Scores for a common standardized college aptitude test are normally distributed with a mean of 483 and a standard deviation of 95. Randomly selected men are given a Test Preparation Course before taking this test. Assume, for sake of argument, that the preparation course has no effect.

If 1 of the men is randomly selected, find the probability that his score is at least 537.6.
P(X > 537.6) = 
Enter your answer as a number accurate to 4 decimal places.

If 16 of the men are randomly selected, find the probability that their mean score is at least 537.6.
P(M > 537.6) = 
Enter your answer as a number accurate to 4 decimal places.

Assume that any probability less than 5% is sufficient evidence to conclude that the preparation course does help men do better. If the random sample of 16 men does result in a mean score of 537.6, is there strong evidence to support the claim that the course is actually effective?

• Yes. The probability indicates that it is (highly ?) unlikely that by chance, a randomly selected group of students would get a mean as high as 537.6.
• No. The probability indicates that it is too possible by chance alone to randomly select a group of students with a mean as high as 537.6