The dodecagon is a polygon with 12 sides. A regular dodecagon has equal sides and equal angles.
|Bowers style acronym||Dog|
|Coxeter diagram||x12o ()|
|Vertex figure||Dyad, length (√2+√6)/2|
|Measures (edge length 1)|
|Number of pieces||12|
|Level of complexity||1|
|Symmetry||I2(12), order 24|
The combining prefix in BSAs is tw-, as in twip or twaddip.
The only non-compound stellation of the dodecagon is the dodecagram. This makes it the largest polygon with a single non-compound stellation. The only other polygons with only one are the pentagon, the octagon, and the decagon.
Regular dodecagons generally do not occur in higher spherical polytopes aside from prisms, though some Euclidean tilings with hexagonal tiling symmetry do use dodecagonal faces, as the dodecagon is the uniform truncation of the hexagon. It is the largest polygon which can occur in a regular faced Euclidean tiling, occurring in the truncated hexagonal tiling for example.
The name decagon is derived from the Ancient Greek δώδεκα (12) and γωνία (angle), referring to the number of vertices.
Other names include:
- dog, Bowers style acronym, short for "dodecagon"
Coordinates for a regular dodecagon of unit edge length, centered at the origin, are all permutations of:
A dodecagon has the following Coxeter diagrams:
Two main variants of the dodecagon have hexagon symmetry: the dihexagon, with two alternating side lengths and equal angles, and the dual hexambus, with two alternating angles and equal edges. Other less regular variations with chiral hexagonal, square, triangular, rectangular, inversion, mirror, or no symmetry also exist.
- 1st stellation: Stellated dodecagon (compound of two hexagons)
- 2nd stellation: Trisquare (compound of three squares)
- 3rd stellation: Tetratriangle (compound of four triangles)
- 4th stellation: Dodecagram
- Bowers, Jonathan. "Regular Polygons and Other Two Dimensional Shapes".
- Wikipedia Contributors. "Dodecagon".