Regular polygon: Difference between revisions
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|2|| ||0.000 |
|2|| 0||0.000 |
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|3|| <math>\frac{\sqrt{3}}{4}</math>||0.433 |
|3|| <math>\frac{\sqrt{3}}{4}</math>||0.433 |
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|4|| ||1.000 |
|4|| 1||1.000 |
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|5|| <math>\frac {1}{4} \sqrt{25+10\sqrt{5}}</math>||1.720 |
|5|| <math>\frac {1}{4} \sqrt{25+10\sqrt{5}}</math>||1.720 |
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|9|| ||6.182 |
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|10|| ||7.694 |
|10|| <math>\frac{5}{2} \sqrt{5+2\sqrt{5}}</math>||7.694 |
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|11|| ||9.366 |
|11|| ||9.366 |
Revision as of 09:57, 7 May 2006
A regular polygon is a simple polygon (a polygon which does not intersect itself anywhere) which is equiangular (all angles are equal) and equilateral (all sides have the same length).
For each number of sides, all regular polygons with that number of sides are similar.
Examples:
- 2-sided regular polygon: degenerate, a "double line segment"
- Equilateral triangle
- Square
- Regular pentagon
- Regular hexagon
- Regular octagon
- Regular decagon
- Regular dodecagon
Properties
The inner angle of a regular n-gon is (n−2)π/n radians (or (n−2)180°/n, or (n−2)/(2n) turns).
All vertices of a regular polygon lie on a common circle, i.e., they are concyclic points, i.e., every regular polygon has a circumscribed circle.
A regular n-sided polygon can be constructed with compass and straightedge if and only if the odd prime factors of n are distinct Fermat primes. See constructible polygon.
Area
The area of a regular n-sided polygon is
where t is the length of a side, or half the perimeter multiplied by the length of the apothem (the line drawn from the centre of the polygon perpendicular to a side)
For t=1 this gives
with the following values:
2 | 0 | 0.000 |
3 | 0.433 | |
4 | 1 | 1.000 |
5 | 1.720 | |
6 | 2.598 | |
7 | 3.634 | |
8 | 4.828 | |
9 | 6.182 | |
10 | 7.694 | |
11 | 9.366 | |
12 | 11.196 | |
13 | 13.186 | |
14 | 15.335 | |
15 | 17.642 | |
16 | 20.109 | |
17 | 22.735 | |
18 | 25.521 | |
19 | 28.465 | |
20 | 31.569 | |
100 | 795.513 | |
1000 | 79577.210 | |
10000 | 7957746.893 |
Symmetry
The symmetry group of an n-sided regular polygon is dihedral group Dn (of order 2n): D2, D3, D4,... It consists of the rotations in Cn (there is rotational symmetry of order n), together with reflection symmetry in n axes that pass through the center. If n is even then half of these axes pass through two opposite vertices, and the other half through the midpoint of opposite sides. If n is odd then all axes pass through a vertex and the midpoint of the opposite side.
Polyhedra
A uniform polyhedron is a polyhedron with regular polygons as faces such that for every two vertices there is an isometry mapping one into the other.