In this mini-project, we'll consider this (fictional) medical test. In a population, 2% of all people have a certain medical condition. This is called the prevalence of the condition. A new test for t

In this mini-project, we'll consider this (fictional) medical test. In a population, 2% of all people have a certain medical condition. This is called the prevalence of the condition.

A new test for this condition is being developed. Here is some data that was gathered during the development of the test. The test was administered to people without this condition, and also people with the condition. The result of the test is a real number, and it is rounded to the nearest one-tenth.

(pic shown in the file).

For example, 50% of people who do not have the condition had a test value of 0.0. 30% of people without the condition had a test value of 0.1, and so on.

For people with the condition, 5% of them had a test value of 0.0, another 5% had a test value of 0.1, and so on.

It is our job to choose a cut-off value for the test,c. When someone takes the test, if they have a test value which is greater than or equal toc, then the test result will be indicated as positive, meaning it is suspected the individual has the condition. If they have a test value strictly less thanc, the test result will be indicated as negative, meaning it is suspected the individual does not have the condition.

What value ofc should we pick?

1.Let's say we pick c = 0.1. This means anyone who tests at 0.1 or higher will have a positive test result, and anyone who tests at 0.0 will have a negative test result. Using the table above, and the prevalence of 2%, find each of these conditional probabilities for this choice of c:

(a) P ( positive ∣ has condition ) (this is called the sensitivity, power, or true positive rate)

(b) P ( negative ∣ has condition ) (this is called the Type II error, or false negative rate)

(c) P ( negative ∣ does not have condition ) (this is called the specificity, or true negative rate)

(d)P ( positive ∣ does not have condition ) (this is called the Type I error, or the false positive rate)

(e)P ( has condition ∣ positive ) (this is called the Positive Predictive Value)

(f)P ( does not have condition ∣ negative ) (this is called the Negative Predictive Value)

2.Instead, say we pick c = 0.3. Find each of the six conditional probabilities from #1 for this new choice of c.

3.Now it's up to you to pick a value for c. Which value of c would you recommend? Why? What are the advantages and disadvantages of your choice?