Number of positive integers n for which `n^(2)+96` is a perfect square is

Does any perfect square end in 2?

Algebraic form of an n^(th) term of an arithmetic sequence is 8n-4. Prove that the sum of the n consecutive terms of this sequence is a perfect square.

Cards marked with the numbers 2 to101 are placed in a box and mixed thoroughly. One card is drawn from this box. Find the probability that the number of the card is a number which is a perfect square.

The number of positive integers less than 1000 having only odd digits is

For any positive integer n , int (dx)/( x ^(n +1) + x ) is equal to:

Prove that the product of two consecutive even numbers added to 1 gives a perfect square.

(a)Which one of the following sentences is a STATEMENT?(i)275 is a perfect square.