Equiangular polygon

Example equiangular polygons
Direct	Indirect	Skew
A rectangle, <4>, is a convex direct equiangular polygon, containing four 90° internal angles.	A concave indirect equiangular polygon, <6-2>, like this hexagon, counterclockwise, has five left turns and one right turn, like this tetromino.	A skew polygon has equal angles off a plane, like this skew octagon alternating red and blue edges on a cube.
Direct	Indirect	Counter-turned
A multi-turning equiangular polygon can be direct, like this octagon, <8/2>, has 8 90° turns, totaling 720°.	A concave indirect equiangular polygon, <5-2>, counterclockwise has 4 left turns and one right turn. (-1.2.4.3.2)_60°	An indirect equiangular hexagon, <6-6>_90° with 3 left turns, 3 right turns, totaling 0°.

In Euclidean geometry, an equiangular polygon is a polygon whose vertex angles are equal. If the lengths of the sides are also equal (that is, if it is also equilateral) then it is a regular polygon. Isogonal polygons are equiangular polygons which alternate two edge lengths.

For clarity, a planar equiangular polygon can be called direct or indirect. A direct equiangular polygon has all angles turning in the same direction in a plane and can include multiple turns. Convex equiangular polygons are always direct. An indirect equiangular polygon can include angles turning right or left in any combination. A skew equiangular polygon may be isogonal, but can't be considered direct since it is nonplanar.

A spirolateral n_θ is a special case of an equiangular polygon with a set of n integer edge lengths repeating sequence until returning to the start, with vertex internal angles θ.

Construction

An equiangular polygon can be constructed from a regular polygon or regular star polygon where edges are extended as infinite lines. Each edges can be independently moved perpendicular to the line's direction. Vertices represent the intersection point between pairs of neighboring line. Each moved line adjusts its edge-length and the lengths of its two neighboring edges.^[1] If edges are reduced to zero length, the polygon becomes degenerate, or if reduced to negative lengths, this will reverse the internal and external angles.

For an even-sided direct equiangular polygon, with internal angles θ°, moving alternate edges can invert all vertices into supplementary angles, 180-θ°. Odd-sided direct equiangular polygons can only be partially inverted, leaving a mixture of supplementary angles.

Every equiangular polygon can be adjusted in proportions by this construction and still preserve equiangular status.

This convex direct equiangular hexagon, <6>, is bounded by 6 lines with 60° angle between. Each line can be moved perpendicular to its direction.	This concave indirect equiangular hexagon, <6-2>, is also bounded by 6 lines with 90° angle between, each line moved independently, moving vertices as new intersections.

Equiangular polygon theorem

For a convex equiangular p-gon, each internal angle is 180(1-2/p)°; this is the equiangular polygon theorem.

For a direct equiangular p/q star polygon, density q, each internal angle is 180(1-2q/p)°, with 1<2q<p. For w=gcd(p,q)>1, this represents a w-wound (p/w)/(q/w) star polygon, which is degenerate for the regular case.

A concave indirect equiangular (p_r+p_l)-gon, with p_r right turn vertices and p_l left turn vertices, will have internal angles of 180(1-2/|p_r-p_l|))°, regardless of their sequence. An indirect star equiangular (p_r+p_l)-gon, with p_r right turn vertices and p_l left turn vertices and q total turns, will have internal angles of 180(1-2q/|p_r-p_l|))°, regardless of their sequence. An equiangular polygon with the same number of right and left turns has zero total turns, and has no constraints on its angles.

Notation

Every direct equiangular p-gon can be given a notation <p> or <p/q>, like regular polygons {p} and regular star polygons {p/q}, containing p vertices, and stars having density q.

Convex equiangular p-gons <p> have internal angles 180(1-2/p)°, while direct star equiangular polygons, <p/q>, have internal angles 180(1-2q/p)°.

A concave indirect equiangular p-gon can be given the notation <p-2c>, with c counter-turn vertices. For example, <6-2> is a hexagon with 90° internal angles of the difference, <4>, 1 counter-turned vertex. A multiturn indirect equilateral p-gon can be given the notation <^p-2c/_q> with c counter turn vertices, and q total turns. An equiangular polygon <p-p> is a p-gon with undefined internal angles θ, but can be expressed explicitly as <p-p>_θ.

Other properties

Viviani's theorem holds for equiangular polygons:^[2]

The sum of distances from an interior point to the sides of an equiangular polygon does not depend on the location of the point, and is that polygon's invariant.

A cyclic polygon is equiangular if and only if the alternate sides are equal (that is, sides 1, 3, 5, ... are equal and sides 2, 4, ... are equal). Thus if n is odd, a cyclic polygon is equiangular if and only if it is regular.^[3]

For prime p, every integer-sided equiangular p-gon is regular. Moreover, every integer-sided equiangular p^k-gon has p-fold rotational symmetry.^[4]

An ordered set of side lengths $(a_{1},\dots ,a_{n})$ gives rise to an equiangular n-gon if and only if either of two equivalent conditions holds for the polynomial $a_{1}+a_{2}x+\cdots +a_{n-1}x^{n-2}+a_{n}x^{n-1}:$ it equals zero at the complex value $e^{2\pi i/n};$ it is divisible by $x^{2}-2x\cos(2\pi /n)+1.$ ^[5]

Direct equiangular polygons by sides

Direct equiangular polygons can be regular, isogonal, or lower symmetries. Examples for <p/q> are grouped into sections by p and subgrouped by density q.

Equiangular triangles

Equiangular triangles must be convex and have 60° internal angles. It is an equilateral triangle and a regular triangle, <3>={3}. The only degree of freedom is edge-length.

Regular, {3}, r₆

Equiangular quadrilaterals

A rectangle dissected into a 2×3 array of squares^[6]

Direct equiangular quadrilaterals have 90° internal angles. The only equiangular quadrilaterals are rectangles, <4>, and squares, {4}.

An equiangular quadrilateral with integer side lengths may be tiled by unit squares.^[6]

Regular, {4}, r₈
Spirolateral 2_90°, p₄

Equiangular pentagons

Direct equiangular pentagons, <5> and <5/2>, have 108° and 36° internal angles respectively.

108° internal angle from an equiangular pentagon, <5>

Equiangular pentagons can be regular, have bilateral symmetry, or no symmetry.

Regular, r₁₀
Bilateral symmetry, i₂
No symmetry, a₁

36° internal angles from an equiangular pentagram, <5/2>

Regular pentagram, r₁₀
Irregular, d₂

Equiangular hexagons

Direct equiangular hexagons, <6> and <6/2>, have 120° and 60° internal angles respectively.

120° internal angles of an equiangular hexagon, <6>

An equiangular hexagon with integer side lengths may be tiled by unit equilateral triangles.^[6]

Regular, {6}, r₁₂
Spirolateral (1,2)_120°, p₆
Spirolateral (1…3)_120°, g₂
Spirolateral (1,2,2)_120°, i₄
Spirolateral (1,2,2,2,1,3)_120°, p₂

60° internal angles of an equiangular double-wound triangle, <6/2>

Regular, degenerate, r₆
Spirolateral (1,3)_60°, p₆
Spirolateral (1,2)_60°, p₆
Spirolateral (2,3)_60°, p₆
Spirolateral (1,2,3,4,3,2)_60°, p₂

Equiangular heptagons

Direct equiangular heptagons, <7>, <7/2>, and <7/3> have 128 4/7°, 77 1/7° and 25 5/7° internal angles respectively.

128.57° internal angles of an equiangular heptagon, <7>

Regular, {7}, r₁₄
Irregular, i₂

77.14° internal angles of an equiangular heptagram, <7/2>

Regular, r₁₄
Irregular, i₂

25.71° internal angles of an equiangular heptagram, <7/3>

Regular, r₁₄
Irregular, i₂

Equiangular octagons

Direct equiangular octagons, <8>, <8/2> and <8/3>, have 135°, 90° and 45° internal angles respectively.

135° internal angles from an equiangular octagon, <8>

Regular, r₁₆
Spirolateral (1,2)_135°, p₈
Spirolateral (1…4)_135°, g₂
Unequal truncated square, p₂

90° internal angles from an equiangular double-wound square, <8/2>

Regular degenerate, r₈
Spirolateral (1,2,2,3,3,2,2,1)_90°, d₂
Spirolateral (2,1,3,2,2,3,1,2)_90°, d₂

45° internal angles from an equiangular octagram, <8/3>

Regular, r₁₆
Isogonal, p₈
Isogonal, p₈
Spirolateral, (1,2)_45°, p₈
Isogonal, p₈
Spirolateral (1…4)_45°, g₂

Equiangular enneagons

Direct equiangular enneagons, <9>, <9/2>, <9/3>, and <9/4> have 140°, 100°, 60° and 20° internal angles respectively.

140° internal angles from an equiangular enneagon <9>

Regular, r₁₈
Spirolateral (1,1,3)_140°, i₆

100° internal angles from an equiangular enneagram, <9/2>

Regular {9/2}, p₉
Spirolateral (1,1,5)_100°, i₆
Spirolateral 3_100°, g₃

60° internal angles from an equiangular triple-wound triangle, <9/3>

Regular, degenerate, r₆
Irregular, a₁
Irregular, a₁
Irregular, a₁

20° internal angles from an equiangular enneagram, <9/4>

Regular {9/4}, r₁₈
Spirolateral 3_20°, g₃
Irregular, i₂

Equiangular decagons

Direct equiangular decagons, <10>, <10/2>, <10/3>, <10/4>, have 144°, 108°, 72° and 36° internal angles respectively.

144° internal angles from an equiangular decagon <10>

Regular, r₂₀
Spirolateral (1,2)_144°, p₁₀
Spirolateral (1…5)_144°, g₂

108° internal angles from an equiangular double-wound pentagon <10/2>

Regular, degenerate
Spirolateral (1,2)_108°, p₁₀
Irregular, p₂

72° internal angles from an equiangular decagram <10/3>

Regular {10/3}, r₂₀
Isogonal, p₁₀
Spirolateral (1,2)_72°, p₁₀
Irregular, i₄
Spirolateral (1…5)_72°, g₂

36° internal angles from an equiangular double-wound pentagram <10/4>

Regular, degenerate, r₁₀
Spirolateral (1,2)_36°, p₁₀
Isogonal, p₁₀
Isogonal, p₁₀
Irregular, p₂
Irregular, p₂
Irregular, p₂

Equiangular hendecagons

Direct equiangular hendecagons, <11>, <11/2>, <11/3>, <11/4>, and <11/5> have 147 3/11°, 114 6/11°, 81 9/11°, 49 1/11°, and 16 4/11° internal angles respectively.

147° internal angles from an equiangular hendecagon, <11>

Regular, {11}, r₂₂

114° internal angles from an equiangular hendecagram, <11/2>

Regular {11/2}, r₂₂

81° internal angles from an equiangular hendecagram, <11/3>

Regular {11/3}, r₂₂

49° internal angles from an equiangular hendecagram, <11/4>

Regular {11/4}, r₂₂

16° internal angles from an equiangular hendecagram, <11/5>

Regular {11/5}, r₂₂

Equiangular dodecagons

Direct equiangular dodecagons, <12>, <12/2>, <12/3>, <12/4>, and <12/5> have 150°, 120°, 90°, 60°, and 30° internal angles respectively.

150° internal angles from an equiangular dodecagon, <12>

Convex solutions with integer edge lengths may be tiled by pattern blocks, squares, equilateral triangles, and 30° rhombi.^[6]

Regular, {12}, r₂₄
Isogonal, p₁₂
Spirolateral (1,2)_150°, p₁₂
Spirolateral (1…3)_150°, g₄
Spirolateral (1…4)_150°, g₃
Spirolateral (1…6)_150°, g₂

120° internal angles from an equiangular double-wound hexagon, <12/2>

Regular degenerate, r₁₂
Spirolateral, (1…4)_120°, g₃
Irregular, d₂
Irregular, d₂

90° internal angles from an equiangular triple-wound square, <12/3>

Regular, degenerate, r₈
Spirolateral (1…3)_90°, g₂
Spirolateral (2…4)_90°, g₄
Spirolateral (1,1,3)_90°, i₈
Spirolateral (1,2,2)_90°, i₈
Spirolateral (1…6)_90°, g₂
Irregular, a₁

60° internal angles from an equiangular quadruple-wound triangle, <12/4>

Regular, degenerate, r₆
Spirolateral (1,3,5,1)_60°, p₆
Spirolateral (1…4)_60°, g₃
Irregular, a₁

30° internal angles from an equiangular dodecagram, <12/5>

Regular {12/5}, r₂₄
Isogonal, p₁₂
Spirolateral (1,2)_30°, p₁₂
Spirolateral (1…3)_30°, g₄
Spirolateral (1…4)_30°, g₃
Spirolateral (1…6)_30°, g₂

Equiangular tetradecagons

Direct equiangular tetradecagons, <14>, <14/2>, <14/3>, <14/4>, and <14/5>, <14/6>, have 154 2/7°, 128 4/7°, 102 6/7°, 77 1/7°, 51 3/7° and 25 5/7° internal angles respectively.

154.28° internal angles from an equiangular tetradecagon, <14>

Regular {14}, r₂₈
Isogonal, t{7}, p₁₄

128.57° internal angles from an equiangular double-wound regular heptagon, <14/2>

Regular degenerate, r₁₄
Isogonal, t{7/2}, p₁₄
Spirolateral 2_128.57°

102.85° internal angles from an equiangular tetradecagram, <14/3>

Regular {14/3}, r₂₈
Isogonal t{7/3}, p₁₄

77.14° internal angles from an equiangular double-wound heptagram <14/4>

Regular degenerate, r₁₄
Isogonal, p₁₄
Isogonal, p₁₄
Spirolateral 2_77.14°

51.43° internal angles from an equiangular tetradecagram, <14/5>

Regular {14/5}, r₂₈
Isogonal, p₁₄
Isogonal, p₁₄

25.71° internal angles from an equiangular double-wound heptagram, <14/6>

Regular degenerate, r₁₄
Isogonal, p₁₄
Isogonal, p₁₄
Isogonal, p₁₄
Irregular, d₂

Equiangular pentadecagons

Direct equiangular pentadecagons, <15>, <15/2>, <15/3>, <15/4>, <15/5>, <15/6>, and <15/7>, have 156°, 132°, 108°, 84°, 60° and 12° internal angles respectively.

156° internal angles from an equiangular pentadecagon, <15>

Regular, {15}, r₃₀

132° internal angles from an equiangular pentadecagram, <15/2>

Regular, {15/2}, r₃₀

108° internal angles from an equiangular triple-wound pentagon, <15/3>

Regular, degenerate, r₁₀
spirolateral (1…3)_108°, g₅

84° internal angles from an equiangular pentadecagram, <15/4>

Regular, {15/4}, r₃₀

60° internal angles from an equiangular 5-wound triangle, <15/5>

Regular, degenerate, r₆
Irregular, a₁

36° internal angles from an equiangular triple-wound pentagram, <15/6>

Regular, degenerate, r₁₀
Irregular, a₁
Spirolateral (1…4)_36°, g₅

12° internal angles from an equiangular pentadecagram, <15/7>

Regular, {15/7}, r₃₀

Equiangular hexadecagons

Direct equiangular hexadecagons, <16>, <16/2>, <16/3>, <16/4>, <16/5>, <16/6>, and <16/7>, have 157.5°, 135°, 112.5°, 90°, 67.5° 45° and 22.5° internal angles respectively.

157.5° internal angles from an equiangular hexadecagon, <16>

Regular, {16}, r₃₂
Isogonal, t{8}, p₁₆
Spirolateral (1…4)_157.5°, g₄

135° internal angles from an equiangular double-wound octagon, <16/2>

Regular, degenerate, r₁₆
Irregular, p₁₆

112.5° internal angles from an equiangular hexadecagram, <16/3>

Regular, {16/3}, r₃₂

90° internal angles from an equiangular 4-wound square, <16/4>

Regular, degenerate, r₈
Irregular, a₁

67.5° internal angles from an equiangular hexadecagram, <16/5>

Regular, {16/5}, r₃₂

45° internal angles from an equiangular double-wound regular octagram, <16/6>

Regular, degenerate, r₁₆
spirolateral (1…3)_45°, g₈

22.5° internal angles from an equiangular hexadecagram, <16/7>

Regular, {16/7}, r₃₂
Isogonal, p₁₆

Equiangular octadecagons

Direct equiangular octadecagons, <18}, <18/2>, <18/3>, <18/4>, <18/5>, <18/6>, <18/7>, and <18/8>, have 160°, 140°, 120°, 100°, 80°, 60°, 40° and 20° internal angles respectively.

160° internal angles from an equiangular octadecagon, <18>

Regular, {18}, r₃₆
Isogonal, t{9}, p₁₈

140° internal angles from an equiangular double-wound enneagon, <18/2>

Regular, degenerate
Spirolateral 2_140°, p₁₈

120° internal angles of an equiangular 3-wound hexagon <18/3>

Regular, degenerate, r₁₈
irregular, a₁

100° internal angles of an equiangular double-wound enneagram <18/4>

Regular, degenerate, r₁₈
Spirolateral 2_100°, g₃

80° internal angles of an equiangular octadecagram {18/5}

Regular, {18/5}, r₃₆

60° internal angles of an equiangular 6-wound triangle <18/6>

Regular, degenerate, r₆
irregular, a₁

40° internal angles of an equiangular octadecagram <18/7>

Regular, {18/7}, r₃₆
Isogonal, p₁₈
Isogonal, p₁₈
Isogonal, p₁₈

20° internal angles of an equiangular double-wound enneagram <18/8>

Regular, degenerate, r₁₈
Isogonal, p₁₈
Isogonal, p₁₈
Isogonal, p₁₈
Isogonal, p₁₈
Spirolateral 2_20°, p₁₈
Spirolateral 6_20°, g₃

Equiangular icosagons

Direct equiangular icosagon, <20>, <20/3>, <20/4>, <20/5>, <20/6>, <20/7>, and <20/9>, have 162°, 126°, 108°, 90°, 72°, 54° and 18° internal angles respectively.

162° internal angles from an equiangular icosagon, <20>

Regular, {20}, r₄₀
Spirolateral (1,3)_162°, p₂₀

144° internal angles from an equiangular double-wound decagon, <20/2>

Regular, degenerate, r₂₀
Spirolateral (1…4)_144°, g₅

126° internal angles from an equiangular icosagram, <20/3>

Regular {20/3}, p₄₀
Spirolateral (1,3)_126°, p₂₀

108° internal angles from an equiangular 4-wound pentagon, <20/4>

Regular degenerate, r₁₀
Spirolateral (1…4)_108°, g₅
Irregular, a₁

90° internal angles from an equiangular 5-wound square, <20/5>

Regular degenerate, r₈
Spirolateral (1…5)_90°, g₄
Spirolateral (1,2,3,2,1)_90°, i₈

72° internal angles from an equiangular double-wound decagram, <20/6>

Regular degenerate, r₂₀
Spirolateral (1,2)_72°, p₁₀
Spirolateral (1…4)_72°, g₅

54° internal angles from an equiangular icosagram, <20/7>

Regular {20/7}, r₄₀
Isogonal, p₂₀
Isogonal, p₂₀
Isogonal, p₂₀

36° internal angles from an equiangular quadruple-wound pentagram, <20/8>

Regular degenerate, r₁₀
Spirolateral (1…4)_36°, g₅
irregular, a₁

18° internal angles from an equiangular icosagram, <20/9>

Regular {20/9}, r₄₀
Isogonal, p₂₀
Isogonal, p₂₀
Isogonal, p₂₀
Isogonal, p₂₀

References

^ Marius Munteanu, Laura Munteanu, Rational Equiangular Polygons Applied Mathematics, Vol.4 No.10, October 2013
^ Elias Abboud "On Viviani's Theorem and its Extensions" pp. 2, 11
^ De Villiers, Michael, "Equiangular cyclic and equilateral circumscribed polygons", Mathematical Gazette 95, March 2011, 102-107.
^ McLean, K. Robin. "A powerful algebraic tool for equiangular polygons", Mathematical Gazette 88, November 2004, 513-514.
^ M. Bras-Amorós, M. Pujol: "Side Lengths of Equiangular Polygons (as seen by a coding theorist)", The American Mathematical Monthly, vol. 122, n. 5, pp. 476–478, May 2015. ISSN 0002-9890.
^ ^a ^b ^c ^d ^e Ball, Derek (2002), "Equiangular polygons", The Mathematical Gazette, 86 (507): 396–407, doi:10.2307/3621131, JSTOR 3621131, S2CID 233358516.

Williams, R. The Geometrical Foundation of Natural Structure: A Source Book of Design. New York: Dover Publications, 1979. p. 32

External links

A Property of Equiangular Polygons: What Is It About? a discussion of Viviani's theorem at Cut-the-knot.
Weisstein, Eric W. "Equiangular Polygon". MathWorld.

[1] Marius Munteanu, Laura Munteanu, Rational Equiangular Polygons Applied Mathematics, Vol.4 No.10, October 2013

[ref1-2] Elias Abboud "On Viviani's Theorem and its Extensions" pp. 2, 11

[3] De Villiers, Michael, "Equiangular cyclic and equilateral circumscribed polygons", Mathematical Gazette 95, March 2011, 102-107.

[4] McLean, K. Robin. "A powerful algebraic tool for equiangular polygons", Mathematical Gazette 88, November 2004, 513-514.

[5] M. Bras-Amorós, M. Pujol: "Side Lengths of Equiangular Polygons (as seen by a coding theorist)", The American Mathematical Monthly, vol. 122, n. 5, pp. 476–478, May 2015. ISSN 0002-9890.

[ball-6] Ball, Derek (2002), "Equiangular polygons", The Mathematical Gazette, 86 (507): 396–407, doi:10.2307/3621131, JSTOR 3621131, S2CID 233358516.

[1]

[2]

[3]

[4]

[5]

[6]