Penrose TilingTiling in 5-fold symmetry was thought impossible!Areas can be filled completely and symmetrically with tiles of 3, 4 and 6 sides, but it was long believed that it was impossible to fill an area with 5-fold symmetry, as shown below:
The solution was found in PhiIn the early 1970's, however, Roger Penrose discovered that a surface can be completely tiled in an asymmetrical, non-repeating manner in five-fold symmetry with just two shapes based on phi, now known as "Penrose tiles." This is accomplished by creating a set of two symmetrical tiles, each of which is the combination of the two triangles found in the geometry of the pentagon. Phi plays a pivotal role in these constructions. The relationship of the sides of the pentagon, and also the tiles, is Φ, 1 and 1/Φ.
The ratio of the two types of tiles in the resulting patterns is always phi!
As you expand the tiling to cover greater areas, the ratio of the quantity of the one type of tile to the other always approaches phi, or 1.6180339..., the Golden Ratio. Within this tiling there can be small areas of five-fold symmetry. Decagons can also occur, which when grouped together can look like pentagons from a distance. Explore further with these resources:You can download a free program called "Bob" to generate Penrose tiling like the above at the site of Stephen Collins. You can buy acrylic puzzles of Penrose darts, kites and tiles and other pentagon-based shapes at Kadon Enterprises. Quasi-Crystals
Phi is intrinsically related to the number 5The appearance of the golden ratio in examples of five-fold symmetry occurs because phi itself is intrinsically related to the number 5, mathematically and trigonometrically.
5 ^ .5 * .5 + .5 = Φ In this mathematical construction, "5 ^ .5" means "5 raised to the 1/2 power," which is the square root of 5, which is then multiplied by .5 and to which .5 is then added. See more on the Five and Phi page. |
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