Three circles pass through a point P, and the second points of their intersection A,B,C lie on a straight line. Let A1B1,C1 be the second meets of lines AP,BP,CP with the corresponding circles. Let C2 be the intersections of lines AB1 and BA1. Let A2,B2 be defined similarly. Prove that the triangles A1B1C1 and A2B2C2 are equal, geometryconcurrentcollinearcongruent triangles