If the (n + 1) numbers a, b. c, d,.........

If the `(n + 1)` numbers `a, b. c, d,...........,` be all different and each of them a prime number, then the numbet of different factors (other than 1) of `a^mbc*d...` is

A

`m-2^(n)`

B

`(m+1)2^(n)`

C

`(m+1)2^(n)-1`

D

`m*s^(n)-1`

Text Solution

Verified by Experts

The correct Answer is:

C

Similar Questions

Explore conceptually related problems

If a_(1),a_(2),a_(3),......,a_(n+1) be (n+1) different prime numbers,then the number of different factors (other than 1) of a_(1)^(m)*a_(2)*a_(3)...a_(n+1), is

The least prime number is 0 (b) 1 (c) 2 (d) 3

The difference of the smallest three digit number and the largest two digit number is: 100 (b) 1 (c) 10 (d) 99

If the sum and difference of two numbers are 20 and 8 respectively, then the difference of their squares is a. 12 b. 160 c. 28 d. 180

The HCF of two co-prime numbers is: (a)2 (b)0 (c)the product of the co-primes (d)1

Every counting number has an infinite number of factors (b) multiplies prime factors (d) None of these

The HCF of two co-primes is (a) the smaller number (b) the larger number (c) product of the number (d) 1

Two different natural numbers are such that their product is less than their sum one of the numbers must be a. 21 b. 28 c. 37 d. 51

If the `(n + 1)` numbers `a, b. c, d,...........,` be all different and each of them a prime number, then the numbet of different factors (other than 1) of `a^m*b*c*d...` is

Text Solution

Similar Questions

Recommended Questions

If the `(n + 1)` numbers `a, b. c, d,...........,` be all different and each of them a prime number, then the numbet of different factors (other than 1) of `a^mbc*d...` is