Let ABCD be a cyclic quadrilateral with AB<CD. The diagonals intersect at the point F and lines AD and BC intersect at the point E. Let K and L be the orthogonal projections of F onto lines AD and BC respectively, and let M, S and T be the midpoints of EF, CF and DF respectively. Prove that the second intersection point of the circumcircles of triangles MKT and MLS lies on the segment CD.(Greece - Silouanos Brazitikos) geometrycyclic quadrilateralNine Point CircleBalkan Mathematics OlympiadBalkanbir tiyinga qimmat masala