It is estimated that 3% of the athletes competing in a large tournament are users of...

22 )Acompany has developed a drug test to detect sterold use by athletes .The test is...

22 )Acompany has developed a drug test to detect sterold use by athletes .The test is accurate 95% of the timewhen an athlete has taken steroids .It is 97% accurate when an athlete hasn't taken steroids .Suppose that the drug test will be used in a population of athletes in which 10% have actually taken steroids .Assume an athlete is chosen at random and the drug test is administered to this athlete ( a)Make a tree diagram showing the sample...

According to the guidelines of the World Anti-Doping Agency (WADA), athletes are subject to testing both...

According to the guidelines of the World Anti-Doping Agency (WADA), athletes are subject to testing both ‘in-competition’ and ‘out-of-competition’ for prohibited substances. Suppose that the tests for prohibited substances can identify a substance abuse 96% of the time. However, 2% of the time the test indicates a positive result although the athlete is not a prohibited substance user. If 5% of all athletes are users of prohibited substances, what is the probability that an athlete who has tested positive for...

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?

Olympic athletes have to undergo anti-doping tests to verify that they did not use performance enhancing...

Olympic athletes have to undergo anti-doping tests to verify that they did not use performance enhancing drugs during the competition. According to page 43 of the World Anti Doping Agency (WADA) 2017 Anti-doping Testing figures 0.9% of testing conducted on Olympic athletes in the "Athletics" sport, which includes sprinting, yields an AAF - Adverse Analytical Finding - i.e. a positive result. It is harder to find information on the reliability of the tests conducted, so for the sake of this...

Let’s say that we work for the International Olympic Committee (IOC) as part of their Fight...

Let’s say that we work for the International Olympic Committee (IOC) as part of their Fight Against Doping. We have a drug test for a banned performance-enhancing drug (PED) that is 99.3% accurate at identifying the presence of the PED in an athlete’s system. However, it is only 73% accurate at identifying the absence of PED in the athlete’s system. From a scientific study we also have a strong a priori reason to believe that only 3% of Olympic athletes...

Consider a test for detecting if an athlete has used a performance-enhancing drug. Let θ be...

Consider a test for detecting if an athlete has used a performance-enhancing drug. Let θ be the likelihood that the drug test gives the correct result. That is, the probability of drug test being positive (R = 1) when they actually did (D = 1), is θ. And the probability it reports no drug use when indeed there was none is also θ. More formally, P(R=1|D=1) = P(R=0|D=0) = θ Suppose also that the proportion of athletes in a particular...

Suppose 5% of athletes at the Olympic games dope, i.e., use performance enhancing drugs. The International...

Suppose 5% of athletes at the Olympic games dope, i.e., use performance enhancing drugs. The International Olympic Committee has a test that correctly identifies athletes who have doped 90% of the times. This test also correctly identifies athletes who have not doped 96% of the times. The test came out positive for an athlete. What is the chance that he/she has not doped?

Suppose 5% of athletes at the Olympic games dope, i.e., use performance enhancing drugs. The International...

Suppose 5% of athletes at the Olympic games dope, i.e., use performance enhancing drugs. The International Olympic Committee has a test that correctly identifies athletes who have doped 90% of the times. This test also correctly identifies athletes who have not doped 96% of the times. The test came out positive for an athlete. What is the chance that he/she has not doped?

Two athletes of equal ability are competing for a prize of $12,000. Each is deciding whether...

Two athletes of equal ability are competing for a prize of $12,000. Each is deciding whether to take a dangerous performance-enhancing drug. If one athlete takes the drug and the other does not, the one who takes the drug wins the prize. If both or neither take the drug, they tie and split the prize. Taking the drug imposes health risks that are equivalent to a loss of XX dollars. Complete the following payoff matrix describing the decisions the athletes...

Olympic athletes undergo a variety of drug tests to ensure the fairness of the competition. Suppose...

Olympic athletes undergo a variety of drug tests to ensure the fairness of the competition. Suppose that 3% of athletes in the 2018 Winter Olympics had taken banned drugs. The drug test has a sensitivity of 98% and a specificity of 95%. (a) Draw a tree diagram first branching on whether the athlete had taken banned drugs (D or D’) and then on the test result (POS or NEG)? (b) What is Pr(NEG|D)? Interpret this probability in terms of a...