Interior Angle Of Regular Polygon

The formula can be obtained in three ways.

Interior angle of regular polygon. In a regular polygon all the interior angles measure the same and hence can be obtained by dividing the sum of the interior angles by the number of sides. Interior angles of a polygon formula. In order to find the measure of a single interior angle of a regular polygon a polygon with sides of equal length and angles of equal measure with n sides we calculate the sum interior angles or n 2 180 and then divide that sum by the number of sides or n.

The interior angles of a polygon always lie inside the polygon. Interior angles of regular polygons. Sum of interior angles 180 n 2 where n the number of sides in the polygon.

Angle q is an interior angle of quadrilateral quad. Sum of interior angles p 2 180. If n is the number of sides of a polygon then the formula is given below.

Interior angles of a regular polygon 180 n 360 n. An interior angle of a polygon is an angle inside the polygon at one of its vertices. Sum of all the interior angles of a polygon is equal to the product of a straight angle and two less than the number of sides of the polygon.

Interior angles of polygons the interior angles of a polygon are the angles that are inside the shape. An exterior angle of a polygon is an angle outside the polygon formed by one of its sides and the extension of an adjacent side. Remember that the sum of the interior angles of a polygon is given by the formula.