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The Practice of Statistics for AP

David Moore,Daren Starnes,Dan Yates

$Math Studyset Vaia Explanations$ Math

4th Edition · 809 pages

ISBN: 9781319113339

Chapter 6: Q. 2.3 (page 390)

To introduce her class to binomial distributions, Mrs. Desai gives a $10$ -item, multiple-choice quiz. The catch is, that students must simply guess an answer (A through E) for each question. Mrs. Desai uses her computer's random number generator to produce the answer key so that each possible answer has an equal chance to be chosen. Patti is one of the students in this class.
Let $X =$ the number of Patti's correct guesses.
To get a passing score on the quiz, a student must guess correctly at least $6$ times. Would you be surprised if Patti earned a passing score? Compute an appropriate probability to support your answer.

Short Answer

Expert verified

The probability is $0.0064$ .

Step by step solution

01

Given Information

Number of questions $= 10$

Students are supposed to guess the answers.

$X$ is a number of answers that Patti gives correct.

02

Explanation

The binomial distribution pdf is:

$P (X = r) = {}^{n}C_{r} \times p^{r} \times (1 - p)^{r}$

Calculation:

Using Ti-83 plus calculator $P (X < 6)$ can be calculated as:

Now, $P (X \geq 6)$ can be calculated as

localid="1649855112536" $P (X \geq 6) = 1 - P (X < 6) = 1 - 0.9936 = 0.0064$

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Most popular questions from this chapter

Better readers?( $1.3$ ) Did students have higher reading scores after participating in the chess program? Give appropriate statistical evidence to support your answer.

Exercises 47 and 48 refer to the following setting. Two independent random variables $X$ and $Y$ have the probability distributions, means, and standard deviations shown.

48. Difference Let the random variable $D = X - Y$ .

(a) Find all possible values of D. Compute the probability that $D$ takes each of these values. Summarize the probability distribution of $D$ in a table.
(b) Show that the mean of $D$ is equal to $μ_{X} - μ_{Y}$ .
(c) Confirm that the variance of $D$ is equal to $σ_{X}^{2} + σ_{Y}^{2}$ .Find all possible values of $D$ . Compute the probability that takes each of these values. Summarize the probability distribution of in a table.

Lie detectors A federal report finds that lie detector tests given to truthful persons have probability about $0.2$ of suggesting that the person is deceptive. A company asks $12$ job applicants about thefts from
previous employers, using a lie detector to assess their truthfulness. Suppose that all $12$ answer truthfully. Let $X =$ the number of people who the lie detector says are being deceptive.
(a) Find and interpret $μ X$ .
(b) Find and interpret $σ X$ .

Benford’s law and fraud Refer to Exercise 13. It might also be possible to detect an employee’s fake expense records by looking at the variability in the first digits of those expense amounts.

(a) Calculate the standard deviation σY. This gives us an idea of how much variation we’d expect in the employee’s expense records if he assumed that first digits from $1$ to $9$ were equally likely.

(b) Now calculate the standard deviation of first digits that follow Benford’s law (Exercise 5). Would using standard deviations be a good way to detect fraud? Explain.

80. More lefties Refer to Exercise 72.

(a) Find the probability that exactly $3$ students in the sample are left-handed. Show your work.
(b) Would you be surprised if the random sample contained $4$ or more left-handed students? Compute $P (W \geq 4)$ and use this result to support your
answer.

See all solutions

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