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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 9: Q.76 (page 589)

A student group claims that first-year students at a university study 2.5 hours per night during the school week. A skeptic suspects that they study less than that on average. He takes a random sample of 30 first-year students and finds that $\bar{x}$ =137 minutes and $s_{x}$ =45 minutes. A graph of the data shows no outliers but some skewness. Carry out an appropriate significance test at the 5% significance level. What conclusion do you draw?

Short Answer

Expert verified

The students in the university on an average study $2.5$ hours on an average night.

Step by step solution

01

Introduction

The significance level of an occasion (like a statistical test) is the probability that the occasion might have happened by some coincidence. If the level is quite low, that is to say, the probability of occurring by chance is tiny, we say the occasion is significant.

02

Explanation

Calculating the null and alternative hypotheses,

$\begin{aligned} H_{0} : μ = 150 \\ H_{1} : μ < 150 \end{aligned}$

Now, role="math" localid="1652944307124" $\bar{x} = 137 s_{x} = 45 n = 30$

Using

$t = \frac{\bar{x} - μ}{s_{x} / \sqrt{n}} ~ t_{n - 1}$

role="math" localid="1652944541809" $t = \frac{137 - 150}{45 / \sqrt{30}} = - 1.582$

At the significance level $0.05$ the critical value is $- 1.699$

If the critical value is less than the t value the null hypothesis is not rejected.

Hence we can conclude that students in the university an average study $2.5$ hours on an average night.

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Most popular questions from this chapter

In planning a study of the birth weights of babies whose mothers did not see a

doctor before delivery, a researcher states the hypotheses as

$\begin{matrix} H_{0} : μ < 1000 grams \\ H_{a} : μ = 900 grams \end{matrix}$

A random sample of $100$ likely voters in a small city produced $59$ voters in favor of Candidate A. The observed value of the test statistic for testing the null hypothesis $H_{0} : p = 0.5$ versus the alternative hypothesis $H_{a} : p = 0.5$ is

$(a) z = \frac{0.59 - 0.5}{\sqrt{\frac{0.59 (0.41)}{100}}}$

(b). $z = \frac{0.59 - 0.5}{\sqrt{\frac{0.5 (0.5)}{100}}}$

(c). $z = \frac{0.5 - 0.59}{\sqrt{\frac{0.59 (0.41)}{100}}}$

(d). $z = \frac{0.5 - 0.59}{\sqrt{\frac{0.5 (0.5)}{100}}}$

(e). $t = \frac{0.59 - 0.5}{\sqrt{\frac{0.5 (0.5)}{100}}}$

A government report says that the average amount of money spent per U.S. household per week on food is about $\(158$ . A random sample of $50$ households in a small city is selected, and their weekly spending on food is recorded. The Minitab output below shows the results of requesting a confidence interval for the population mean M. An examination of the data reveals no outliers.

(a) Explain why the Normal condition is met in this case.

(b) Can you conclude that the mean weekly spending on food in this city differs from the national figure of $\) 158$ ? Give appropriate evidence to support your answer.

How long does it take for a chunk of information to travel from one server to another and back on the Internet? According to the site internettrafficreport.com, a typical response time is $200$ milliseconds (about one-fifth of a second). Researchers collected data on response times of a random sample of $14$ servers in Europe. A graph of the data reveals no strong skewness or outliers. The figure below displays Minitab output for a one-sample t interval for the population mean. Is there convincing evidence at the $5 %$ significance level that the site’s claim is incorrect? Use the confidence interval to justify your answer.

Growing tomatoes An agricultural field trial compares the yield of two varieties of tomatoes for commercial use. Researchers randomly selected $10$ Variety A and $10$ Variety B tomato plants. Then the researchers divide in half each $10$ small plots of land in different locations. For each plot, a coin toss determines which half of the plot gets a Variety A plant; a Variety B plant goes in the other half. After harvest, they compare the yield in pounds for the plants at each location. The $10$ differences $(V a r i e t y A - V a r i e t y B)$ give $x = 0.34$ and $s_{x} = 0.83$ . A graph of the differences looks roughly symmetric and single-peaked with no outliers. Is there convincing evidence that Variety A has a higher mean yield? Perform a significance test using $α$ $= 0.05$ to answer the question.

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