The probability of a false negative is 0.1%; the probability of a false positive is 10%....

The probability of a false negative is 0.1%; the probability of a false positive is 10%....

The probability of a false negative is 0.1%; the probability of a false positive is 10%. The prevalence of the disease in the population is 2%. Given a person tests positive, what is the probability that (s)he does nothave the disease?

The test for a disease has a false positive rate of 5% and a false negative...

The test for a disease has a false positive rate of 5% and a false negative rate of 3%.  Suppose a person to be test has the disease with probability 20%. If the test is positive, what is the revised probability that the person has the disease? If the test is negative, what is the revised probability that the person has the disease? If the test is negative, what is the revised probability that the person does not have the disease?...

Suppose you are analyzing a test for a blood disease where • 94% of people with...

Suppose you are analyzing a test for a blood disease where • 94% of people with the disease test positive. • Only 0.5% of the population has this disease. • The false-positive rate is 0.1%. (a) What is the test’s precision, that is the probability that a person with a positive test has the disease? (b) What is the accuracy of the test, that is the probability that either a person tests positive AND has the disease OR a person...

The prevalence of a disease D among the population is 3%. There is a diagnostic test...

The prevalence of a disease D among the population is 3%. There is a diagnostic test for disease D. The sensitivity of this test is 99%, this means that the test is positive given that the person has the disease. The specificity of this test is 98%, this means that the test is negative given that the person does not have the disease. a) Given that a person tests positive, what is the probability that the person does not have...

A certain disease has an incidence rate of 0.5%. If the false negative rate is 4%...

A certain disease has an incidence rate of 0.5%. If the false negative rate is 4% and the false positive rate is 2%, compute the probability that a person who tests positive actually has the disease.

A certain disease has an incidence rate of 2%. The false negative rate is 5%, and...

A certain disease has an incidence rate of 2%. The false negative rate is 5%, and the false positive rate is 1%. Compute the probability that a person who tests positive actually has the disease. Give your answer to 2 decimal places.

5. In medical tests the prevalence of a disease in a given population is the percentage...

5. In medical tests the prevalence of a disease in a given population is the percentage of the population that has the disease. For a population with a known prevalence, the positive predictive value (PPV) of a test is the probability that a person in the population that tests positive actually has the disease. The negative predictive value (NPV) of a test is the probability that a person in the population who tests negative, in fact, does not have the...

A certain disease has an incidence rate of 0.2%. If the false negative rate is 8%...

A certain disease has an incidence rate of 0.2%. If the false negative rate is 8% and the false positive rate is 4%, compute the probability that a person who tests positive actually has the disease.

A certain disease has an incidence rate of 0.4%. If the false negative rate is 6%...

A certain disease has an incidence rate of 0.4%. If the false negative rate is 6% and the false positive rate is 2%, compute the probability that a person who tests positive actually has the disease. Give your answer accurate to at least 3 decimal places

3. A diagnostic test has 95% sensitivity (the probability a person with the condition tests positive...

3. A diagnostic test has 95% sensitivity (the probability a person with the condition tests positive = 0.95) and 95% specificity (the probability a person without the condition tests negative = 0.95). In a population of people given the test, 1% of the people have the condition (probability a person has the condition = 0.01). (a) What proportion of the people will test positive? (b) Given a person has tested positive, what is the probability he/she has the condition?