A natural number has prime factorization given by n = 2 x 3 y 5 z , where y and z are such that y + z = 5 and y − 1 + z − 1 = 5 6 , y > z . Then the number of odd divisors of n, including 1, is:

Given n = 2x. 3y. 5z . (i) y + z = 5 & 1 y + 1 z = 5 6 On solving we get y = 3, z = 2 So, n = 2x. 33. 52 So that no. of odd divisor = (3 + 1) (2 + 1) = 12 Hence no. of divisors including 1 = 12

A natural number has prime factorization given by n = $2^{x} 3^{y} 5^{z},$ where y and z are such that y + z = 5 and $y^{- 1} + z^{- 1} = \frac{5}{6}, y > z .$ Then the number of odd divisors of n, including 1, is:

Option 1 - 11

Option 2 - 6x

Option 3 - 6

Option 4 - 12

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Answered by

Alok Kumar Singh | Contributor-Level 10

4 months ago

Correct Option - 4

Detailed Solution:

Given n = 2^x. 3^y. 5^z . (i)

$y + z = 5 & \frac{1}{y} + \frac{1}{z} = \frac{5}{6}$

On solving we get y = 3, z = 2

So, n = 2^x. 3³. 5²

So that no. of odd divisor = (3 + 1) (2 + 1) = 12

Hence no. of divisors including 1 = 12

Upvote

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Maths Ncert Solutions class 11th 2026

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