Hexahedron
A hexahedron (plural: hexahedra) is any polyhedron with six faces. A cube, for example, is a regular hexahedron with all its faces square, and three squares around each vertex.
There are seven topologically distinct convex hexahedra,[1] one of which exists in two mirror image forms. (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.)
| Quadrilaterally-faced hexahedron (Cuboid) 6 faces, 12 edges, 8 vertices | ||||||
|---|---|---|---|---|---|---|
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| Cube (square) |
Rectangular cuboid (three pairs of rectangles) |
Trigonal trapezohedron (congruent rhombi) |
Trigonal trapezohedron (congruent quadrilaterals) |
Quadrilateral frustum (apex-truncated square pyramid) |
Parallelepiped (three pairs of parallelograms) |
(three pairs of rhombi) |
| Oh, [4,3], (*432) order 48 |
D2h, [2,2], (*222) order 8 |
D3d, [2+,6], (2*3) order 12 |
D3, [2,3]+, (223) order 6 |
C4v, [4], (*44) order 8 |
Ci, [2+,2+], (×) order 2 | |
 Triangular bipyramid 36 Faces 9 E, 5 V |
  Tetragonal antiwedge. Chiral – exists in "left-handed" and "right-handed" mirror image forms. 4.4.3.3.3.3 Faces 10 E, 6 V |
 4.4.4.4.3.3 Faces 11 E, 7 V |
 Pentagonal pyramid 5.35 Faces 10 E, 6 V |
 5.4.4.3.3.3 Faces 11 E, 7 V |
 5.5.4.4.3.3 Faces 12 E, 8 V |
There are three further topologically distinct hexahedra that can only be realised as concave figures:
| Concave | ||
|---|---|---|
 4.4.3.3.3.3 Faces 10 E, 6 V |
 5.5.3.3.3.3 Faces 11 E, 7 V |
 6.6.3.3.3.3 Faces 12 E, 8 V |
References
See also
External links
- Polyhedra with 4-7 Faces by Steven Dutch
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