Pentadecagon

Regular pentadecagon
	A regular pentadecagon
Type	Regular polygon
Edges and vertices	15
Schläfli symbol	{15}
Coxeter diagram
Symmetry group	Dihedral (D15), order 2×15
Internal angle (degrees)	156°
Dual polygon	self
Properties	convex, cyclic, equilateral, isogonal, isotoxal

In geometry, a pentadecagon (or pentakaidecagon) is a 15-sided polygon or 15-gon.

Regular pentadecagon

A regular pentadecagon is represented by Schläfli symbol {15}.

A regular pentadecagon has interior angles of 156°, and with a side length a, has an area given by

\begin{align} A & = \frac{15}{4}a^2 \cot \frac{\pi}{15} \\ & = \frac{15a^2}{8} \left( \sqrt{3}+\sqrt{15}+ \sqrt{2}\sqrt{5+\sqrt{5}} \right) \\ & \simeq 17.6424\,a^2. \end{align}

Uses

A regular triangle, decagon, and pentadecagon can completely fill a plane vertex.

Construction

As 15 = 3 × 5, a regular pentadecagon is constructible using compass and straightedge: The construction of a regular pentadecagon is Proposition XVI of Book IV of Euclid's Elements. ^[1]

Comparison the construction according Euclid with this article: Pentadecagon

In the construction for a given circumscribed circle: $\overline{FG} = \overline{CF}\text{,} \; \overline{AH} = \overline{GM}\text{,} \; |E_1E_6|$ is a side of equilateral triangle and $|E_2E_5|$ is a side of a regular pentagon. The point $H$ divides the radius $\overline{AM}$ in golden ratio: $\frac{\overline{AH}}{\overline{HM}} = \frac{\overline{AM}}{\overline{AH}} = \frac{1+ \sqrt{5}}{2} = \Phi \approx 1.618 \text{.}$

Compared with the first animation (with green lines) are in the following two images the two circular arc (for angles 36° and 24°) rotated 90° counterclockwise shown.

A compass and straightedge construction for a given side length. The construction is nearly equal to that of the pentagon at a given side,^[2] then also the presentation is succeed by extension one side and it generates a segment, here $\overline{FE_2}\text{,}$ which is divided according to the golden ratio. $\frac{\overline{E_1 E_2}}{\overline{E_1 F}} = \frac{\overline{E_2 F}}{\overline{E_1 E_2}} = \frac{1+ \sqrt{5}}{2} = \Phi \approx 1.618 \text{.}$

Construction

Construction as animation

Symmetry

The symmetries of a regular pentadecagon as shown with colors on edges and vertices. Lines of reflections are blue. Gyrations are given as numbers in the center. Vertices are colored by their symmetry positions.

The regular pentadecagon has Dih₁₅ dihedral symmetry, order 30, represented by 15 lines of reflection. Dih₁₅ has 3 dihedral subgroups: Dih₅, Dih₃, and Dih₁. And four more cyclic symmetries: Z₁₅, Z₅, Z₃, and Z₁, with Z_n representing π/n radian rotational symmetry.

On the pentadecagon, there are 8 distinct symmetries. John Conway labels these symmetries with a letter and order of the symmetry follows the letter.^[3] He gives r30 for the full reflective symmetry, Dih₁₅. He gives d (diagonal) with reflection lines through vertices, p with reflection lines through edges (perpendicular), and for the odd-sided pentadecagon i with mirror lines through both vertices and edges, and g for cyclic symmetry. a1 labels no symmetry.

These lower symmetries allows degrees of freedoms in defining irregular pentadecagons. Only the g15 subgroup has no degrees of freedom but can seen as directed edges.

Pentadecagrams

There are 3 regular star polygons: {15/2}, {15/4}, {15/7}, constructed from the same 15 vertices of a regular pentadecagon, but connected by skipping every second, fourth, or seventh vertex respectively.

There are also three regular star figures: {15/3}, {15/5}, {15/6}, the first being a compound of 3 pentagons, the second a compound of 5 equilateral triangles, and the third is a compound of 3 pentagrams.

Picture	{15/2}	{15/3} or 3{5}	{15/4}	{15/5} or 5{3}	{15/6} or 3{5/2}	{15/7}
Interior angle	132°	108°	84°	60°	36°	12°

Petrie polygons

The regular pentadecagon is the Petrie polygon for some higher-dimensional polytopes, projected in a skew orthogonal projection:

14-simplex (14D)

It is also the Petrie polygon for the great 120-cell and grand stellated 120-cell.

References

↑ Lua error in package.lua at line 80: module 'strict' not found. from good authority: UNIVERSITY OF KENTUCKY College of Arts & Sciences Mathematics
↑ A simplified version of the representation of: Der goldene Schnitt und das regelmäßige Fünfeck; 6th image; Susanne Mueller-Philipp; Uni Münster retrieved on 19 December 2014.
↑ 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)

External links

Weisstein, Eric W., "Pentadecagon", MathWorld.

[1] Lua error in package.lua at line 80: module 'strict' not found. from good authority: UNIVERSITY OF KENTUCKY College of Arts & Sciences Mathematics

[2] A simplified version of the representation of: Der goldene Schnitt und das regelmäßige Fünfeck; 6th image; Susanne Mueller-Philipp; Uni Münster retrieved on 19 December 2014.

[3] 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)

[1]

[2]

[3]

v t e 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 (1000) Myriagon (10 000) 65537-gon Megagon (1 000 000) Apeirogon (∞)
Star polygons (5–12 sides)	Pentagram Hexagram Heptagram Octagram Enneagram Decagram Hendecagram Dodecagram

Pentadecagon

Contents

Regular pentadecagon

Uses

Construction

Symmetry

Pentadecagrams

Petrie polygons

References

External links

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