Points A1, A2, B1, B2 lie on the circumcircle of a triangle ABC in such a way that A1B1∥AB, A1A2∥BC, B1B2∥AC. The line AA2 and CA1 meet at point A′, and the lines BB2 and CB1 meet at point B′. Prove that all lines A′B′ concur. geometrySharygin Geometry OlympiadSharygin 2023concurrent lines