Let $ABC$ be an acute-angled triangle. The tangents to its circumcircle at $A, B, C$ form a triangle $PQR$ with $C \in PQ$ and $B \in PR$. Let $C_{1}$ be the foot of the altitude from $C$ in $\Delta ABC$ . Prove that $CC_{1}$ bisects $\widehat{QC_{1}P}$ .
Problem
Source: 16-th Hungary-Israel Binational Mathematical Competition 2003
Tags: geometry, circumcircle, trigonometry, geometry unsolved