Answer: Our required probability is 0.406.
Step-by-step explanation:
Since we have given that
Probability of selecting an adult over 40 years of age with cancer = 0.05
Probability of a doctor correctly diagnosing a person with cancer as having the disease = 0.78
Probability of incorrectly diagnosing a person without cancer as having the disease = 0.06
Let A be the given event i.e. adult over 40 years of age with cancer. P(A) = 0.05.
So, P(A')=1-0.05 = 0.95
Let C be the event that having cancer.
P(C|A)=0.78
P(C|A')=0.06
So, using the Bayes theorem, we get that
[tex]P(A|C)=\dfrac{P(A).P(C|A)}{P(A).P(C|A)+P(A')P(C|A')}\\\\P(A|C)=\dfrac{0.78\times 0.05}{0.78\times 0.05+0.06\times 0.95}\\\\P(A|C)=0.406[/tex]
Hence, our required probability is 0.406.
