A,B and C are points on the circumference of a circle with centre O. Tangents are drawn to the circumcircles of triangles OAB and OAC at P and Q respectively, where P and Q are diametrically opposite O. The two tangents intersect at K. The line CA meets the circumcircle of △OAB at A and X. Prove that X lies on the line KO. geometrycircumcirclecircles