Jul 31, 2017
©non_regular
Loading...
seen from United States
seen from France
seen from United States
seen from Germany
seen from China
seen from United Kingdom
seen from Malaysia
seen from United States
seen from Greece
seen from United States
seen from Netherlands
seen from United States
seen from China
seen from Indonesia
seen from Indonesia
seen from Malaysia
seen from China
seen from United Kingdom
seen from Germany
seen from Brazil
©non_regular
Anya is live and ready to show you everything. Watch her strip, dance, and perform exclusive shows just for you. Interact in real-time and make your fantasies come true.
Free to watch • No registration required • HD streaming
From NPR:
How many shapes are able to "tile the plane" — meaning the shapes can fit together perfectly to cover any flat surface without overlapping or leaving any gaps. Mathematicians have proved that all triangles and quadrilaterals, or shapes with four sides, can tile the plane, and they have documented all of the convex hexagons that can do it.But it gets a lot more complicated when dealing with pentagons — specifically convex, or nonregular pentagons with the angles pointing outward. The number of convex pentagons is infinite — and so is the number that could potentially tile the plane. It's a problem that's almost unsolvable because, as McLoud-Mann put it, it has "infinitely many possibilities."