Digonal-scalenohedral 8-3 double step prism

From Polytope Wiki
Revision as of 21:20, 16 November 2023 by OfficialURL (talk | contribs) (Fixed with MathFixer.)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigation Jump to search
Digonal-scalenohedral 8-3 double step prism
File:Digonal-scalenohedral 8-3 double step prism.png
Rank4
TypeIsogonal
Elements
Cells16 phyllic disphenoids, 16 tetragonal disphenoids, 8 chiral digonal scalenohedra
Faces32 scalene triangles, 32+32 isosceles triangles
Edges8+16+16+32
Vertices16
Vertex figure9-vertex polyhedron with 3 tetragons and 8 triangles
Measures (based on unit rectified tesseract)
Edge lengths6-valence (16): 1
 4-valence (16):
 4-valence (8):
 3-valence (32):
Circumradius
Central density1
Related polytopes
DualTrapezoprismatic intersected 8-3 bigyrochoron
Abstract & topological properties
Euler characteristic0
OrientableYes
Properties
SymmetryS2(I2(8)-3)×2R, order 32
ConvexYes
NatureTame

The digonal-scalenohedral 8-3 double step prism is a convex isogonal polychoron, formed as a convex hull of two 8-3 step prisms in a way that leaves six corealmic vertices corresponding to a digonal scalenohedron. It consists of 8 chiral digonal scalenohedra, 16 tetragonal disphenoids, and 16 phyllic disphenoids. 3 digonal scalenohedra, 4 tetragonal disphenoids, and 4 phyllic disphenoids join at each vertex.

It can be constructed by removing an inscribed digonal-scalenohedral 8-3 double step prism from a rectified tesseract.

The ratio between the longest and shortest edges is 1: ≈ 1:1.73205.

Vertex coordinates[edit | edit source]

Coordinates for the vertices of a digonal-scalenohedral 8-3 double step prism are given by:

  • (a*sin(2πk/8), a*cos(2πk/8), b*sin(6πk/8), b*cos(6πk/8)),
  • (b*sin(2πk/8), b*cos(2πk/8), a*sin(6πk/8), a*cos(6πk/8)),

where a = , b = , and k is an integer from 0 to 7.

External links[edit | edit source]