Point $P$ lies inside triangle $ABC$. Let the projections of $P$ onto sides $BC$,$CA$,$AB$ be $D$, $E$, $F$ respectively. Let the projections from $A$ to the lines $BP$ and $CP$ be $M$ and $N$ respectively. Prove that $ME$, $NF$ and $BC$ are concurrent.
Problem
Source: China TST 2005 Quiz 1.1 (missing from contest collections)
Tags: geometry, concurrency, concurrent, projective geometry