In the quadrilateral ABCD is AD∥BC and the angles ∠A and ∠D are acute. The diagonals intersect in P. The circumscribed circles of △ABP and △CDP intersect the line AD again at S and T respectively. Call M the midpoint of [ST]. Prove that △BCM is isosceles.
https://1.bp.blogspot.com/-C5MqC0RTqwY/Xy1fAavi_aI/AAAAAAAAMSM/2MXMlwb13McCYTrOHm1ZzWc0nkaR1J6zQCLcBGAsYHQ/s0/flanders%2B2016%2Bp1.png geometrycircumcircleisoscelesparallel