Statement-1: A convex quindecagon has 90 diagonals.
Statement-2: Number of diagonals in a polygon is `.^(n)C_(2)-n`.

A polygon has 65 diagonals, then find the number of its side.

In a polygon the number of diagonals is 54. the number of sides of the polygon, is

In a polygon the number of diagonals 77. Find the number of sides of the polygon.

If a convex polygon has 44 diagonals, than find the number of its sides. Remember : Numbers of diagonal of the polygon having n sides = ((n),(2))-n.

In a polygon, no three diagonals are concurrent. If the total number of points of intersection of diagonals interior to the polygon is 70, then the number of diagonals of the polygon is a. 20 b. 28 c. 8 d. none of these

Number of diagonal of the polygon having 10 sides = ............

The interior angles of a regular polygon measure 150^@ each. The number of diagonals of the polygon is

Statement-1 If a set A has n elements, then the number of binary relations on A = n^(n^(2)) . Statement-2 Number of possible relations from A to A = 2^(n^(2)) .

Write the converse of the following statements: If a number n is even, then n^(2) is even.

Statement-1: the highest power of 3 in .^(50)C_(10) is 4. Statement-2: If p is any prime number, then power of p in n! is equal to [n/p]+[n/p^(2)]+[n/p^(3)] + . . ., where [*] denotes the greatest integer function.