How many different ways can the letters of the word MUMBAI be arranged so that A is always next to B?
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Answered by
13
Answer:
60
Step-by-step explanation:
Hi,
Suppose A is always next to B, then we can treat BA together in every
arrangement as 1.
Since there are 2 M's , 1 U , 1 I , and 1 BA group , we can arrange all
these 5 in 5! ways and since M is repeating twice we need to divide
by 2!, since all permutation between 2 M's will repeat in the same
arrangement. So, total number of ways are 5!/2! = 60
So different ways the letter of word MUMBAI can be arranged so
so that A is always next to B are 60
Hope, it helps !
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3
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