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searching for Dual polyhedron 39 found (363 total)

alternate case: dual polyhedron

Small dodecahemidodecahedron (100 words) [view diff] exact match in snippet view article find links to article

covering) Symmetry group Ih, [5,3], *532 Index references U51, C65, W91 Dual polyhedron Small dodecahemidodecacron Vertex figure 5.10.5/4.10 Bowers acronym

covering) Symmetry group Ih, [5,3], *532 Index references U70, C86, W107 Dual polyhedron Great dodecahemidodecacron Vertex figure 5/2.10/3.5/3.10/3 Bowers acronym

5/3 Symmetry group Ih, [5,3], *532 Index references U71, C85, W106 Dual polyhedron Great icosihemidodecacron Vertex figure 3.10/3.3/2.10/3 Bowers acronym

covering) Symmetry group Ih, [5,3], *532 Index references U49, C63, W89 Dual polyhedron Small icosihemidodecacron Vertex figure 3.10.3/2.10 Bowers acronym

4/2) | Symmetry group Oh, [4,3], *432 Index references U18, C60, W86 Dual polyhedron Small rhombihexacron Vertex figure 4.8.4/3.8/7 Bowers acronym Sroh

covering) Symmetry group Ih, [5,3], *532 Index references U62, C78, W100 Dual polyhedron Small dodecahemicosacron Vertex figure 6.5/2.6.5/3 Bowers acronym Sidhei

5/4) | Symmetry group Ih, [5,3], *532 Index references U73, C89, W109 Dual polyhedron Great rhombidodecacron Vertex figure 4.10/3.4/3.10/7 Bowers acronym

5/4) | Symmetry group Ih, [5,3], *532 Index references U50, C64, W90 Dual polyhedron Small dodecicosacron Vertex figure 6.10.6/5.10/9 Bowers acronym Siddy

| 3 Symmetry group Ih, [5,3], *532 Index references U44, C56, W83 Dual polyhedron Medial icosacronic hexecontahedron Vertex figure 5.6.5/3.6 Bowers acronym

5/3 Symmetry group Ih, [5,3], *532 Index references U61, C77, W99 Dual polyhedron Great dodecacronic hexecontahedron Vertex figure 3.10/3.5/2.10/7 Bowers

| 3 Symmetry group Ih, [5,3], *532 Index references U48, C62, W88 Dual polyhedron Great icosacronic hexecontahedron Vertex figure 5.6.3/2.6 Bowers acronym

5/2 3 Symmetry group Ih, [5,3], *532 Index references U30, C39, W70 Dual polyhedron Small triambic icosahedron Vertex figure (3.5/2)3 Bowers acronym Sidtid

| 5 Symmetry group Ih, [5,3], *532 Index references U43, C55, W82 Dual polyhedron Small ditrigonal dodecacronic hexecontahedron Vertex figure 3.10.5/3

| 3 Symmetry group Ih, [5,3], *532 Index references U31, C40, W71 Dual polyhedron Small icosacronic hexecontahedron Vertex figure 6.5/2.6.3 Bowers acronym

5/3 Symmetry group Ih, [5,3], *532 Index references U42, C54, W81 Dual polyhedron Great ditrigonal dodecacronic hexecontahedron Vertex figure 3.10/3

5/2 3 Symmetry group I, [5,3]+, 532 Index references U64, C80, W115 Dual polyhedron Great hexagonal hexecontahedron Vertex figure 3.3.3.5/2.3.5/3 Bowers

5/2) | Symmetry group Ih, [5,3], *532 Index references U63, C79, W101 Dual polyhedron Great dodecicosacron Vertex figure 6.10/3.6/5.10/7 Bowers acronym Giddy

The dual polyhedron of a triangular cupola

5/4 Symmetry group Ih, [5,3], *532 Index references U47, C61, W87 Dual polyhedron Great triambic icosahedron Vertex figure ((3.5)3)/2 Bowers acronym

5/3 Symmetry group Ih, [5,3], *532 Index references U58, C74, W97 Dual polyhedron Great pentakis dodecahedron Vertex figure 5.10/3.10/3 Bowers acronym

3 3 Symmetry group Ih, [5,3], *532 Index references U32, C41, W110 Dual polyhedron Small hexagonal hexecontahedron Vertex figure 35.5/2 Bowers acronym

4/3 Symmetry group Oh, [4,3], *432 Index references U19, C66, W92 Dual polyhedron Great triakis octahedron Vertex figure 3.8/3.8/3 Bowers acronym Quith

4/3 | Symmetry group Oh, [4,3], *432 Index references U20, C67, W93 Dual polyhedron Great disdyakis dodecahedron Vertex figure 4.6/5.8/3 Bowers acronym

5/3 Symmetry group Ih, [5,3], *532 Index references U66, C83, W104 Dual polyhedron Great triakis icosahedron Vertex figure 3.10/3.10/3 Bowers acronym

symmetry, the cyclic group C 4 v {\displaystyle C_{4v}} of order 8. The dual polyhedron of a square cupola is the polyhedron with 8 triangles and 4 kites as

| 3 5/3 Symmetry group Ih, [5,3], *532 Index references U-, C-, W- Dual polyhedron Great complex icosidodecacron Vertex figure (3.5/3)5 (3.5/2)5/3 Bowers

5/3 Symmetry group I, [5,3]+, 532 Index references U74, C90, W117 Dual polyhedron Great pentagrammic hexecontahedron Vertex figure (34.5/2)/2 Bowers

5/2 Symmetry group Ih, [5,3], *532 Index references U72, C91, W118 Dual polyhedron Small hexagrammic hexecontahedron Vertex figure (35.5/3)/2 Bowers acronym

| 4 Symmetry group Oh, [4,3], *432 Index references U13, C38, W69 Dual polyhedron Small hexacronic icositetrahedron Vertex figure 4.8.3/2.8 Bowers acronym

new polyhedron is constructed, which is 18 surface structures of the dual polyhedron, also one of hendecahedrons. There are 440,564 topologically distinct

solid can have is 92: the snub dodecahedron has 92 faces while its dual polyhedron, the pentagonal hexecontahedron, has 92 vertices. On the other hand

136 of which are chiral. Using this same set of (Miller) rules, its dual polyhedron, the truncated tetrahedron, produces only 9 stellations, without including

5/2 Symmetry group Ih, [5,3], *532 Index references U75, C92, W119 Dual polyhedron Great dirhombicosidodecacron Vertex figure 4.5/3.4.3.4.5/2.4.3/2 Bowers

| 3/2 5 Symmetry group Ih, [5,3], *532 Index references U-, C-, W- Dual polyhedron Small complex icosidodecacron Vertex figure (3/2.5)5 (3.5)5/3 Bowers

such that the edge of one polyhedron intersects the dual edge of the dual polyhedron. There are five dual compounds of the regular polyhedra. The core is

convex polyhedron, then G* is the planar graph corresponding to the dual polyhedron. Duals are useful because many properties of the dual graph are related

reciprocation of a symmetrical polyhedron in a concentric sphere to obtain the dual polyhedron. Another example is Brianchon's theorem, the dual of the already mentioned

Skewb, it is a deep-cut puzzle very similar to the Skewb and is a dual-polyhedron transformation. Commercial Name: Skewb Ultimate Geometric shape: Dodecahedron

in particular contains pentagonal faces, while the icosahedron, its dual polyhedron, has a vertex figure that is a regular pentagon. These five regular