Two cyclists ride on two intersecting circles. Each of them rides on his own circle at a constant speed. Having left at the same time from one of the points of intersection of the circles and having made one lap each, the cyclists meet again at this point. Prove that there exists a fixed point in the plane, the distances from which to cyclists are the same all the time, regardless of the directions they travel in.Proposed by N. Vasiliev and I. Sharygin