Let d(n) denote the number of divisors of n including 1 and itself. Then d(225), d(1125) and d(640) are

Let d(n) denote the number of positive divisors of a positive integer n. Which of the following are correct? 1. d(5) = d(11) 2. d(5).d(11) = d(55) 3.d(5) + d(11) = d(16) Select the correct answer using the code given below :

For a positive integer n, define d(n) - the number of positive divisors of n. What is the value of d(d(d(12))) ?

For the function f(x)=(e^(x)+1)/(e^(x)-1) if n(d) denotes the number of integers which are not in its domain and n(r) denotes the number of integers which are not in its range,then n(d)+n(r) is equal to

Let d_(1),d_(2),d_(3),......,d_(k) be all the divisors of a positive integer n including 1 and n. Suppose d_(1)+d_(2)+d_(3)+......+d_(k)=72, then the value of (1)/(d_(1))+(1)/(d_(2))+(1)/(d_(3))+......+(1)/(d_(k)) is

If a\ a n d\ b denote the sum of the coefficients in the expansions of (1-3x+10 x^2)^n a n d\ (1+x^2)^n respectively, then write the relation between a\ a n d\ bdot

A number n is said to be perfect if the sum of all its divisors (excluding n itself) is equal to n. An example of perfect number is (a) 6 (b) 9 (c) 15 (d) 21

Number of divisors of N=a^(x)b^(y)c^(z)d^(w)e^(u) is

Let X and Y be the sets of all positive divisors of 400 and 1000 respectively (including 1 and the number), Then , n(X nnY)=