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− | A golden triangle is an isosceles triangle where a ratio between one of the identical sides <math> a </math> and the base <math> b <math> is the golden ratio <math> \phi </math>. | + | A golden triangle is an isosceles triangle where a ratio between one of the identical sides <math> a </math> and the base <math> b </math> is the golden ratio <math> \phi </math>. |
<center> <math> \frac {a}{b} = \phi </math> </center> | <center> <math> \frac {a}{b} = \phi </math> </center> |
Revision as of 00:01, 7 December 2020
Robinson Triangles
Robinson triangles, also known as golden triangles due to their close relation with the golden ratio discussed previously, make up the spikes of regular pentagrams.
A golden triangle is an isosceles triangle where a ratio between one of the identical sides $ a $ and the base $ b $ is the golden ratio $ \phi $.
A similar triangle to the Robinson triangle is the golden gnomon:
Regarding Penrose tiling, a golden triangle and two golden gnomons make up a regular pentagon, which ties in with the golden ratio local pentagon symmetry discussed earlier. P2 Penrose tiling are made from kites and darts. A kite is made from two golden triangles, and a dart is made from two gnomons.
Further Readings:
One final note – if you like proofs, you will enjoy this site: http://mrbertman.com/penroseTilings.html. It contains many definitions and theorems that deal with how to place a tile correctly (the site uses the term “legally”) and why those rules exist. You can even create your own Penrose tiling!