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13 October, 20:57

A classic counting problem is to determine the number of different ways that the letters of "personnel""personnel" can be arranged. find that number.

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  1. 13 October, 21:00
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    Answer: 90,720

    Explanation:

    1) Assume initially the all the letters are different.

    2) The number of ways how you can arrange 9 letters is:

    P (9) = 9! = 362,880 different arrangements

    3) Now take into account tha the letter n is repeated so half of the arragements are repeated.

    4) The same happens with the letter e.

    5) That means that you have to divide by 2 two times to get the number of differente arrays:

    => 362,880 / (2 * 2) = 90,720
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