_x_5810 a b c := a^7 + a^6×b - a^5×b^2 - a^4×b^3 + a^3×b^4 + a^2×b^5 - a×b^6 - b^7 + a^6×c - a^4×b^2×c + 2×a^3×b^3×c + a^2×b^4×c - 2×a×b^5×c - b^6×c - a^5×c^2 - a^4×b×c^2 + 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 + a×b^4×c^2 + b^5×c^2 - a^4×c^3 + 2×a^3×b×c^3 + 2×a^2×b^2×c^3 + 4×a×b^3×c^3 + b^4×c^3 + a^3×c^4 + a^2×b×c^4 + a×b^2×c^4 + b^3×c^4 + a^2×c^5 - 2×a×b×c^5 + b^2×c^5 - a×c^6 - b×c^6 - c^7 in
        cPointhb h_x_5810.
Definition X_5811 :=
        let h_x_5811 a b c := -a^7 - a^6×b + 3×a^5×b^2 + 3×a^4×b^3 - 3×a^3×b^4 - 3×a^2×b^5 + a×b^6 + b^7 - a^6×c - 2×a^5×b×c + a^4×b^2×c - 4×a^3×b^3×c + a^2×b^4×c + 6×a×b^5×c - b^6×c + 3×a^5×c^2 + a^4×b×c^2 - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 - a×b^4×c^2 - 3×b^5×c^2 + 3×a^4×c^3 - 4×a^3×b×c^3 + 2×a^2×b^2×c^3 - 12×a×b^3×c^3 + 3×b^4×c^3 - 3×a^3×c^4 + a^2×b×c^4 - a×b^2×c^4 + 3×b^3×c^4 - 3×a^2×c^5 + 6×a×b×c^5 - 3×b^2×c^5 + a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5811.
Definition X_5812 :=
        let h_x_5812 a b c := -a^7 + 2×a^5×b^2 + a^4×b^3 - a^3×b^4 - 2×a^2×b^5 + b^7 + 2×a^5×b×c + a^4×b^2×c - 2×a^3×b^3×c - b^6×c + 2×a^5×c^2 + a^4×b×c^2 - 2×a^3×b^2×c^2 + 2×a^2×b^3×c^2 - 3×b^5×c^2 + a^4×c^3 - 2×a^3×b×c^3 + 2×a^2×b^2×c^3 + 3×b^4×c^3 - a^3×c^4 + 3×b^3×c^4 - 2×a^2×c^5 - 3×b^2×c^5 - b×c^6 + c^7 in
        cPointhb h_x_5812.
Definition X_5813 :=
        let h_x_5813 a b c := a^5 + a^4×b - a×b^4 - b^5 + a^4×c - 4×a^3×b×c + 2×a^2×b^2×c + b^4×c + 2×a^2×b×c^2 + 2×a×b^2×c^2 - a×c^4 + b×c^4 - c^5 in
        cPointhb h_x_5813.
Definition X_5814 :=
        let h_x_5814 a b c := -a^4 - a^3×b + a×b^3 + b^4 - a^3×c + 3×a×b^2×c + 2×b^3×c + 3×a×b×c^2 + 2×b^2×c^2 + a×c^3 + 2×b×c^3 + c^4 in
        cPointhb h_x_5814.
Definition X_5815 :=
        let h_x_5815 a b c := -a^4 - 2×a^3×b + 2×a×b^3 + b^4 - 2×a^3×c - 4×a^2×b×c + 6×a×b^2×c + 6×a×b×c^2 - 2×b^2×c^2 + 2×a×c^3 + c^4 in
        cPointhb h_x_5815.
Definition X_5816 :=
        let h_x_5816 a b c := -a^5 + a^4×b - 2×a^2×b^3 + a×b^4 + b^5 + a^4×c - 2×a^3×b×c + b^4×c - 2×a×b^2×c^2 - 2×b^3×c^2 - 2×a^2×c^3 - 2×b^2×c^3 + a×c^4 + b×c^4 + c^5 in
        cPointhb h_x_5816.
Definition X_5817 :=
        let h_x_5817 a b c := a^6 - 5×a^4×b^2 + 4×a^3×b^3 + 3×a^2×b^4 - 4×a×b^5 + b^6 + 2×a^4×b×c + 4×a^3×b^2×c - 4×a×b^4×c - 2×b^5×c - 5×a^4×c^2 + 4×a^3×b×c^2 - 6×a^2×b^2×c^2 + 8×a×b^3×c^2 - b^4×c^2 + 4×a^3×c^3 + 8×a×b^2×c^3 + 4×b^3×c^3 + 3×a^2×c^4 - 4×a×b×c^4 - b^2×c^4 - 4×a×c^5 - 2×b×c^5 + c^6 in
        cPointhb h_x_5817.
Definition X_5818 :=
        let h_x_5818 a b c := a^4 - 2×a^3×b + 2×a^2×b^2 + 2×a×b^3 - 3×b^4 - 2×a^3×c + 4×a^2×b×c - 2×a×b^2×c + 2×a^2×c^2 - 2×a×b×c^2 + 6×b^2×c^2 + 2×a×c^3 - 3×c^4 in
        cPointhb h_x_5818.
Definition X_5819 :=
        let h_x_5819 a b c := -3×a^4 + 2×a^3×b - 2×a^2×b^2 + 2×a×b^3 + b^4 + 2×a^3×c - 2×a×b^2×c - 2×a^2×c^2 - 2×a×b×c^2 - 2×b^2×c^2 + 2×a×c^3 + c^4 in
        cPointhb h_x_5819.
Definition X_5820 :=
        let h_x_5820 a b c := a^6 - a^4×b^2 + a^2×b^4 - b^6 + 2×a^4×b×c + 2×a^3×b^2×c - a^4×c^2 + 2×a^3×b×c^2 + 2×a^2×b^2×c^2 + b^4×c^2 + a^2×c^4 + b^2×c^4 - c^6 in
        cPointhb h_x_5820.
Definition X_5821 :=
        let h_x_5821 a b c := a^6 + a^4×b^2 + 2×a^3×b^3 + a^2×b^4 - 2×a×b^5 - 3×b^6 + 8×a^4×b×c + 10×a^3×b^2×c + 2×a^2×b^3×c - 2×a×b^4×c - 2×b^5×c + a^4×c^2 + 10×a^3×b×c^2 + 10×a^2×b^2×c^2 + 4×a×b^3×c^2 + 3×b^4×c^2 + 2×a^3×c^3 + 2×a^2×b×c^3 + 4×a×b^2×c^3 + 4×b^3×c^3 + a^2×c^4 - 2×a×b×c^4 + 3×b^2×c^4 - 2×a×c^5 - 2×b×c^5 - 3×c^6 in
        cPointhb h_x_5821.
Definition X_5822 :=
        let h_x_5822 a b c := (a - b - c)*(3×a^4 - 2×a^2×b^2 + 2×a×b^3 + b^4 + 2×a^2×b×c - 2×a×b^2×c - 2×a^2×c^2 - 2×a×b×c^2 - 2×b^2×c^2 + 2×a×c^3 + c^4) in
        cPointhb h_x_5822.
Definition X_5823 :=
        let h_x_5823 a b c := a^6 + a^5×b - 3×a^4×b^2 + a^2×b^4 - a×b^5 + b^6 + a^5×c + 4×a^4×b×c + 3×a^3×b^2×c - a^2×b^3×c + b^5×c - 3×a^4×c^2 + 3×a^3×b×c^2 - 4×a^2×b^2×c^2 + a×b^3×c^2 - b^4×c^2 - a^2×b×c^3 + a×b^2×c^3 - 2×b^3×c^3 + a^2×c^4 - b^2×c^4 - a×c^5 + b×c^5 + c^6 in
        cPointhb h_x_5823.
Definition X_5824 :=
        let h_x_5824 a b c := -a^6 - 2×a^5×b + 2×a^4×b^2 + 2×a^3×b^3 + a^2×b^4 - 2×b^6 - 2×a^5×c - 8×a^4×b×c - 6×a^3×b^2×c + 2×a^2×b^3×c - 2×b^5×c + 2×a^4×c^2 - 6×a^3×b×c^2 + 2×a^2×b^2×c^2 + 2×b^4×c^2 + 2×a^3×c^3 + 2×a^2×b×c^3 + 4×b^3×c^3 + a^2×c^4 + 2×b^2×c^4 - 2×b×c^5 - 2×c^6 in
        cPointhb h_x_5824.
Definition X_5825 :=
        let h_x_5825 a b c := (a - b - c)*(3×a^5 + 3×a^4×b - 10×a^3×b^2 - 2×a^2×b^3 + 7×a×b^4 - b^5 + 3×a^4×c + 8×a^3×b×c + 2×a^2×b^2×c + 3×b^4×c - 10×a^3×c^2 + 2×a^2×b×c^2 - 14×a×b^2×c^2 - 2×b^3×c^2 - 2×a^2×c^3 - 2×b^2×c^3 + 7×a×c^4 + 3×b×c^4 - c^5) in
        cPointhb h_x_5825.
Definition X_5826 :=
        let h_x_5826 a b c := a^5 - 2×a^4×b - a^3×b^2 + a^2×b^3 + b^5 - 2×a^4×c + 4×a^3×b×c - 2×a^2×b^2×c + 2×a×b^3×c - 2×b^4×c - a^3×c^2 - 2×a^2×b×c^2 - 4×a×b^2×c^2 + b^3×c^2 + a^2×c^3 + 2×a×b×c^3 + b^2×c^3 - 2×b×c^4 + c^5 in
        cPointhb h_x_5826.
Definition X_5827 :=
        let h_x_5827 a b c := a^4 + a^2×b^2 - 2×b^4 + 2×a^2×b×c - 4×a×b^2×c - 2×b^3×c + a^2×c^2 - 4×a×b×c^2 - 2×b×c^3 - 2×c^4 in
        cPointhb h_x_5827.
Definition X_5828 :=
        let h_x_5828 a b c := a^4 - 2×a^3×b + 4×a^2×b^2 + 2×a×b^3 - 5×b^4 - 2×a^3×c + 12×a^2×b×c - 10×a×b^2×c + 4×a^2×c^2 - 10×a×b×c^2 + 10×b^2×c^2 + 2×a×c^3 - 5×c^4 in
        cPointhb h_x_5828.
Definition X_5829 :=
        let h_x_5829 a b c := -2×a^7 + 2×a^6×b + a^5×b^2 + a^4×b^3 - 4×a^2×b^5 + a×b^6 + b^7 + 2×a^6×c - a^4×b^2×c + 4×a^3×b^3×c - 4×a×b^5×c - b^6×c + a^5×c^2 - a^4×b×c^2 + 4×a^2×b^3×c^2 - a×b^4×c^2 - 3×b^5×c^2 + a^4×c^3 + 4×a^3×b×c^3 + 4×a^2×b^2×c^3 + 8×a×b^3×c^3 + 3×b^4×c^3 - a×b^2×c^4 + 3×b^3×c^4 - 4×a^2×c^5 - 4×a×b×c^5 - 3×b^2×c^5 + a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5829.
Definition X_5830 :=
        let h_x_5830 a b c := 2×a^5 - 2×a^4×b - a^3×b^2 + a^2×b^3 - a×b^4 + b^5 - 2×a^4×c + 4×a^3×b×c - 5×a^2×b^2×c - 2×a×b^3×c + b^4×c - a^3×c^2 - 5×a^2×b×c^2 - 2×a×b^2×c^2 - 2×b^3×c^2 + a^2×c^3 - 2×a×b×c^3 - 2×b^2×c^3 - a×c^4 + b×c^4 + c^5 in
        cPointhb h_x_5830.
Definition X_5831 :=
        let h_x_5831 a b c := a^5 - a^3×b^2 - a^2×b^3 + b^5 + 2×a^3×b×c - 5×a^2×b^2×c - 2×a×b^3×c + b^4×c - a^3×c^2 - 5×a^2×b×c^2 - 4×a×b^2×c^2 - 2×b^3×c^2 - a^2×c^3 - 2×a×b×c^3 - 2×b^2×c^3 + b×c^4 + c^5 in
        cPointhb h_x_5831.
Definition X_5832 :=
        let h_x_5832 a b c := a^6 - a^5×b - a^4×b^2 + a^2×b^4 + a×b^5 - b^6 - a^5×c + 2×a^4×b×c - 4×a^2×b^3×c + a×b^4×c + 2×b^5×c - a^4×c^2 - 2×a^2×b^2×c^2 - 2×a×b^3×c^2 + b^4×c^2 - 4×a^2×b×c^3 - 2×a×b^2×c^3 - 4×b^3×c^3 + a^2×c^4 + a×b×c^4 + b^2×c^4 + a×c^5 + 2×b×c^5 - c^6 in
        cPointhb h_x_5832.
Definition X_5833 :=
        let h_x_5833 a b c := a^6 - a^5×b - 2×a^3×b^3 + a^2×b^4 + 3×a×b^5 - 2×b^6 - a^5×c + 8×a^4×b×c - 2×a^3×b^2×c - 12×a^2×b^3×c + 3×a×b^4×c + 4×b^5×c - 2×a^3×b×c^2 - 10×a^2×b^2×c^2 - 6×a×b^3×c^2 + 2×b^4×c^2 - 2×a^3×c^3 - 12×a^2×b×c^3 - 6×a×b^2×c^3 - 8×b^3×c^3 + a^2×c^4 + 3×a×b×c^4 + 2×b^2×c^4 + 3×a×c^5 + 4×b×c^5 - 2×c^6 in
        cPointhb h_x_5833.
Definition X_5834 :=
        let h_x_5834 a b c := -2×a^4×b - a^3×b^2 + a^2×b^3 + a×b^4 + b^5 - 2×a^4×c + 4×a^3×b×c - 3×a^2×b^2×c + 2×a×b^3×c - b^4×c - a^3×c^2 - 3×a^2×b×c^2 - 6×a×b^2×c^2 + a^2×c^3 + 2×a×b×c^3 + a×c^4 - b×c^4 + c^5 in
        cPointhb h_x_5834.
Definition X_5835 :=
        let h_x_5835 a b c := 2×a^3×b + a^2×b^2 + b^4 + 2×a^3×c + 4×a×b^2×c + 2×b^3×c + a^2×c^2 + 4×a×b×c^2 + 2×b^2×c^2 + 2×b×c^3 + c^4 in
        cPointhb h_x_5835.
Definition X_5836 :=
        let h_x_5836 a b c := a*(a^2×b - b^3 + a^2×c - 2×a×b×c + 3×b^2×c + 3×b×c^2 - c^3) in
        cPointhb h_x_5836.
Definition X_5837 :=
        let h_x_5837 a b c := (a - b - c)*(3×a^2×b + 2×a×b^2 - b^3 + 3×a^2×c + b^2×c + 2×a×c^2 + b×c^2 - c^3) in
        cPointhb h_x_5837.
Definition X_5838 :=
        let h_x_5838 a b c := (a - b - c)*(5×a^3 - a^2×b + 3×a×b^2 + b^3 - a^2×c - 6×a×b×c - b^2×c + 3×a×c^2 - b×c^2 + c^3) in
        cPointhb h_x_5838.
Definition X_5839 :=
        let h_x_5839 a b c := 3×a^2-(b+c)^2 in
        cPointhb h_x_5839.
Definition X_5840 :=
        let h_x_5840 a b c := -2×a^7 + 2×a^6×b + 3×a^5×b^2 - 3×a^4×b^3 - a×b^6 + b^7 + 2×a^6×c - 4×a^5×b×c - a^4×b^2×c + 2×a^3×b^3×c + 2×a×b^5×c - b^6×c + 3×a^5×c^2 - a^4×b×c^2 + a×b^4×c^2 - 3×b^5×c^2 - 3×a^4×c^3 + 2×a^3×b×c^3 - 4×a×b^3×c^3 + 3×b^4×c^3 + a×b^2×c^4 + 3×b^3×c^4 + 2×a×b×c^5 - 3×b^2×c^5 - a×c^6 - b×c^6 + c^7 in
        cPointhb h_x_5840.
Definition X_5841 :=
        let h_x_5841 a b c := 2×a^7 - 2×a^6×b - 3×a^5×b^2 + 3×a^4×b^3 + a×b^6 - b^7 - 2×a^6×c + 4×a^5×b×c - 3×a^4×b^2×c - 2×a^3×b^3×c + 4×a^2×b^4×c - 2×a×b^5×c + b^6×c - 3×a^5×c^2 - 3×a^4×b×c^2 + 8×a^3×b^2×c^2 - 4×a^2×b^3×c^2 - a×b^4×c^2 + 3×b^5×c^2 + 3×a^4×c^3 - 2×a^3×b×c^3 - 4×a^2×b^2×c^3 + 4×a×b^3×c^3 - 3×b^4×c^3 + 4×a^2×b×c^4 - a×b^2×c^4 - 3×b^3×c^4 - 2×a×b×c^5 + 3×b^2×c^5 + a×c^6 + b×c^6 - c^7 in
        cPointhb h_x_5841.
Definition X_5842 :=
        let h_x_5842 a b c := 2×a^7 - 2×a^6×b - 3×a^5×b^2 + 3×a^4×b^3 + a×b^6 - b^7 - 2×a^6×c + a^4×b^2×c + b^6×c - 3×a^5×c^2 + a^4×b×c^2 - a×b^4×c^2 + 3×b^5×c^2 + 3×a^4×c^3 - 3×b^4×c^3 - a×b^2×c^4 - 3×b^3×c^4 + 3×b^2×c^5 + a×c^6 + b×c^6 - c^7 in
        cPointhb h_x_5842.
Definition X_5843 :=
        let h_x_5843 a b c := -2×a^6 + 7×a^4×b^2 - 2×a^3×b^3 - 6×a^2×b^4 + 2×a×b^5 + b^6 - 4×a^4×b×c - 2×a^3×b^2×c + 6×a^2×b^3×c + 2×a×b^4×c - 2×b^5×c + 7×a^4×c^2 - 2×a^3×b×c^2 - 4×a×b^3×c^2 - b^4×c^2 - 2×a^3×c^3 + 6×a^2×b×c^3 - 4×a×b^2×c^3 + 4×b^3×c^3 - 6×a^2×c^4 + 2×a×b×c^4 - b^2×c^4 + 2×a×c^5 - 2×b×c^5 + c^6 in
        cPointhb h_x_5843.
Definition X_5844 :=
        let h_x_5844 a b c := 2×a^4 - 4×a^3×b - a^2×b^2 + 4×a×b^3 - b^4 - 4×a^3×c + 8×a^2×b×c - 4×a×b^2×c - a^2×c^2 - 4×a×b×c^2 + 2×b^2×c^2 + 4×a×c^3 - c^4 in
        cPointhb h_x_5844.
Definition X_5845 :=
        let h_x_5845 a b c := 2×a^4 - 2×a^3×b + a^2×b^2 - b^4 - 2×a^3×c + 2×b^3×c + a^2×c^2 - 2×b^2×c^2 + 2×b×c^3 - c^4 in
        cPointhb h_x_5845.
Definition X_5846 :=
        let h_x_5846 a b c := -2×a^3 - a×b^2 + b^3 + b^2×c - a×c^2 + b×c^2 + c^3 in
        cPointhb h_x_5846.
Definition X_5847 :=
        let h_x_5847 a b c := -2×a^3 - a^2×b + b^3 - a^2×c + b^2×c + b×c^2 + c^3 in
        cPointhb h_x_5847.
Definition X_5848 :=
        let h_x_5848 a b c := -2×a^5 + 2×a^4×b + a^3×b^2 - a^2×b^3 - a×b^4 + b^5 + 2×a^4×c - 4×a^3×b×c + a^2×b^2×c + 2×a×b^3×c - b^4×c + a^3×c^2 + a^2×b×c^2 - 2×a×b^2×c^2 - a^2×c^3 + 2×a×b×c^3 - a×c^4 - b×c^4 + c^5 in
        cPointhb h_x_5848.
Definition X_5849 :=
        let h_x_5849 a b c := 2×a^6 - 3×a^4×b^2 + 2×a^2×b^4 - b^6 - 2×a^3×b^2×c + 2×a^2×b^3×c - 3×a^4×c^2 - 2×a^3×b×c^2 + b^4×c^2 + 2×a^2×b×c^3 + 2×a^2×c^4 + b^2×c^4 - c^6 in
        cPointhb h_x_5849.
Definition X_5850 :=
        let h_x_5850 a b c := -2×a^3 - 3×a^2×b + 4×a×b^2 + b^3 - 3×a^2×c - b^2×c + 4×a×c^2 - b×c^2 + c^3 in
        cPointhb h_x_5850.
Definition X_5851 :=
        let h_x_5851 a b c := -2×a^5 + 2×a^4×b + 5×a^3×b^2 - 7×a^2×b^3 + a×b^4 + b^5 + 2×a^4×c - 12×a^3×b×c + 7×a^2×b^2×c + 6×a×b^3×c - 3×b^4×c + 5×a^3×c^2 + 7×a^2×b×c^2 - 14×a×b^2×c^2 + 2×b^3×c^2 - 7×a^2×c^3 + 6×a×b×c^3 + 2×b^2×c^3 + a×c^4 - 3×b×c^4 + c^5 in
        cPointhb h_x_5851.
Definition X_5852 :=
        let h_x_5852 a b c := 2×a^3 + 2×a^2×b - 3×a×b^2 - b^3 + 2×a^2×c + b^2×c - 3×a×c^2 + b×c^2 - c^3 in
        cPointhb h_x_5852.
Definition X_5853 :=
        let h_x_5853 a b c := (-a + b + c)*(2×a^2 - a×b + b^2 - a×c - 2×b×c + c^2) in
        cPointhb h_x_5853.
Definition X_5854 :=
        let h_x_5854 a b c := (a - b - c)*(2×a^3 - 2×a^2×b - 3×a×b^2 + b^3 - 2×a^2×c + 8×a×b×c - b^2×c - 3×a×c^2 - b×c^2 + c^3) in
        cPointhb h_x_5854.
Definition X_5855 :=
        let h_x_5855 a b c := -2×a^4 + 4×a^3×b + a^2×b^2 - 4×a×b^3 + b^4 + 4×a^3×c - 4×a^2×b×c + 2×a×b^2×c + a^2×c^2 + 2×a×b×c^2 - 2×b^2×c^2 - 4×a×c^3 + c^4 in
        cPointhb h_x_5855.
Definition X_5856 :=
        let h_x_5856 a b c := (a - b - c)*(2×a^4 - 2×a^3×b - a^2×b^2 + b^4 - 2×a^3×c + 4×a^2×b×c - 4×b^3×c - a^2×c^2 + 6×b^2×c^2 - 4×b×c^3 + c^4) in
        cPointhb h_x_5856.
Definition X_5857 :=
        let h_x_5857 a b c := -2×a^6 + 2×a^5×b + 3×a^4×b^2 - 2×a^3×b^3 - 2×a^2×b^4 + b^6 + 2×a^5×c + 2×a^3×b^2×c - 2×a^2×b^3×c - 2×b^5×c + 3×a^4×c^2 + 2×a^3×b×c^2 - b^4×c^2 - 2×a^3×c^3 - 2×a^2×b×c^3 + 4×b^3×c^3 - 2×a^2×c^4 - b^2×c^4 - 2×b×c^5 + c^6 in
        cPointhb h_x_5857.
Definition X_5858 :=
        let h_x_5858 a b c := -6×a^2+3×b^2+3×c^2+2×sqrt(3)*(SS a b c) in
        cPointhb h_x_5858.
Definition X_5859 :=
        let h_x_5859 a b c := -6×a^2+3×b^2+3×c^2-2×sqrt(3)*(SS a b c) in
        cPointhb h_x_5859.
Definition X_5860 :=
        let h_x_5860 a b c := -2×a^2+b^2+c^2+(SS a b c) in
        cPointhb h_x_5860.
Definition X_5861 :=
        let h_x_5861 a b c := -2×a^2+b^2+c^2-(SS a b c) in
        cPointhb h_x_5861.
Definition X_5862 :=
        let h_x_5862 a b c := -6×a^2+3×b^2+3×c^2+sqrt(3)*(SS a b c) in
        cPointhb h_x_5862.
Definition X_5863 :=
        let h_x_5863 a b c := -6×a^2+3×b^2+3×c^2-sqrt(3)*(SS a b c) in
        cPointhb h_x_5863.
Definition X_5864 :=
        let h_x_5864 a b c := a^2*(3×a^2×b^2-3×b^4+3×a^2×c^2-3×c^4+sqrt(3)*(a^2-b^2-c^2)*(SS a b c)) in
        cPointhb h_x_5864.
Definition X_5865 :=
        let h_x_5865 a b c := a^2*(3×a^2×b^2-3×b^4+3×a^2×c^2-3×c^4-sqrt(3)*(a^2-b^2-c^2)*(SS a b c)) in
        cPointhb h_x_5865.
Definition X_5866 :=
        let h_x_5866 a b c := a^2*(a^2-b^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2+5×a^2×b^2×c^2-2×b^4×c^2-a^2×c^4-2×b^2×c^4+c^6) in
        cPointhb h_x_5866.
Definition X_5867 :=
        let h_x_5867 a b c := a^2*(a+b)*(a+c)*(2×a^3×b^2-2×a×b^4+5×a^3×b×c+3×a^2×b^2×c-3×a×b^3×c-b^4×c+2×a^3×c^2+3×a^2×b×c^2-a×b^2×c^2-b^3×c^2-3×a×b×c^3-b^2×c^3-2×a×c^4-b×c^4) in
        cPointhb h_x_5867.
Definition X_5868 :=
        let h_x_5868 a b c := -6×a^6+3×a^4×b^2+3×b^6+3×a^4×c^2-3×b^4×c^2-3×b^2×c^4+3×c^6-2×sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(SS a b c) in
        cPointhb h_x_5868.
Definition X_5869 :=
        let h_x_5869 a b c := -6×a^6+3×a^4×b^2+3×b^6+3×a^4×c^2-3×b^4×c^2-3×b^2×c^4+3×c^6+2×sqrt(3)*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(SS a b c) in
        cPointhb h_x_5869.
Definition X_5870 :=
        let h_x_5870 a b c := 2×a^6-a^4×b^2-b^6-a^4×c^2+b^4×c^2+b^2×c^4-c^6+(a^2+b^2-c^2)*(a^2-b^2+c^2)*(SS a b c) in
        cPointhb h_x_5870.
Definition X_5871 :=
        let h_x_5871 a b c := 2×a^6-a^4×b^2-b^6-a^4×c^2+b^4×c^2+b^2×c^4-c^6-(a^2+b^2-c^2)*(a^2-b^2+c^2)*(SS a b c) in
        cPointhb h_x_5871.
Definition X_5872 :=
        let h_x_5872 a b c := 6×a^6-9×a^4×b^2+6×a^2×b^4-3×b^6-9×a^4×c^2+3×b^4×c^2+6×a^2×c^4+3×b^2×c^4-3×c^6+2×sqrt(3)*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(SS a b c) in
        cPointhb h_x_5872.
Definition X_5873 :=
        let h_x_5873 a b c := 6×a^6-9×a^4×b^2+6×a^2×b^4-3×b^6-9×a^4×c^2+3×b^4×c^2+6×a^2×c^4+3×b^2×c^4-3×c^6-2×sqrt(3)*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(SS a b c) in
        cPointhb h_x_5873.
Definition X_5874 :=
        let h_x_5874 a b c := 2×a^6-3×a^4×b^2+2×a^2×b^4-b^6-3×a^4×c^2+b^4×c^2+2×a^2×c^4+b^2×c^4-c^6+(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(SS a b c) in
        cPointhb h_x_5874.
Definition X_5875 :=
        let h_x_5875 a b c := 2×a^6-3×a^4×b^2+2×a^2×b^4-b^6-3×a^4×c^2+b^4×c^2+2×a^2×c^4+b^2×c^4-c^6-(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(SS a b c) in
        cPointhb h_x_5875.
Definition X_5876 :=
        let h_x_5876 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-b^6×c^2-3×a^4×c^4+4×b^4×c^4+3×a^2×c^6-b^2×c^6-c^8) in
        cPointhb h_x_5876.
Definition X_5877 :=
        let h_x_5877 a b c := a^12-2×a^10×b^2+3×a^6×b^6-4×a^4×b^8+3×a^2×b^10-b^12-2×a^10×c^2+5×a^8×b^2×c^2-4×a^6×b^4×c^2+4×a^4×b^6×c^2-6×a^2×b^8×c^2+3×b^10×c^2-4×a^6×b^2×c^4+3×a^2×b^6×c^4-3×b^8×c^4+3×a^6×c^6+4×a^4×b^2×c^6+3×a^2×b^4×c^6+2×b^6×c^6-4×a^4×c^8-6×a^2×b^2×c^8-3×b^4×c^8+3×a^2×c^10+3×b^2×c^10-c^12 in
        cPointhb h_x_5877.
Definition X_5878 :=
        let h_x_5878 a b c := a^10+a^8×b^2-8×a^6×b^4+8×a^4×b^6-a^2×b^8-b^10+a^8×c^2+12×a^6×b^2×c^2-8×a^4×b^4×c^2-8×a^2×b^6×c^2+3×b^8×c^2-8×a^6×c^4-8×a^4×b^2×c^4+18×a^2×b^4×c^4-2×b^6×c^4+8×a^4×c^6-8×a^2×b^2×c^6-2×b^4×c^6-a^2×c^8+3×b^2×c^8-c^10 in
        cPointhb h_x_5878.
Definition X_5879 :=
        let h_x_5879 a b c := a^2*(a^10-3×a^8×b^2+2×a^6×b^4+2×a^4×b^6-3×a^2×b^8+b^10+a^8×c^2+8×a^6×b^2×c^2-18×a^4×b^4×c^2+8×a^2×b^6×c^2+b^8×c^2-8×a^6×c^4+8×a^4×b^2×c^4+8×a^2×b^4×c^4-8×b^6×c^4+8×a^4×c^6-12×a^2×b^2×c^6+8×b^4×c^6-a^2×c^8-b^2×c^8-c^10)*(a^10+a^8×b^2-8×a^6×b^4+8×a^4×b^6-a^2×b^8-b^10-3×a^8×c^2+8×a^6×b^2×c^2+8×a^4×b^4×c^2-12×a^2×b^6×c^2-b^8×c^2+2×a^6×c^4-18×a^4×b^2×c^4+8×a^2×b^4×c^4+8×b^6×c^4+2×a^4×c^6+8×a^2×b^2×c^6-8×b^4×c^6-3×a^2×c^8+b^2×c^8+c^10) in
        cPointhb h_x_5879.
Definition X_5880 :=
        let h_x_5880 a b c := a^3-b^3+2×a×b×c+b^2×c+b×c^2-c^3 in
        cPointhb h_x_5880.
Definition X_5881 :=
        let h_x_5881 a b c := 3×a^4-3×a^3×b-a^2×b^2+3×a×b^3-2×b^4-3×a^3×c+6×a^2×b×c-3×a×b^2×c-a^2×c^2-3×a×b×c^2+4×b^2×c^2+3×a×c^3-2×c^4 in
        cPointhb h_x_5881.
Definition X_5882 :=
        let h_x_5882 a b c := 4×a^4-3×a^3×b-3×a^2×b^2+3×a×b^3-b^4-3×a^3×c+6×a^2×b×c-3×a×b^2×c-3×a^2×c^2-3×a×b×c^2+2×b^2×c^2+3×a×c^3-c^4 in
        cPointhb h_x_5882.
Definition X_5883 :=
        let h_x_5883 a b c := a*(a^2×b-b^3+a^2×c+2×a×b×c+2×b^2×c+2×b×c^2-c^3) in
        cPointhb h_x_5883.
Definition X_5884 :=
        let h_x_5884 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c+a^3×b^2×c-a^2×b^3×c-2×a×b^4×c+b^5×c-a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2+b^4×c^2-2×a^3×c^3-a^2×b×c^3+a×b^2×c^3-2×b^3×c^3+2×a^2×c^4-2×a×b×c^4+b^2×c^4+a×c^5+b×c^5-c^6) in
        cPointhb h_x_5884.
Definition X_5885 :=
        let h_x_5885 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c+a^3×b^2×c-2×a^2×b^3×c-2×a×b^4×c+2×b^5×c-a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2+b^4×c^2-2×a^3×c^3-2×a^2×b×c^3+a×b^2×c^3-4×b^3×c^3+2×a^2×c^4-2×a×b×c^4+b^2×c^4+a×c^5+2×b×c^5-c^6) in
        cPointhb h_x_5885.
Definition X_5886 :=
        let h_x_5886 a b c := a^4-a^3×b-2×a^2×b^2+a×b^3+b^4-a^3×c+2×a^2×b×c-a×b^2×c-2×a^2×c^2-a×b×c^2-2×b^2×c^2+a×c^3+c^4 in
        cPointhb h_x_5886.
Definition X_5887 :=
        let h_x_5887 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c-2×a^4×b×c+2×a^3×b^2×c+2×a^2×b^3×c-3×a×b^4×c-a^4×c^2+2×a^3×b×c^2-4×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2-2×a^3×c^3+2×a^2×b×c^3+2×a×b^2×c^3+2×a^2×c^4-3×a×b×c^4+b^2×c^4+a×c^5-c^6) in
        cPointhb h_x_5887.
Definition X_5888 :=
        let h_x_5888 a b c := a^2*(a^4+a^2×b^2-2×b^4+a^2×c^2-11×b^2×c^2-2×c^4) in
        cPointhb h_x_5888.
Definition X_5889 :=
        let h_x_5889 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-a^4×b^2×c^2-a^2×b^4×c^2+b^6×c^2-3×a^4×c^4-a^2×b^2×c^4+3×a^2×c^6+b^2×c^6-c^8) in
        cPointhb h_x_5889.
Definition X_5890 :=
        let h_x_5890 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+a^4×b^2×c^2-3×a^2×b^4×c^2+b^6×c^2-3×a^4×c^4-3×a^2×b^2×c^4+3×a^2×c^6+b^2×c^6-c^8) in
        cPointhb h_x_5890.
Definition X_5891 :=
        let h_x_5891 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+2×b^2×c^2-c^4)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+4×b^2×c^2+c^4) in
        cPointhb h_x_5891.
Definition X_5892 :=
        let h_x_5892 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+4×a^4×b^2×c^2-9×a^2×b^4×c^2+4×b^6×c^2-3×a^4×c^4-9×a^2×b^2×c^4-6×b^4×c^4+3×a^2×c^6+4×b^2×c^6-c^8) in
        cPointhb h_x_5892.
Definition X_5893 :=
        let h_x_5893 a b c := 2×a^10+a^8×b^2-12×a^6×b^4+10×a^4×b^6+2×a^2×b^8-3×b^10+a^8×c^2+16×a^6×b^2×c^2-10×a^4×b^4×c^2-16×a^2×b^6×c^2+9×b^8×c^2-12×a^6×c^4-10×a^4×b^2×c^4+28×a^2×b^4×c^4-6×b^6×c^4+10×a^4×c^6-16×a^2×b^2×c^6-6×b^4×c^6+2×a^2×c^8+9×b^2×c^8-3×c^10 in
        cPointhb h_x_5893.
Definition X_5894 :=
        let h_x_5894 a b c := 4×a^10-5×a^8×b^2-8×a^6×b^4+14×a^4×b^6-4×a^2×b^8-b^10-5×a^8×c^2+24×a^6×b^2×c^2-14×a^4×b^4×c^2-8×a^2×b^6×c^2+3×b^8×c^2-8×a^6×c^4-14×a^4×b^2×c^4+24×a^2×b^4×c^4-2×b^6×c^4+14×a^4×c^6-8×a^2×b^2×c^6-2×b^4×c^6-4×a^2×c^8+3×b^2×c^8-c^10 in
        cPointhb h_x_5894.
Definition X_5895 :=
        let h_x_5895 a b c := (3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4)*(a^6-3×a^2×b^4+2×b^6+6×a^2×b^2×c^2-2×b^4×c^2-3×a^2×c^4-2×b^2×c^4+2×c^6) in
        cPointhb h_x_5895.
Definition X_5896 :=
        let h_x_5896 a b c := a^2*(a^4-2×a^2×b^2+b^4+2×a^2×c^2+2×b^2×c^2-3×c^4)*(a^4+2×a^2×b^2-3×b^4-2×a^2×c^2+2×b^2×c^2+c^4)*(3×a^6-3×a^4×b^2-3×a^2×b^4+3×b^6-4×a^4×c^2+8×a^2×b^2×c^2-4×b^4×c^2-a^2×c^4-b^2×c^4+2×c^6)*(3×a^6-4×a^4×b^2-a^2×b^4+2×b^6-3×a^4×c^2+8×a^2×b^2×c^2-b^4×c^2-3×a^2×c^4-4×b^2×c^4+3×c^6) in
        cPointhb h_x_5896.
Definition X_5897 :=
        let h_x_5897 a b c := a^2*(a^10-3×a^8×b^2+2×a^6×b^4+2×a^4×b^6-3×a^2×b^8+b^10+2×a^8×c^2+8×a^6×b^2×c^2-20×a^4×b^4×c^2+8×a^2×b^6×c^2+2×b^8×c^2-10×a^6×c^4+10×a^4×b^2×c^4+10×a^2×b^4×c^4-10×b^6×c^4+8×a^4×c^6-16×a^2×b^2×c^6+8×b^4×c^6+a^2×c^8+b^2×c^8-2×c^10)*(a^10+2×a^8×b^2-10×a^6×b^4+8×a^4×b^6+a^2×b^8-2×b^10-3×a^8×c^2+8×a^6×b^2×c^2+10×a^4×b^4×c^2-16×a^2×b^6×c^2+b^8×c^2+2×a^6×c^4-20×a^4×b^2×c^4+10×a^2×b^4×c^4+8×b^6×c^4+2×a^4×c^6+8×a^2×b^2×c^6-10×b^4×c^6-3×a^2×c^8+2×b^2×c^8+c^10) in
        cPointhb h_x_5897.
Definition X_5898 :=
        let h_x_5898 a b c := a^2*(a^14-3×a^12×b^2+a^10×b^4+5×a^8×b^6-5×a^6×b^8-a^4×b^10+3×a^2×b^12-b^14-3×a^12×c^2+15×a^8×b^4×c^2-20×a^6×b^6×c^2+15×a^4×b^8×c^2-12×a^2×b^10×c^2+5×b^12×c^2+a^10×c^4+15×a^8×b^2×c^4-17×a^6×b^4×c^4+a^4×b^6×c^4+9×a^2×b^8×c^4-9×b^10×c^4+5×a^8×c^6-20×a^6×b^2×c^6+a^4×b^4×c^6+5×b^8×c^6-5×a^6×c^8+15×a^4×b^2×c^8+9×a^2×b^4×c^8+5×b^6×c^8-a^4×c^10-12×a^2×b^2×c^10-9×b^4×c^10+3×a^2×c^12+5×b^2×c^12-c^14) in
        cPointhb h_x_5898.
Definition X_5899 :=
        let h_x_5899 a b c := a^2*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-2×a^6×c^2-3×a^4×b^2×c^2+a^2×b^4×c^2+4×b^6×c^2+a^2×b^2×c^4-6×b^4×c^4+2×a^2×c^6+4×b^2×c^6-c^8) in
        cPointhb h_x_5899.
Definition X_5900 :=
        let h_x_5900 a b c := (a^8-4×a^6×b^2+6×a^4×b^4-4×a^2×b^6+b^8-2×a^6×c^2-a^4×b^2×c^2-a^2×b^4×c^2-2×b^6×c^2+3×a^2×b^2×c^4+2×a^2×c^6+2×b^2×c^6-c^8)*(a^8-2×a^6×b^2+2×a^2×b^6-b^8-4×a^6×c^2-a^4×b^2×c^2+3×a^2×b^4×c^2+2×b^6×c^2+6×a^4×c^4-a^2×b^2×c^4-4×a^2×c^6-2×b^2×c^6+c^8) in
        cPointhb h_x_5900.
Definition X_5901 :=
        let h_x_5901 a b c := 2×a^4-2×a^3×b-3×a^2×b^2+2×a×b^3+b^4-2×a^3×c+4×a^2×b×c-2×a×b^2×c-3×a^2×c^2-2×a×b×c^2-2×b^2×c^2+2×a×c^3+c^4 in
        cPointhb h_x_5901.
Definition X_5902 :=
        let h_x_5902 a b c := a*(a^2×b-b^3+a^2×c+a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_5902.
Definition X_5903 :=
        let h_x_5903 a b c := a*(a^2×b-b^3+a^2×c-a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_5903.
Definition X_5904 :=
        let h_x_5904 a b c := a*(a^2×b-b^3+a^2×c+a×b×c-b^2×c-b×c^2-c^3) in
        cPointhb h_x_5904.
Definition X_5905 :=
        let h_x_5905 a b c := a^3+a^2×b-a×b^2-b^3+a^2×c+b^2×c-a×c^2+b×c^2-c^3 in
        cPointhb h_x_5905.
Definition X_5906 :=
        let h_x_5906 a b c := (a-b-c)*(a^6+a^5×b-a^4×b^2-2×a^3×b^3-a^2×b^4+a×b^5+b^6+a^5×c+2×a^4×b×c+a^3×b^2×c-a^2×b^3×c-2×a×b^4×c-b^5×c-a^4×c^2+a^3×b×c^2+4×a^2×b^2×c^2+a×b^3×c^2-b^4×c^2-2×a^3×c^3-a^2×b×c^3+a×b^2×c^3+2×b^3×c^3-a^2×c^4-2×a×b×c^4-b^2×c^4+a×c^5-b×c^5+c^6) in
        cPointhb h_x_5906.
Definition X_5907 :=
        let h_x_5907 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+a^2×b^4×c^2-2×b^6×c^2-3×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4+3×a^2×c^6-2×b^2×c^6-c^8) in
        cPointhb h_x_5907.
Definition X_5908 :=
        let h_x_5908 a b c := a*(a^8×b+2×a^7×b^2-2×a^6×b^3-6×a^5×b^4+6×a^3×b^6+2×a^2×b^7-2×a×b^8-b^9+a^8×c-2×a^7×b×c-2×a^6×b^2×c+6×a^5×b^3×c-6×a^3×b^5×c+2×a^2×b^6×c+2×a×b^7×c-b^8×c+2×a^7×c^2-2×a^6×b×c^2+2×a^3×b^4×c^2-2×a^2×b^5×c^2-4×a×b^6×c^2+4×b^7×c^2-2×a^6×c^3+6×a^5×b×c^3-4×a^3×b^3×c^3-2×a^2×b^4×c^3-2×a×b^5×c^3+4×b^6×c^3-6×a^5×c^4+2×a^3×b^2×c^4-2×a^2×b^3×c^4+12×a×b^4×c^4-6×b^5×c^4-6×a^3×b×c^5-2×a^2×b^2×c^5-2×a×b^3×c^5-6×b^4×c^5+6×a^3×c^6+2×a^2×b×c^6-4×a×b^2×c^6+4×b^3×c^6+2×a^2×c^7+2×a×b×c^7+4×b^2×c^7-2×a×c^8-b×c^8-c^9) in
        cPointhb h_x_5908.
Definition X_5909 :=
        let h_x_5909 a b c := a*(a^8×b+2×a^7×b^2-2×a^6×b^3-6×a^5×b^4+6×a^3×b^6+2×a^2×b^7-2×a×b^8-b^9+a^8×c-2×a^7×b×c-2×a^6×b^2×c+2×a^5×b^3×c+4×a^4×b^4×c+2×a^3×b^5×c-6×a^2×b^6×c-2×a×b^7×c+3×b^8×c+2×a^7×c^2-2×a^6×b×c^2+4×a^4×b^3×c^2-6×a^3×b^4×c^2-2×a^2×b^5×c^2+4×a×b^6×c^2-2×a^6×c^3+2×a^5×b×c^3+4×a^4×b^2×c^3-4×a^3×b^3×c^3+6×a^2×b^4×c^3+2×a×b^5×c^3-8×b^6×c^3-6×a^5×c^4+4×a^4×b×c^4-6×a^3×b^2×c^4+6×a^2×b^3×c^4-4×a×b^4×c^4+6×b^5×c^4+2×a^3×b×c^5-2×a^2×b^2×c^5+2×a×b^3×c^5+6×b^4×c^5+6×a^3×c^6-6×a^2×b×c^6+4×a×b^2×c^6-8×b^3×c^6+2×a^2×c^7-2×a×b×c^7-2×a×c^8+3×b×c^8-c^9) in
        cPointhb h_x_5909.
Definition X_5910 :=
        let h_x_5910 a b c := a^2*(a^18×b^2-9×a^16×b^4+36×a^14×b^6-84×a^12×b^8+126×a^10×b^10-126×a^8×b^12+84×a^6×b^14-36×a^4×b^16+9×a^2×b^18-b^20+a^18×c^2+4×a^16×b^2×c^2-28×a^14×b^4×c^2+32×a^12×b^6×c^2+46×a^10×b^8×c^2-136×a^8×b^10×c^2+116×a^6×b^12×c^2-32×a^4×b^14×c^2-7×a^2×b^16×c^2+4×b^18×c^2-9×a^16×c^4-28×a^14×b^2×c^4+104×a^12×b^4×c^4-172×a^10×b^6×c^4+270×a^8×b^8×c^4-212×a^6×b^10×c^4+16×a^4×b^12×c^4+28×a^2×b^14×c^4+3×b^16×c^4+36×a^14×c^6+32×a^12×b^2×c^6-172×a^10×b^4×c^6-16×a^8×b^6×c^6+12×a^6×b^8×c^6+288×a^4×b^10×c^6-132×a^2×b^12×c^6-48×b^14×c^6-84×a^12×c^8+46×a^10×b^2×c^8+270×a^8×b^4×c^8+12×a^6×b^6×c^8-472×a^4×b^8×c^8+102×a^2×b^10×c^8+126×b^12×c^8+126×a^10×c^10-136×a^8×b^2×c^10-212×a^6×b^4×c^10+288×a^4×b^6×c^10+102×a^2×b^8×c^10-168×b^10×c^10-126×a^8×c^12+116×a^6×b^2×c^12+16×a^4×b^4×c^12-132×a^2×b^6×c^12+126×b^8×c^12+84×a^6×c^14-32×a^4×b^2×c^14+28×a^2×b^4×c^14-48×b^6×c^14-36×a^4×c^16-7×a^2×b^2×c^16+3×b^4×c^16+9×a^2×c^18+4×b^2×c^18-c^20) in
        cPointhb h_x_5910.
Definition X_5911 :=
        let h_x_5911 a b c := a*(a^14×b-4×a^13×b^2+a^12×b^3+16×a^11×b^4-19×a^10×b^5-20×a^9×b^6+45×a^8×b^7-45×a^6×b^9+20×a^5×b^10+19×a^4×b^11-16×a^3×b^12-a^2×b^13+4×a×b^14-b^15+a^14×c+2×a^13×b×c-5×a^12×b^2×c-12×a^11×b^3×c+9×a^10×b^4×c+30×a^9×b^5×c-5×a^8×b^6×c-40×a^7×b^7×c-5×a^6×b^8×c+30×a^5×b^9×c+9×a^4×b^10×c-12×a^3×b^11×c-5×a^2×b^12×c+2×a×b^13×c+b^14×c-4×a^13×c^2-5×a^12×b×c^2+8×a^11×b^2×c^2+10×a^10×b^3×c^2-20×a^9×b^4×c^2-15×a^8×b^5×c^2+48×a^7×b^6×c^2+28×a^6×b^7×c^2-44×a^5×b^8×c^2-19×a^4×b^9×c^2+8×a^3×b^10×c^2-6×a^2×b^11×c^2+4×a×b^12×c^2+7×b^13×c^2+a^12×c^3-12×a^11×b×c^3+10×a^10×b^2×c^3+20×a^9×b^3×c^3-25×a^8×b^4×c^3+8×a^7×b^5×c^3+12×a^6×b^6×c^3-24×a^5×b^7×c^3-a^4×b^8×c^3+4×a^3×b^9×c^3+10×a^2×b^10×c^3+4×a×b^11×c^3-7×b^12×c^3+16×a^11×c^4+9×a^10×b×c^4-20×a^9×b^2×c^4-25×a^8×b^3×c^4-32×a^7×b^4×c^4+10×a^6×b^5×c^4+24×a^5×b^6×c^4-2×a^4×b^7×c^4+48×a^3×b^8×c^4+29×a^2×b^9×c^4-36×a×b^10×c^4-21×b^11×c^4-19×a^10×c^5+30×a^9×b×c^5-15×a^8×b^2×c^5+8×a^7×b^3×c^5+10×a^6×b^4×c^5-12×a^5×b^5×c^5-6×a^4×b^6×c^5+8×a^3×b^7×c^5+9×a^2×b^8×c^5-34×a×b^9×c^5+21×b^10×c^5-20×a^9×c^6-5×a^8×b×c^6+48×a^7×b^2×c^6+12×a^6×b^3×c^6+24×a^5×b^4×c^6-6×a^4×b^5×c^6-80×a^3×b^6×c^6-36×a^2×b^7×c^6+28×a×b^8×c^6+35×b^9×c^6+45×a^8×c^7-40×a^7×b×c^7+28×a^6×b^2×c^7-24×a^5×b^3×c^7-2×a^4×b^4×c^7+8×a^3×b^5×c^7-36×a^2×b^6×c^7+56×a×b^7×c^7-35×b^8×c^7-5×a^6×b×c^8-44×a^5×b^2×c^8-a^4×b^3×c^8+48×a^3×b^4×c^8+9×a^2×b^5×c^8+28×a×b^6×c^8-35×b^7×c^8-45×a^6×c^9+30×a^5×b×c^9-19×a^4×b^2×c^9+4×a^3×b^3×c^9+29×a^2×b^4×c^9-34×a×b^5×c^9+35×b^6×c^9+20×a^5×c^10+9×a^4×b×c^10+8×a^3×b^2×c^10+10×a^2×b^3×c^10-36×a×b^4×c^10+21×b^5×c^10+19×a^4×c^11-12×a^3×b×c^11-6×a^2×b^2×c^11+4×a×b^3×c^11-21×b^4×c^11-16×a^3×c^12-5×a^2×b×c^12+4×a×b^2×c^12-7×b^3×c^12-a^2×c^13+2×a×b×c^13+7×b^2×c^13+4×a×c^14+b×c^14-c^15) in
        cPointhb h_x_5911.
Definition X_5912 :=
        let h_x_5912 a b c := 2×a^10-4×a^8×b^2-3×a^6×b^4+2×a^4×b^6-a^2×b^8-4×a^8×c^2+18×a^6×b^2×c^2-6×a^4×b^4×c^2+11×a^2×b^6×c^2-3×b^8×c^2-3×a^6×c^4-6×a^4×b^2×c^4-18×a^2×b^4×c^4+3×b^6×c^4+2×a^4×c^6+11×a^2×b^2×c^6+3×b^4×c^6-a^2×c^8-3×b^2×c^8 in
        cPointhb h_x_5912.
Definition X_5913 :=
        let h_x_5913 a b c := 3×a^4×b^2+2×a^2×b^4-b^6+3×a^4×c^2-10×a^2×b^2×c^2+b^4×c^2+2×a^2×c^4+b^2×c^4-c^6 in
        cPointhb h_x_5913.
Definition X_5914 :=
        let h_x_5914 a b c := 4×a^10-8×a^8×b^2-3×a^6×b^4+4×a^4×b^6-5×a^2×b^8-8×a^8×c^2+30×a^6×b^2×c^2-12×a^4×b^4×c^2+25×a^2×b^6×c^2-3×b^8×c^2-3×a^6×c^4-12×a^4×b^2×c^4-36×a^2×b^4×c^4+3×b^6×c^4+4×a^4×c^6+25×a^2×b^2×c^6+3×b^4×c^6-5×a^2×c^8-3×b^2×c^8 in
        cPointhb h_x_5914.
Definition X_5915 :=
        let h_x_5915 a b c := 4×a^12-8×a^10×b^2+7×a^8×b^4-11×a^6×b^6+13×a^4×b^8-5×a^2×b^10-8×a^10×c^2+10×a^8×b^2×c^2+3×a^6×b^4×c^2-17×a^4×b^6×c^2+7×a^2×b^8×c^2-3×b^10×c^2+7×a^8×c^4+3×a^6×b^2×c^4+12×a^4×b^4×c^4-2×a^2×b^6×c^4+12×b^8×c^4-11×a^6×c^6-17×a^4×b^2×c^6-2×a^2×b^4×c^6-18×b^6×c^6+13×a^4×c^8+7×a^2×b^2×c^8+12×b^4×c^8-5×a^2×c^10-3×b^2×c^10 in
        cPointhb h_x_5915.
Definition X_5916 :=
        let h_x_5916 a b c := 12*(a^12-2×a^10×b^2+2×a^4×b^8-a^2×b^10-2×a^10×c^2+6×a^8×b^2×c^2-2×a^6×b^4×c^2-3×a^4×b^6×c^2-b^10×c^2-2×a^6×b^2×c^4+3×a^4×b^4×c^4+a^2×b^6×c^4+6×b^8×c^4-3×a^4×b^2×c^6+a^2×b^4×c^6-10×b^6×c^6+2×a^4×c^8+6×b^4×c^8-a^2×c^10-b^2×c^10)*(SS a b c)-2×sqrt(3)*(a^14-a^12×b^2+2×a^10×b^4-10×a^8×b^6+14×a^6×b^8-7×a^4×b^10+a^2×b^12-a^12×c^2-6×a^10×b^2×c^2+14×a^8×b^4×c^2-13×a^6×b^6×c^2+3×a^4×b^8×c^2+2×a^2×b^10×c^2-3×b^12×c^2+2×a^10×c^4+14×a^8×b^2×c^4-9×a^6×b^4×c^4+5×a^4×b^6×c^4-7×a^2×b^8×c^4+9×b^10×c^4-10×a^8×c^6-13×a^6×b^2×c^6+5×a^4×b^4×c^6+8×a^2×b^6×c^6-6×b^8×c^6+14×a^6×c^8+3×a^4×b^2×c^8-7×a^2×b^4×c^8-6×b^6×c^8-7×a^4×c^10+2×a^2×b^2×c^10+9×b^4×c^10+a^2×c^12-3×b^2×c^12) in
        cPointhb h_x_5916.
Definition X_5917 :=
        let h_x_5917 a b c := 12*(a^12-2×a^10×b^2+2×a^4×b^8-a^2×b^10-2×a^10×c^2+6×a^8×b^2×c^2-2×a^6×b^4×c^2-3×a^4×b^6×c^2-b^10×c^2-2×a^6×b^2×c^4+3×a^4×b^4×c^4+a^2×b^6×c^4+6×b^8×c^4-3×a^4×b^2×c^6+a^2×b^4×c^6-10×b^6×c^6+2×a^4×c^8+6×b^4×c^8-a^2×c^10-b^2×c^10)*(SS a b c)+2×sqrt(3)*(a^14-a^12×b^2+2×a^10×b^4-10×a^8×b^6+14×a^6×b^8-7×a^4×b^10+a^2×b^12-a^12×c^2-6×a^10×b^2×c^2+14×a^8×b^4×c^2-13×a^6×b^6×c^2+3×a^4×b^8×c^2+2×a^2×b^10×c^2-3×b^12×c^2+2×a^10×c^4+14×a^8×b^2×c^4-9×a^6×b^4×c^4+5×a^4×b^6×c^4-7×a^2×b^8×c^4+9×b^10×c^4-10×a^8×c^6-13×a^6×b^2×c^6+5×a^4×b^4×c^6+8×a^2×b^6×c^6-6×b^8×c^6+14×a^6×c^8+3×a^4×b^2×c^8-7×a^2×b^4×c^8-6×b^6×c^8-7×a^4×c^10+2×a^2×b^2×c^10+9×b^4×c^10+a^2×c^12-3×b^2×c^12) in
        cPointhb h_x_5917.
Definition X_5918 :=
        let h_x_5918 a b c := a*(a^4×b-2×a^3×b^2+2×a×b^4-b^5+a^4×c+8×a^3×b×c-4×a^2×b^2×c-4×a×b^3×c-b^4×c-2×a^3×c^2-4×a^2×b×c^2+4×a×b^2×c^2+2×b^3×c^2-4×a×b×c^3+2×b^2×c^3+2×a×c^4-b×c^4-c^5) in
        cPointhb h_x_5918.
Definition X_5919 :=
        let h_x_5919 a b c := a*(a^2×b-b^3+a^2×c-8×a×b×c+b^2×c+b×c^2-c^3) in
        cPointhb h_x_5919.
Definition X_5920 :=
        let h_x_5920 a b c := a*(a-b-c)*(a^7×b-a^6×b^2-3×a^5×b^3+3×a^4×b^4+3×a^3×b^5-3×a^2×b^6-a×b^7+b^8+a^7×c-2×a^6×b×c-11×a^5×b^2×c+2×a^4×b^3×c+19×a^3×b^4×c+2×a^2×b^5×c-9×a×b^6×c-2×b^7×c-a^6×c^2-11×a^5×b×c^2+22×a^4×b^2×c^2+26×a^3×b^3×c^2+11×a^2×b^4×c^2+17×a×b^5×c^2-3×a^5×c^3+2×a^4×b×c^3+26×a^3×b^2×c^3-20×a^2×b^3×c^3-7×a×b^4×c^3+2×b^5×c^3+3×a^4×c^4+19×a^3×b×c^4+11×a^2×b^2×c^4-7×a×b^3×c^4-2×b^4×c^4+3×a^3×c^5+2×a^2×b×c^5+17×a×b^2×c^5+2×b^3×c^5-3×a^2×c^6-9×a×b×c^6-a×c^7-2×b×c^7+c^8) in
        cPointhb h_x_5920.
Definition X_5921 :=
        let h_x_5921 a b c := 5×a^6-5×a^4×b^2+3×a^2×b^4-3×b^6-5×a^4×c^2+2×a^2×b^2×c^2+3×b^4×c^2+3×a^2×c^4+3×b^2×c^4-3×c^6 in
        cPointhb h_x_5921.
Definition X_5922 :=
        let h_x_5922 a b c := (a^4-2×a^2×b^2+b^4+2×a^2×c^2+2×b^2×c^2-3×c^4)*(a^4+2×a^2×b^2-3×b^4-2×a^2×c^2+2×b^2×c^2+c^4)*(7×a^10-10×a^8×b^2+2×a^6×b^4-a^2×b^8+2×b^10-10×a^8×c^2+12×a^6×b^2×c^2+4×a^2×b^6×c^2-6×b^8×c^2+2×a^6×c^4-6×a^2×b^4×c^4+4×b^6×c^4+4×a^2×b^2×c^6+4×b^4×c^6-a^2×c^8-6×b^2×c^8+2×c^10) in
        cPointhb h_x_5922.
Definition X_5923 :=
        let h_x_5923 a b c := (a^3-a^2×b-a×b^2+b^3+a^2×c+2×a×b×c+b^2×c-a×c^2-b×c^2-c^3)*(a^3+a^2×b-a×b^2-b^3-a^2×c+2×a×b×c-b^2×c-a×c^2+b×c^2+c^3)*(3×a^7-7×a^5×b^2+2×a^4×b^3+5×a^3×b^4-4×a^2×b^5-a×b^6+2×b^7-2×a^5×b×c+6×a^4×b^2×c-4×a^3×b^3×c-4×a^2×b^4×c+6×a×b^5×c-2×b^6×c-7×a^5×c^2+6×a^4×b×c^2-2×a^3×b^2×c^2+8×a^2×b^3×c^2+a×b^4×c^2-6×b^5×c^2+2×a^4×c^3-4×a^3×b×c^3+8×a^2×b^2×c^3-12×a×b^3×c^3+6×b^4×c^3+5×a^3×c^4-4×a^2×b×c^4+a×b^2×c^4+6×b^3×c^4-4×a^2×c^5+6×a×b×c^5-6×b^2×c^5-a×c^6-2×b×c^6+2×c^7) in
        cPointhb h_x_5923.
Definition X_5924 :=
        let h_x_5924 a b c := 3×a^10-3×a^9×b-10×a^8×b^2+8×a^7×b^3+14×a^6×b^4-6×a^5×b^5-12×a^4×b^6+7×a^2×b^8+a×b^9-2×b^10-3×a^9×c+4×a^8×b×c+2×a^5×b^4×c-8×a^4×b^5×c+8×a^3×b^6×c-7×a×b^8×c+4×b^9×c-10×a^8×c^2+4×a^6×b^2×c^2-12×a^5×b^3×c^2+12×a^4×b^4×c^2+8×a^3×b^5×c^2-12×a^2×b^6×c^2+4×a×b^7×c^2+6×b^8×c^2+8×a^7×c^3-12×a^5×b^2×c^3+16×a^4×b^3×c^3-16×a^3×b^4×c^3+20×a×b^6×c^3-16×b^7×c^3+14×a^6×c^4+2×a^5×b×c^4+12×a^4×b^2×c^4-16×a^3×b^3×c^4+10×a^2×b^4×c^4-18×a×b^5×c^4-4×b^6×c^4-6×a^5×c^5-8×a^4×b×c^5+8×a^3×b^2×c^5-18×a×b^4×c^5+24×b^5×c^5-12×a^4×c^6+8×a^3×b×c^6-12×a^2×b^2×c^6+20×a×b^3×c^6-4×b^4×c^6+4×a×b^2×c^7-16×b^3×c^7+7×a^2×c^8-7×a×b×c^8+6×b^2×c^8+a×c^9+4×b×c^9-2×c^10 in
        cPointhb h_x_5924.
Definition X_5925 :=
        let h_x_5925 a b c := 5×a^10-6×a^8×b^2-10×a^6×b^4+16×a^4×b^6-3×a^2×b^8-2×b^10-6×a^8×c^2+28×a^6×b^2×c^2-16×a^4×b^4×c^2-12×a^2×b^6×c^2+6×b^8×c^2-10×a^6×c^4-16×a^4×b^2×c^4+30×a^2×b^4×c^4-4×b^6×c^4+16×a^4×c^6-12×a^2×b^2×c^6-4×b^4×c^6-3×a^2×c^8+6×b^2×c^8-2×c^10 in
        cPointhb h_x_5925.
Definition X_5926 :=
        let h_x_5926 a b c := a^2*(b^2-c^2)*(2×a^6-4×a^4×b^2+2×a^2×b^4-4×a^4×c^2+a^2×b^2×c^2-b^4×c^2+2×a^2×c^4-b^2×c^4) in
        cPointhb h_x_5926.
Definition X_5927 :=
        let h_x_5927 a b c := a*(a^4×b-2×a^3×b^2+2×a×b^4-b^5+a^4×c+2×a^2×b^2×c-3×b^4×c-2×a^3×c^2+2×a^2×b×c^2-4×a×b^2×c^2+4×b^3×c^2+4×b^2×c^3+2×a×c^4-3×b×c^4-c^5) in
        cPointhb h_x_5927.
Definition X_5928 :=
        let h_x_5928 a b c := a^6+a^5×b-a^4×b^2+a^2×b^4-a×b^5-b^6+a^5×c-a×b^4×c-a^4×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2+2×a×b^2×c^3+a^2×c^4-a×b×c^4+b^2×c^4-a×c^5-c^6 in
        cPointhb h_x_5928.
Definition X_5929 :=
        let h_x_5929 a b c := a*(b+c)*(a^5×b+2×a^4×b^2-2×a^2×b^4-a×b^5+a^5×c+2×a^2×b^3×c-a×b^4×c-2×b^5×c+2×a^4×c^2-2×a^2×b^2×c^2+2×a×b^3×c^2+2×b^4×c^2+2×a^2×b×c^3+2×a×b^2×c^3-2×a^2×c^4-a×b×c^4+2×b^2×c^4-a×c^5-2×b×c^5) in
        cPointhb h_x_5929.
Definition X_5930 :=
        let h_x_5930 a b c := (a+b-c)*(a-b+c)*(b+c)*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4) in
        cPointhb h_x_5930.
Definition X_5931 :=
        let h_x_5931 a b c := (a+b)*(a-b-c)*(a+c)*(a^4-2×a^2×b^2+b^4+2×a^2×c^2+2×b^2×c^2-3×c^4)*(a^4+2×a^2×b^2-3×b^4-2×a^2×c^2+2×b^2×c^2+c^4) in
        cPointhb h_x_5931.
Definition X_5932 :=
        let h_x_5932 a b c := (a+b-c)*(a-b+c)*(a^6-2×a^5×b-a^4×b^2+4×a^3×b^3-a^2×b^4-2×a×b^5+b^6-2×a^5×c-2×a^4×b×c+2×a×b^4×c+2×b^5×c-a^4×c^2+2×a^2×b^2×c^2-b^4×c^2+4×a^3×c^3-4×b^3×c^3-a^2×c^4+2×a×b×c^4-b^2×c^4-2×a×c^5+2×b×c^5+c^6) in
        cPointhb h_x_5932.
Definition X_5933 :=
        let h_x_5933 a b c := (a+b-c)*(a-b+c)*(a^3-3×a^2×b-3×a×b^2+b^3-3×a^2×c-4×a×b×c+b^2×c-3×a×c^2+b×c^2+c^3) in
        cPointhb h_x_5933.
Definition X_5934 :=
        let h_x_5934 a b c := -(a×c*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5-3×a^4×c-2×a^2×b^2×c+5×b^4×c+2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-6×b^3×c^2+2×a^2×c^3-6×b^2×c^3-3×a×c^4+5×b×c^4+c^5)*(sqrt((b×c)/((s a b c)*(sa a b c)))+sqrt((a×c)/((s a b c)*(sb a b c)))-sqrt((a×b)/((s a b c)*(sc a b c))))-a×c*(a^5+5×a^4×b-6×a^3×b^2-6×a^2×b^3+5×a×b^4+b^5-3×a^4×c+6×a^2×b^2×c-3×b^4×c+2×a^3×c^2-2×a^2×b×c^2-2×a×b^2×c^2+2×b^3×c^2+2×a^2×c^3+2×b^2×c^3-3×a×c^4-3×b×c^4+c^5)*(-sqrt(((b×c)/((s a b c)*(sa a b c))))+sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c)))))*(-a×b*(a-b+c)*(c/(1+sqrt(((sa a b c)*(sb a b c))/(a×b)))+b/(1+sqrt(((sa a b c)*(sc a b c))/(a×c)))-a/(1+sqrt(((sb a b c)*(sc a b c))/(b×c))))+a×b*(-a+b+c)*(c/(1+sqrt(((sa a b c)*(sb a b c))/(a×b)))-b/(1+sqrt(((sa a b c)*(sc a b c))/(a×c)))+a/(1+sqrt(((sb a b c)*(sc a b c))/(b×c)))))+(-a×b*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5-3×a^4×c-2×a^2×b^2×c+5×b^4×c+2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-6×b^3×c^2+2×a^2×c^3-6×b^2×c^3-3×a×c^4+5×b×c^4+c^5)*(sqrt((b×c)/((s a b c)*(sa a b c)))-sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c))))+a×b*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5+5×a^4×c-2×a^2×b^2×c-3×b^4×c-6×a^3×c^2+6×a^2×b×c^2-2×a×b^2×c^2+2×b^3×c^2-6×a^2×c^3+2×b^2×c^3+5×a×c^4-3×b×c^4+c^5)*(-sqrt(((b×c)/((s a b c)*(sa a b c))))+sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c)))))*(a*(a+b-c)*c*(c/(1+sqrt(((sa a b c)*(sb a b c))/(a×b)))+b/(1+sqrt(((sa a b c)*(sc a b c))/(a×c)))-a/(1+sqrt(((sb a b c)*(sc a b c))/(b×c))))-a×c*(-a+b+c)*(-(c/(1+sqrt(((sa a b c)*(sb a b c))/(a×b))))+b/(1+sqrt(((sa a b c)*(sc a b c))/(a×c)))+a/(1+sqrt(((sb a b c)*(sc a b c))/(b×c))))) in
        cPointhb h_x_5934.
Definition X_5935 :=
        let h_x_5935 a b c := (a×c*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5-3×a^4×c-2×a^2×b^2×c+5×b^4×c+2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-6×b^3×c^2+2×a^2×c^3-6×b^2×c^3-3×a×c^4+5×b×c^4+c^5)*(sqrt((b×c)/((s a b c)*(sa a b c)))+sqrt((a×c)/((s a b c)*(sb a b c)))-sqrt((a×b)/((s a b c)*(sc a b c))))-a×c*(a^5+5×a^4×b-6×a^3×b^2-6×a^2×b^3+5×a×b^4+b^5-3×a^4×c+6×a^2×b^2×c-3×b^4×c+2×a^3×c^2-2×a^2×b×c^2-2×a×b^2×c^2+2×b^3×c^2+2×a^2×c^3+2×b^2×c^3-3×a×c^4-3×b×c^4+c^5)*(-sqrt(((b×c)/((s a b c)*(sa a b c))))+sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c)))))*(-a×b*(a-b+c)*(sqrt(((sa a b c)*(sb a b c))/(a×b))+sqrt(((sa a b c)*(sc a b c))/(a×c))-sqrt(((sb a b c)*(sc a b c))/(b×c)))+a×b*(-a+b+c)*(sqrt(((sa a b c)*(sb a b c))/(a×b))-sqrt(((sa a b c)*(sc a b c))/(a×c))+sqrt(((sb a b c)*(sc a b c))/(b×c))))-(-a×b*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5-3×a^4×c-2×a^2×b^2×c+5×b^4×c+2×a^3×c^2-2×a^2×b×c^2+6×a×b^2×c^2-6×b^3×c^2+2×a^2×c^3-6×b^2×c^3-3×a×c^4+5×b×c^4+c^5)*(sqrt((b×c)/((s a b c)*(sa a b c)))-sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c))))+a×b*(a^5-3×a^4×b+2×a^3×b^2+2×a^2×b^3-3×a×b^4+b^5+5×a^4×c-2×a^2×b^2×c-3×b^4×c-6×a^3×c^2+6×a^2×b×c^2-2×a×b^2×c^2+2×b^3×c^2-6×a^2×c^3+2×b^2×c^3+5×a×c^4-3×b×c^4+c^5)*(-sqrt(((b×c)/((s a b c)*(sa a b c))))+sqrt((a×c)/((s a b c)*(sb a b c)))+sqrt((a×b)/((s a b c)*(sc a b c)))))*(a*(a+b-c)*c*(sqrt(((sa a b c)*(sb a b c))/(a×b))+sqrt(((sa a b c)*(sc a b c))/(a×c))-sqrt(((sb a b c)*(sc a b c))/(b×c)))-a×c*(-a+b+c)*(-sqrt((((sa a b c)*(sb a b c))/(a×b)))+sqrt(((sa a b c)*(sc a b c))/(a×c))+sqrt(((sb a b c)*(sc a b c))/(b×c)))) in
        cPointhb h_x_5935.
Definition X_5936 :=
        let h_x_5936 a b c := (a+3×b+c)*(a+b+3×c) in
        cPointhb h_x_5936.
Definition X_5937 :=
        let h_x_5937 a b c := a^2*(a+b)*(a+c)*(a^4×b^2+a^3×b^3-a^2×b^4-a×b^5+2×a^4×b×c+a^3×b^2×c-a^2×b^3×c-a×b^4×c-b^5×c+a^4×c^2+a^3×b×c^2+a^2×b^2×c^2+a×b^3×c^2-b^4×c^2+a^3×c^3-a^2×b×c^3+a×b^2×c^3+b^3×c^3-a^2×c^4-a×b×c^4-b^2×c^4-a×c^5-b×c^5) in
        cPointhb h_x_5937.
Definition X_5938 :=
        let h_x_5938 a b c := a^2*(a^8-b^8+a^4×b^2×c^2-a^2×b^4×c^2-a^2×b^2×c^4+2×b^4×c^4-c^8) in
        cPointhb h_x_5938.
Definition X_5939 :=
        let h_x_5939 a b c := 2×a^8-a^6×b^2+a^4×b^4-2×a^2×b^6-a^6×c^2-2×a^4×b^2×c^2+a^2×b^4×c^2-b^6×c^2+a^4×c^4+a^2×b^2×c^4+4×b^4×c^4-2×a^2×c^6-b^2×c^6 in
        cPointhb h_x_5939.
Definition X_5940 :=
        let h_x_5940 a b c := a^2*(a^8-6×a^6×b^2+6×a^2×b^6-b^8-6×a^6×c^2+43×a^4×b^2×c^2-28×a^2×b^4×c^2+3×b^6×c^2-28×a^2×b^2×c^4+8×b^4×c^4+6×a^2×c^6+3×b^2×c^6-c^8) in
        cPointhb h_x_5940.
Definition X_5941 :=
        let h_x_5941 a b c := a^2*(a^12-2×a^10×b^2+a^8×b^4-a^4×b^8+2×a^2×b^10-b^12-2×a^10×c^2+7×a^8×b^2×c^2-5×a^6×b^4×c^2+9×a^4×b^6×c^2-5×a^2×b^8×c^2+4×b^10×c^2+a^8×c^4-5×a^6×b^2×c^4-12×a^4×b^4×c^4+3×a^2×b^6×c^4-11×b^8×c^4+9×a^4×b^2×c^6+3×a^2×b^4×c^6+16×b^6×c^6-a^4×c^8-5×a^2×b^2×c^8-11×b^4×c^8+2×a^2×c^10+4×b^2×c^10-c^12) in
        cPointhb h_x_5941.
Definition X_5942 :=
        let h_x_5942 a b c := c*(a-b+c)*(-a+b+c)*(a^2+b^2-c^2)+b*(a+b-c)*(-a+b+c)*(a^2-b^2+c^2)-a*(a+b-c)*(a-b+c)*(-a^2+b^2+c^2) in
        cPointhb h_x_5942.
Definition X_5943 :=
        let h_x_5943 a b c := a^2*(a^2×b^2-b^4+a^2×c^2+4×b^2×c^2-c^4) in
        cPointhb h_x_5943.
Definition X_5944 :=
        let h_x_5944 a b c := a^2*(2×a^8-5×a^6×b^2+3×a^4×b^4+a^2×b^6-b^8-5×a^6×c^2+4×a^4×b^2×c^2+b^6×c^2+3×a^4×c^4+a^2×c^6+b^2×c^6-c^8) in
        cPointhb h_x_5944.
Definition X_5945 :=
        let h_x_5945 a b c := a^2/(A a b c)*(b^2/(B a b c)+c^2/(C a b c)-a^2/(A a b c)) in
        cPointhb h_x_5945.
Definition X_5946 :=
        let h_x_5946 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2-4×a^2×b^4×c^2+3×b^6×c^2-3×a^4×c^4-4×a^2×b^2×c^4-4×b^4×c^4+3×a^2×c^6+3×b^2×c^6-c^8) in
        cPointhb h_x_5946.
Definition X_5947 :=
        let h_x_5947 a b c := 3×a^7×b^2+3×a^6×b^3-9×a^5×b^4-9×a^4×b^5+9×a^3×b^6+9×a^2×b^7-3×a×b^8-3×b^9+2×a^7×b×c+5×a^6×b^2×c-6×a^5×b^3×c-17×a^4×b^4×c+2×a^3×b^5×c+15×a^2×b^6×c+2×a×b^7×c-3×b^8×c+3×a^7×c^2+5×a^6×b×c^2-2×a^5×b^2×c^2-14×a^4×b^3×c^2-18×a^3×b^4×c^2-2×a^2×b^5×c^2+16×a×b^6×c^2+12×b^7×c^2+3×a^6×c^3-6×a^5×b×c^3-14×a^4×b^2×c^3-26×a^3×b^3×c^3-22×a^2×b^4×c^3-2×a×b^5×c^3+12×b^6×c^3-9×a^5×c^4-17×a^4×b×c^4-18×a^3×b^2×c^4-22×a^2×b^3×c^4-26×a×b^4×c^4-18×b^5×c^4-9×a^4×c^5+2×a^3×b×c^5-2×a^2×b^2×c^5-2×a×b^3×c^5-18×b^4×c^5+9×a^3×c^6+15×a^2×b×c^6+16×a×b^2×c^6+12×b^3×c^6+9×a^2×c^7+2×a×b×c^7+12×b^2×c^7-3×a×c^8-3×b×c^8-3×c^9 in
        cPointhb h_x_5947.
Definition X_5948 :=
        let h_x_5948 a b c := a^11×b^2+a^10×b^3-5×a^9×b^4-5×a^8×b^5+10×a^7×b^6+10×a^6×b^7-10×a^5×b^8-10×a^4×b^9+5×a^3×b^10+5×a^2×b^11-a×b^12-b^13+2×a^11×b×c+3×a^10×b^2×c-8×a^9×b^3×c-13×a^8×b^4×c+12×a^7×b^5×c+22×a^6×b^6×c-8×a^5×b^7×c-18×a^4×b^8×c+2×a^3×b^9×c+7×a^2×b^10×c-b^12×c+a^11×c^2+3×a^10×b×c^2-2×a^9×b^2×c^2-14×a^8×b^3×c^2-5×a^7×b^4×c^2+17×a^6×b^5×c^2+18×a^5×b^6×c^2+2×a^4×b^7×c^2-18×a^3×b^8×c^2-14×a^2×b^9×c^2+6×a×b^10×c^2+6×b^11×c^2+a^10×c^3-8×a^9×b×c^3-14×a^8×b^2×c^3-6×a^7×b^3×c^3+11×a^6×b^4×c^3+22×a^5×b^5×c^3+18×a^4×b^6×c^3-8×a^3×b^7×c^3-22×a^2×b^8×c^3+6×b^10×c^3-5×a^9×c^4-13×a^8×b×c^4-5×a^7×b^2×c^4+11×a^6×b^3×c^4+16×a^5×b^4×c^4+8×a^4×b^5×c^4+13×a^3×b^6×c^4+5×a^2×b^7×c^4-15×a×b^8×c^4-15×b^9×c^4-5×a^8×c^5+12×a^7×b×c^5+17×a^6×b^2×c^5+22×a^5×b^3×c^5+8×a^4×b^4×c^5+12×a^3×b^5×c^5+19×a^2×b^6×c^5-15×b^8×c^5+10×a^7×c^6+22×a^6×b×c^6+18×a^5×b^2×c^6+18×a^4×b^3×c^6+13×a^3×b^4×c^6+19×a^2×b^5×c^6+20×a×b^6×c^6+20×b^7×c^6+10×a^6×c^7-8×a^5×b×c^7+2×a^4×b^2×c^7-8×a^3×b^3×c^7+5×a^2×b^4×c^7+20×b^6×c^7-10×a^5×c^8-18×a^4×b×c^8-18×a^3×b^2×c^8-22×a^2×b^3×c^8-15×a×b^4×c^8-15×b^5×c^8-10×a^4×c^9+2×a^3×b×c^9-14×a^2×b^2×c^9-15×b^4×c^9+5×a^3×c^10+7×a^2×b×c^10+6×a×b^2×c^10+6×b^3×c^10+5×a^2×c^11+6×b^2×c^11-a×c^12-b×c^12-c^13 in
        cPointhb h_x_5948.
Definition X_5949 :=
        let h_x_5949 a b c := (b+c)^2*(a^3+a^2×b-a×b^2-b^3+a^2×c+3×a×b×c+b^2×c-a×c^2+b×c^2-c^3) in
        cPointhb h_x_5949.
Definition X_5950 :=
        let h_x_5950 a b c := (a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c+4×a^4×b×c+a^3×b^2×c-2×a^2×b^3×c-2×a×b^4×c-2×b^5×c-a^4×c^2+a^3×b×c^2-2×a^2×b^2×c^2+a×b^3×c^2+b^4×c^2-2×a^3×c^3-2×a^2×b×c^3+a×b^2×c^3+4×b^3×c^3+2×a^2×c^4-2×a×b×c^4+b^2×c^4+a×c^5-2×b×c^5-c^6)*(a^6×b+2×a^5×b^2-a^4×b^3-4×a^3×b^4-a^2×b^5+2×a×b^6+b^7+a^6×c-2×a^5×b×c+a^3×b^3×c+a×b^5×c-b^6×c+2×a^5×c^2+4×a^3×b^2×c^2+a^2×b^3×c^2-2×a×b^4×c^2-3×b^5×c^2-a^4×c^3+a^3×b×c^3+a^2×b^2×c^3-2×a×b^3×c^3+3×b^4×c^3-4×a^3×c^4-2×a×b^2×c^4+3×b^3×c^4-a^2×c^5+a×b×c^5-3×b^2×c^5+2×a×c^6-b×c^6+c^7) in
        cPointhb h_x_5950.
Definition X_5951 :=
        let h_x_5951 a b c := a*(a^6+2×a^5×b-a^4×b^2-4×a^3×b^3-a^2×b^4+2×a×b^5+b^6-a^5×c+2×a^4×b×c-a^3×b^2×c-a^2×b^3×c+2×a×b^4×c-b^5×c-2×a^4×c^2+2×a^3×b×c^2+2×a^2×b^2×c^2+2×a×b^3×c^2-2×b^4×c^2+2×a^3×c^3-a^2×b×c^3-a×b^2×c^3+2×b^3×c^3+a^2×c^4-4×a×b×c^4+b^2×c^4-a×c^5-b×c^5)*(a^6-a^5×b-2×a^4×b^2+2×a^3×b^3+a^2×b^4-a×b^5+2×a^5×c+2×a^4×b×c+2×a^3×b^2×c-a^2×b^3×c-4×a×b^4×c-b^5×c-a^4×c^2-a^3×b×c^2+2×a^2×b^2×c^2-a×b^3×c^2+b^4×c^2-4×a^3×c^3-a^2×b×c^3+2×a×b^2×c^3+2×b^3×c^3-a^2×c^4+2×a×b×c^4-2×b^2×c^4+2×a×c^5-b×c^5+c^6) in
        cPointhb h_x_5951.
Definition X_5952 :=
        let h_x_5952 a b c := (b-c)^2*(a^3-a^2×b-a×b^2+b^3-a^2×c-a×b×c+3×b^2×c-a×c^2+3×b×c^2+c^3)*(a^4+2×a^3×b-2×a×b^3-b^4+2×a^3×c+a^2×b×c-3×a×b^2×c-3×a×b×c^2+2×b^2×c^2-2×a×c^3-c^4) in
        cPointhb h_x_5952.
Definition X_5953 :=
        let h_x_5953 a b c := a^8×b^2+2×a^7×b^3-2×a^6×b^4-6×a^5×b^5+6×a^3×b^7+2×a^2×b^8-2×a×b^9-b^10-2×a^8×b×c+2×a^7×b^2×c+6×a^6×b^3×c-8×a^5×b^4×c-12×a^4×b^5×c+6×a^3×b^6×c+10×a^2×b^7×c-2×b^9×c+a^8×c^2+2×a^7×b×c^2+8×a^6×b^2×c^2-2×a^5×b^3×c^2-19×a^4×b^4×c^2-10×a^3×b^5×c^2+7×a^2×b^6×c^2+10×a×b^7×c^2+3×b^8×c^2+2×a^7×c^3+6×a^6×b×c^3-2×a^5×b^2×c^3-18×a^4×b^3×c^3-22×a^3×b^4×c^3-10×a^2×b^5×c^3+6×a×b^6×c^3+8×b^7×c^3-2×a^6×c^4-8×a^5×b×c^4-19×a^4×b^2×c^4-22×a^3×b^3×c^4-18×a^2×b^4×c^4-14×a×b^5×c^4-2×b^6×c^4-6×a^5×c^5-12×a^4×b×c^5-10×a^3×b^2×c^5-10×a^2×b^3×c^5-14×a×b^4×c^5-12×b^5×c^5+6×a^3×b×c^6+7×a^2×b^2×c^6+6×a×b^3×c^6-2×b^4×c^6+6×a^3×c^7+10×a^2×b×c^7+10×a×b^2×c^7+8×b^3×c^7+2×a^2×c^8+3×b^2×c^8-2×a×c^9-2×b×c^9-c^10 in
        cPointhb h_x_5953.
Definition X_5954 :=
        let h_x_5954 a b c := (b-c)^2*(-a^6+a^5×b+a^4×b^2-a^2×b^4-a×b^5+b^6+a^5×c-2×a^2×b^3×c+b^5×c+a^4×c^2-3×a^2×b^2×c^2+4×a×b^3×c^2-b^4×c^2-2×a^2×b×c^3+4×a×b^2×c^3-2×b^3×c^3-a^2×c^4-b^2×c^4-a×c^5+b×c^5+c^6) in
        cPointhb h_x_5954.
Definition X_5955 :=
        let h_x_5955 a b c := a^4+a^3×b+a×b^3+b^4+a^3×c+2×a^2×b×c+5×a×b^2×c+2×b^3×c+5×a×b×c^2+2×b^2×c^2+a×c^3+2×b×c^3+c^4 in
        cPointhb h_x_5955.
Definition X_5956 :=
        let h_x_5956 a b c := a*(a^4×b^2+3×a^3×b^3+3×a^2×b^4+a×b^5+3×a^3×b^2×c+3×a^2×b^3×c-a×b^4×c-b^5×c+a^4×c^2+3×a^3×b×c^2-2×a^2×b^2×c^2-8×a×b^3×c^2-4×b^4×c^2+3×a^3×c^3+3×a^2×b×c^3-8×a×b^2×c^3-6×b^3×c^3+3×a^2×c^4-a×b×c^4-4×b^2×c^4+a×c^5-b×c^5) in
        cPointhb h_x_5956.
Definition X_5957 :=
        let h_x_5957 a b c := (-b+c)*(2×a^4-a^3×b-3×a^2×b^2+a×b^3+b^4-a^3×c-4×a^2×b×c-3×a^2×c^2-2×b^2×c^2+a×c^3+c^4) in
        cPointhb h_x_5957.
Definition X_5958 :=
        let h_x_5958 a b c := a*(b-c)*(a^5+a^4×b-2×a^3×b^2-2×a^2×b^3+a×b^4+b^5+a^4×c-2×a^3×b×c-4×a^2×b^2×c-a×b^3×c+b^4×c-2×a^3×c^2-4×a^2×b×c^2-3×a×b^2×c^2-b^3×c^2-2×a^2×c^3-a×b×c^3-b^2×c^3+a×c^4+b×c^4+c^5) in
        cPointhb h_x_5958.
Definition X_5959 :=
        let h_x_5959 a b c := (b-c)*(-a^7+2×a^5×b^2-a^3×b^4+2×a^5×b×c-3×a^3×b^3×c-a^2×b^4×c+a×b^5×c+b^6×c+2×a^5×c^2-5×a^3×b^2×c^2-3×a^2×b^3×c^2+b^5×c^2-3×a^3×b×c^3-3×a^2×b^2×c^3-2×a×b^3×c^3-2×b^4×c^3-a^3×c^4-a^2×b×c^4-2×b^3×c^4+a×b×c^5+b^2×c^5+b×c^6) in
        cPointhb h_x_5959.
Definition X_5960 :=
        let h_x_5960 a b c := (b+c)*(-(b-c)^2*(a+b+c)*sqrt((a^3-a^2×b-a×b^2+b^3+a^2×c-3×a×b×c+b^2×c-a×c^2-b×c^2-c^3)*(a^3+a^2×b-a×b^2-b^3-a^2×c-3×a×b×c-b^2×c-a×c^2+b×c^2+c^3))+(a+b)*(a-b+c)*(b+c)*sqrt((-a^3-a^2×b+a×b^2+b^3-a^2×c-3×a×b×c-b^2×c+a×c^2-b×c^2+c^3)*(a^3+a^2×b-a×b^2-b^3-a^2×c-3×a×b×c-b^2×c-a×c^2+b×c^2+c^3))+(a+b-c)*(a+c)*(b+c)*sqrt((a^3+a^2×b-a×b^2-b^3+a^2×c+3×a×b×c+b^2×c-a×c^2+b×c^2-c^3)*(-a^3+a^2×b+a×b^2-b^3-a^2×c+3×a×b×c-b^2×c+a×c^2+b×c^2+c^3))) in
        cPointhb h_x_5960.
Definition X_5961 :=
        let h_x_5961 a b c := a^2*(a^2-b^2-c^2)*(a^2-a×b+b^2-c^2)*(a^2+a×b+b^2-c^2)*(a^2-b^2-a×c+c^2)*(a^2-b^2+a×c+c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4) in
        cPointhb h_x_5961.
Definition X_5962 :=
        let h_x_5962 a b c := (a^2+b^2-c^2)*(a^2-b^2-b×c-c^2)*(a^2-b^2+b×c-c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-2×b^2×c^2+c^4)*(a^4+b^4-2×a^2×c^2-2×b^2×c^2+c^4) in
        cPointhb h_x_5962.
Definition X_5963 :=
        let h_x_5963 a b c := a^2*(a^2+b^2-c^2)*(a^2-b^2+c^2)*(a^4-2×a^2×b^2+b^4-2×b^2×c^2+c^4)*(a^4+b^4-2×a^2×c^2-2×b^2×c^2+c^4)*(a^4-2×a^2×b^2+b^4+a^2×b×c-b^3×c-2×a^2×c^2+b^2×c^2-b×c^3+c^4)*(a^4-2×a^2×b^2+b^4-a^2×b×c+b^3×c-2×a^2×c^2+b^2×c^2+b×c^3+c^4) in
        cPointhb h_x_5963.
Definition X_5964 :=
        let h_x_5964 a b c := (a^2-b^2-c^2)*(a^4-2×a^2×b^2+b^4-2×a^2×c^2+c^4)*(a^4+a^3×b+a^2×b^2+a×b^3+b^4-2×a^2×c^2-a×b×c^2-2×b^2×c^2+c^4)*(a^4-a^3×b+a^2×b^2-a×b^3+b^4-2×a^2×c^2+a×b×c^2-2×b^2×c^2+c^4)*(a^4-2×a^2×b^2+b^4-a^3×c+a×b^2×c+a^2×c^2-2×b^2×c^2-a×c^3+c^4)*(a^4-2×a^2×b^2+b^4+a^3×c-a×b^2×c+a^2×c^2-2×b^2×c^2+a×c^3+c^4) in
        cPointhb h_x_5964.
Definition X_5965 :=
        let h_x_5965 a b c := 2×a^6-4×a^4×b^2+3×a^2×b^4-b^6-4×a^4×c^2+b^4×c^2+3×a^2×c^4+b^2×c^4-c^6 in
        cPointhb h_x_5965.
Definition X_5966 :=
        let h_x_5966 a b c := a^2*(a^6-a^4×b^2-a^2×b^4+b^6-3×a^4×c^2-3×b^4×c^2+4×a^2×c^4+4×b^2×c^4-2×c^6)*(a^6-3×a^4×b^2+4×a^2×b^4-2×b^6-a^4×c^2+4×b^4×c^2-a^2×c^4-3×b^2×c^4+c^6) in
        cPointhb h_x_5966.
Definition X_5967 :=
        let h_x_5967 a b c := (2×a^2-b^2-c^2)*(a^4+b^4-a^2×c^2-b^2×c^2)*(a^4-a^2×b^2-b^2×c^2+c^4) in
        cPointhb h_x_5967.
Definition X_5968 :=
        let h_x_5968 a b c := a^2*(a^2+b^2-2×c^2)*(a^2-2×b^2+c^2)*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_5968.
Definition X_5969 :=
        let h_x_5969 a b c := a^4×b^2-2×a^2×b^4+a^4×c^2+b^4×c^2-2×a^2×c^4+b^2×c^4 in
        cPointhb h_x_5969.
Definition X_5970 :=
        let h_x_5970 a b c := a^2*(a^4×b^2+a^2×b^4-2×a^4×c^2-2×b^4×c^2+a^2×c^4+b^2×c^4)*(2×a^4×b^2-a^2×b^4-a^4×c^2-b^4×c^2-a^2×c^4+2×b^2×c^4) in
        cPointhb h_x_5970.
Definition X_5971 :=
        let h_x_5971 a b c := a^6-a^2×b^4+5×a^2×b^2×c^2-2×b^4×c^2-a^2×c^4-2×b^2×c^4 in
        cPointhb h_x_5971.
Definition X_5972 :=
        let h_x_5972 a b c := 2×a^6-2×a^4×b^2-a^2×b^4+b^6-2×a^4×c^2+4×a^2×b^2×c^2-b^4×c^2-a^2×c^4-b^2×c^4+c^6 in
        cPointhb h_x_5972.
Definition X_5973 :=
        let h_x_5973 a b c := (b+c)^2*(-a^14×b-3×a^13×b^2-2×a^12×b^3+2×a^11×b^4+5×a^10×b^5+7×a^9×b^6+4×a^8×b^7-4×a^7×b^8-7×a^6×b^9-5×a^5×b^10-2×a^4×b^11+2×a^3×b^12+3×a^2×b^13+a×b^14-a^14×c-2×a^13×b×c-8×a^12×b^2×c-16×a^11×b^3×c-8×a^10×b^4×c+4×a^9×b^5×c+9×a^8×b^6×c+16×a^7×b^7×c+11×a^6×b^8×c-2×a^5×b^9×c-2×a^4×b^10×c-2×a^2×b^12×c+b^14×c-3×a^13×c^2-8×a^12×b×c^2-8×a^11×b^2×c^2-14×a^10×b^3×c^2-8×a^9×b^4×c^2+25×a^8×b^5×c^2+20×a^7×b^6×c^2-8×a^6×b^7×c^2+a^5×b^8×c^2+6×a^4×b^9×c^2-4×a^3×b^10×c^2-2×a^2×b^11×c^2+2×a×b^12×c^2+b^13×c^2-2×a^12×c^3-16×a^11×b×c^3-14×a^10×b^2×c^3+2×a^9×b^3×c^3-2×a^8×b^4×c^3+4×a^7×b^5×c^3+36×a^6×b^6×c^3+16×a^5×b^7×c^3-18×a^4×b^8×c^3-4×a^3×b^9×c^3+2×a^2×b^10×c^3-2×a×b^11×c^3-2×b^12×c^3+2×a^11×c^4-8×a^10×b×c^4-8×a^9×b^2×c^4-2×a^8×b^3×c^4+28×a^7×b^4×c^4-16×a^5×b^6×c^4+20×a^4×b^7×c^4+2×a^3×b^8×c^4-8×a^2×b^9×c^4-8×a×b^10×c^4-2×b^11×c^4+5×a^10×c^5+4×a^9×b×c^5+25×a^8×b^2×c^5+4×a^7×b^3×c^5+28×a^5×b^5×c^5-4×a^4×b^6×c^5-12×a^3×b^7×c^5-a^2×b^8×c^5-b^10×c^5+7×a^9×c^6+9×a^8×b×c^6+20×a^7×b^2×c^6+36×a^6×b^3×c^6-16×a^5×b^4×c^6-4×a^4×b^5×c^6+32×a^3×b^6×c^6+8×a^2×b^7×c^6+5×a×b^8×c^6-b^9×c^6+4×a^8×c^7+16×a^7×b×c^7-8×a^6×b^2×c^7+16×a^5×b^3×c^7+20×a^4×b^4×c^7-12×a^3×b^5×c^7+8×a^2×b^6×c^7+4×a×b^7×c^7+4×b^8×c^7-4×a^7×c^8+11×a^6×b×c^8+a^5×b^2×c^8-18×a^4×b^3×c^8+2×a^3×b^4×c^8-a^2×b^5×c^8+5×a×b^6×c^8+4×b^7×c^8-7×a^6×c^9-2×a^5×b×c^9+6×a^4×b^2×c^9-4×a^3×b^3×c^9-8×a^2×b^4×c^9-b^6×c^9-5×a^5×c^10-2×a^4×b×c^10-4×a^3×b^2×c^10+2×a^2×b^3×c^10-8×a×b^4×c^10-b^5×c^10-2×a^4×c^11-2×a^2×b^2×c^11-2×a×b^3×c^11-2×b^4×c^11+2×a^3×c^12-2×a^2×b×c^12+2×a×b^2×c^12-2×b^3×c^12+3×a^2×c^13+b^2×c^13+a×c^14+b×c^14) in
        cPointhb h_x_5973.
Definition X_5974 :=
        let h_x_5974 a b c := a*(a^6+2×a^5×b+2×a^4×b^2+2×a^3×b^3-2×a×b^5-b^6+2×a^5×c+6×a^4×b×c+8×a^3×b^2×c-6×a×b^4×c-2×b^5×c+2×a^4×c^2+8×a^3×b×c^2+a^2×b^2×c^2-8×a×b^3×c^2-4×b^4×c^2+2×a^3×c^3-8×a×b^2×c^3-6×b^3×c^3-6×a×b×c^4-4×b^2×c^4-2×a×c^5-2×b×c^5-c^6) in
        cPointhb h_x_5974.
Definition X_5975 :=
        let h_x_5975 a b c := a^2×(a×b+b^2+a×c+c^2)^2*(a^3+b^3+a×b×c-2×b×c^2-c^3)*(a^3-b^3+a×b×c-2×b^2×c+c^3) in
        cPointhb h_x_5975.
Definition X_5976 :=
        let h_x_5976 a b c := (a^2-b×c)*(a^2+b×c)*(a^2×b^2-b^4+a^2×c^2-c^4) in
        cPointhb h_x_5976.
Definition X_5977 :=
        let h_x_5977 a b c := a^5×b-a^3×b^3+a^5×c-a^2×b^3×c+a×b^4×c+b^5×c-a×b^3×c^2-a^3×c^3-a^2×b×c^3-a×b^2×c^3+a×b×c^4+b×c^5 in
        cPointhb h_x_5977.
Definition X_5978 :=
        let h_x_5978 a b c := (a^2+b^2+c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)-2×sqrt(3)*(a^2×b^2-b^4+a^2×c^2-c^4)*(SS a b c) in
        cPointhb h_x_5978.
Definition X_5979 :=
        let h_x_5979 a b c := (a^2+b^2+c^2)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)+2×sqrt(3)*(a^2×b^2-b^4+a^2×c^2-c^4)*(SS a b c) in
        cPointhb h_x_5979.
Definition X_5980 :=
        let h_x_5980 a b c := sqrt(3)×a^2*(a^2-b^2-c^2)*(a^2+b^2+c^2)+2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2)*(SS a b c) in
        cPointhb h_x_5980.
Definition X_5981 :=
        let h_x_5981 a b c := sqrt(3)×a^2*(a^2-b^2-c^2)*(a^2+b^2+c^2)-2*(a^4-a^2×b^2-a^2×c^2-2×b^2×c^2)*(SS a b c) in
        cPointhb h_x_5981.
Definition X_5982 :=
        let h_x_5982 a b c := a^8-5×a^6×b^2+7×a^4×b^4-5×a^2×b^6+2×b^8-5×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-5×b^6×c^2+7×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4-5×a^2×c^6-5×b^2×c^6+2×c^8-2×sqrt(3)*(a^2-b^2)*(a^2-c^2)*(a^2+b^2+c^2)*(SS a b c) in
        cPointhb h_x_5982.
Definition X_5983 :=
        let h_x_5983 a b c := a^8-5×a^6×b^2+7×a^4×b^4-5×a^2×b^6+2×b^8-5×a^6×c^2+3×a^4×b^2×c^2+a^2×b^4×c^2-5×b^6×c^2+7×a^4×c^4+a^2×b^2×c^4+6×b^4×c^4-5×a^2×c^6-5×b^2×c^6+2×c^8+2×sqrt(3)*(a^2-b^2)*(a^2-c^2)*(a^2+b^2+c^2)*(SS a b c) in
        cPointhb h_x_5983.
Definition X_5984 :=
        let h_x_5984 a b c := 3×a^8-a^6×b^2-a^2×b^6-b^8-a^6×c^2-5×a^4×b^2×c^2+3×a^2×b^4×c^2-b^6×c^2+3×a^2×b^2×c^4+4×b^4×c^4-a^2×c^6-b^2×c^6-c^8 in
        cPointhb h_x_5984.
Definition X_5985 :=
        let h_x_5985 a b c := a^8-a^6×b^2+a^4×b^4-a^2×b^6-a^6×b×c-a^5×b^2×c+a^4×b^3×c+a^3×b^4×c-a^2×b^5×c-a×b^6×c-a^6×c^2-a^5×b×c^2-a^4×b^2×c^2+a^3×b^3×c^2+a^2×b^4×c^2-a×b^5×c^2-b^6×c^2+a^4×b×c^3+a^3×b^2×c^3+a^2×b^3×c^3+a×b^4×c^3+a^4×c^4+a^3×b×c^4+a^2×b^2×c^4+a×b^3×c^4+2×b^4×c^4-a^2×b×c^5-a×b^2×c^5-a^2×c^6-a×b×c^6-b^2×c^6 in
        cPointhb h_x_5985.
Definition X_5986 :=
        let h_x_5986 a b c := a^10-a^2×b^8-a^6×b^2×c^2-a^4×b^4×c^2+a^2×b^6×c^2-b^8×c^2-a^4×b^2×c^4+2×a^2×b^4×c^4+b^6×c^4+a^2×b^2×c^6+b^4×c^6-a^2×c^8-b^2×c^8 in
        cPointhb h_x_5986.
Definition X_5987 :=
        let h_x_5987 a b c := a^10-a^2×b^8-2×a^4×b^4×c^2+2×a^2×b^6×c^2-b^8×c^2-2×a^4×b^2×c^4+a^2×b^4×c^4+b^6×c^4+2×a^2×b^2×c^6+b^4×c^6-a^2×c^8-b^2×c^8 in
        cPointhb h_x_5987.
Definition X_5988 :=
        let h_x_5988 a b c := a^4×b-a^3×b^2+a×b^4+b^5+a^4×c-a^2×b^2×c-a^3×c^2-a^2×b×c^2-b^3×c^2-b^2×c^3+a×c^4+c^5 in
        cPointhb h_x_5988.
Definition X_5989 :=
        let h_x_5989 a b c := a^7-a^2×b^5-a^3×b^2×c^2+b^4×c^3+b^3×c^4-a^2×c^5 in
        cPointhb h_x_5989.
Definition X_5990 :=
        let h_x_5990 a b c := a^7-a^6×b+a^3×b^4-a^2×b^5-a^6×c+a^5×b×c-a^3×b^3×c+a^2×b^4×c+a×b^5×c-a^3×b^2×c^2+a^2×b^3×c^2-a×b^4×c^2-b^5×c^2-a^3×b×c^3+a^2×b^2×c^3-a×b^3×c^3+b^4×c^3+a^3×c^4+a^2×b×c^4-a×b^2×c^4+b^3×c^4-a^2×c^5+a×b×c^5-b^2×c^5 in
        cPointhb h_x_5990.
Definition X_5991 :=
        let h_x_5991 a b c := a^8-a^7×b+a^3×b^5-a^2×b^6-a^7×c+a^6×b×c-a^3×b^4×c+a^2×b^5×c-a^4×b^2×c^2+a^3×b^3×c^2+a×b^5×c^2+a^3×b^2×c^3-a^2×b^3×c^3-a×b^4×c^3-b^5×c^3-a^3×b×c^4-a×b^3×c^4+2×b^4×c^4+a^3×c^5+a^2×b×c^5+a×b^2×c^5-b^3×c^5-a^2×c^6 in
        cPointhb h_x_5991.
Definition X_5992 :=
        let h_x_5992 a b c := a^5-a^4×b+a^3×b^2-a^2×b^3-a×b^4-b^5-a^4×c+a^2×b^2×c+b^4×c+a^3×c^2+a^2×b×c^2-a×b^2×c^2+b^3×c^2-a^2×c^3+b^2×c^3-a×c^4+b×c^4-c^5 in
        cPointhb h_x_5992.
Definition X_5993 :=
        let h_x_5993 a b c := (b-c)^2*(a^3+b^3+a×b×c+2×b^2×c+2×b×c^2+c^3)*(-a^4-a^3×b+a×b^3+b^4-a^3×c-a^2×b×c+3×a×b^2×c+b^3×c+3×a×b×c^2+a×c^3+b×c^3+c^4) in
        cPointhb h_x_5993.
Definition X_5994 :=
        let h_x_5994 a b c := a^2*(a^2-b^2)*(a^2-c^2)*(3×a^2+3×b^2-3×c^2-2×sqrt(3)*(SS a b c))*(3×a^2-3×b^2+3×c^2-2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5994.
Definition X_5995 :=
        let h_x_5995 a b c := a^2*(a^2-b^2)*(a^2-c^2)*(3×a^2+3×b^2-3×c^2+2×sqrt(3)*(SS a b c))*(3×a^2-3×b^2+3×c^2+2×sqrt(3)*(SS a b c)) in
        cPointhb h_x_5995.
Definition X_5996 :=
        let h_x_5996 a b c := (b^2-c^2)*(-2×a^2×b^2-2×a^2×c^2+b^2×c^2) in
        cPointhb h_x_5996.
Definition X_5997 :=
        let h_x_5997 a b c := a-sqrt((a+b-c)*(a-b+c)) in
        cPointhb h_x_5997.
Definition X_5998 :=
        let h_x_5998 a b c := a+sqrt((a+b-c)*(a-b+c)) in
        cPointhb h_x_5998.
Definition X_5999 :=
        let h_x_5999 a b c := a^8+a^4×b^4-2×a^2×b^6+a^4×b^2×c^2-b^6×c^2+a^4×c^4+2×b^4×c^4-2×a^2×c^6-b^2×c^6 in
        cPointhb h_x_5999.
Definition X_6000 :=
        let h_x_6000 a b c := a^2*(a^6×b^2-3×a^4×b^4+3×a^2×b^6-b^8+a^6×c^2+4×a^4×b^2×c^2-3×a^2×b^4×c^2-2×b^6×c^2-3×a^4×c^4-3×a^2×b^2×c^4+6×b^4×c^4+3×a^2×c^6-2×b^2×c^6-c^8) in
        cPointhb h_x_6000.
Definition X_6001 :=
        let h_x_6001 a b c := a*(a^5×b-a^4×b^2-2×a^3×b^3+2×a^2×b^4+a×b^5-b^6+a^5×c+2×a^3×b^2×c-3×a×b^4×c-a^4×c^2+2×a^3×b×c^2-4×a^2×b^2×c^2+2×a×b^3×c^2+b^4×c^2-2×a^3×c^3+2×a×b^2×c^3+2×a^2×c^4-3×a×b×c^4+b^2×c^4+a×c^5-c^6) in
        cPointhb h_x_6001.
Definition X_6002 :=
        let h_x_6002 a b c := (b-c)*(-a^3-a^2×b-a^2×c-a×b×c+b^2×c+b×c^2) in
        cPointhb h_x_6002.
Definition X_6003 :=
        let h_x_6003 a b c := a*(b-c)*(a^3-a^2×b-a×b^2+b^3-a^2×c-a×b×c-a×c^2+c^3) in
        cPointhb h_x_6003.
Definition X_6004 :=
        let h_x_6004 a b c := a*(b-c)*(a^2-a×b+b^2-a×c+c^2) in
        cPointhb h_x_6004.
Definition X_6005 :=
        let h_x_6005 a b c := a*(b-c)*(2×a×b+2×a×c+b×c) in
        cPointhb h_x_6005.
Definition X_6006 :=
        let h_x_6006 a b c := (5×a-b-c)*(-b+c) in
        cPointhb h_x_6006.
Definition X_6007 :=
        let h_x_6007 a b c := a*(a^2×b^2-a×b^3+a×b^2×c+a^2×c^2+a×b×c^2-2×b^2×c^2-a×c^3) in
        cPointhb h_x_6007.
Definition X_6008 :=
        let h_x_6008 a b c := (b-c)*(-3×a^2-a×b-a×c+2×b×c) in
        cPointhb h_x_6008.
Definition X_6009 :=
        let h_x_6009 a b c := (-b+c)*(4×a^2-a×b+b^2-a×c-4×b×c+c^2) in
        cPointhb h_x_6009.
Definition X_6010 :=
        let h_x_6010 a b c := a^2*(a-b)*(a-c)*(-a×b^2-b^3+a^2×c-a×b×c-b^2×c+a×c^2)*(a^2×b+a×b^2-a×b×c-a×c^2-b×c^2-c^3) in
        cPointhb h_x_6010.
Definition X_6011 :=
        let h_x_6011 a b c := a*(a-b)*(a-c)*(a^3-a^2×b-a×b^2+b^3-a×b×c-b^2×c-b×c^2+c^3)*(a^3+b^3-a^2×c-a×b×c-b^2×c-a×c^2-b×c^2+c^3) in
        cPointhb h_x_6011.
Definition X_6012 :=
        let h_x_6012 a b c := a*(a-b)*(a-c)*(a^2-a×b+b^2-b×c+c^2)*(a^2+b^2-a×c-b×c+c^2) in
        cPointhb h_x_6012.
Definition X_6013 :=
        let h_x_6013 a b c := a*(a-b)*(a-c)*(2×a×b+a×c+2×b×c)*(a×b+2×a×c+2×b×c) in
        cPointhb h_x_6013.
Definition X_6014 :=
        let h_x_6014 a b c := a^2*(a-b)*(a+b-5×c)*(a-c)*(a-5×b+c) in
        cPointhb h_x_6014.
Definition X_6015 :=
        let h_x_6015 a b c := a*(2×a^2×b^2+a^3×c-a^2×b×c-a×b^2×c+b^3×c-a^2×c^2-b^2×c^2)*(a^3×b-a^2×b^2-a^2×b×c+2×a^2×c^2-a×b×c^2-b^2×c^2+b×c^3) in
        cPointhb h_x_6015.
Definition X_6016 :=
        let h_x_6016 a b c := a^2*(a-b)*(a-c)*(a×b+3×b^2-2×a×c+b×c)*(2×a×b-a×c-b×c-3×c^2) in
        cPointhb h_x_6016.
Definition X_6017 :=
        let h_x_6017 a b c := a^2*(a-b)*(a-c)*(a^2-a×b+4×b^2-4×a×c-b×c+c^2)*(a^2-4×a×b+b^2-a×c-b×c+4×c^2) in
        cPointhb h_x_6017.
Definition X_6018 :=
        let h_x_6018 a b c := a^2*(a-b-c)*(a×b+b^2+a×c-4×b×c+c^2)^2 in
        cPointhb h_x_6018.
Definition X_6019 :=
        let h_x_6019 a b c := a^2*(a-b-c)*(b+c)^2×(a^2+b^2-3×b×c+c^2)^2 in
        cPointhb h_x_6019.
Definition X_6020 :=
        let h_x_6020 a b c := a^2*(a-b-c)*(b-c)^2×(a^4-b^4+a^2×b×c-b^3×c-b×c^3-c^4)^2 in
        cPointhb h_x_6020.
Definition X_6021 :=
        let h_x_6021 a b c := a^2*(a-b-c)*(2×a×b^2-2×a×b×c-b^2×c+2×a×c^2-b×c^2)^2 in
        cPointhb h_x_6021.
Definition X_6022 :=
        let h_x_6022 a b c := a^2*(a-b-c)*(b+c)^2×(2×a^2×b^2-3×a^2×b×c+2×a^2×c^2-b^2×c^2)^2 in
        cPointhb h_x_6022.
Definition X_6023 :=
        let h_x_6023 a b c := a^2*(a+b-c)*(a-b+c)*(b+c)^2×(a^4-b^4-2×a^2×b×c+b^3×c+b^2×c^2+b×c^3-c^4)^2 in
        cPointhb h_x_6023.
Definition X_6024 :=
        let h_x_6024 a b c := a^2*(a-b-c)*(a^2×b-4×a×b^2+b^3+a^2×c+4×a×b×c-4×a×c^2+c^3)^2 in
        cPointhb h_x_6024.
Definition X_6025 :=
        let h_x_6025 a b c := (a-b-c)*(a^3×b-a^2×b^2+a^3×c+b^3×c-a^2×c^2-2×b^2×c^2+b×c^3)^2 in
        cPointhb h_x_6025.
Definition X_6026 :=
        let h_x_6026 a b c := (a-b-c)*(b-c)^2×(a^4×b^2+a^4×b×c+a^4×c^2+b^3×c^3)^2 in
        cPointhb h_x_6026.
Definition X_6027 :=
        let h_x_6027 a b c := a^2*(a-b-c)*(b-c)^2×(a^4-b^4+2×a^2×b×c-b^3×c+b^2×c^2-b×c^3-c^4)^2 in
        cPointhb h_x_6027.
Definition X_6028 :=
        let h_x_6028 a b c := a^2*(a-b-c)*(a^4×b^2+a×b^5-2×a^4×b×c-b^5×c+a^4×c^2+a×c^5-b×c^5)^2 in
        cPointhb h_x_6028.
Definition X_6029 :=
        let h_x_6029 a b c := a^2*(a-b-c)*(a^3×b^2+a×b^4-2×a^3×b×c-b^4×c+a^3×c^2+a×c^4-b×c^4)^2 in
        cPointhb h_x_6029.
Definition X_6030 :=
        let h_x_6030 a b c := a^2*(3×a^4-a^2×b^2-2×b^4-a^2×c^2-b^2×c^2-2×c^4) in
        cPointhb h_x_6030.
Definition X_6031 :=
        let h_x_6031 a b c := 4×a^6-4×a^2×b^4-a^2×b^2×c^2-2×b^4×c^2-4×a^2×c^4-2×b^2×c^4 in
        cPointhb h_x_6031.
Definition X_6032 :=
        let h_x_6032 a b c := 3×a^4×b^2+a^2×b^4-2×b^6+3×a^4×c^2+a^2×b^2×c^2+2×b^4×c^2+a^2×c^4+2×b^2×c^4-2×c^6 in
        cPointhb h_x_6032.
Definition X_6033 :=
        let h_x_6033 a b c := a^8-a^4×b^4+a^2×b^6-b^8-a^4×b^2×c^2+2×b^6×c^2-a^4×c^4-2×b^4×c^4+a^2×c^6+2×b^2×c^6-c^8 in
        cPointhb h_x_6033.
Definition X_6034 :=
        let h_x_6034 a b c := a^6-a^4×b^2+2×a^2×b^4+b^6-a^4×c^2-3×a^2×b^2×c^2-b^4×c^2+2×a^2×c^4-b^2×c^4+c^6 in
        cPointhb h_x_6034.
Definition X_6035 :=
        let h_x_6035 a b c := (a^2-b^2)*(a^2-c^2)*(a^6-a^4×b^2-a^2×b^4+b^6-a^4×c^2-b^4×c^2+2×a^2×c^4+2×b^2×c^4-2×c^6)*(a^6-a^4×b^2+2×a^2×b^4-2×b^6-a^4×c^2+2×b^4×c^2-a^2×c^4-b^2×c^4+c^6) in
        cPointhb h_x_6035.
Definition X_6036 :=
        let h_x_6036 a b c := 2×a^8-4×a^6×b^2+5×a^4×b^4-4×a^2×b^6+b^8-4×a^6×c^2+2×a^2×b^4×c^2-4×b^6×c^2+5×a^4×c^4+2×a^2×b^2×c^4+6×b^4×c^4-4×a^2×c^6-4×b^2×c^6+c^8 in
        cPointhb h_x_6036.
Definition X_6037 :=
        let h_x_6037 a b c := (a^2-b^2)*(a^2-c^2)*(a^4+b^4-a^2×c^2-b^2×c^2)*(a^2×b^2-b^4+2×a^2×c^2+b^2×c^2)*(2×a^2×b^2+a^2×c^2+b^2×c^2-c^4)*(a^4-a^2×b^2-b^2×c^2+c^4) in
        cPointhb h_x_6037.
Definition X_6038 :=
        let h_x_6038 a b c := 3×a^10×b^2-a^8×b^4+a^6×b^6-3×a^4×b^8+3×a^10×c^2+2×a^8×b^2×c^2-a^6×b^4×c^2-4×a^2×b^8×c^2-a^8×c^4-a^6×b^2×c^4+4×a^2×b^6×c^4-2×b^8×c^4+a^6×c^6+4×a^2×b^4×c^6+4×b^6×c^6-3×a^4×c^8-4×a^2×b^2×c^8-2×b^4×c^8 in
        cPointhb h_x_6038.
Definition X_6039 :=
        let h_x_6039 a b c := a^8+a^4×b^4-2×a^2×b^6+a^4×b^2×c^2-b^6×c^2+a^4×c^4+2×b^4×c^4-2×a^2×c^6-b^2×c^6+sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*(a^6-a^2×b^4-2×a^2×b^2×c^2-a^2×c^4) in
        cPointhb h_x_6039.
Definition X_6040 :=
        let h_x_6040 a b c := a^8+a^4×b^4-2×a^2×b^6+a^4×b^2×c^2-b^6×c^2+a^4×c^4+2×b^4×c^4-2×a^2×c^6-b^2×c^6-sqrt(a^4-a^2×b^2+b^4-a^2×c^2-b^2×c^2+c^4)*(a^6-a^2×b^4-2×a^2×b^2×c^2-a^2×c^4) in
        cPointhb h_x_6040.
Definition X_6041 :=
        let h_x_6041 a b c := a^2*(b^2-c^2)*(2×a^6-2×a^4×b^2+a^2×b^4-b^6-2×a^4×c^2+b^4×c^2+a^2×c^4+b^2×c^4-c^6) in
        cPointhb h_x_6041.
Definition X_6042 :=
        let h_x_6042 a b c := a×(b+c)^2×(a×b+b^2+a×c+c^2)^2 in
        cPointhb h_x_6042.
Definition X_6043 :=
        let h_x_6043 a b c := a*(a+b)*(a+c)*(a^3+a×b^2+3×a×b×c-b^2×c+a×c^2-b×c^2) in
        cPointhb h_x_6043.
Definition X_6044 :=
        let h_x_6044 a b c := a×(b+c)^2*(a^3+b^3-b^2×c-a×c^2)*(a^3-a×b^2-b×c^2+c^3) in
        cPointhb h_x_6044.
Definition X_6045 :=
        let h_x_6045 a b c := a*(a^7×b^2-3×a^5×b^4+3×a^3×b^6-a×b^8-5×a^5×b^3×c-3×a^4×b^4×c+6×a^3×b^5×c+2×a^2×b^6×c-a×b^7×c+b^8×c+a^7×c^2-6×a^5×b^2×c^2-3×a^4×b^3×c^2+3×a^3×b^4×c^2+4×a^2×b^5×c^2+2×a×b^6×c^2-b^7×c^2-5×a^5×b×c^3-3×a^4×b^2×c^3+2×a^2×b^4×c^3+a×b^5×c^3-3×b^6×c^3-3×a^5×c^4-3×a^4×b×c^4+3×a^3×b^2×c^4+2×a^2×b^3×c^4-2×a×b^4×c^4+3×b^5×c^4+6×a^3×b×c^5+4×a^2×b^2×c^5+a×b^3×c^5+3×b^4×c^5+3×a^3×c^6+2×a^2×b×c^6+2×a×b^2×c^6-3×b^3×c^6-a×b×c^7-b^2×c^7-a×c^8+b×c^8) in
        cPointhb h_x_6045.
Definition X_6046 :=
        let h_x_6046 a b c := (a+b-c)^3×(a-b+c)^3×(b+c)^2 in
        cPointhb h_x_6046.
Definition X_6047 :=
        let h_x_6047 a b c := (b+c)*(-5×a^5×b-3×a^4×b^2+6×a^3×b^3+2×a^2×b^4-a×b^5+b^6-5×a^5×c-10×a^4×b×c-2×a^3×b^2×c+4×a^2×b^3×c-a×b^4×c-2×b^5×c-3×a^4×c^2-2×a^3×b×c^2+4×a^2×b^2×c^2+2×a×b^3×c^2-b^4×c^2+6×a^3×c^3+4×a^2×b×c^3+2×a×b^2×c^3+4×b^3×c^3+2×a^2×c^4-a×b×c^4-b^2×c^4-a×c^5-2×b×c^5+c^6) in
        cPointhb h_x_6047.
Definition X_6048 :=
        let h_x_6048 a b c := a*(a^2×b+a×b^2+a^2×c+a×b×c-3×b^2×c+a×c^2-3×b×c^2) in
        cPointhb h_x_6048.
Definition X_6049 :=
        let h_x_6049 a b c := (b + c - 3×a)^2 / (b + c - a) in
        cPointhb h_x_6049.
Definition X_6050 :=
        let h_x_6050 a b c := a*(b-c)*(3×a^2-b^2-2×b×c-c^2) in
        cPointhb h_x_6050.
Definition X_6051 :=
        let h_x_6051 a b c := a*(a^2×b+2×a×b^2+b^3+a^2×c+6×a×b×c+3×b^2×c+2×a×c^2+3×b×c^2+c^3) in
        cPointhb h_x_6051.
Definition X_6052 :=
        let h_x_6052 a b c := a*(a^7×b^2+4×a^6×b^3+7×a^5×b^4+8×a^4×b^5+7×a^3×b^6+4×a^2×b^7+a×b^8-2×a^7×b×c-4×a^6×b^2×c+3×a^5×b^3×c+17×a^4×b^4×c+16×a^3×b^5×c-2×a^2×b^6×c-9×a×b^7×c-3×b^8×c+a^7×c^2-4×a^6×b×c^2-24×a^5×b^2×c^2-29×a^4×b^3×c^2-45×a^3×b^4×c^2-80×a^2×b^5×c^2-60×a×b^6×c^2-15×b^7×c^2+4×a^6×c^3+3×a^5×b×c^3-29×a^4×b^2×c^3-120×a^3×b^3×c^3-202×a^2×b^4×c^3-139×a×b^5×c^3-33×b^6×c^3+7×a^5×c^4+17×a^4×b×c^4-45×a^3×b^2×c^4-202×a^2×b^3×c^4-178×a×b^4×c^4-45×b^5×c^4+8×a^4×c^5+16×a^3×b×c^5-80×a^2×b^2×c^5-139×a×b^3×c^5-45×b^4×c^5+7×a^3×c^6-2×a^2×b×c^6-60×a×b^2×c^6-33×b^3×c^6+4×a^2×c^7-9×a×b×c^7-15×b^2×c^7+a×c^8-3×b×c^8) in
        cPointhb h_x_6052.
Definition X_6053 :=
        let h_x_6053 a b c := 2×a^10-10×a^8×b^2+17×a^6×b^4-11×a^4×b^6+a^2×b^8+b^10-10×a^8×c^2+3×a^4×b^4×c^2+10×a^2×b^6×c^2-3×b^8×c^2+17×a^6×c^4+3×a^4×b^2×c^4-22×a^2×b^4×c^4+2×b^6×c^4-11×a^4×c^6+10×a^2×b^2×c^6+2×b^4×c^6+a^2×c^8-3×b^2×c^8+c^10 in
        cPointhb h_x_6053.
Definition X_6054 :=
        let h_x_6054 a b c := a^8+3×a^6×b^2-5×a^4×b^4+3×a^2×b^6-2×b^8+3×a^6×c^2-5×a^4×b^2×c^2+a^2×b^4×c^2+3×b^6×c^2-5×a^4×c^4+a^2×b^2×c^4-2×b^4×c^4+3×a^2×c^6+3×b^2×c^6-2×c^8 in
        cPointhb h_x_6054.
Definition X_6055 :=
        let h_x_6055 a b c := 4×a^8-6×a^6×b^2+7×a^4×b^4-6×a^2×b^6+b^8-6×a^6×c^2-2×a^4×b^2×c^2+4×a^2×b^4×c^2-6×b^6×c^2+7×a^4×c^4+4×a^2×b^2×c^4+10×b^4×c^4-6×a^2×c^6-6×b^2×c^6+c^8 in
        cPointhb h_x_6055.
Definition X_6056 :=
        let h_x_6056 a b c := a^4*(-a+b+c)*(a^2-b^2-c^2)^2 in
        cPointhb h_x_6056.
Definition X_6057 :=
        let h_x_6057 a b c := (b+c)^2*(-a+b+c) in
        cPointhb h_x_6057.
Definition X_6058 :=
        let h_x_6058 a b c := (a+b-c)^2×(a-b+c)^2×(b+c)^4*(-a+b+c) in
        cPointhb h_x_6058.
Definition X_6059 :=
        let h_x_6059 a b c := a^2*(-a+b+c)*(a^2+b^2-c^2)^2×(a^2-b^2+c^2)^2 in
        cPointhb h_x_6059.
Definition X_6060 :=
        let h_x_6060 a b c := (-a+b+c)*(3×a^4-2×a^2×b^2-b^4-2×a^2×c^2+2×b^2×c^2-c^4)^2 in
        cPointhb h_x_6060.
Definition X_6061 :=
        let h_x_6061 a b c := a^2×(a+b)^2×(a+c)^2×(-a+b+c)^3 in
        cPointhb h_x_6061.
Definition X_6062 :=
        let h_x_6062 a b c := (-a+b+c)*(2×a^4-a^2×b^2-b^4-a^2×c^2+2×b^2×c^2-c^4)^2 in
        cPointhb h_x_6062.
Definition X_6063 :=
        let h_x_6063 a b c := b^2*(-a+b-c)*(a+b-c)*c^2 in
        cPointhb h_x_6063.
Definition X_6064 :=
        let h_x_6064 a b c := (a-b)^2×(a+b)^2×(a-c)^2*(a-b-c)*(a+c)^2 in
        cPointhb h_x_6064.
Definition X_6065 :=
        let h_x_6065 a b c := a^2×(a-b)^2×(a-c)^2*(a-b-c) in
        cPointhb h_x_6065.
Definition X_6066 :=
        let h_x_6066 a b c := a^4×(a-b)^2×(a-c)^2*(a-b-c) in
        cPointhb h_x_6066.
Definition X_6067 :=
        let h_x_6067 a b c := (a-b-c)*(a×b-b^2+a×c+2×b×c-c^2)^2 in
        cPointhb h_x_6067.
Definition X_6068 :=
        let h_x_6068 a b c := (a-b-c)*(2×a^2-a×b-b^2-a×c+2×b×c-c^2)^2 in
        cPointhb h_x_6068.
Definition X_6069 :=
        let h_x_6069 a b c := a^22-8×a^20×b^2+28×a^18×b^4-56×a^16×b^6+70×a^14×b^8-56×a^12×b^10+28×a^10×b^12-8×a^8×b^14+a^6×b^16-8×a^20×c^2+42×a^18×b^2×c^2-92×a^16×b^4×c^2+106×a^14×b^6×c^2-62×a^12×b^8×c^2+7×a^10×b^10×c^2+13×a^8×b^12×c^2-8×a^6×b^14×c^2+4×a^4×b^16×c^2-3×a^2×b^18×c^2+b^20×c^2+28×a^18×c^4-92×a^16×b^2×c^4+113×a^14×b^4×c^4-62×a^12×b^6×c^4+17×a^10×b^8×c^4-9×a^8×b^10×c^4+5×a^6×b^12×c^4-6×a^4×b^14×c^4+13×a^2×b^16×c^4-7×b^18×c^4-56×a^16×c^6+106×a^14×b^2×c^6-62×a^12×b^4×c^6+4×a^10×b^6×c^6+4×a^8×b^8×c^6+8×a^6×b^10×c^6-6×a^4×b^12×c^6-18×a^2×b^14×c^6+20×b^16×c^6+70×a^14×c^8-62×a^12×b^2×c^8+17×a^10×b^4×c^8+4×a^8×b^6×c^8-12×a^6×b^8×c^8+8×a^4×b^10×c^8+3×a^2×b^12×c^8-28×b^14×c^8-56×a^12×c^10+7×a^10×b^2×c^10-9×a^8×b^4×c^10+8×a^6×b^6×c^10+8×a^4×b^8×c^10+10×a^2×b^10×c^10+14×b^12×c^10+28×a^10×c^12+13×a^8×b^2×c^12+5×a^6×b^4×c^12-6×a^4×b^6×c^12+3×a^2×b^8×c^12+14×b^10×c^12-8×a^8×c^14-8×a^6×b^2×c^14-6×a^4×b^4×c^14-18×a^2×b^6×c^14-28×b^8×c^14+a^6×c^16+4×a^4×b^2×c^16+13×a^2×b^4×c^16+20×b^6×c^16-3×a^2×b^2×c^18-7×b^4×c^18+b^2×c^20 in
        cPointhb h_x_6069.

End Triangle.