Question

2. Suppose next that we have even less knowledge of our patient, and we are only...

2. Suppose next that we have even less knowledge of our patient, and we are only given the accuracy of the blood test and prevalence of the disease in our population. We are told that the blood test is 95 percent reliable, this means that the test will yield an accurate positive result in 95% of the cases where the disease is actually present. Gestational diabetes affects 6% of the population in our patient’s age group, and that our test has a false positive rate of 9%. Use your knowledge of Bayes’ Theorem and Conditional Probabilities to compute the following quantities based on the information given only in part 2:

  1. If 100,000 people take the blood test, how many people would you expect to test positive and actually have gestational diabetes?
  2. What is the probability of having the disease given that you test positive?
  3. If 100,000 people take the blood test, how many people would you expect to test negative despite actually having gestational diabetes?
  4. What is the probability of having the disease given that you tested negative?

Comment on what you observe in the above computations. How does the prevalence of the disease affect whether the test can be trusted?

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
2 2. Suppose next that we have even less knowledge of our patient, and we are...
2 2. Suppose next that we have even less knowledge of our patient, and we are only given the accuracy of the blood test and prevalence of the disease in our population. We are told that the blood test is 9# percent reliable, this means that the test will yield an accurate positive result in 9#% of the cases where the disease is actually present. Gestational diabetes affects #+1 percent of the population in our patient’s age group, and that...
Suppose next that we have even less knowledge of our patient, and we are only given...
Suppose next that we have even less knowledge of our patient, and we are only given the accuracy of the blood test and prevalence of the disease in our population. We are told that the blood test is 96 percent reliable, this means that the test will yield an accurate positive result in 96% of the cases where the disease is actually present. Gestational diabetes affects 7 percent of the population in our patient’s age group, and that our test...
Consider a particular genetic disease affects 3% of adults in the U.S. population. Fortunately, there is...
Consider a particular genetic disease affects 3% of adults in the U.S. population. Fortunately, there is a genetic test for the gene that causes the disease. The test is 98% accurate; that is, 98% of the people who take the test get the correct result (and 2% of people tested get the wrong result). In Springfield, there are 100,000 adults, and they all get tested for the disease. How many of the residents of Springfield are likely to have the...
⦁   Suppose in August the Covid-19 situation has calmed down. Since not everyone shows symptoms and...
⦁   Suppose in August the Covid-19 situation has calmed down. Since not everyone shows symptoms and some symptoms could have been a different pneumonia we might use an anti-body test to see if people have had the disease. Let’s assume by August 40% of the US has had the disease. The anti-body test is not perfect. Some people will get “false positives” or “false negatives”. 90% of people who test positive will actually have had the disease. 95% of people...
The percentage of the Illinois population with diabetes is believed to be 9.1%. B1) Suppose we...
The percentage of the Illinois population with diabetes is believed to be 9.1%. B1) Suppose we decided to take a random sample of 20 people from the Illinois population. What is the probability that none of them have diabetes? (2 pts) What is the probability that at least 20% of the sample has diabetes? (2 pts) B2) Suppose we decided to take a random sample of 200 people from the Illinois population. How many people would we expect to have...
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...
Most medical tests used today have about a 5% false positive rate, which some doctors will...
Most medical tests used today have about a 5% false positive rate, which some doctors will take to mean that if a patient’s test comes back positive, that the patient has a 95% chance of having the disease. A 95% chance is very high, and so the doctor will assume that the patient has the disease and will start an aggressive and potentially dangerous course of treatment. For your first problem, you will show that, for rare diseases, this common...
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...
A medical test is available to determine whether a patient has a certain disease. To determine...
A medical test is available to determine whether a patient has a certain disease. To determine the accuracy of the test, a total of 10,100 people are tested. Only 100 of these people have the disease, while the other 10,000 are disease free. Of the disease-free people, 9800 get a negative result, and 200 get a positive result. The 100 people with the disease all get positive results. Use this information as you answer the questions below. 1) Find the...
A new, non-invasive colon cancer screening method boasts a sensitivity of 99%. That is, given that...
A new, non-invasive colon cancer screening method boasts a sensitivity of 99%. That is, given that a patient has colon cancer, the screening method has a 0.99 probability of yielding a positive test. The test is also 90% specific, meaning that if a person without colon cancer is screened, there is a 0.9 probability of a negative test result. Among the population of adults over 45 years of age, the proportion who have colon cancer is 0.0013 (thirteen out of...