On a circle Γ, points A,B,N,C,D,M are chosen in a clockwise order in such a way that N and M are the midpoints of clockwise arcs BC and AD respectively. Let P be the intersection of AC and BD, and let Q be a point on line MB such that PQ is perpendicular to MN. Point R is chosen on segment MC such that QB=RC, prove that the midpoint of QR lies on AC. geometrycyclic quadrilateral