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The Practice of Statistics for AP Examination

Daren Starnes, Josh Tabor

$Math Studyset Vaia Explanations$ Math

6th Edition · 837 pages

ISBN: 9781319113339

Chapter 12: Q.23 (page 793)

Multiple Choice Select the best answer for Exercises 23-28. Exercises 23-28 refer to the following setting. To see if students with longer feet tend to be taller, a random sample of $25$ students was selected from a large high school. For each student, $x =$ foot length and $y$ $=$ height were recorded. We checked that the conditions for inference about the slope of the population regression line are met. Here is a portion of the computer output from a least-squares regression analysis using these data:
Which of the following is the equation of the least-squares regression line for predicting height from foot length?
a. $\hat{h e i g h t} = 10.2204 + 0.4117$ (foot length) $\hat{h e i g h t} = 10.2204 + 0.4117$ (foot length)
b. $\hat{h e i g h t} = 0.4117 + 3.0867$ (foot length) $\hat{h e i g h t} = 0.4117 + 3.0867$ (foot length)
c. $\hat{h e i g h t} = 91.9766 + 3.0867$ (foot length) $\hat{h e i g h t} = 91.9766 + 3.0867$ (foot length)
d. $\hat{h e i g h t} = 91.9766 + 6.47044$ (foot length) $\hat{h e i g h t} = 91.9766 + 6.47044$ (foot length)
e. $\hat{h e i g h t} = 3.0867 + 6.47044$ (foot length) $\hat{h e i i g h t} = 3.0867 + 6.47044$ (foot length)

Short Answer

Expert verified

The correct option is option (c) $\hat{y} = 91.9766 + 3.0867 x$

Step by step solution

01

Given Information

Given in the question that

we have to determine the correct option.

02

Explanation

The formula is

$\hat{y} = b_{0} + b_{1} x$

where $b_{0}$ is $91.9766$ and $b_{1}$ is $3.0867$ which is given in the coef" of the output of the computer.

therefore

$\hat{y} = 91.9766 + 3.0867 x$

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Most popular questions from this chapter

Stats teachers’ cars A random sample of 21 AP® Statistics teachers was asked to report the age (in years) and mileage of their primary vehicles. Here is a scatterplot of the data:

Here is some computer output from a least-squares regression analysis of these data. Assume that the conditions for regression inference are met.

a. Verify that the $95 %$ confidence interval for the slope of the population regression line is $(9016.4, 14, 244.8)$ .

b. A national automotive group claims that the typical driver puts $15, 000$ miles per year on his or her main vehicle. We want to test whether AP® Statistics teachers are typical drivers. Explain why an appropriate pair of hypotheses for this test is role="math" localid="1654244859513" $H_{0} : β_{1} = 15, 000$ versus $H_{a} : β_{1} \neq 15, 000$ .

c. Compute the standardized test statistic and P -value for the test in part (b). What conclusion would you draw at the $α = 0.05$ significance level?

d. Does the confidence interval in part (a) lead to the same conclusion as the test in part (c)? Explain your answer.

T12.9 Which of the following would provide evidence that a power model of the form $y = a x^{p}$ , where $p \neq 0$ and $p \neq 1$ , describes the relationship between a response variable $y$ and an explanatory variable $x$ ?
a. A scatterplot of $y$ versus $x$ looks approximately linear.
b. A scatterplot of $I n y$ versus $x$ looks approximately linear.
c. A scatterplot of $y$ versus $\ln x$ looks approximately linear.
d. A scatterplot of $I n y$ versus $\ln x$ looks approximately linear.
e. None of these

Recycle and Review Exercises 29-31 refer to the following setting. Does the color in which words are printed affect your ability to read them? Do the words themselves affect your ability to name the color in which they are printed? Mr. Starnes designed a study to investigate these questions using the 16 students in his AP Statistics class as subjects. Each student performed the following two tasks in random order while a partner timed his or her performance: (1) Read $32$ words aloud as quickly as possible, and (2) say the color in which each of $32$ words is printed as quickly as possible. Try both tasks for yourself using the word list given.

Color words (4.2) Let's review the design of the study-

a. Explain why this was an experiment and not an observational study.

b. Did Mr. Stames use a completely randomized design a: randomizéd black design? Why do you think he choose this experimental design?

c. Explain the purpose of the ramdom assignment in the context of the study.

Here are the data from Mr. Stames's experiment. For each subject, the time to perform the Iwo tasks is given to the nearest second.

Beer and BAC Refer to Exercise $5$ . Here is computer output from the least-squares regression analysis of the beer and blood alcohol data.

a. What is the estimate for $β_{0}$ ? Interpret this value.

b. What is the estimate for $β_{1}$ ? Interpret this value.

c. What is the estimate for $σ$ ? Interpret this value.

d. Give the standard error of the slope $S E_{b_{1}}$ . Interpret this value.

Tattoos: What per cent of U.S. adults have one or more tattoos? The Harris Poll conducted an online survey of $2302$ adults and found $29 %$ of respondents had at least 1 tattoo. According to the published report, “Respondents for this survey were selected from among those who have agreed to participate in Harris Interactive surveys.” Explain why it would not be appropriate to use these data to construct a $95 %$ confidence interval for the proportion of all U.S. adults who have tattoos.

See all solutions

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