Difference between revisions of "Interior angle"

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The '''interior angle''' is the [[angle]] between two line segments, having two endpoints connected via a path, facing the path connecting them.
 
The '''interior angle''' is the [[angle]] between two line segments, having two endpoints connected via a path, facing the path connecting them.
  
The regular polygons are formed by have all interior angles [[equiangular]]  
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All of the interior angles of a [[regular polygon]] are congruent (in other words, regular polygons are [[equiangular]]).
  
This is the complementary concept to [[exterior angle]]
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==Properties==
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#All the interior angles of an <math>n</math> sided regular polygon sum to <math>(n-2)180</math> degrees.
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#All the interior angles of an <math>n</math> sided regular polygon are <math>180(1-{2\over n})</math> degrees.
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#As the interior angles of an <math>n</math> sided regular polygon get larger, the ratio of the [[perimeter]] to the [[apothem]] approaches <math>2\pi</math>.
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== See Also ==
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* [[Exterior angle]]

Latest revision as of 09:02, 1 August 2024

The interior angle is the angle between two line segments, having two endpoints connected via a path, facing the path connecting them.

All of the interior angles of a regular polygon are congruent (in other words, regular polygons are equiangular).

Properties

  1. All the interior angles of an $n$ sided regular polygon sum to $(n-2)180$ degrees.
  2. All the interior angles of an $n$ sided regular polygon are $180(1-{2\over n})$ degrees.
  3. As the interior angles of an $n$ sided regular polygon get larger, the ratio of the perimeter to the apothem approaches $2\pi$.

See Also