Answer:
0.0224 or 2.24%
Step-by-step explanation:
The probability that an intern uses drugs, given that the test is negative, is determined by the probability of false negative divided by the probability of a negative (true or false).
A false negative occurs when an intern who uses drugs (10%) takes the test and gets a negative. Since the test gets it right 80% of the time, the probability of this happening is:
[tex]P(FN) = 0.10*(1-0.80)=0.02[/tex]
A true negative occurs when an intern who does not use drugs (90%) takes the test and gets a negative. Since the test gets it wrong 3% of the time, the probability of this happening is:
[tex]P(TN) = 0.90*(1-0.03)=0.873[/tex]
Therefore, the probability that an intern uses drugs, given that the test is negative is:
[tex]P(D|N) = \frac{P(FN)}{P(FN)+P(TN)} \\P(D|N) = \frac{0.02}{0.02+0.873} \\P(D|N) = 0.0224 = 2.24\%[/tex]
The probability is 0.0224 or 2.24%.
Answer:
don't do drugs or you'll end up like macauley culkin
Step-by-step explanation:
