Asked by Candice
Find the probability that if the letters of the word "parallel" are randomly arranged that the L's will not be together.
In class, I'm studying permutations and combinations. The solutions stated the no. of permutations where 3 L's are together is 6!/2!. Could you please explain why?
Thanks in advance
In class, I'm studying permutations and combinations. The solutions stated the no. of permutations where 3 L's are together is 6!/2!. Could you please explain why?
Thanks in advance
Answers
Answered by
Reiny
Treat the LLL as if they were one element, say X
so we have
X a a p r e, 6 elements of which two are alike, the two a's
number of ways to arrange them is 6!/2!
(remember we divide by 2! because of the two "alikes" )
So in the first part, the number of ways to arrange the original is
8!/(3!2!) = 3360
The number of ways the LLL is together is 6!/2! = 360
Number of ways the L's are NOT together = 3360 - 360 = 3000
so we have
X a a p r e, 6 elements of which two are alike, the two a's
number of ways to arrange them is 6!/2!
(remember we divide by 2! because of the two "alikes" )
So in the first part, the number of ways to arrange the original is
8!/(3!2!) = 3360
The number of ways the LLL is together is 6!/2! = 360
Number of ways the L's are NOT together = 3360 - 360 = 3000
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