10-10 duoprism

Uniform 10-10 duoprism


Schlegel diagram
TypeUniform duoprism
Schläfli symbol{10}×{10} = {10}2
Coxeter diagrams

Cells25 decagonal prisms
Faces100 squares,
20 decagons
Edges200
Vertices100
Vertex figureTetragonal disphenoid
Symmetry[[10,2,10]] = [20,2+,20], order 800
Dual10-10 duopyramid
Propertiesconvex, vertex-uniform, Facet-transitive

In geometry of 4 dimensions, a 10-10 duoprism is a polygonal duoprism, a 4-polytope resulting from the Cartesian product of two decagons.

It has 100 vertices, 200 edges, 120 faces (100 squares, and 20 decagons), in 20 decagonal prism cells. It has Coxeter diagram , and symmetry [[10,2,10]], order 800.

Images

The uniform 10-10 duoprism can be constructed from [10]×[10] or [5]×[5] symmetry, order 400 or 100, with extended symmetry doubling these with a 2-fold rotation that maps the two orientations of prisms together.

2D orthogonal projection Net
[10] [20]

10-10 duopyramid

10-10 duopyramid
TypeUniform dual duopyramid
Schläfli symbol{10}+{10} = 2{10}
Coxeter diagrams

Cells100 tetragonal disphenoids
Faces200 isosceles triangles
Edges120 (100+20)
Vertices20 (10+10)
Symmetry[[10,2,10]] = [20,2+,20], order 800
Dual10-10 duoprism
Propertiesconvex, vertex-uniform, Facet-transitive

The dual of a 10-10 duoprism is called a 10-10 duopyramid. It has 100 tetragonal disphenoid cells, 200 triangular faces, 120 edges, and 20 vertices.


Orthogonal projection

See also

Notes

    References

    External links

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