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 n is a natural number such that n=P_(1)^(a_(1))P_(2)^(a_(2))P_(3)^(a_(3))...P_(k)^(a_(k)) where p_(1),p_(2),...p_(k) are distinct primes then minimum value of ln n 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 x^(2)-2x-1 is a factor of px^(3)+qx^(2)+1 , (where p , q are integers) then find the value of p +q.

A number N when factorized can be written as N=p_(1)^(4)xxp_(2)^(3)xxp_(3)^(7) . Find the number of perfect squares which are factors of N. (The 3 prime numbers p_(1),p_(2),p_(3)gt2 )

Let X_k=(p_1*p_2*...*p_k)+ 1,where p_1, p_2, ...,p_k are the first k primes. Consider the following : 1. X_k is a prime number. 2. X_k is a composite number . 3. X_k+1 is always an even number. Which of the above is/are correct? (a) 1 only (b) 2 only (c) 3 only (d) 1 and 3