International Mathematical Olympiad 1978 Problem 4
In triangle , . A circle is tangent internally to the circumcircle of triangle and also to sides , at , , respectively. Prove that the midpoint of segment is the center of the incircle of triangle .
In triangle , . A circle is tangent internally to the circumcircle of triangle and also to sides , at , , respectively. Prove that the midpoint of segment is the center of the incircle of triangle .