An investigator wishes to estimate the proportion of stu- dents at a certain university who have violated

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An investigator wishes to estimate the proportion of stu- dents at a certain university who have violated the honor code. Having obtained a random sample of n students, she realizes that asking each, "Have you violated the honor code?" will probably result in some untruthful responses. Consider the following scheme, called a randomized response technique. The investigator makes up a deck of 100 cards, of which 50 are of type I and 50 are of type II. Type I: Have you violated the honor code (yes or no)? Type II: Is the last digit of your telephone number a 0, 1, or 2 (yes or no)?

Each student in the random sample is asked to mix the deck, draw a card, and answer the resulting question truthfully. Because of the irrelevant question on type II cards, a yes response no longer stigmatizes the respondent, so we assume that responses are truthful. Let p denote the proportion of honor-code violators (i.e., the probability of a randomly selected student being a violator), and let = P(yes response). Then A and p are related by A = .5p+ (.5)(.3).

a. Let Y denote the number of yes responses, so Y- Bin (n, A). Thus Y/n is an unbiased estimator of A. Derive an estimator for p based on Y. If n = 80 and y = 20, what is your estimate? [Hint: Solve A = .5p+.15 for p and then substitute Y/n for A.]

b. Use the fact that E(Y/n) = A to show that your estimator p is unbiased.

c. If there were 70 type I and 30 type II cards, what would be your estimator for p?

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