Snowflake Tiles Gallery


Grass - 113


Grass - 39


Empties - 26


Empties Tiled - 112


Mama - 51


Mama Tiled - 114


Pentagonal - 65


Tangled Web - 55


Quonset HHH - 74


Quonset HHH Tiled - 75


Barb - 8


Cris - 21


Barb and Cris Tiled - 7


smashed - 124


Smashed Tess - 123


Sluice - 150


Centre - 159


Centre - qhp - 159
All of these snowflakes will tile the plane because they are so symmetrical. The hexagons fill the plane perfectly while the pentagons always leave gaps.

This has an interesting consequence. For hexagonal tilings there two ways of tiling a plane with them. You can set hexagonal tiles out one by one carefully matching them up - which is tricky. But once you've done that a bit you will find that there is a rectangular region within the tile that, when copied, place the tiles down much more quickly, even automatically as I did here. Pentagons and rectangles form periodic tilings.

The pentagonal tiles do not make periodic tilings; they make aperiodic tilings. Actually, if a tiling is defined as filling a space with no gaps or overlaps then the geometry of a pentagon always forces gaps between them. Roger Penrose's Penrose tiles are pairs of tiles that do fill a plane with a pentagonal symmetry with no gaps or overlaps and that tiling is also aperiodic. Since it's aperiodic you cannot automate the process of tiling the plane. You actually have to place each tile by hand.