Let $N$ be the midpoint of $MC$, $O$ the midpoint of $BN$ and $K$ the projection of $M$ onto $BC$. The homothety with center $B$ and factor $\frac{1}{2}$ sends $A$ to $M$ and because $AH||MK$ the height $AH$ is sent to $MK$. Moreover $N$ is sent to $O$ implying that $M$, $O$ and $K$ are collinear. Hence, the height $MK$ is bisecting the median $BN$ in triangle $BMC$.