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?

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?

1) With probability 0.82, a test will give a positive result when applied to a person...

1) With probability 0.82, a test will give a positive result when applied to a person with a certain disease and will give a positive result when applied to someone without the disease with probability 0.8. Given that 7% of the population have the disease, what is the probability that a person that tests positive for the disease actually has the disease?