Two regular polygons have sides m and n respectively . If the number of degrees in an angle of the first is equal to the number of radians in an angle of the second , show that , `(n(m-2))/(m(n-2))=pi/(180)`

A regular polygon has n times as many sides as another and the number of degrees in each interior angle of the first is m times the number of radians in that of the second. Find the number of sides of each polygon .

The number of diagonals of a polygon of n sides is-

Find the number of diagonals in a polygon with n sides.

The regular polygon whose each exterior angle is 12^@ will have number of sides

The angles of a triangle are in A.P . And the number of degrees in the least is to the number of radians in the greatest as 60 to pi . Find the angles in degrees.

Two finite sets have m and n elements. The number of elements in the power set of first set is 48 more than the total number of elements in the power set of the second set. Then the value of m and n are-

Two finite sets have ma nd n elements respectively. The total number of subsets of the first set is 56 more than the total number of subsets of the second set. Then the values of m and n respectively are-

Two finite sets A and B consist of m and n elements respectively. The number of subsets in A exceeds that of B by 112. Find the values of m and n.