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How many different words can be formed b...

How many different words can be formed by jumbling the letters of word MISSISSIPPI in which no two S are adjacent ?

A

`6*7*.^(8)C_(4)`

B

`6*8*.^(7)C_(4)`

C

`7*.^(6)C_(4)*.^(8)C_(4)`

D

`8*.^(6)C_(4)*.^(7)C_(4)`

Text Solution

Verified by Experts

The correct Answer is:
C
Other than S seve letters M,I,I,I,P,P,I can be arranged in `(7!)/(2!4!)=(7*6*5)/(1*2)=7*.^(6)C_(2)=7*.^(6)C_(4)`
now, four S can be placed in 8 spaces in `.^(8)C_(4)` ways.
hence, required number of ways`=7*.^(6)C_(4)*.^(8)C_(4)`.
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