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12 March, 09:15

Four couples have reserved seats in a row for a concert. In how many different ways can they be seated if

(a) there are no seating restrictions?

(b) the two members of each couple wish to sit together?

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  1. 12 March, 09:32
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    a) 40320 ways

    b) 384 ways

    Step-by-step explanation:

    a) if there are no seating restrictions, the number of ways the 4 couples can be seated is the permutation of 8 persons in 8 seats then

    number of ways = permutation of 8 persons in 8 seats = 8! = 40320

    b) if each couple will sit together then the number of ways is:

    number of ways = number of permutation of 4 integrants of each couple in 4 pairs of seats * number of permutation for a couple in a pair of seats^ number of pair of seats = 4! * 2^4 = 384
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