We have a test with sensitivity 95% and specificity 98%. We assume that 2% of a...

We have an illness, where 2% of the polulation is infected, and we have a test...

We have an illness, where 2% of the polulation is infected, and we have a test with sensitivity 94% and specificity 98%. A="infected" and B="tests positive" The question: What is the probability that a test-subject tests positive, even when not infected? And how high does the specificity need to be such that the probability is below 10%

We have the following statements: 1 percent of the population is infected by a disease. We...

We have the following statements: 1 percent of the population is infected by a disease. We have a test, a, that has a sensitivity of 90% and a specificity of 95%. Sensitivity means that a person will test positive IF they are in fact infected. Specificity means that a person will test negative IF they are in fact not infected. The question is: What is the probability that a random tested person gets a positiv result? And what is the...

We have an illness, where 2% of the polulation is infected, and we have a test...

We have an illness, where 2% of the polulation is infected, and we have a test with sensitivity 94% and specificity 98%. A="infected" and B="tests positive" Question: 20 people gets tested, and all tests negative. What is the probability that atleast one of these 20 really are infected?

Suppose that a screening test for breast cancer has 95% sensitivity and 90% specificity. Assume 1%...

Suppose that a screening test for breast cancer has 95% sensitivity and 90% specificity. Assume 1% of the population being screened truly has breast cancer. a. If you really do have breast cancer, what is the probability that the test says you do? b. If you really do not have breast cancer, what is the probability that the test says you do? c. The screening test is applied to a total of 15 people; 5 who really do have cancer...

The most commonly used test for HIV has a sensitivity of 0.997 and a specificity of...

The most commonly used test for HIV has a sensitivity of 0.997 and a specificity of 0.985. In other words, a person infected with HIV will test positive for the virus 99.7% of the time while a person NOT infected with HIV will test NEGATIVE for the virus 98.5% of the time. Research current rates of infection for the indicated population in order to answer the following questions. 1. If a US randomly selected US resident is tested for HIV...

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?

Fasting glucose to insulin ratio to measure insulin sensitivity: Reported sensitivity is .95 and reported specificity...

Fasting glucose to insulin ratio to measure insulin sensitivity: Reported sensitivity is .95 and reported specificity is .84. Prostate specific antigen in serum screening: reported sensitivity is .79 and reported specificity is .95. 1. What are the advantages and disadvantages for each test? 2. What might be the consequences of negative and positive results for each test?

The sensitivity and specificity of a diagnostic test in health care are defined as: • Sensitivity...

The sensitivity and specificity of a diagnostic test in health care are defined as: • Sensitivity = probability that the diagnostic test result is positive IF the patient has the disease; • Specificity = probability that the diagnostic test result is negative IF the patient does not have the disease. Suppose that two tests for the disease TB are applied as follows. Test A is applied to the full population, and anyone found positive according to test A is treated....

You have conducted a study on the sensitivity and specificity of a lab test for disease...

You have conducted a study on the sensitivity and specificity of a lab test for disease Y and draw the following conclusions: 125 students who have disease Y test positive 25 students who have disease Y test negative 500 students who do not have disease Y test negative 50 students who do not have disease Y test positive 1.What proportion of those who test negative does NOT have disease Y? NPV = ( ) % (round to one decimal place)...

The RDT SARS-COV-2 test has 93.8 sensitivity (the probability of a true positive result) and 95.6%...

The RDT SARS-COV-2 test has 93.8 sensitivity (the probability of a true positive result) and 95.6% specificity (the probability of a true negative result) . Suppose that 10% of population is infected with SARS-COV-2. If a randomly selected individual tests positive, what is the probability he or she is infected?