WebThe mutetrahedron or mut, short for multiple tetrahedron, is one of the three regular skew apeirohedra in Euclidean 3-space. It's an infinite polyhedron that consists solely of hexagons, with 6 meeting at each vertex. The mutetrahedron is based on the cyclotruncated tetrahedral-octahedral honeycomb. WebIcosahedron. The icosahedron, or ike, is one of the five Platonic solids. It has 20 triangles as faces, joining 5 to a vertex. An alternate, lower symmetry construction as a snub tetrahedron, furthermore relates the icosahedron to the snub polytopes, most notably to the snub disicositetrachoron, of which it is a cell .
Petrial hexagonal tiling - Polytope Wiki
WebThe petrial great stellated dodecahedron is a regular skew polyhedron and is the Petrie dual of the great stellated dodecahedron, and so it shares both of its vertices and edges with the great stellated dodecahedron. It consists of 6 skew decagrams and has an Euler characteristic of -4. Contents 1 Vertex coordinates 2 Related polyhedra WebThe cube or hexahedron is one of the five Platonic solids. It has 6 square faces, joining 3 to a triangular vertex. It is the 3-dimensional hypercube . It is the only Platonic solid that can tile 3-dimensional Euclidean space. This results in the cubic honeycomb. It also forms the cells of the 4D tesseract . It is also the uniform square prism . gakidling primary school
Petrial mucube - Polytope Wiki
WebPetrial mutetrahedron From Polytope Wiki The Petrial mutetrahedron is a regular skew apeirohedron in 3-dimensional Euclidean space. It is the Petrie dual of the mutetrahedron, and it has 6 triangular helices meeting at a vertex. Contents 1 Vertex coordinates 2 External links 3 References 4 Bibliography Vertex coordinates] WebThe petrial great dodecahedron is a regular skew polyhedron and the Petrie dual of the great dodecahedron. It consists of 10 skew hexagons, has an Euler characteristic of -8, and it shares the vertices and edges of the icosahedron. Vertex coordinates [edit edit source] WebFor the Win! There are no games in progress. Create a game by clicking on the "+" icon below. gakic review