Let $ABC$ be an acute triangle with orthocenter $H$. Let $G$ be the point such that the quadrilateral $ABGH$ is a parallelogram. Let $I$ be the point on the line $GH$ such that $AC$ bisects $HI$. Suppose that the line $AC$ intersects the circumcircle of the triangle $GCI$ at $C$ and $J$. Prove that $IJ = AH$.
\begin{flushright}\emph{(Australia)}\end{flushright}
Školjka 
be an acute triangle with orthocenter 
. Let 
be the point such that the quadrilateral 
is a parallelogram. Let 
be the point on the line 
such that 
bisects 
. Suppose that the line 
at 
and 
. Prove that 
.