The following problem is frequently encountered in the case of a rare disease, say AIDS, when determining the probability of actually having the disease after testing positively for HIV. (This is often known as the accuracy of the test given that you have the disease.) Let us set up the problem as follows: $Y = 0$ if you tested negative using the ELISA test for HIV, $Y = 1$ if you tested positive; $X = 1$ if you have HIV, $X = 0$ if you do not have HIV. Assume that $0.1$ percent of the population has HIV and that the accuracy of the test is $0.95$ in both cases of (i) testing positive when you have HIV, and (ii) testing negative when you do not have HIV. (The actual ELISA test is actually $99.7$ percent accurate when you have HIV, and $98.5$ percent accurate when you do not have HIV.) (a)Assuming arbitrarily a population of 10,000,000 people, use the accompanying table to
first enter the column totals. $$\begin{array} { | r | l | l | l | }
\hline & \text { Test Positive } ( Y = 1 ) & \text { Test Negative } ( Y = 0 ) & \text { Total } \
\hline \text { HIV } ( X = 1 ) & & & \
\hline \text { No HIV } ( X = 0 ) & & & \
\hline \text { Total } & & & 10,000,000 \
\hline
\end{array}$$

Question

The following problem is frequently encountered in the case of a rare disease, say AIDS, when determining the probability of actually having the disease after testing positively for HIV. (This is often known as the accuracy of the test given that you have the disease.) Let us set up the problem as follows: $Y = 0$ if you tested negative using the ELISA test for HIV, $Y = 1$ if you tested positive; $X = 1$ if you have HIV, $X = 0$ if you do not have HIV. Assume that $0.1$ percent of the population has HIV and that the accuracy of the test is $0.95$ in both cases of (i) testing positive when you have HIV, and (ii) testing negative when you do not have HIV. (The actual ELISA test is actually $99.7$ percent accurate when you have HIV, and $98.5$ percent accurate when you do not have HIV.) (a)Assuming arbitrarily a population of 10,000,000 people, use the accompanying table to
first enter the column totals. $$\begin{array} { | r | l | l | l | } 
\hline & \text { Test Positive } ( Y = 1 ) & \text { Test Negative } ( Y = 0 ) & \text { Total } \
\hline \text { HIV } ( X = 1 ) & & & \
\hline \text { No HIV } ( X = 0 ) & & & \
\hline \text { Total } & & & 10,000,000 \
\hline
\end{array}$$

Quizplus · Accepted Answer

The Answer of The following problem is frequently encountered in the case of a rare disease, say AIDS, when determining the probability of actually having the disease after testing positively for HIV. (This is often known as the accuracy of the test given that you have the disease.) Let us set up the problem as follows: $Y = 0$ if you tested negative using the ELISA test for HIV, $Y = 1$ if you tested positive; $X = 1$ if you have HIV, $X = 0$ if you do not have HIV. Assume that $0.1$ percent of the population has HIV and that the accuracy of the test is $0.95$ in both cases of (i) testing positive when you have HIV, and (ii) testing negative when you do not have HIV. (The actual ELISA test is actually $99.7$ percent accurate when you have HIV, and $98.5$ percent accurate when you do not have HIV.) (a)Assuming arbitrarily a population of 10,000,000 people, use the accompanying table to
first enter the column totals. $$\begin{array} { | r | l | l | l | } 
\hline & \text { Test Positive } ( Y = 1 ) & \text { Test Negative } ( Y = 0 ) & \text { Total } \
\hline \text { HIV } ( X = 1 ) & & & \
\hline \text { No HIV } ( X = 0 ) & & & \
\hline \text { Total } & & & 10,000,000 \
\hline
\end{array}$$

The Following Problem Is Frequently Encountered in the Case of a Rare