Inside a convex quadrilateral ABCD there are points P (and P', P'' etc))such that drawing WP,XP,YP,ZP one gets four quadrilaterals of equal areas (W, X, Y, Z being the midpoints of the sides).

Define P's location.

Say W is on AB, X is on BC, Y is on CD, and Z is on AD.

If W, X, Y, Z are the midpoints of the sides then WXYZ is the Varignon parallelogram. https://en.wikipedia.org/wiki/Varignon%27s_theorem

Construct lines through A,B,C, and D parallel to WZ, WX, XY, and YZ. These lines intersect to form a new parallelogram, STUV.

The diagonals of STUV intersect at P.

Even if the quadrilateral is concave, or crossed.

Posted by broll on 2018-04-28 23:55:50