Resurgent wrote:In a high school debating team consisting of 2 freshmen, 2 sophomores, 2 juniors, and 2 seniors, two students are selected to represent the school at the state debating championship. The rules stipulate that the representatives must be from different grades, but otherwise the 2 representatives are to be chosen by lottery. What is the probability that the students selected will consist one freshman and one sophomore?
A. 1/16
B. 1/8
C. 1/7
D. 1/6
E. 1/4
OA: D
Let F be the event that the first student selected is Freshman. And S be the event the 2nd student is Sophomore. These two are equally likely so we will multiply our result by 2. We know that
P(S|F) = P( S and F)/P(F). We are conditioning on the fact that a freshman was chosen first. Probability of choosing a Freshman or a sophomore first is 2/8 =1/4
P( S and F)= P(F) x P(S|F)
= 1/4 x P(S|F)
This is the tricky part. If a Freshman has already been taken then we are left with 7 students over all. But the restriction says No other freshman can be chosen so the remaining freshman cannot be included in the sample space in the calculating P(S|F). So the prob that the second student is a Sophomore is 2/6 =1/3
P( S and F)= 1/4 x 1/3 =1/12
If we reverse roles we get the same value 1/12
1/12 + 1/12 = 1/6
This is an intriguing and interesting question.
