In: Math
Aldrich Ames is a convicted traitor who leaked American secrets to a foreign power. Yet Ames took routine lie detector tests and each time passed them. How can this be done? Recognizing control questions, employing unusual breathing patterns, biting one's tongue at the right time, pressing one's toes hard to the floor, and counting backwards by 7 are countermeasures that are difficult to detect but can change the results of a polygraph examination†. In fact, it is reported in Professor Ford's book that after only 20 minutes of instruction by "Buzz" Fay (a prison inmate), 85% of those trained were able to pass the polygraph examination even when guilty of a crime. Suppose that a random sample of eleven students (in a psychology laboratory) are told a "secret" and then given instructions on how to pass the polygraph examination without revealing their knowledge of the secret. What are the following probabilities? (Round your answers to three decimal places.)
(a) all the students are able to pass the polygraph examination
(b) more than half the students are able to pass the polygraph examination
(c) no more than half of the students are able to pass the polygraph examination
(d) all the students fail the polygraph examination
The probability of passing the polygraph test even when guilty = 85/100 = 0.85
X be the number of students among the 11 students who are able to pass the polygraph test
X follows binomial distribution with parameters p = 0.85 and n = 11
where x = 0,1,2,...n
==> where x = 0,1,2,...11
a)
Therefore the probability that all the students are able to pass the polygraph examination is 0.167
b)
Therefore the probability that more than half the students are able to pass the polygraph examination is 0.997
c)
Therefore the probability that not more than half the students are able to pass the polygraph examination is 0.003
d)
Therefore the probability that all the students fail the polygraph examination is near to 0