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A hexagonal prism is a prism with a hexagon as the base. This also makes it the cartesian product of a hexagon and a line segment.

It is also the truncated hexagonal hosohedron.

Its Bowers' acronym is hip.

Structure and Sections

One hexagon and two squares meet at each vertex.

See Also

Regular
$ t_0 \{6,2\} $
Rectified
$ t_1 \{6,2\} $
Birectified
$ t_2 \{6,2\} $
Truncated
$ t_{0,1} \{6,2\} $
Bitruncated
$ t_{1,2} \{6,2\} $
Cantellated
$ t_{0,2} \{6,2\} $
Cantitruncated
$ t_{0,1,2} \{6,2\} $
Hexagonal dihedron Hexagonal dihedron Hexagonal hosohedron Truncated hexagonal dihedron Hexagonal prism Hexagonal prism Dodecagonal prism
Regular
$ t_0 \{3,2\} $
Rectified
$ t_1 \{3,2\} $
Birectified
$ t_2 \{3,2\} $
Truncated
$ t_{0,1} \{3,2\} $
Bitruncated
$ t_{1,2} \{3,2\} $
Cantellated
$ t_{0,2} \{3,2\} $
Cantitruncated
$ t_{0,1,2} \{3,2\} $
Trigonal dihedron Trigonal dihedron Trigonal hosohedron Truncated trigonal dihedron Triangular prism Triangular prism Hexagonal prism
$ {t}_{0,1} \{2,2\} $ $ {t}_{0,1} \{2,3\} $ $ {t}_{0,1} \{2,4\} $ $ {t}_{0,1} \{2,5\} $ $ {t}_{0,1} \{2,6\} $ $ {t}_{0,1} \{2,7\} $ $ {t}_{0,1} \{2,8\} $ ... $ {t}_{0,1} \{2,\aleph_0\} $
Digonal prism Triangular prism Cube Pentagonal prism Hexagonal prism Heptagonal prism Octagonal prism ... Apeirogonal prism

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