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{{short description|Near-miss Johnson solid with 28 faces}}
{| border="1" bgcolor="#ffffff" cellpadding="5" align="right" style="margin-left:10px" width="250"
{{Infobox polyhedron
!bgcolor=#e7dcc3 colspan=2|Tetrated dodecahedron
| image = Tetrated dodecahedron.svg
|-
| type = [[Near-miss Johnson solid]]
|align=center colspan=2|[[Image:Tetrated Dodecahedron.gif|240px|Tetrated dodecahedron]]
| euler =
|-
| faces = 4 [[equilateral triangle]]s<br>12 [[isosceles triangle]]s<br>12 [[pentagon]]s
|bgcolor=#e7dcc3|Type||[[near-miss Johnson solid]]
| edges = 54
|-
| vertices = 28
|bgcolor=#e7dcc3|Faces||4+12 [[triangle]]s<br>12 [[pentagon]]s
| vertex_config = 4 ({{math|5.5.5}})<BR>12 ({{math|3.5.3.5}})<BR>12 ({{math|3.3.5.5}})
|-
| schläfli =
|bgcolor=#e7dcc3|Edges||54
| wythoff =
|-
| conway =
|bgcolor=#e7dcc3|Vertices||28
| coxeter =
|-
| symmetry = {{mvar|T<sub>d</sub>}}
|bgcolor=#e7dcc3|[[Vertex configuration]]||4 (5.5.5)<BR>12 (3.5.3.5)<BR>12 (3.3.5.5)
| rotation_group =
|-
| surface_area =
|bgcolor=#e7dcc3|[[List of spherical symmetry groups|Symmetry group]]||T<sub>d</sub>
| volume =
|-
| angle =
|bgcolor=#e7dcc3|Properties||convex
| dual =
|}
| properties = [[convex polytope|convex]]
The '''tetrated dodecahedron''' is a [[near-miss Johnson solid]]. It was first discovered in 2002 by Alex Doskey. It was then independently rediscovered in 2003 and named by Robert Austin.<ref>[http://www.orchidpalms.com/polyhedra/acrohedra/nearmiss/Tetrated%20Dodecahedra.html Tetrated dodecahedra]</ref>
| vertex_figure =

| net = TetratedDodeca flat.png
It has 28 faces: twelve regular pentagons arranged in four panels of three pentagons each, four equilateral triangles (shown in blue), and six pairs of isosceles triangles (shown in yellow). All edges of the tetrated dodecahedron have the same length, except for the shared bases of these isosceles triangles, which are approximately 1.07 times as long as the other edges. This [[polyhedron]] has [[tetrahedral symmetry]].
}}

[[File:Tetrated dodecahedron.stl|thumb|3D model of a tetrated dodecahedron]]
== Net ==
[[File:Physical model of tetrated dodecahedron.png|thumb|Model built with [[polydron]]]]
In [[geometry]], the '''tetrated dodecahedron''' is a [[near-miss Johnson solid]]. It was first discovered in 2002 by Alex Doskey. It was then independently rediscovered in 2003, and named, by Robert Austin.<ref>[http://www.orchidpalms.com/polyhedra/acrohedra/nearmiss/Tetrated%20Dodecahedra.html Tetrated dodecahedra]</ref>


It has 28 [[Face (geometry)|faces]]: twelve regular [[pentagon]]s arranged in four panels of three pentagons each, four [[equilateral triangle]]s (shown in blue), and six pairs of [[isosceles triangle]]s (shown in yellow). All edges of the tetrated [[dodecahedron]] have the same length, except for the shared bases of these isosceles triangles, which are approximately 1.07 times as long as the other edges. This [[polyhedron]] has [[tetrahedral symmetry]].
The 12 pentagons and 16 triangles are colored in this net by their locations within the tetrahedral symmetry.


Topologically, as a near-miss Johnson solid, the four triangles corresponding to the face planes of a tetrahedron are always equilateral, while the pentagons and the other triangles only have reflection symmetry.
[[File:TetratedDodeca flat.png|400px]]


== Related polyhedra ==
== Related polyhedra ==
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|[[File:Johnson solid 34 net.png|120px]]
|[[File:Johnson solid 34 net.png|120px]]
|}
|}

== See also ==
* [[Tetrahedrally diminished dodecahedron]]


== Notes ==
== Notes ==
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[[Category:Polyhedra]]
[[Category:Polyhedra]]

[[eo:Kvaruma dekduedro]]

Latest revision as of 16:08, 30 November 2023

Tetrated dodecahedron
TypeNear-miss Johnson solid
Faces4 equilateral triangles
12 isosceles triangles
12 pentagons
Edges54
Vertices28
Vertex configuration4 (5.5.5)
12 (3.5.3.5)
12 (3.3.5.5)
Symmetry groupTd
Propertiesconvex
Net
3D model of a tetrated dodecahedron
Model built with polydron

In geometry, the tetrated dodecahedron is a near-miss Johnson solid. It was first discovered in 2002 by Alex Doskey. It was then independently rediscovered in 2003, and named, by Robert Austin.[1]

It has 28 faces: twelve regular pentagons arranged in four panels of three pentagons each, four equilateral triangles (shown in blue), and six pairs of isosceles triangles (shown in yellow). All edges of the tetrated dodecahedron have the same length, except for the shared bases of these isosceles triangles, which are approximately 1.07 times as long as the other edges. This polyhedron has tetrahedral symmetry.

Topologically, as a near-miss Johnson solid, the four triangles corresponding to the face planes of a tetrahedron are always equilateral, while the pentagons and the other triangles only have reflection symmetry.

[edit]
Dodecahedron
(Platonic solid)
Icosidodecahedron
(Archimedean solid)
Pentagonal
orthobirotunda

(Johnson solid)

See also

[edit]

Notes

[edit]