Answer: P = 0.75
Step-by-step explanation:
Hi!
The sample space of this problems is the set of all the possible sales. It is divided in the disjoint sets:
[tex]S_s = {\text{sales made in Seattle }}\\S_p={\text {sales made in Portland}}[/tex]
We have also the set of sales of boat accesories [tex]S_b[/tex], the colored one in the image.
We are given the data:
[tex]P(S_s) = 0.6\\P(S_b | S_s) = \frac{P(S_b\bigcap S_s)}{P(S_s)}=0.4\\P(S_b|S_p) =\frac{P(S_b\bigcap S_p)}{P(S_p)}=0.2[/tex]
From these relations you can compute the probabilities of the intersections colored in the image:
[tex]pink\;set:\;P(S_b \bigcap S_s) =0.6*0.4=0.24\\blue\;set\;:P(S_b \bigcap S_p)=(1-0.6)*0.2 =0.08[/tex]
You are asked about the conditional probability:
[tex]P(S_s|S_b) = \frac{P(S_s \bigcap S_b)}{P(S_b)}[/tex]
To calculate this, you need [tex]P(S_b)[/tex] . In the image you can see that the set [tex]S_b[/tex] is the union of the two disjoint pink and blue sets. Then:
[tex]P(S_b)=P((S_b \bigcap S_s)\bigcup(S_b \bigcap S_p)) = 0.24 + 0.08 = 0.32[/tex]
Finally:
[tex]P(S_s|S_b) = \frac{0.24}{0.32}=0.75[/tex]
