6 people consists of 3 married couples. Each couple wants to sit with older partner on the left.

1 answer:

8 0

a. The first part asks for how many ways they can be seated together in a row. Therefore we want the permutations of the set of 6 people, or 6 factorial,

6! = 6 $*$ 5

= 30 $*$ 4

= 360 $*$ 2 = 720 possible ways to order 6 people in a row

b. There are two cases to consider here. If the doctor were to sit in the left - most seat, or the right - most seat. In either case there would be 5 people remaining, and hence 5! possible ways to arrange themselves.

5! = 5 $*$ 4

= 20 $*$ 3

= 120 $*$ 1 = 120 possible ways to arrange themselves if the doctor were to sit in either the left - most or right - most seat.

In either case there are 120 ways, so 120 + 120 = Total of 240 arrangements among the 6 people if the doctor sits in the aisle seat ( leftmost or rightmost seat )

c. With each husband on the left, there are 3 people left, all women, that we have to consider here.

3! = 3 $*$ 2 6 ways to arrange 3 couples in a row, the husband always to the left

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