X(5430) = CENTER OF THE GRIGORIEV CONIC
- <q>Let L_A be the line parallel to line BC and tangent to the
circumcircle of triangle ABC and define L_B and L_C cyclically. </q>
Let L_A be the parallel to BC tangent to circumcircle on the
positive side of BC, and M_A the parallel to BC tangent to
circumcircle on the negative side of BC.
Similarly L_B, M_B, L_C, M_C.
Let A'B'C', A"B"C" be the triangles bounded by the lines
(L_A,L_B,L_C) and (M_A,M_B,M_C).
By similar constructions as described in the point's entry,
do we get eight conics?
That is, conics respective to A'B'C', A"B"C", A'B"C", A"B'C",
A"B"C', A"B'C', A'B"C', A'B'C" ?
Or just only two, respective to A'B'C', A"B"C", whose the centers
are symmetric with center of symmetry O?