hyperrechthoek
Also known as box, n-orthotope
thumb|Projections of k-cells onto the plane (from k\in\{1,\dots{},6\}). Only the edges of the higher-dimensional cells are shown. In geometry, a hyperrectangle (also called a box, hyperbox, k-cell or orthotope), is the generalization of a rectangle (a plane figure) and the rectangular cuboid (a solid figure) to higher dimensions. A necessary and sufficient condition is that it is congruent to the Cartesian product of finite intervals. This means that a k-dimensional rectangular solid has each of its edges equal to one of the closed intervals used in the definition. Every k-cell is compact.
Key facts
- Polyhedron.name
- -fusil
- Polyhedron.image
- File:Rhombic 3-orthoplex.svg
- Polyhedron.caption
- Example: 3-fusil
- Polyhedron.type
- Prism
- Polyhedron.schläfli
- {{math|1={}+{}+···+{} = {} }}
- Polyhedron.coxeter
- ...
- Polyhedron.symmetry
- , order
- Polyhedron.dual
- -orthotope
- Polyhedron.properties
- convex, isotopal
via Wikipedia infobox
Article · Nederlands
In de meetkunde is een hyperrechthoek de generalisatie in willekeurig veel dimensies van een tweedimensionale rechthoek en een driedimensionale balk. Een hyperkubus is een speciaal geval van een hyperrechthoek.
Abstract from DBpedia / Wikipedia · CC BY-SA