Synthetic foundations of cevian geometry II: The center of the cevian conic

Abstract

This paper continues the investigation of Part I, by studying the conic CP on the five points ABCPQ, where ABC is a given ordinary triangle and Q is the isotomcomplement of P, defined as the complement of the isotomic conjugate P' of P with respect to triangle ABC. We show that CP also lies on the points P' and Q', where Q' is the isotomcomplement of P'. The conic CP lies on six other points which are the images of the vertices of ABC under the affine mapping λ=TP' TP-1 and its inverse, where TP and TP' are the unique affine maps taking ABC to the cevian triangles of P and P', respectively. In the paper we characterize the center Z of CP as the unique fixed point of λ in the extended plane, when CP is a parabola or an ellipse, and the unique ordinary fixed point of λ, when CP is a hyperbola. We also show that Z=GV · TP(GV), where G is the centroid of ABC and V=PQ · P'Q'. When P is the Gergonne point of ABC, this gives a new characterization of the Feuerbach point Z. All of our arguments are purely synthetic.