ronnie1985 wrote:One single person and two couples are to be seated at random in a row of five chairs. What is the probability that neither of the couples sits together in adjacent chairs
A)1/5
B)1/4
C)3/8
D)2/5
E)1/2
First let us find the probability of at least one of the couple being sitting together.
One single person and two couples implies in all there are 5 people, so no. of ways of seating these 5 people = 5! = 120 ways
Let us consider one couple as 1 person, then no. of ways of seating them = 4! ways and 1 couple means 2 people, who can be seated in 2! ways. So, no. of ways of seating them = 4! * 2! = 48 ways
Similarly, the other couple can be seated in 48 ways.
Hence, total no. of ways in which the 2 couples sit together = 3! * 2! * 2! = 24 ways
Now, the no. of ways so that at least one of the couple sit together = 48 + 48 - 24 = 72
Probability so that at least one of the couple sit together = 72/120 = 3/5
Therefore, probability that neither of the couples sits together in adjacent chairs = 1 - 3/5 = [spoiler]2/5[/spoiler]
The correct answer is
D.
