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X(2), X(11058) A', B', C' reflections of A, B, C in G infinite points of K092 anti-points, see Table 77 |
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The locus of point P such that the sum of line angles (BC,AP)+(CA,BP)+(AB,CP) = t (mod. pi) is a K60+ cubic with three asymptotes concurring at G. When t = 0, the cubic is Kjp = K024 and with t = pi/2, it is the McCay cubic K003. Any other cubic belongs to the pencil generated by these two cubics and meets the circumcircle at A, B, C and three other points which are the vertices of an equilateral triangle. In particular, the pencil contains one and only one K60++ which is K213. It is a central equilateral cubic with inflexional tangent at G passing through the Schoute center X(187). See the page K092 for a description of X(11057). See another characterization of K213 in table 22. |
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K213 also belongs to the pencil of equilateral cubics generated by K092 and K104. All these cubics have the same points at infinity and the same tangent at G (when it is defined) which is the line through X(187). The last remaining base point is X(11058). This pencil also contains : • the cubic decomposed into the line at infinity and the circum-conic through X(2), X(67), X(599), X(11058) with perspector X(3906). • a nodal cubic with node G. |
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The hessian of K213 is a central focal cubic with focus and center G. This contains the isodynamic points X(15), X(16). |
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