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The Practice of Statistics for AP Examination

Daren Starnes, Josh Tabor

$Math Studyset 91影视 Explanations$ Math

6th Edition 路 837 pages

ISBN: 9781319113339

Chapter 6: Q.116 (page 432)

Each entry in a table of random digits like Table $D$ has probability $$ of being a 0 , and the digits are independent of one another. Each line of Table D contains 40 random
digits. The mean and standard deviation of the number of 0 s in a randomly selected line will be approximately
a. mean $= 0.1$ , standard deviation $= 0.05$ .
b. mean $= 0.1$ , standard deviation $= 0.1$ .
c. mean $= 4$ , standard deviation $= 0.05$ .
d. mean $= 4$ , standard deviation $= 1.90$ .
e. mean $= 4$ , standard deviation $= 3.60$ .

Short Answer

Expert verified

The correct option is (d)

Step by step solution

01

Given Information

Probability of success $(p) = 0.1$

Number of trials $(n) = 4$

02

Explanation for correct option

The mean and standard deviation can be calculated as:

$渭 = n 脳 p = 40 (0.1) = 4 蟽 = \sqrt{n 脳 p 脳 (1 - p)} = \sqrt{40 (0.1) (1 - 0.1)} = 1.9$

The mean and standard deviation are 4 and $1.9$ respectively.

Hence, the correct option is (d).

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Most popular questions from this chapter

Benford鈥檚 law and fraud

(a) Using the graph from Exercise 21, calculate the standard deviation 蟽_Y. This gives us an idea of how much variation we鈥檇 expect in the employee鈥檚 expense records if he assumed that first digits from 1 to 9 were equally likely.

(b) The standard deviation of the first digits of randomly selected expense amounts that follow Benford鈥檚 law is $蟽_{X} = 2.46$ . Would using standard deviations be a good way to detect fraud? Explain your answer.

Size of American households In government data, a household consists of all occupants of a dwelling unit, while a family consists of two or more persons who live together and are related by blood or marriage. So all families form households, but some households are not families. Here are the distributions of household size and family size in the United States:

Let H = the number of people in a randomly selected U.S. household and F= the number of people in a randomly chosen U.S. family.

(a) Here are histograms comparing the probability distributions of Hand F. Describe any differences that you observe.

(b) Find the expected value of each random variable. Explain why this difference makes sense.

(c) The standard deviations of the two random variables are $蟽_{H} = 1.421$ and $蟽_{F} = 1.249$ .Explain why this difference makes sense.

In debt? Refer to Exercise 100.

a. Justify why D can be approximated by a normal distribution.

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Airlines typically accept more reservations for a flight than the number of seats on the plane. Suppose that for a certain route, an airline accepts $40$ reservations on a plane that carries $38$ passengers. Based on experience, the probability distribution of $Y =$ the number of passengers who actually show up for a randomly selected flight is given in the following table. You can check that $渭_{Y} = 37.4 and 蟽_{Y} = 1.24 .$

There is also a crew of two flight attendants and two pilots on each flight. Let $X =$ the total number of people (passengers plus crew) on a randomly selected flight.

a. Make a graph of the probability distribution of $X$ . Describe its shape.

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$W = \frac{X_{1} + X_{2}}{2} = 0.5 X_{1} + 0.5 X_{2}$

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