 Example pentagonal form | |
| Faces | 6n triangles 2n squares 2 n-gon |
|---|---|
| Edges | 16n |
| Vertices | 6n |
| Symmetry group | Dn, , (n22) |
| Rotation group | Dn, , (n22) |
| Properties | convex, chiral |
In geometry, the gyroelongated bicupolae are an infinite sets of polyhedra, constructed by adjoining two n-gonal cupolas to an n-gonal Antiprism. The triangular, square, and pentagonal gyroelongated bicupola are three of five Johnson solids which are chiral, meaning that they have a "left-handed" and a "right-handed" form.
Adjoining two triangular prisms to a square antiprism also generates a polyhedron, but not a Johnson solid, as it is not convex. The hexagonal form is also a polygon, but has coplanar faces. Higher forms can be constructed without regular faces.
| Image cw | Image ccw | Name | Faces |
|---|---|---|---|
 |
 |
Gyroelongated digonal bicupola | 4 triangles, 4 squares |
 |
 |
Gyroelongated triangular bicupola (J44) | 6+2 triangles, 6 squares |
 |
 |
Gyroelongated square bicupola (J45) | 8 triangles, 8+2 squares |
 |
 |
Gyroelongated pentagonal bicupola (J46) | 30 triangles, 10 squares, 2 pentagon |
| Gyroelongated hexagonal bicupola | 12 triangles, 24 squares, 2 hexagon |
See also
References
- Norman W. Johnson, "Convex Solids with Regular Faces", Canadian Journal of Mathematics, 18, 1966, pages 169–200. Contains the original enumeration of the 92 solids and the conjecture that there are no others.
- Victor A. Zalgaller (1969). Convex Polyhedra with Regular Faces. Consultants Bureau. No ISBN. The first proof that there are only 92 Johnson solids.
| Convex polyhedra | |||||
|---|---|---|---|---|---|
| Platonic solids (regular) | |||||
| Archimedean solids (semiregular or uniform) | |||||
| Catalan solids (duals of Archimedean) |
| ||||
| Dihedral regular | |||||
| Dihedral uniform |
| ||||
| Dihedral others | |||||
| Degenerate polyhedra are in italics. | |||||
 | This polyhedron-related article is a stub. You can help Misplaced Pages by expanding it. |