Given a triangle $ABC$ with $O$ as its circumcenter. Points $P$ and $C$ are the intersection points of the circumcircle of triangle $BOC$ and the circle with diameter $AC$. Point $Q$ lies on segment $PC$ such that $PB=PQ$. Prove that $\angle AQP = \angle ABC$.
Well, I tried this for a long time, and I am stuck till here :
Let $D$ be the foot of the perpendicular from $A$ to $BC$, since we need to prove that $\angle AQP = \angle ABC$, then we shall prove that $\angle PAQ = \angle BAH$, but I don't know what to do next, I have tried like some angke chasing but can't derive anything from the fact that $PB = PQ$, can anyone help? It will be really appreciated. Thanks a lot!!


