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In Euclidean geometry, an equiangular polygon is a polygon whose vertex angles are equal. If the lengths of the sides are also equal then it is a regular polygon. Isogonal polygons are equiangular polygons which alternate two edge lengths. The only equiangular triangle is the equilateral triangle. Rectangles, including the square, are the only equiangular quadrilaterals (four-sided figures).〔.〕 For an equiangular ''n''-gon each internal angle is 180(1-2/n)°; this is the ''equiangular polygon theorem''. Viviani's theorem holds for equiangular polygons:〔(Elias Abboud "On Viviani’s Theorem and its Extensions" ) pp. 2, 11〕 :''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 rectangle (equiangular quadrilateral) with integer side lengths may be tiled by unit squares, and an equiangular hexagon with integer side lengths may be tiled by unit equilateral triangles. Some but not all equilateral dodecagons may be tiled by a combination of unit squares and equilateral triangles; the rest may be tiled by these two shapes together with rhombi with 30 and 150 degree angles.〔 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.〔De Villiers, Michael, "Equiangular cyclic and equilateral circumscribed polygons", Mathematical Gazette 95, March 2011, 102-107.〕 For prime ''p'', every integer-sided equiangular ''p''-gon is regular. Moreover, every integer-sided equiangular ''p''''k''-gon has ''p''-fold rotational symmetry.〔McLean, K. Robin. "A powerful algebraic tool for equiangular polygons", ''Mathematical Gazette'' 88, November 2004, 513-514.〕 An equiangular polygon that is also equilateral (has all sides of equal length) is a regular polygon. ==References== *Williams, R. ''The Geometrical Foundation of Natural Structure: A Source Book of Design''. New York: Dover Publications, 1979. p. 32 *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. 抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「equiangular polygon」の詳細全文を読む スポンサード リンク
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