Question

The probability of event `A` occurring is `p`. If `A` doesn't occur, that is event `a`. What is the probability of the following occurring: `A A, aa, Aa`?

Answer 1

See below:

Explanation:

Let's use some numbers first and then generalize. I'll set `A` as probability `3/4` and `a` as probability `1/4`.

The probability of drawing the three different draws are (and I'm assuming order matters and so `P(A a) and P(a A)` are different):

`P(A A)=3/4xx3/4=9/16`

`P(a a)=1/4xx1/4=1/16`

`P(A a)=3/4xx1/4=3/16`

We can now generalize using `p` and `1-p`:

`P(A A)=pxxp=p^2`

`P(a a)=(1-p)xx(1-p)=(1-p)^2=1-2p+p^2`

`P(A a)=pxx(1-p)=p-p^2`

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If order doesn't matter, then we multiply the `P(A a)` results by 2 to account for `P(a A)`, giving:

`P(A a)=2xx3/4xx1/4=6/16`

and

`P(A a)=2xxpxx(1-p)=2p-2p^2`