Icositetragon

Regular icositetragon
A regular icositetragon
Type	Regular polygon
Edges and vertices	24
Schläfli symbol	{24}, t{12}, tt{6}, ttt{3}
Coxeter diagram
Symmetry group	Dihedral (D₂₄), order 2×24
Internal angle (degrees)	165°
Dual polygon	Self
Properties	Convex, cyclic, equilateral, isogonal, isotoxal

In geometry, an icositetragon (or icosikaitetragon or tetracosagon) or 24-gon is a twenty-four-sided polygon. The sum of any icositetragon's interior angles is 3960 degrees.

Regular icositetragon

The regular icositetragon is represented by Schläfli symbol {24} and can also be constructed as a truncated dodecagon, t{12}, or a twice-truncated hexagon, tt{6}, or thrice-truncated triangle, ttt{3}.

Further information: Trigonometric_constants_expressed_in_real_radicals § 7.5°: regular icositetragon (24-sided polygon)

One interior angle in a regular icositetragon is 165°, meaning that one exterior angle would be 15°.

The area of a regular icositetragon is: (with t = edge length)

A=6t^{2}\cot {\frac {\pi }{24}}={6}t^{2}(2+{\sqrt {2}}+{\sqrt {3}}+{\sqrt {6}}).

The icositetragon appeared in Archimedes' polygon approximation of pi, along with the hexagon (6-gon), dodecagon (12-gon), tetracontaoctagon (48-gon), and enneacontahexagon (96-gon).

Construction

As 24 = 2³ × 3, a regular icositetragon is constructible using a compass and straightedge.^[1] As a truncated dodecagon, it can be constructed by an edge-bisection of a regular dodecagon.

Symmetry

Symmetries of a regular icositetragon. Vertices are colored by their symmetry positions. Blue mirrors are drawn through vertices, and purple mirrors are drawn through edge. Gyration orders are given in the center.

The regular icositetragon has Dih₂₄ symmetry, order 48. There are 7 subgroup dihedral symmetries: (Dih₁₂, Dih₆, Dih₃), and (Dih₈, Dih₄, Dih₂ Dih₁), and 8 cyclic group symmetries: (Z₂₄, Z₁₂, Z₆, Z₃), and (Z₈, Z₄, Z₂, Z₁).

These 16 symmetries can be seen in 22 distinct symmetries on the icositetragon. John Conway labels these by a letter and group order.^[2] The full symmetry of the regular form is r48 and no symmetry is labeled a1. The dihedral symmetries are divided depending on whether they pass through vertices (d for diagonal) or edges (p for perpendiculars), and i when reflection lines path through both edges and vertices. Cyclic symmetries in the middle column are labeled as g for their central gyration orders.

Each subgroup symmetry allows one or more degrees of freedom for irregular forms. Only the g24 subgroup has no degrees of freedom but can seen as directed edges.

Related polygons

A regular triangle, octagon, and icositetragon can completely fill a plane vertex.

An icositetragram is a 24-sided star polygon. There are 3 regular forms given by Schläfli symbols: {24/5}, {24/7}, and {24/11}. There are also 7 regular star figures using the same vertex arrangement: 2{12}, 3{8}, 4{6}, 6{4}, 8{3}, 3{8/3}, and 2{12/5}.

Icositetragrams as star polygons and star figures

Form	Convex polygon	Compounds			Star polygon	Compound
Image	{24/1}={24}	{24/2}=2{12}	{24/3}=3{8}	{24/4}=4{6}	{24/5}	{24/6}=6{4}
Interior angle	165°	150°	135°	120°	105°	90°
Form	Star polygon	Compounds			Star polygon	Compound
Image	{24/7}	{24/8}=8{3}	{24/9}=3{8/3}	{24/10}=2{12/5}	{24/11}	{24/12}=12{2}
Interior angle	75°	60°	45°	30°	15°	0°

There are also isogonal icositetragrams constructed as deeper truncations of the regular dodecagon {12} and dodecagram {12/5}. These also generate two quasitruncations: t{12/11}={24/11}, and t{12/7}={24/7}. ^[3]

Isogonal truncations of regular dodecagon and dodecagram

Quasiregular	Isogonal					Quasiregular
t{12}={24}						t{12/11}={24/11}
t{12/5}={24/5}						t{12/7}={24/7}

Skew icositetragon

3 regular skew zig-zag icositetragons
{12}#{ }	{12/5}#{ }	{12/7}#{ }

A regular skew icositetragon is seen as zig-zagging edges of a dodecagonal antiprism, a dodecagrammic antiprism, and a dodecagrammic crossed-antiprism.

A skew icositetragon is a skew polygon with 24 vertices and edges but not existing on the same plane. The interior of such an icositetragon is not generally defined. A skew zig-zag icositetragon has vertices alternating between two parallel planes.

A regular skew icositetragon is vertex-transitive with equal edge lengths. In 3-dimensions it will be a zig-zag skew icositetragon and can be seen in the vertices and side edges of a dodecagonal antiprism with the same D_12d, [2⁺,24] symmetry, order 48. The dodecagrammic antiprism, s{2,24/5} and dodecagrammic crossed-antiprism, s{2,24/7} also have regular skew dodecagons.

Petrie polygons

The regular icositetragon is the Petrie polygon for many higher-dimensional polytopes, seen as orthogonal projections in Coxeter planes, including:

E₈
4₂₁	2₄₁	1₄₂

References

↑ Constructible Polygon
↑ John H. Conway, Heidi Burgiel, Chaim Goodman-Strauss, (2008) The Symmetries of Things, ISBN 978-1-56881-220-5 (Chapter 20, Generalized Schaefli symbols, Types of symmetry of a polygon pp. 275-278)
↑ The Lighter Side of Mathematics: Proceedings of the Eugène Strens Memorial Conference on Recreational Mathematics and its History, (1994), Metamorphoses of polygons, Branko Grünbaum

Weisstein, Eric W. "Icositetragon". MathWorld.

Regular polygons

Listed by number of sides

1–10 sides	Monogon Digon Equilateral triangle Square Pentagon Hexagon Heptagon Octagon Nonagon (Enneagon) Decagon

11–20 sides	Hendecagon Dodecagon Tridecagon Tetradecagon Pentadecagon Hexadecagon Heptadecagon Octadecagon Enneadecagon Icosagon

21–100 sides (selected)	Icositetragon (24) Triacontagon (30) Triacontadigon (32) Tetracontagon (40) Tetracontadigon (42) Tetracontaoctagon (48) Pentacontagon (50) Hexacontagon (60) Hexacontatetragon (64) Heptacontagon (70) Octacontagon (80) Enneacontagon (90) Enneacontahexagon (96) Hectogon (100)

>100 sides	120-gon 257-gon 360-gon Chiliagon (1,000) Myriagon (10,000) 65537-gon Megagon (1,000,000) Apeirogon (∞)

Star polygons (5–12 sides)	Pentagram Hexagram Heptagram Octagram Enneagram Decagram Hendecagram Dodecagram

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