My take: Reflect $K$ around point $M$ and let that be $K'$. From there, all we need to prove is that $LK'NK$ is a parallelogram but that follows by the properties of reflection.

If $KL\parallel CA$ and $KN\parallel AB$ then$$\frac{ML}{MN}=\frac{\frac{ML}{MA}}{\frac{MN}{MA}}=\frac{\frac{MK}{MC}}{\frac{MK}{MB}}=\frac{MB}{MC}$$by Thales (this holds for any $M,K$ on the line $BC$). If $M$ is also the midpoint of $BC$ as in this problem then $ML=MN$.