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A $10$-question multiple-choice exam offers $5$choices for each question. Jason just guesses the answers, so he has a probability $1/5$of getting any one answer correct. You want to perform a simulation to determine the number of correct answers that Jason gets. One correct way to use a table of random digits to do this is the following:

(a) One digit from the random digit table simulates one answer, with 5$=$right and all other digits $=$wrong. Ten digits from the table simulate $10$answers. (b) One digit from the random digit table simulates one answer, with 0 or 1 $=$right and all other digits $=$wrong. Ten digits from the table simulate $10$answers.

(c) One digit from the random digit table simulates one answer, with odd $=$right and even $=$wrong. Ten digits from the table simulate $10$answers.

(d) Two digits from the random digit table simulate one answer, with $00$to $20$$=$right and $21$to $99=$wrong. Ten pairs of digits from the table simulate $10$answers.

(e) Two digits from the random digit table simulate one answer, with $00$to $05=$right and $06$to $99$$=$ wrong. Ten pairs of digits from the table simulate $10$answers.

Step by step solution

01

Given information

A$10$-question multiple-choice exam offers $5$choices for each question.

He has a probability $1/5$of getting any one answer correct.

Determine the number of correct answers he gets.

02

Explanation

The probability of a correct answer needs to be $1/5$

(a) Incorrect, because $5$of the $10$possible digits correspond with a right answer, which corresponds with a probability of $5/10=1/2$

(b) Correct, because$2$of the$10$possible digits correspond with a right answer, which corresponds with a probability of $2/10=1/5$

(c) Incorrect, because $5$of the $10$possible digits correspond with a right answer, which corresponds with a probability of$5/10=1/2$

(d) Incorrect, because repeats are being ignored and thus the probability of obtaining a correct answer is then not the same for each question (while this probability should be constant).

(e) Incorrect, because$21$of the$100$ possible pairs of digits correspond with a right answer, which corresponds with a probability of $21/100$instead of $1/5=20/100.$

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