Answer:
The probability that a randomly selected person who is shy is a Statistician is 0.3684.
Step-by-step explanation:
Let's denote the events as follows:
E = a person is an Economist
S = a person is a Statistician
X = a person is shy.
Given:
P (E) = 0.80
P (S) = 0.20
P (X|S) = 0.70
P (X|E) = 0.30
Compute the probability that a randomly selected person is shy is:
[tex]P(X) = P(X|S)P(S)+P(X|E)P(E)\\=(0.70\times0.20)+(0.30\times0.80)\\=0.38[/tex]
The probability that a person is shy is, P (X) = 0.38.
The conditional probability of an event A provided that another event B has already occurred is:
[tex]P(A|B)=\frac{P(B|A)P(A)}{P(B)}[/tex]
Compute the probability that a randomly selected person who is shy is a Statistician as follows:
[tex]P(S|X)=\frac{P(X|S)P(S)}{P(X)}=\frac{0.70\times0.20}{0.38}= 0.3684[/tex]
Thus, the probability that a randomly selected person who is shy is a Statistician is 0.3684.
