A drug test gives a true positive result 95% of the time. Suppose 20% of the...

A medical test gives a correct result 90% of the time for infected individuals and 95%...

A medical test gives a correct result 90% of the time for infected individuals and 95% of the time for non-infected individuals. All members of the population are tested. The probability that a person is infected given they have a positive test result is 0.6. What proportion of the population is infected?

Probability that a test gives a positive result when someone has an illness is 0.98, and...

Probability that a test gives a positive result when someone has an illness is 0.98, and gives a positive result when the person does not have the illness is 0.02. The incidence of illness in the population is 0.01. Suppose a person takes the test and the result is positive. What is the probability that the person has the disease?

Suppose we assume that 5% of people are drug users. If a person is a drug...

Suppose we assume that 5% of people are drug users. If a person is a drug user, the result of the test is positive 95% of the time, and if the person is not a drug user, the result is negative 90% of the time. A person is randomly selected. What is the probability that he tests positive for drugs?

Problem 9: Suppose the probability of being infected with a certain virus is 0.005. A test...

Problem 9: Suppose the probability of being infected with a certain virus is 0.005. A test used to detect the virus is positive 90% of the time given that the person tested has the virus, and positive 5% of the time given that the person tested does not have the virus. (2 points) a. Use Bayes’ Theorem to find the probability that a person has the virus, given that they tested positive. Clearly show your work and how you are...

A certain virus infects one in every 200200 people. A test used to detect the virus...

A certain virus infects one in every 200200 people. A test used to detect the virus in a person is positive 9090​% of the time when the person has the virus and 1010​% of the time when the person does not have the virus.​ (This 1010​% result is called a false positive​.) Let A be the event​ "the person is​ infected" and B be the event​ "the person tests​ positive." ​(a) Using​ Bayes' Theorem, when a person tests​ positive, determine...

A certain virus infects one in every 200 people. A test used to detect the virus...

A certain virus infects one in every 200 people. A test used to detect the virus in a person is positive 80​% of the time when the person has the virus and 15​% of the time when the person does not have the virus.​ (This 15​% result is called a false positive​.) Let A be the event​ "the person is​ infected" and B be the event​ "the person tests​ positive." ​(a) Using​ Bayes' Theorem, when a person tests​ positive, determine...

test for a certain disease is found to be 95% accurate, meaning that it will correctly...

test for a certain disease is found to be 95% accurate, meaning that it will correctly diagnose the disease in 95 out of 100 people who have the ailment. The test is also 95% accurate for a negative result, meaning that it will correctly exclude the disease in 95 out of 100 people who do not have the ailment. For a certain segment of the population, the incidence of the disease is 4%. (1) If a person tests positive, find...

Use the table below to find the probability. Positive Test Result Negative Test Result Subject Uses...

Use the table below to find the probability. Positive Test Result Negative Test Result Subject Uses Drugs 44 (True Positive) 6 (False Negative) Subject is Not a Drug User 90 (False Positive) 860 (True Negative) Find P ( negative test result | subject does not use drug.)

A certain virus infects one in every 300 300 people. A test used to detect the...

A certain virus infects one in every 300 300 people. A test used to detect the virus in a person is positive 90 90​% of the time when the person has the virus and 10 10​% of the time when the person does not have the virus.​ (This 10 10​% result is called a false positive​.) Let A be the event​ "the person is​ infected" and B be the event​ "the person tests​ positive." ​(a) Using​ Bayes' Theorem, when a...

Use the table below to find the probability. Positive Test Result Negative Test Result Subject Uses...

Use the table below to find the probability. Positive Test Result Negative Test Result Subject Uses Drugs 44 (True Positive) 6 (False Negative) Subject is Not a Drug User 90 (False Positive) 860 (True Negative) Find . (Round to 4 decimals)