# Polygon

For other use please see Polygon (disambiguation)

A polygon (literally "many angle", see Wiktionary for the etymology) is a closed planar path composed of a finite number of sequential line segments. The straight line segments that make up the polygon are called its sides or edges and the points where the sides meet are the polygon's vertices. If a polygon is simple, then its sides (and vertices) constitute the boundary of a polygonal region, and the term polygon sometimes also describes the interior of the polygonal region (the open area that this path encloses) or the union of both the region and its boundary.

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## Names and types

A simple non-convex hexagon
A complex pentagon

Polygons are named according to the number of sides, combining a Greek-derived numerical prefix with the suffix -gon, e.g. pentagon, dodecagon. The triangle and quadrilateral are exceptions. For larger numbers, mathematicians write the numeral itself, e.g. 17-gon. A variable can even be used, usually n-gon. This is useful if the number of sides is used in a formula.

Polygon names
Name Sides
triangle (or trigon) 3
pentagon 5
hexagon 6
heptagon (avoid "septagon") 7
octagon 8
enneagon (or "nonagon") 9
decagon 10
hendecagon (avoid "undecagon") 11
dodecagon (avoid "duodecagon") 12
triskaidecagon 13
icosagon 20
triacontagon 30
pentacontagon 50
hectagon (avoid "centagon") 100
chiliagon 1000
myriagon 10,000

### Naming polygons

To construct the name of a polygon with more than 20 and less than 100 sides, combine the prefixes as follows

Tens and Ones final prefix
-kai- 1 hena- -gon
20 icosi- 2 -di-
30 triaconta- 3 -tri-
40 tetraconta- 4 -tetra-
50 pentaconta- 5 -penta-
60 hexaconta- 6 -hexa-
70 heptaconta- 7 -hepta-
80 octaconta- 8 -octa-
90 enneaconta- 9 -ennea-

That is, a 42-sided figure would be named as follows:

Tens and Ones final prefix full polygon name
tetraconta- -kai- -di- -gon tetracontakaidigon

and a 50-sided figure

Tens and Ones final prefix full polygon name
pentaconta-   -gon pentacontagon

But beyond nonagons and decagons, professional mathematicians prefer the aforementioned numeral notation (for example, MathWorld has articles on 17-gons and 257-gons).

## Taxonomic classification

The taxonomic classification of polygons is illustrated by the following tree:

 

 Polygon / \ Simple Complex / \ Convex Concave / Cyclic / Regular 

• A polygon is called simple if it is described by a single, non-intersecting boundary; otherwise it is called complex.
• A simple polygon is called convex if it has no internal angles greater than 180° otherwise it is called concave.
• A convex polygon is called concyclic or cyclic polygon if all the vertices lie on a single circle.
• A cyclic polygon is called regular if all its sides are of equal length and all its angles are equal.

## Properties

We will assume Euclidean geometry throughout.

### Angles

Any polygon, regular or irregular, complex or simple, has as many angles as it has sides. The sum of the inner angles of a simple n-gon is (n−2)π radians (or (n−2)180°), and the inner angle of a regular n-gon is (n−2)π/n radians (or (n−2)180°/n). This can be seen in two different ways:

• Moving around a simple n-gon (like a car on a road), the amount one "turns" at a vertex is 180° minus the inner angle. "Driving around" the polygon, one makes one full turn, so the sum of these turns must be 360°, from which the formula follows easily. The reasoning also applies if some inner angles are more than 180°: going clockwise around, it means that one sometime turns left instead of right, which is counted as a negative amount one turns.
• Any simple n-gon can be considered to be made up of (n−2) triangles, each of which has an angle sum of π radians or 180°.

### Area

Missing image
Apothem_of_hexagon.png
Apothem of an hexagon

Several formulae give the area of a regular polygon:

[itex]A=\frac{nt^2}{4\tan(180^\circ/n)}[itex]
half the perimeter multiplied by the length of the apothem (the line drawn from the centre of the polygon perpendicular to a side)

The area A of a simple polygon can be computed if the cartesian coordinates (x1, y1), (x2, y2), ..., (xn, yn) of its vertices, listed in order as the area is circulated in counter-clockwise fashion, are known. The formula is

A = ½ · (x1y2x2y1 + x2y3x3y2 + ... + xny1x1yn)
= ½ · (x1(y2yn) + x2(y3y1) + x3(y4y2) + ... + xn(y1yn−1))

The formula was described by Meister in 1769 and by Gauss in 1795. It can be verified by dividing the polygon into triangles, but it can also be seen as a special case of Green's theorem.

If the polygon can be drawn on an equally-spaced grid such that all its vertices are grid points, Pick's theorem gives a simple formula for the polygon's area based on the numbers of interior and boundary grid points.

If any two simple polygons of equal area are given, then the first can be cut into polygonal pieces which can be reassembled to form the second polygon. This is the Bolyai-Gerwien theorem.

### Construction

All regular polygons are concyclic, as are all triangles and rectangles (see circumcircle).

A regular n-sided polygon can be constructed with ruler and compass if and only if the odd prime factors of n are distinct Fermat primes. See constructible polygon.

## Point in polygon test

In computer graphics and computational geometry, it is often necessary to determine whether a given point P = (x0,y0) lies inside a simple polygon given by a sequence of line segments. It is known as Point in polygon test.

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