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

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?

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

Sum of interior angles of polygon

If in a convex polygon,the sum of all interior angles excluding one is 2210^(@), then find the excluded angle and number of sides of the polygon.

In a convex hexagon,prove that the sum of all interior angle is equal to twice the sum of its exterior angles formed by producing the sides in the same order.

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.

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