Hyperrectangle
| Hyperrectangle n-orthotope | |
|---|---|
 A rectangular cuboid is a 3-orthotope | |
| Type | Prism |
| Facets | 2n |
| Vertices | 2n |
| Symmetry group | [2n-1], order 2n |
| Schläfli symbol | { }n |
| Coxeter-Dynkin diagram |   ... |
| Dual | Rectangular n-fusil |
| Properties | convex, zonohedron, isogonal |
In geometry, an orthotope[1] (also called a hyperrectangle or a box) is the generalization of a rectangle for higher dimensions, formally defined as the Cartesian product of intervals.
A three-dimensional orthotope is also called a right rectangular prism, rectangular cuboid, or rectangular parallelepiped.
A special case of an n-orthotope, where all edges are equal length, is the n-hypercube.[1]
By analogy, the term "hyperrectangle" or "box" refers to Cartesian products of orthogonal intervals of other kinds, such as ranges of keys in database theory or ranges of integers, rather than real numbers.[citation needed]
Dual polytope
The dual polytope of an n-orthotope has been variously called a rectangular n-orthoplex, rhombic n-fusil, or n-lozenge. It is constructed by 2n points located in the center of the orthotope rectangular faces. Its plane cross selections in all pairs of axes are rhombi. An n-fusil's Schläfli symbol can be represented by a sum of n orthogonal line segments: { } + { } + ... + { }
| n | Example image |
|---|---|
| 1 |  { }  |
| 2 | .png) { } + { } |
| 3 |   Example rhombic 3-orthoplex inside 3-orthotope { } + { } + { } |
See also
Notes
References
- Coxeter, Harold Scott MacDonald (1973). Regular Polytopes (3rd ed.). New York: Dover. pp. 122–123. ISBN 0-486-61480-8.
External links
- Weisstein, Eric W., "Rectangular parallelepiped", MathWorld.
- Weisstein, Eric W., "Orthotope", MathWorld.
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