Let $S$ be a square with the side length 20 and let $M$ be the set of points formed with the vertices of $S$ and another 1999 points lying inside $S$. Prove that there exists a triangle with vertices in $M$ and with area at most equal with $\frac{1}{10}$.
Školjka 
be a square with the side length 20 and let 
be the set of points formed with the vertices of 
.