The national flufferball association decides to implement a drug screening procedure to test its athletes for illegal performance enhancing drugs. 3% of the professional flufferball players actually use performance enhancing drugs. A test for the drugs has a false positive rate of 2% and a false negative rate of 4%. In other words, a person who does not take the drugs will test positive with probability 0.02. A person who does take the drugs will test negative with probability 0.04. A randomly selected player is tested and tests positive. What is the probability that she really does take performance enhancing drugs?

A First Course in Probability (10th Edition)
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ISBN:9780134753119
Author:Sheldon Ross
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Chapter1: Combinatorial Analysis
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Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...
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This is a discrete math (discrete probability) problem. Please explain each step in detail, no cursive writing. 

 

The national flufferball association decides to implement a drug screening procedure to test its
athletes for illegal performance enhancing drugs. 3% of the professional flufferball players actually
use performance enhancing drugs. A test for the drugs has a false positive rate of 2% and a false
negative rate of 4%. In other words, a person who does not take the drugs will test positive with
probability 0.02. A person who does take the drugs will test negative with probability 0.04. A
randomly selected player is tested and tests positive. What is the probability that she really does
take performance enhancing drugs?
Transcribed Image Text:The national flufferball association decides to implement a drug screening procedure to test its athletes for illegal performance enhancing drugs. 3% of the professional flufferball players actually use performance enhancing drugs. A test for the drugs has a false positive rate of 2% and a false negative rate of 4%. In other words, a person who does not take the drugs will test positive with probability 0.02. A person who does take the drugs will test negative with probability 0.04. A randomly selected player is tested and tests positive. What is the probability that she really does take performance enhancing drugs?
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