If `P_1,P_2,......... P_(m+1)` are distinct prime numbers. Then the number of factors of `P_1^nP_2P_3....P_(m+1)` is :

If P_(1),P_(2),.......P_(m+1) are distinct prime numbers.The the number of factors of P_(1)^(n)P_(2)P_(3)...P_(m+1) is :

If n is a natural and n=p_1^(x_1)p_2^(x_2)p_3^(x_3)," where "p_1,p_2,p_3 are distinct prime factors, then the number of prime factors for his

If n is a natural number and n=p1x_(1)backslash p2x_(2)backslash p3x_(3), where p_(1),backslash p_(2),backslash p_(3) are distinct prime factors,then the number of prime factors for n is x_(1)+x_(2)+x_(3)(b)x_(1)+x_(2)+x_(3)(c)(x_(1)+1)(x_(2)+1)(x_(3)+1) (d) None of the above

If 2^p + 1 is a prime number, then p must be power of:

The number 2^(P)-1 is a prime number for

A is a set containing n elements. A subset P_1 of A is chosen. The set A is reconstructed by replacing the elements P Next, a of subset P_2 of A is chosen and again the set is reconstructed by replacing the elements of P_2, In this way, m subsets P_1, P_2....,P_m of A are chosen. The number of ways of choosing P_1,P_2,P_3,P_4...P_m

Let P_(m) stand for nP_(m). Then the expression 1.P_(1)+2.P_(2)+3.P_(3)+...+n.P_(n)=:

If p is a prime number,then LCM of p and (p+1) is

If P_(1),P_(2),P_(3) are prime numbers and m,n, rare positive integers such that LCM(m,n,r)P_(1),P_(2)^(2)P_(3)^(3) and GCD(m,n,r)=P_(1)P_(2)P_(3) Then number of possible triplets of (m,n,r) are