For a convex polygon of n sides we have
Sum of all exterior angles……….

If the sum of all interior angles of a regular polygon is twice the sum of all its exterior angles, then the polygon is

Passage II: Measure of each exterior angle of a regular polygon of n sides : (360/n)^(@) The measure of each exterior angle of a 10 sided regular polygon is

Passage II: Measure of each exterior angle of a regular polygon of n sides : (360/n)^(@) If measure of an exterior angle is 45^(@) , the number of sides in a regular polygon is

The sum of the interior angles of a polygon is three xx the sum of its exterior angles. Determine the number of sides of the polygon.

Consider the following statements : 1. If n ge 3 and mge3 are distinct positive integers, then the sum of the exterior angles of a regular polygon of m sides is different from the sum of the exterior angles of a regular polygon of n sides. 2. Let m, n be integers such that m gt n ge 3 . Then the sum of the interior angles of a regular polygon of m sides is greater than the sum of the interior angles of a regular polygon of n sides, and their sum is (m+n)(pi)/(2) . Which of the above statements is/are correct?

The sum of all the interior angles of a regular polygon is four times the sum of its exterior angles. The polygon is :

Sum of Exterior angles of polygon