Let ABC be a triangle with AB=AC, and let M be the midpoint of BC. Let P be a point such that PB<PC and PA is parallel to BC. Let X and Y be points on the lines PB and PC, respectively, so that B lies on the segment PX, C lies on the segment PY, and ∠PXM=∠PYM. Prove that the quadrilateral APXY is cyclic. IMO Shortlistgeometrygeometry solvedsymmetryAngle ChasingMiquel point