Blended disnub hexecontatetradisoctachoron
|Blended disnub hexecontatetradisoctachoron|
|Bowers style acronym||Bidsgado|
|Cells||8 great icosahedra, 8 icosahedra, 192 tetrahedra, 96+64 octahedra, 64 tetrahemihexahedra, 32 cubohemioctahedra|
|Faces||1312 triangles, 192 squares, 64 hexagons|
|Measures (edge length 1)|
|Conjugate||Blended disnub hexecontatetradisoctachoron|
|Abstract & topological properties|
|Symmetry||D4+, order 96|
The blended disnub hexecontatetradisoctachoron, or bidsgado, is a nonconvex uniform polychoron that consists of 8 great icosahedra, 8 icosahedra, 192 tetrahedra, 96+64 octahedra, 64 tetrahemihexahedra, and 32 cubohemioctahedra. One great icosahedron, one icosahedron, eight tetrahedra, ten octahedra, four tetrahemihexahedra, and four cuboctahedra join at each vertex.
It can be obtained as the blend of a snub hexecontatetrasnub-snub disoctachoron, 4 icositetrachora, and 4 hexadecaoctahemihexadecachora. In the process, some of the octahedron cells blend out.
Vertex coordinates[edit | edit source]
Its vertices are the same as those of its regiment colonel, the disnub disicositetrachoron.
Related polychora[edit | edit source]
There are other idtessids that the blended disnub hexecontatetradisoctachoron shares blend components with, but whose facets are counted differently. The first of these is the cisblended disnub hexecontatetradisoctachoron.
External links[edit | edit source]
- Bowers, Jonathan. "Category 30: Idtessids" (#1907).
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