Polygon Angle Sums
Polygon Angle Sums
When working with polygons, understanding how their angles relate to the number of sides is a fundamental geometry skill. Whether you are dealing with a simple triangle or a complex 12-sided figure, specific formulas allow you to find the sums of their interior and exterior angles.
Sum of Interior Angles
The interior angles are the angles inside the closed shape of a polygon. The sum of the interior angles of any n-sided polygon is given by the formula:
Sum=(nโ2)ร180โ
Why does this work? If you pick one vertex of a polygon and draw diagonals to all other non-adjacent vertices, you will divide the polygon into exactly nโ2 triangles. Since the interior angles of a single triangle always add up to 180โ, multiplying the number of triangles by 180โ gives the total angle sum.
Example: Find the sum of the interior angles of a 12-gon.
- Identify the number of sides: n=12
- Apply the formula: S=(12โ2)ร180โ
- Calculate: S=10ร180โ=1800โ
Sum of Exterior Angles
An exterior angle is formed by extending one side of the polygon outward. The rule for exterior angles is beautifully simple:
The sum of the exterior angles of any convex polygon (taking one at each vertex) is always 360โ, regardless of how many sides the polygon has.
Regular Polygons
A regular polygon has all sides equal in length and all interior angles equal in measure. Because the angles are identical, you can easily find the measure of a single angle by dividing the total sum by the number of sides, n.
Each Interior Angle: Interiorย Angle=n(nโ2)ร180โโ
Each Exterior Angle: Exteriorย Angle=n360โโ
(Note: The interior and exterior angle at the same vertex always add up to 180โ.)
Example: Find each interior angle of a regular octagon.
- An octagon has n=8 sides.
- Total interior sum: (8โ2)ร180โ=6ร180โ=1080โ
- Divide by 8: 81080โโ=135โ
Alternatively, you can find the exterior angle first (8360โโ=45โ) and subtract it from 180โ (180โโ45โ=135โ). Both methods work perfectly!