A Theorem about Simultaneous Orthological and Homological Triangles

Abstract

In this paper we prove that if P1, P2 are isogonal points in the triangle ABC, and if A1B1C1 and A2B2C2 are their corresponding pedal triangles such that the triangles ABC and A1B1C1 are homological (the lines AA1, BB1, CC1 are concurrent), then the triangles ABC and A2B2C2 are also homological.