Rectified truncated icosahedron

Rectified truncated icosahedron
Schläfli symbolrt{3,5}
Conway notationatI[1]
Faces92:
60 { }∨( )
12 {5}
20 {6}
Edges180
Vertices90
Symmetry groupIh, [5,3], (*532) order 120
Rotation groupI, [5,3]+, (532), order 60
Dual polyhedronRhombic enneacontahedron
Propertiesconvex

Net

The rectified truncated icosahedron is a polyhedron, constructed as a rectified truncated icosahedron. It has 92 faces: 60 isosceles triangles, 12 regular pentagons, and 20 regular hexagons.

Images

Dual

By Conway polyhedron notation, the dual polyhedron can be called a joined truncated icosahedron, but it is topologically equivalent to the rhombic enneacontahedron with all rhombic faces.

Related polyhedra

The rectified truncated icosahedron can be seen in sequence of rectification and truncation operations from the truncated icosahedron. Further truncation, and alternation operations creates two more polyhedra:

Name Truncated
icosahedron
Truncated
truncated
icosahedron
Rectified
truncated
icosahedron
Expanded
truncated
icosahedron
Truncated
rectified
truncated
icosahedron
Snub
rectified
truncated
icosahedron
Coxeter tI[2] ttI[3] rtI rrtI trtI srtI
Conway atI[4] etI[5] btI[6] stI[7]
Image
Net
Conway dtI = kD[8] kdtI[9] jtI[10] otI[11] mtI[12] gtI[13]
Dual
Net

See also

References

External links

This article is issued from Wikipedia - version of the 11/23/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.