The altitudes $AA_1$ and $CC_1$ of a triangle $ABC$ meet at point $H$. Point $H_A$ is symmetric to $H$ about $A$. Line $H_AC_1$ meets $BC$ at point $C' $, point $A' $ is defined similarly. Prove that $A' C' // AC$.
Problem
Source: 2015 Sharygin Geometry Olympiad Correspondence Round P7
Tags: geometry, symmetry, orthocenter