If `N^(2)-33, N^(2)-31 and N^(2)-29` are prime numbers, then what is the number of possible values of N, where N is an integer?

If N,(N+2) and (N+4) are prime numbers, then the number of possible solutions for N are

Let P(n): n^(2)-n+41 is a prime number, then

If n^(2)+2n -8 is a prime number where n in N then n is

Is 2^(3-n) a prime number for all natural numbers n?

If roots of the quadratic equation x^(2) + Nx - 444N=0 are integers and N is a prime number then number of possible values of N is

Let S_(n)=n^(2)+20n+12 n a positive integer. What is the sum of all possible values of n for which S_(n) is a perfect square?

If n in N such that characteristic of n^2 to the base 8 is 2 , then number of possible values of n is

Given that N = 2^(n)(2^(n+1) -1) and 2^(n+1) - 1 is a prime number, which of the following is true, where n is a natural number.

The sum of the first n terms (n>1) of an AP is 153 and the common difference is 2. If the first term is an integer,then what is the number of possible values of n.