Interior Angles Of A Polygon Equation

If n is the number of sides of a polygon then the formula is given below.

Interior angles of a polygon equation. If a polygon has 5 sides it will have 5 interior angles. Interior angles of a polygon formula. Let us discuss the three different formulas in detail.

The formula can be obtained in three ways. Interior angle of a polygon is that angle formed at the point of contact of any two adjacent sides of a polygon. Quadrilaterals definite integration de moivre s theorem denary density depreciation difference of two squares differential equations differentiation direct proportion distributive law dividing algebraic fractions dividing decimals dividing fractions dividing negative numbers dividing terms drawing.

Interior angles of a polygon. Now you are able to identify interior angles of polygons and you can recall and apply the formula s n 2 180 to find the sum of the interior angles of a polygon. Sum of interior angles n 2 180 each angle of a regular polygon n 2 180 n.

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. A polygon will have the number of interior angles equal to the number of sides it has.