Question 7: A diagnostic test is administered to a random person to determine if they have a certain disease. Consider the events: T = "the test is positive,", T ="the test is negative," D = "the person has the disease," and D = "the person has not the disease," Suppose that the test has the following "false positive" and "false negative" probabilities: P(T|D) = 0.02 (i.e., 2%) and P(T|D) = 0.04 (i.e., 4%). a) For any events A, B the Law of Total Probability says P(A) = P(A n B) + P(A N B). Use this to prove that 1 = P(B|A) + P(B|A) b) Compute the probability P(T|D) of a “true positive’ and the probability P(T|D) of “true negative".

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Question 7: A diagnostic test is administered to a random person to determine if they have a
certain disease. Consider the events: T = "the test is positive,", T = "the test is negative,"
D = "the person has the disease," and D = "the person has not the disease,"
Suppose that the test has the following "false positive" and "false negative" probabilities:
P(T|D) = 0.02 (i.e., 2%) and P(T|D) = 0.04 (i.e., 4%).
a) For any events A, B the Law of Total Probability says P(A) = P(AN B) + P(A O B).
Use this to prove that
b) Compute the probability P(T|D) of a “true positive" and the probability P(T|D) of “true
negative".
c) Assume that 10% of the population has this disease, i.e., P(D) = 0.1. What is the probability that
a random person will test positive?
d) Suppose that a random person is tested and the test returns positive. What is the probability that
this person actually has the disease? Is this a good test? [Hint: We are looking for the probability
P(D|T)].
%3D
1 = P(B|A) + P(B|A)
Transcribed Image Text:Question 7: A diagnostic test is administered to a random person to determine if they have a certain disease. Consider the events: T = "the test is positive,", T = "the test is negative," D = "the person has the disease," and D = "the person has not the disease," Suppose that the test has the following "false positive" and "false negative" probabilities: P(T|D) = 0.02 (i.e., 2%) and P(T|D) = 0.04 (i.e., 4%). a) For any events A, B the Law of Total Probability says P(A) = P(AN B) + P(A O B). Use this to prove that b) Compute the probability P(T|D) of a “true positive" and the probability P(T|D) of “true negative". c) Assume that 10% of the population has this disease, i.e., P(D) = 0.1. What is the probability that a random person will test positive? d) Suppose that a random person is tested and the test returns positive. What is the probability that this person actually has the disease? Is this a good test? [Hint: We are looking for the probability P(D|T)]. %3D 1 = P(B|A) + P(B|A)
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