chrisjim5 wrote:In a room filled with 7 people, 4 people have exactly 1 sibling in the room and 3 people have exactly 2 siblings in the room. If two individuals are selected from the room at random, what is the probability that those two individuals are NOT siblings?
Can you please provide an answer to this?
Let's the 7 people be ABCDEFG.
4 people have exactly 1 sibling:
Let A and B are siblings and C and D are siblings.
So,
A has 1 sibling B
B has 1 sibling A
C has 1 sibling D
D has 1 sibling C
3 people have exactly 2 siblings:
Let E, F and G are all siblings of each other.
So,
E has 2 siblings (F and G).
F has 2 siblings (E and G).
G has 2 siblings (E and F).
Total number of sibling pairs = 5 [AB, CD, EF, EG, FG]
Total number of pairs that can be formed from 7 people C(7,2) = 7!/5!*2! = 21
P(sibling pair) = 5/21
P(not sibling pair) = 1 - 5/21 = 16/21.
