Let $AA _1$ and $BB_1$ be the altitudes of an isosceles acute-angled triangle $ABC, M$ the midpoint of $AB$. The circles circumscribed around the triangles $AMA_1$ and $BMB_1$ intersect the lines $AC$ and $BC$ at points $K$ and $L$, respectively. Prove that $K, M$, and $L$ lie on the same line.
Problem
Source: 2011 Oral Moscow Geometry Olympiad grades 8-9 p5
Tags: geometry, circumcircle, collinear, isosceles