Question

In a statistics class there are 11 juniors and 6 seniors; 4 of the seniors are females, 6 of the juniors are males. If a student is selected at random, what is the probability that the student is either a senior or a male?

Answer 1

`65.74%`

Explanation:

let `A` be the event of being a senior and `B` the event of male
We know
`p(A) = 6/17`
`p(notB|A) = 4/6`
`p(B|notA) = 6/11`

What we can figure out is

`p(notA) = 11/17`
`p(B|A) = 2/6`
`p(notB|notA) = 5/11`

We are then asked to sovle `p(A or B) = p(A)+p(B) - p(A)*p(B)`.
we just need to figure out `p(B)` and solve. Based on the law of total probability `p(B) = sum_i^n p(B,A_i)` in our case

`p(B) = p(B|A)p(A) +p(B|notA)p(notA)`
`p(B) =2/6 * 6/17 +6/11*11/17 = 8/17`

now we solve
`p(A or B) = 6/17+8/17- 6/17*8/17 = .6574`