D lies on the circumcircle of XYZ wanted, 2 circumcircles, altitudes
Source: 2015 Croatia MO p7
August 3, 2020
geometrycircumcircleConcyclic
Problem Statement
In an acute-angled triangle is , and the points and are the feet of the altitudes of from the vertices and . Let be the second intersection of the circumcircles of triangles and (different of ). Let be the intersection of the tangents to the circumcircle of the triangle ABC at the points and , and let the lines and intersect at the point , and the lines and intersect at the point . Prove that the point lies on the circumcircle of the triangle .