Let $E,F$ be the midpoints of sides $CA,AB.$ It is clear that $ML \parallel EF \parallel BC$ and $ML=BC=\frac{_1}{^2}EF.$ Segment $\overline{BC}$ is the image of segment $\overline{EF}$ under the composition $\mathcal{G}$ of the homotheties $\mathcal{K}(K,2) \circ \mathcal{N}(N,-1).$ Coefficent of $ \mathcal{G}$ equals $-2$ and its center (centroid G) lies on the line $KN,$ such that $\overline{GN}:\overline{GK}=-1:2.$ Since $\overline{GO}:\overline{GH}=-1:2,$ it follows that $ON \parallel HK$ and $ON=\frac{_1}{^2}HK=JK$ $\Longrightarrow$ $KONJ$ is a parallelogram.

Let $D$ be midpoint of $BC; AH\parallel OD, AH=2OD$. $N$ is the midpoint of diagonals $BL, CM$, so $ND\parallel BM\parallel AK, AK=BM=2ND$, so $\triangle ODN\sim\triangle AHK$ and their similitude ratio is $\frac{1}2$, resulting $KH\parallel ON, 2KJ=KH=2ON$, done. Best regards, sunken rock