Problem Nine A test for a certain disease was given to 1,000 subjects, 8% of whom...
Problem Nine A test for a certain disease was given to 1,000 subjects, 8% of whom were known to have the disease. For the subjects who had the disease, the test had a positive result for the disease in 90% of the subjects, was inconclusive for 7% and a negative result in 3% of the subjects. For subjects who did not have the disease, the test had a positive result in 5% of subjects, was inconclusive in 10% and a negative result in the remaining 85%.
A. Draw a tree diagram to model the probabilities in this
problem.
B. What is the probability of a randomly selected person having the
disease GIVEN that the test has a positive result?
C. Which theorem/rule did you apply to solve this problem?
Homework Answers
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Problem Nine A test for a certain disease was given to 1,000
subjects, 8% of whom...
Problem Nine A test for a certain disease was given to 1,000 subjects, 8% of whom...
Problem Nine A test for a certain disease was given to 1,000 subjects, 8% of whom were known to have the disease. For the subjects who had the disease, the test had a positive result for the disease in 90% of the subjects, was inconclusive for 7% and a negative result in 3% of the subjects. For subjects who did not have the disease, the test had a positive result in 5% of subjects, was inconclusive in 10% and a...
Only 1 in 1,000 is afflicted with a rare disease for which a diagnostic test has...
Only 1 in 1,000 is afflicted with a rare disease for which a diagnostic test has been developed. When a person has the disease , the test returns a positive result 99% of the time. However, when a person does not have the disease, the test shows a positive result only 2% of the time. When a person's test results are positive, in order to validate the results, a second test is given. The second test has the same accuracy...
In a laboratory, blood test is 95% effective in detecting a certain disease, when it is,...
In a laboratory, blood test is 95% effective in detecting a certain disease, when it is, in fact, present. However, the test also yields a false positive (test is positive but patient does not have the disease) result for 1% of the healthy people tested. 0.5% of the population actually has the disease. Given this information, calculate the following probabilities: The probability that the test is positive. Given a negative result, the probability that the person does not have the...
A blood test to diagnose a disease was performed on a number of patients. Given the...
A blood test to diagnose a disease was performed on a number of patients. Given the following data: Number of patients who had a positive test result and had the disease = 1,193 Number of patients = 1,561 Number of patients who had a negative test, and did not have the disease = 253 Number of patients who had a positive test result, but did not have the disease = 58 Number of patients who had a negative test result,...
3) A certain blood test for a disease gives a positive result 90% of the time...
3) A certain blood test for a disease gives a positive result 90% of the time among patients having the disease. It also gives a positive result 25% of the time among people who do not have the disease. It is believed that 30% of the population has this disease a) What is the probability that a person with a positive test result indeed has the disease? b) What is the probability that the blood test gives a negative result?...
Problem 4. Screening Tests Suppose that a certain disease is prese test designed to detect this...
Problem 4. Screening Tests Suppose that a certain disease is prese test designed to detect this disease if present. The test does not always work perfectly. Sometimes the test is negative when the disease times that the test produces various results. nt in 10% of the population, and that there is a screening is present, and sometimes it is positive when the disease is absent. The table below shows the proportions of Test is Positive (P) Test is Negative (N)...
probabilities I know from given problem: .99 have disease AND Test + therefore... .01 have disease...
probabilities I know from given problem:
.99 have disease AND Test + therefore...
.01 have disease AND Test -
.02 do not have disease AND Test + therefore...
.98 do not have disease AND Test -
.10 of TOTAL population HAVE Disease
therefore...
.90 of TOTAL population DO NOT HAVE Disease.
what I thought I would have to do to get what is being
asked is P(have disease | tests +) = P(Have disease AND Test +) /
P(test +)...
It is known that 2.6% of the population has a certain disease. A new test is...
It is known that 2.6% of the population has a certain disease. A new test is developed to screen for the disease. A study has shown that the test returns a positive result for 18% of all individuals, and returns a positive result for 92% of individuals who do have the disease. If a person tests positively for the disease under this test, what is the probability that they actually have the disease? 0.1276 0.1329 0.1435 0.1223 O 0.1382
2. A rare disease affects 1% of the population. A test has a sensitivity of 98%,...
2. A rare disease affects 1% of the population. A test has a sensitivity of 98%, i.e., it will give a positive result 98% of the time that a person actually has the disease. The same test also has a specificity of 95%, i.e., it will give a negative result 95% of the time when a person does not have the disease. Denote the event that a randomly person has a disease by D, and the event that a randomly...
It’s known that 2 % of people in a certain population have the disease. A blood...
It’s known that 2 % of people in a certain population have the disease. A blood test gives a positive result (indicating the presence of disease) for 95% of people who have the disease, and it is also positive for 3% of healthy people. One person is tested and the test gives positive result. a. If the test result is positive for the person, then the probability that this person actually has a disease is _________ b. If the test...
3) A certain blood test for a disease gives a positive result 90% of the time among patients having the disease. It also gives a positive result 25% of the time among people who do not have the disease. It is believed that 30% of the population has this disease a) What is the probability that a person with a positive test result indeed has the disease? b) What is the probability that the blood test gives a negative result?...
Problem 4. Screening Tests Suppose that a certain disease is prese test designed to detect this disease if present. The test does not always work perfectly. Sometimes the test is negative when the disease times that the test produces various results. nt in 10% of the population, and that there is a screening is present, and sometimes it is positive when the disease is absent. The table below shows the proportions of Test is Positive (P) Test is Negative (N)...
probabilities I know from given problem:
.99 have disease AND Test + therefore...
.01 have disease AND Test -
.02 do not have disease AND Test + therefore...
.98 do not have disease AND Test -
.10 of TOTAL population HAVE Disease
therefore...
.90 of TOTAL population DO NOT HAVE Disease.
what I thought I would have to do to get what is being
asked is P(have disease | tests +) = P(Have disease AND Test +) /
P(test +)...
It is known that 2.6% of the population has a certain disease. A new test is developed to screen for the disease. A study has shown that the test returns a positive result for 18% of all individuals, and returns a positive result for 92% of individuals who do have the disease. If a person tests positively for the disease under this test, what is the probability that they actually have the disease? 0.1276 0.1329 0.1435 0.1223 O 0.1382
2. A rare disease affects 1% of the population. A test has a sensitivity of 98%, i.e., it will give a positive result 98% of the time that a person actually has the disease. The same test also has a specificity of 95%, i.e., it will give a negative result 95% of the time when a person does not have the disease. Denote the event that a randomly person has a disease by D, and the event that a randomly...
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