Tetradecahedron

A tetradecahedron is a polyhedron with 14 faces. There are numerous topologically distinct forms of a tetradecahedron, with many constructible entirely with regular polygon faces.

A tetradecahedron is sometimes called a tetrakaidecahedron.^[1]^[2] No difference in meaning is ascribed.^[3]^[4] The Greek word kai means 'and'.

Convex

There are 1,496,225,352 topologically distinct convex tetradecahedra, excluding mirror images, having at least 9 vertices.^[5] (Two polyhedra are "topologically distinct" if they have intrinsically different arrangements of faces and vertices, such that it is impossible to distort one into the other simply by changing the lengths of edges or the angles between edges or faces.)

Examples

An incomplete list of forms includes:

Tetradecahedra having all regular polygonal faces (all exist in irregular-faced forms as well):

Archimedean solids:
- Cuboctahedron (8 triangles, 6 squares)
- Truncated cube (8 triangles, 6 octagons)
- Truncated octahedron (6 squares, 8 hexagons)
Prisms and antiprisms:
- Dodecagonal prism (12 squares, 2 dodecagons)
- Hexagonal antiprism (12 triangles, 2 hexagons)
Johnson solids:
- J₁₈: Elongated triangular cupola (4 triangles, 9 squares, 1 hexagon)
- J₂₇: Triangular orthobicupola (8 triangles, 6 squares)
- J₅₁: Triaugmented triangular prism (14 triangles)
- J₅₅: Parabiaugmented hexagonal prism (8 triangles, 4 squares, 2 hexagons)
- J₅₆: Metabiaugmented hexagonal prism (8 triangles, 4 squares, 2 hexagons)
- J₆₅: Augmented truncated tetrahedron (8 triangles, 3 squares, 3 hexagons)
- J₈₆: Sphenocorona (12 triangles, 2 squares)
- J₉₁: Bilunabirotunda (8 triangles, 2 squares, 4 pentagons)

Tetradecahedra having at least one irregular face:

Heptagonal dipyramid (14 triangles) (see Dipyramid)
Heptagonal trapezohedron (14 kites) (see Trapezohedron)
Tridecagonal pyramid (13 triangles, 1 regular tridecagon) (see Pyramid (geometry))
Dissected regular icosahedron (the vertex figure of the grand antiprism) (12 equilateral triangles and 2 trapezoids)
Hexagonal truncated trapezohedron: (12 pentagons, 2 hexagons)
Includes an optimal space-filling shape in foams (see Weaire-Phelan structure) and in the crystal structure of Clathrate hydrate (see illustration, next to label 5¹²6²)

References

What Are Polyhedra?, with Greek Numerical Prefixes

External links

[1] Tetradecahedron

[2] Tetradecahedron

[3] Tetrakaidecahedron

[4] Tetrakaidecahedron

[5] Counting polyhedra

[1]

[2]

[3]

[4]

[5]

v t e Polyhedra
Listed by number of faces and type
1–10 faces	Monohedron Dihedron Trihedron Tetrahedron Pentahedron Hexahedron Heptahedron Octahedron Enneahedron Decahedron
11–20 faces	Hendecahedron Dodecahedron Tridecahedron Tetradecahedron Pentadecahedron Hexadecahedron Heptadecahedron Octadecahedron Enneadecahedron Icosahedron
>20 faces	Icositetrahedron (24) Triacontahedron (30) Icosidodecahedron (32) Hexoctahedron (48) Hexecontahedron (60) Enneacontahedron (90) Hectotriadiohedron (132) Apeirohedron (∞)
elemental things	face edge vertex uniform polyhedron (two infinite groups and 75) regular polyhedron (9) quasiregular polyhedron (16) semiregular polyhedron (two infinite groups and 50)
convex polyhedron	Platonic solid (5) Archimedean solid (13) Catalan solid (13) Johnson solid (92)
non-convex polyhedron	Kepler–Poinsot polyhedron (4) Star polyhedron (infinite) Uniform star polyhedron (57)
prismatoid‌s	prism antiprism frustum cupola wedge pyramid parallelepiped

Convex

Examples

See also

References

External links