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What is the probability that divisor of $10^{99}$ is a multiple of $10^{96}$?
 
What is the probability that divisor of $10^{99}$ is a multiple of $10^{96}$?
 
 
'''(A) 1/625'''
+
'''(A) 1/625'''
 
 
(B) 4/625
+
(B) 4/625
+
 
(C) 12/625
+
(C) 12/625
+
 
(D) 16/625
+
(D) 16/625
 +
 
 
==={{Template:Author|Happy Mittal|{{mittalweb}} }}===  
 
==={{Template:Author|Happy Mittal|{{mittalweb}} }}===  
  

Revision as of 17:29, 15 April 2014

What is the probability that divisor of $10^{99}$ is a multiple of $10^{96}$?

(A) 1/625

(B) 4/625

(C) 12/625

(D) 16/625

Solution by Happy Mittal

Divisiors of $10^{99}$ are of the form $2^a*5^b$, where a and b can go from 0 to 99 each, so there are 10000 divisors of $10^{99}$. Now Any of those divisors would be a multiple of $10^{96}$ if both a and b are atleast 96 i.e. 96, 97, 98, or 99. So each of a and b have 4 choices each, and so there are 16 divisiors which are multiple of $10^{96}$.
Thus, required probability

= 16/10000 
= 1/625




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What is the probability that divisor of $10^{99}$ is a multiple of $10^{96}$?

(A) 1/625

(B) 4/625

(C) 12/625

(D) 16/625

Solution by Happy Mittal[edit]

Divisiors of $10^{99}$ are of the form $2^a*5^b$, where a and b can go from 0 to 99 each, so there are 10000 divisors of $10^{99}$. Now Any of those divisors would be a multiple of $10^{96}$ if both a and b are atleast 96 i.e. 96, 97, 98, or 99. So each of a and b have 4 choices each, and so there are 16 divisiors which are multiple of $10^{96}$.
Thus, required probability

= 16/10000 
= 1/625




blog comments powered by Disqus