If the product of n positive numbers is 1, then their sum will be

If the product of n positive numbers is 1, then their sum is

If the product of n positive numbers is 1, then their sum is

If the product of n positive numbers is n^n , then their sum is (a) a positive integer (b). divisible by n (c)equal to n+1//n (d)never less than n^2

If the product of n positive numbers is n^n , then their sum is a positive integer b. divisible by n equal to n+1//n never less than n^2

If the product of n positive numbers is n^n , then their sum is (a)a positive integer (b). divisible by n (c)equal to n+1//n (d)never less than n^2

If the product of n positive numbers is n^n , then their sum is (a) a positive integer (b). divisible by n (c)equal to n+1//n (d)never less than n^2

If the product of n positive numbers is n^n , then their sum is (a) a positive integer (b) divisible by n (c) equal to n+1/n (d) never less than n^2

If the product of n positive number is unity, then their sum is

If the product of n positive numbers is n^n . Then their sum is

If the product of n positive numbers is n^n . Then their sum is