The sum of interior angles of a regular polygon is calculated using the formula (n – 2) * 180°. Each angle in a regular polygon is equal to (n – 2) × 180°/n, where n is the number of sides in the polygon. This formula can be obtained by dividing the number of sides by the sum of interior angles.
For example, a regular polygon with 10 sides has N vertices and one interior angle per vertex. To find the sum of interior angles of a polygon, divide the number of triangles formed inside the polygon by 180 degrees. For example, in a hexagon, there can be a total of 180 degrees of interior angles.
To calculate the sum of interior angles of a polygon, divide it into triangles and multiply the number of triangles by 180°. The general rule for finding the sum of interior angles is (n – 2) * 180°. Each angle in a regular polygon is equal to (n – 2) × 180°/n.
The formula for calculating the size of an interior angle is: interior angle of a polygon = sum of interior angles ÷ number of sides. To find the measure of an interior angle of a regular polygon, take the number of sides, subtract 2 and then multiply by 180. This knowledge can be used to solve problems related to the sum of interior angles of a polygon.
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