Hexagon
ABCDEF is a hexagon. G, H, I, J, K, and L are midpoints on AB, BC, CD, DE, EF, and FA respectively. M is a point inside ABCDEF. Connecting M to the 6 midpoints dissects the hexagon into 6 small quadrilaterals. The vertices of each small quadrilateral includes a shared vertex with ABCDEF, two midpoints adjacent to the shared vertex, and the interior point M. Starting from the quadrilateral with vertex A, going clockwise, the areas of the first five quadrilateral are 81, 64, 49, 36, and 25, respectively. What’s the area of the remaining quadrilateral (the one with vertex F)?