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Question
number of permutations of the letters of the word MISSISSIPPI in which four I's do not come together is
number of permutations of the letters of the word MISSISSIPPI in which four I's do not come together is
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Solution
The correct option is C 33810
In the given word MISSISSIPPI, I appears 4 times , S appears 4 times, P appears 2 times, and M appears just once.
Therefore, number of distinct permutations of the letters in the given word =11!4×4×2=34650
There are 4I's in the given word. When they occur together, they will be treated as a single object for the time being. This single object together with the remaining 7 objects will account for 8 objects.
In these 8 objects, there are 4 Ss and 2 Ps which can be arranged in =8!4×2=840
Thus, number of distinct permutations of the letters of MISSISSIPPI in which 4 I's do not come together = 34650 - 840 = 33810
In the given word MISSISSIPPI, I appears 4 times , S appears 4 times, P appears 2 times, and M appears just once.
Therefore, number of distinct permutations of the letters in the given word =11!4×4×2=34650
There are 4I's in the given word. When they occur together, they will be treated as a single object for the time being. This single object together with the remaining 7 objects will account for 8 objects.
In these 8 objects, there are 4 Ss and 2 Ps which can be arranged in =8!4×2=840
Thus, number of distinct permutations of the letters of MISSISSIPPI in which 4 I's do not come together = 34650 - 840 = 33810
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