Statistics for Business and Economics

James T. McClave, P. George Benson, Terry Sincich

Chapter 6

Inferences Based on a Single Sample: Estimation with Confidence Intervals - all with Video Answers

Educators

Chapter Questions

Problem 1

Find $z_{a / 2}$ for each of the following:
a. $\alpha=.10$
b. $\alpha=01$
c. $\boldsymbol{\alpha}=, 05$
d. $a=.20$

Prabhakar Kumar

Prabhakar Kumar

Numerade Educator

Problem 2

What is the confidence level of each of the following confidence intervals for $\mu$ ?
a. $\bar{x} \pm 1.96\left(\frac{\sigma}{\sqrt{n}}\right)$
b. $\bar{x} \pm 1.645\left(\frac{e}{\sqrt{n}}\right)$
c. $\pi \pm 2.575\left(\frac{\sigma}{\sqrt{n}}\right)$
d. $\pi \pm 1.282\left(\frac{\sigma}{\sqrt{n}}\right)$
e. $\bar{x} \pm 99\left(\frac{\sigma}{\sqrt{n}}\right)$

Lucas Finney

Numerade Educator

Problem 3

A random sample of $n$ measurements was selected from EwV a population with unknown mean $\mu$ and known standard deviation $\sigma$. Calculate a $95 \%$ confidence interval for $\mu$ for each of the following situations:
a. $n=75, \bar{x}=28, \sigma^2=12$
b. $n=200, \bar{x}=102, \sigma^2=22$
c. $n=100, \bar{x}=15, \sigma=.3$
d. $n=100, \bar{x}=4.05, \sigma=.83$
e. Is the assumption that the underlying population of measurements is normally distributed necessary to ensure the validity of the confidence intervals in parts a-d? Explain.

Lucas Finney

Numerade Educator

Problem 4

A random sample of 90 observations produced a mean $\bar{x}=25.9$ and a standard deviation $s=2.7$.
a. Find an approximate $95 \%$ confidence interval for the population mean $\mu$.
b. Find an approximate $90 \%$ confidence interval for $\mu$.
c. Find an approximate $99 \%$ confidence interval for $\mu$.

Lucas Finney

Numerade Educator

Problem 5

A random sample of 70 observations from a normally dstributed population possesses a sample mean equal to 26.2 and a sample standard deviation equal to 4.1.
a. Find an approximate $95 \%$ confidence interval for $\mu$.
b. What do you mean when you say that a confidence coefficient is .95?
c. Find an approximate $99 \%$ confidence interval for $\mu$.
d. What happens to the width of a confidence interval as the value of the confidence coefficient is increased while the sample size is held fixed?
e. Would your confidence intervals of parts a and $c$ be valid if the distribution of the original population was not normal? Explain.

Sheryl Ezze

Numerade Educator

Problem 6

Explain what is meant by the statement, "We are $95 \%$ confident that an interval estimate contains $\mu . "$

Lucas Finney

Numerade Educator

Problem 7

Explain the difference between an interval estimator and a point estimator for $\mu$.

Lucas Finney

Numerade Educator

Problem 8

The mean and standard deviation of a random sample of $n$ measurements are equal to 33.9 and 3.3 , respectively.
a. Find a $95 \%$ confidence interval for $\mu$ if $n=100$.
b. Find a $95 \%$ confidence interval for $\mu$ if $n=400$.
c. Find the widths of the confidence intervals found in parts $\mathbf{a}$ and $\mathbf{b}$. What is the effect on the width of a confidence interval of quadrupling the sample size while holding the confidence coefficient fixed?

Lucas Finney

Numerade Educator

Problem 9

Will a large-sample confidence interval be valid if the population from which the sample is taken is not normally distributed? Explain.

Lucas Finney

Numerade Educator

Problem 10

Heart rate variability of police officers. Are police officers susceptible to higher-than-normal heart rates? The heart rate variability (HRV) of police officers was the subject of research published in the American Journal of Human Biology (January 2014). HRV is defined as the variation in time intervals between heartbeats. A measure of HRV was obtained for each in a sample of 355 Buffalo, N.Y. police officers. (The lower the measure of HRV, the more susceptible the officer is to cardiovascular disease.) For the 73 officers diagnosed with hypertension, a $95 \%$ confidence interval for the mean HRV was (4.1, 124.5). For the 282 officers who are not hypertensive, a $95 \%$ confidence interval for the mean HRV was $(148,0,192.6)$.
a. What confidence coefficient was used to generate the confidence intervals?
b. Give a practical interpretation of both $95 \%$ confidence intervals Use the phrase "95\% confident" in your answer.
c. When you say you are "95\% confident," what do you mean?
d. If you want to reduce the width of each confidence interval, should you use a smaller or larger confidence coefficient? Explain.

Lucas Finney

Numerade Educator

Problem 11

Tipping points in daily deal transactions? Online "daily deal" sites (e.g., Groupon) offer customers a voucher to purchase a product at discount prices. However, the number of voucher purchases must exceed a predetermined number before the deal becomes active. This key number is termed the "tipping point" in marketing. Characteristics of the tipping point were investigated in the Journal of Interactive Markeding (February 2016). A sample of 2,617 vouchers purchased from daily-deal sites in Korea had a mean tipping point of 112 sales with a standard deviation of 560 sales. The researchers want to estimate the true mean tipping point of all daily deal offerings in Korea with 95\% confidence. Find and practically interpret this interval estimate

Lucas Finney

Numerade Educator

Problem 12

Corporate sustainability of CPA firms. Corporate sustainability refers to business practices designed around social and environmental considerations. Refer to the Business and Society (March 2011) study on the sustainability behaviors of CPA corporations, Exercise 2.23 (p. 83). Recall that the level of support for corporate sustainability (measured on a quantitative scale ranging from 0 to 160 points) was obtained for each in a sample of 992 senior managers at CPA firms. Higher point values indicate a higher level of support for sustainability. The accompanying Minitab printout gives a $90 \%$ confidence interval for the mean level of support for all senior manag. ers at CPA firms
$$
\begin{aligned}
&\text { One-Sample T: Support }\\
&\begin{array}{|c|c|c|c|c|c|c|}
\hline \text { Varabin } & & \begin{array}{r}
\text { Hean } \\
\text { tht }
\end{array} & \text { subev } & \text { 25 Neas } & \begin{array}{r}
900 \\
\cos -390
\end{array} & \text { et } \\
\hline 9-\mathrm{pF} \text { ort } & & 67,759 & 26.472 & & (65-390, & (5,269) \\
\hline
\end{array}
\end{aligned}
$$
a. Locate the $90 \%$ confidence interval on the printout.
b. Use the sample mean and standard deviation on the printout to calculate the $90 \%$ confidence interval. Does your result agree with the interval shown on the printout?
c. Give a practical interpretation of the $90 \%$ confidence interval.
d. Suppose the CEO of a CPA firm claims that the true mean level of support for sustainability is 75 points. Do you believe this claim? Explain.

Lucas Finney

Numerade Educator

Problem 13

College dropout study. Refer to the American Economic Review (December 2008) study of college dropouts. Exercise 2.79 (p. 111). Recall that one factor thought to influence the college dropout decision was expected GPA for a student who studied 3 hours per day. In a representative sample of 307 college students who studied 3 hours per day, the mean GPA was $\bar{x}=3.11$ and the standard deviation was $s=66$. Of interest is $\mu$, the true mean GPA of all college students who study 3 hours per day.
a. Give a point estimate for $\mu$.
b. Give an interval estimate for $\mu$. Use a confidence coefficient of 98 .
c. Comment on the validity of the following statement: "98\% of the time, the true mean GPA will fall in the interval computed in part b."
d. It is unlikely that the GPA values for college students who study 3 hours per day are normally distributed. In fact, it is likely that the GPA distribution is highly skewed. If so, what impact, if any, does this have on the validity of inferences derived from the confidence interval?

Rashmi Sinha

Numerade Educator

Problem 14

Wear-out of used display panels. Refer to Exercise 4.126 $(p, 270)$ and the study of the wear-out failure time of used colored display panels purchased by an outlet store. Recall that prior to acquisition, the panels had been used for about one-third of their expected lifetimes. The failure times (in years) for a sample of 50 used panels are reproduced in the table. An SPSS printout of the analysis is shown below.
a. Locate a $95 \%$ confidence interval for the true mean failure time of used colored display panels on the printout.
b. Give a practical interpretation of the interval, part a.
c. In repeated sampling of the population of used colored display panels, where a $95 \%$ confidence interval for the mean failure time is computed for each sample, what proportion of all the confidence intervals generated will capture the true mean failure time?
$$
\begin{array}{lllllllllll}
\hline 0.01 & 1.21 & 1.71 & 2.30 & 2.96 & 0.19 & 1.22 & 1.75 & 2.30 & 2.98 & 0.51 \\
1.24 & 1.77 & 2.41 & 3.19 & 0.57 & 1.48 & 1.79 & 2.44 & 3.25 & 0.70 & 1.54 \\
1.88 & 2.57 & 3.31 & 0.73 & 1.59 & 1.90 & 2.61 & 1.19 & 0.75 & 1.61 & 1.93 \\
2.62 & 3.50 & 0.75 & 1.61 & 2.01 & 2.72 & 3.50 & 1.11 & 1.62 & 2.16 & 2.76 \\
3.50 & 1.16 & 1.62 & 2.18 & 2.84 & 3.50 & & & & & \\
\hline
\end{array}
$$

Sheryl Ezze

Numerade Educator

Problem 15

Unethical corporate conduct. How complicit are entrylevel accountants in carrying out an unethical request from their superiors? This was the question of interest in a study published in the journal Behavioral Research in Accounting (July 2015). A sample of 86 accounting graduate students participated in the study. After asking the subjects to perform what is clearly an unethical task (e.g. to bribe a customer), the researchers measured each subject's intention to comply with the unethical request soore. Scores ranged from -1.5 (intention to resist the uncthical request) to 2.5 (intention to comply with the unethical request). Summary statisties on the 86 scores follow: $T=2.42, s=2.84$.
a. Fstimate $\mu$, the mean intention to comply score for the population of all entry-level accountants, using a $90 \%$ confidence interval.
b. Give a practical interpretation of the interval, part a.
c. Refer to part a. What proportion of all similarly constructed confidence intervals (in repeated sampling) will contain the true value of $\mu$ ?
d. Compute the interval, $\boldsymbol{x} \pm 2 s$. How does the interpretation of this interval differ from that of the confidence interval, part a?

Sheryl Ezze

Numerade Educator

Problem 16

Shepping ea Black Friday. The day after Thanksgivingcalled Black Friday - is one of the largest shopping days in the United States. Winthrop University researchers conducted interviews with a sample of 38 women shopping on Black. Friday to gauge their shopping habits and reported the results in the International Journal of Retail and Disiribution Management (Vol. 39, 2011). One question was, -How many hours do you usually spend shopping on Black Friday?" Data for the 38 shoppers are listed in the accompanying table.
a. Describe the population of interest to the researchers.
b. What is the quantitative variable of interest to the researchers?
c. Use the information in the table to estimate the population mean number of hours spent shopping on Black Friday with a $95 \%$ confidence interval.
d. Give a practical interpretation of the interval.
e. A retail store advertises that the true mean number of hours spent shopping on Black Friday is 5.5 hours. Can the store be sued for false advertising? Explain.
$$
\begin{array}{rrrrrrrrrrrrrr}
\hline 6 & 6 & 4 & 4 & 3 & 16 & 4 & 4 & 5 & 6 & 6 & 5 & 5 & 4 \\
6 & 5 & 6 & 4 & 5 & 4 & 4 & 4 & 7 & 12 & 5 & 8 & 6 & 10 \\
5 & 8 & 8 & 3 & 3 & 8 & 5 & 6 & 10 & 11 & & & & \\
\hline
\end{array}
$$

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 17

Executive Compensation Scoreboard. Refer to the Glassdoor Economic Research (August 25, 2015) report on salaries of executives and workers at S\&P 500 firms. Recall that the data file contains the salaries (in $$\$$ millions) of the 441 CEOs who participated in the survey. Suppose you are interested in estimating the mean salary for these 441 CEOs
a. What is the target parameter?
b. Obtain a random sample of 50 salaries from the data set. c. Find the mean of the 50 salaries, part b.
d. Verify that the standard deviation for the population of 411 salaries is $$\sigma=\$ 11.36$$ million.
e. Use the information, parts $$c$$ and $$d$$, to form a $$99 \%$$ confidence interval for the true mean salary of the 411 CEOs in the survey.
f. Give a practical interpretation of the interval, part e.
2. Find the true mean salary of the 411 CEOs and check to see if this value falls within the $$99 \%$$ confidence interval, part e.

Jason Gerber

Numerade Educator

Problem 18

401(k) Participation rates. Named for the section of the Internal Revenue Code that authorized them, 401(k) plans permit employees to shift part of their before-tax salaries into investments such as mutual funds. One company, concerned with what it believed was a low employee participation rate in its $401(k)$ plan, sampled 30 other companies with similar plans and asked for their $401(\mathbf{k})$ participation rates. The following rates (in percentages) were obtained.
$$
\begin{array}{llllllllllll}
\hline 80 & 76 & 81 & 77 & 82 & 80 & 85 & 60 & 80 & 79 & 82 & 70 \\
88 & 85 & 80 & 79 & 83 & 75 & 87 & 78 & 80 & 84 & 72 & 75 \\
90 & 84 & 82 & 77 & 75 & 86 & & & & & & \\
\hline
\end{array}
$$

Lynn Larson

Numerade Educator

Problem 19

Accounting and Machiavellianism. Refer to the Behavioral Research in Accounting (January 2008) study of Machiavellian traits in accountants, Exercise 1.33 (p. 52). Recall that Machiavellian describes negative character traits that include manipulation, cunning, duplicity, deception, and bad faith. A Machiavellian ("Mach") rating score was determined for each in a simple of accounting alumni of a large southwestern university. Scores range from a low of 40 to a high of 160 , with the theoretical neutral Mach rating score of 100 . The 122 purchasing managers in the sample had a mean Mach rating score of 99.6, with a standard deviation of 12.6 .
a. From the sample, estimate the true mean Mach rating score of all purchasing managers.
b. Form a $95 \%$ confidence interval for the estimate, part b.
c. Give a practical interpretation of the interval, part $\mathbf{c}$.
d. A director of purchasing at a major firm claims that the true mean Mach rating score of all purchasing managers is 85. Is there evidence to dispute this claim?

Check back soon!

Problem 20

Facial structure of CEOs. In Psychological Science (Vol. 22, 2011), researchers reported that a chief executive offcer's facial structure can be used to predict a firm's financial performance. The study involved measuring the facial widthto-height ratio (WHR) for each in a sample of $55 \mathrm{CEO}$ at publicly traded Fortune 500 firms. These WHR values (determined by a computer analyzing a photo of the CEO's face) had a mean of $\bar{x}=1.96$ and a standard deviation of $s=.15$. a. Find and interpret a $95 \%$ confidence interval for $\mu$, the mean facial WHR for all CEOs at publicly traded Foriune 500 firms.
b. The researchers found that CEOs with wider faces (relative to height) tended to be associated with firms that had greater financial performance. They based their inference on an equation that uses facial WHR to predict financial performance. Suppose an analyst wants to predict the financial performance of a Forrune 500 firm based on the value of the true mean facial WHR of CEOs The analyst wants to use the value of $\mu=2.2$. Do you recommend he use this value?

Sheryl Ezze

Numerade Educator

Problem 21

Improving SAT scores, Refer to the Chance (Winter 2001) and National Education Longitudinal Survey (NELS) study of 265 students who paid a private tutor to help them improve their SAT scores, Exercise 2.88 (p. 113). The changes in both the SAT-Mathematics and SAT-Verbal scores for these students are reproduced in the table. Suppose the true population mean change in score on one of the SAT tests for all students who paid a private tutor is 15 . Which of the two tests, SAT-Mathematics or SAT-Verbal, is most likely to have this mean change? Explain.
$$
\begin{array}{|c|c|c|}
\hline & \text { SAT-Math } & \text { SAT-Verbal } \\
\hline \text { Mean change in score } & 19 & 7 \\
\hline \begin{array}{l}
\text { Standard deviation of } \\
\text { seore changes }
\end{array} & 65 & 49 \\
\hline
\end{array}
$$

Sheryl Ezze

Numerade Educator

Problem 22

The "Raid" test kitchen. According to scientists, the cockroach has had 300 million years to develop a resistance to destruction. In a study conducted by researchers for $\mathrm{S}$. C. Johnson \& Son. Inc. (manufacturers of Raid and Off!). 5,000 roaches (the expected number in a roach-infested house) were released in the Raid test kitchen. One week later, the kitchen was fumigated, and 16,298 dead roaches were counted, a gain of 11,298 roaches for the 1-week period. Assume that none of the original roaches died during the 1 -week period and that the standard deviation of $x$, the number of roaches produced per roach in a 1 -week period. is 1.5 . Use the number of roaches produced by the sample of 5,000 roaches to find a $95 \%$ confidence interval for the mean number of roaches produced per week for each roach in a typical roach-infested house.

Nick Johnson

Numerade Educator

Problem 23

Suppose you have selected a random sample of $n=5$ measurements from a normal distribution. Compare the standard normal $z$-values with the corresponding $t$-values if you were forming the following confidence intervals
a. $80 \%$ confidence interval
b. $90 \%$ confidence interval
c. $95 \%$ confidence interval
d. $98 \%$ confidence interval
e. $99 \%$ confidence interval
f. Use the table values you obtained in parts a-e to sketch the $z$ - and $I$-distributions. What are the similarities and differences?

Lucas Finney

Numerade Educator

Problem 24

Explain the differences in the sampling distributions EW of $\bar{x}$ for large and small samples under the following assumptions.
a. The variable of interest, $x$, is normally distributed.
b. Nothing is known about the distribution of the variable $x$.

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 25

Let $t_0$ be a particular value of $t$. Use Table III in Appendix $\mathrm{D}$ to find $l_{\mathrm{e}}$ values such that the following statements are true.
a. $P\left(-t_0<t<t_0\right)=.95$ where df $=10$
b. $P\left(t \leq-t_0\right.$ or $\left.t \geq t_0\right)$ where df $=10$
c. $P\left(t \leq t_0\right)=.05$ where df $=10$
d. $P\left(t \leq-t_0\right.$ or $\left.t \geq t_0\right)=.10$ where df $=20$
e. $P\left(t \leq-t_0\right.$ or $\left.t \geq t_0\right)=.01$ where df $=5$

Sheryl Ezze

Numerade Educator

Problem 26

Let $t_0$ be a specific value of $t_{\text {. Use Table III in Appendix }}$ $\mathrm{D}$ to find $t_0$ values such that the following statements are true.
a. $P\left(t \geq t_0\right)=.025$ where df $=11$
b. $P\left(t \geq t_0\right)=.01$ where df $=9$
c. $P\left(t \leq I_0\right)=.005$ where df $=6$
d. $P\left(t \leq f_0\right)=.05$ where df $=18$

Lucas Finney

Numerade Educator

Problem 27

The following random sample was selected from a normal distribution: $4,6,3,5,9,3$.
a. Construct a $90 \%$ confidence interval for the population mean $\mu$.
b. Construct a $95 \%$ confidence interval for the population mean $\mu$.
c. Construct a $99 \%$ confidence interval for the population mean $\mu$.
d. Assume that the sample mean $F$ and sample standard deviation $s$ remain exactly the same as those you just calculated but are based on a sample of $n=25$ observations rather than $n=6$ observations. Repeat parts a-c. What is the effect of increasing the sample size on the width of the confidence intervals?

Sheryl Ezze

Numerade Educator

Problem 28

The following sample of 16 measurements was selected from a population that is approximately normally distributed:
$$
\begin{array}{rrrrrrrrrrrr}
\hline 91 & 80 & 99 & 110 & 95 & 106 & 78 & 121 & 106 & 100 & 97 & 82 \\
100 & 83 & 115 & 104 & & & & & & & & \\
\hline
\end{array}
$$
a. Construct an $80 \%$ confidence interval for the population mean.
b. Construct a $95 \%$ confidence interval for the population mean and compare the width of this interval with that of part a.
c. Carefully interpret each of the confidence intervals and explain why the $80 \%$ confidence interval is narrower.

Lucas Finney

Numerade Educator

Problem 29

Lobster trap placement. An observational study of teams fishing for the red spiny lobster in Baja California Sur, Mexico, was conducted and the results published in Bulletin of Marine Science (April 2010). One of the variables of interest was the average distance separating traps-called trap spocing-deployed by the same team of fishermen. Trap-spacing measurements (in meters) for a sample of seven teams of red spiny lobster fishermen are shown in the accompanying table. Of interest is the mean trap spacing for the population of red spiny lobster fishermen fishing in Baja California Sur, Mexico.
$$
\begin{array}{lllllll}
\hline 93 & 99 & 105 & 94 & 82 & 70 & 86 \\
\hline
\end{array}
$$
a. Identify the target parameter for this study.
b. Compute a point estimate of the target parameter.
c. What is the problem with using the normal (z) statistic to find a confidence interval for the target parameter?
d. Find a $95 \%$ confidence interval for the target parameter.
e. Give a practical interpretation of the interval, part d.
f. What conditions must be satisfied for the interval, part d, to be valid?

Lucas Finney

Numerade Educator

Problem 30

Radon exposure in Egyptian tombs. Many ancient Egyptian tombs were cut from limestone rock that coatained uranium. Since most tomhs are not well ventilated, guards, four guides, and visitors may be exposed to deadly radon gas In Radiation Protection Dosimetry (December 2010). a study of radon exposure in tombs in the Valley of Kings, Luxor. Egypt (recently opened for public tours), was conducted. The radon levels - measured in becquerels per cubic meter $\left(\mathrm{Bq} / \mathrm{m}^3\right)$ - in the inner chambers of a sample of 12 tombs were determined. Summary statistics folkow: $\mathrm{T}=3,643 \mathrm{~Bq} / \mathrm{m}^3$ and $s=4,487 \mathrm{~Bq} / \mathrm{m}^3$. Use this information to estimate, with $95 \%$ confidence, the true mean level of radon exposure in tombs in the Valley of Kings. Interpret the resulting interval.

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 31

Do social robots walk or roll? Refer to the Iniernational Conference on Social Roborics (VoL. 6414, 2010) study on the current trend in the design of social robots, Exercise 2.78 (p. 111). Recall that in a random sample of social robots obtained through a Web search, 28 were built with wheels. The accompanying table shows the number of wheels on each of the 28 robots.
a. Estimate $\mu$, the average number of wheels used on all social robots built with wheels, with $99 \%$ confidence.
b. Practically interpret the interval, part a.
c. Refer to part a. In repeated sampling, what proportion of all similarly constructed confidence intervals will contain the true mean, $\mu$ ?
$$
\begin{array}{llllllllllllll}
\hline 4 & 4 & 3 & 3 & 3 & 6 & 4 & 2 & 2 & 2 & 1 & 3 & 3 & 3 \\
3 & 4 & 4 & 3 & 2 & 8 & 2 & 2 & 3 & 4 & 3 & 3 & 4 & 2 \\
\hline
\end{array}
$$

Sheryl Ezze

Numerade Educator

Problem 32

Hospital length of stay. Health insurers and the federal goverament are both putting pressure on hospitals to shorten the average length of stay (LOS) of their patients. The average LOS in the United States is 4.5 days (Healtheare Cost and Utilization Project Statistical Brief. October 2014). A random sample of 20 hospitals in onc state had a mean LOS of 3.8 days and a standard deviation of 1.2 days.
a. Use a $90 \%$ confidence interval to estimate the population mean LOS for the state's hospitals.
b. Interpret the interval in terms of this application.
c. What is meant by the phrase "90\% confidence interval"?

Sheryl Ezze

Numerade Educator

Problem 33

Repair and replacement costs of water pipes. Refer to the IHS Joumal of Hydraulic Engineering (September 2012) study of commercial pipes used in a water distribution network, Exercise 2.124 (p. 131). Of interest was the ratio of repair to replacement cost of the pipe. The ratios for a sample of 13 different pipe sizes are listed in the next table. Assume these data represent a random sample selected
$$
6.586 .977 .397 .617 .787 .928 .208 .428 .608 .979 .319 .479 .72
$$
from all possible types of commercial pipe. A Minitab analysis of the data follows.

Lucas Finney

Numerade Educator

Problem 34

Evaporation from swimming pools. A new formula for estimating the water evaporation from occupied swimming pools was proposed and analyzed in the journal Heating Piping/Air Conditioning Engineering (April 2013). The key components of the new formula are number of pool occupants, area of pool's water surface, and the density difference between room air temperature and the air at the pool's surface. Data were collected from a wide range of pools for which the evaporation level was known. The new formula was applied to each pool in the sample, yielding an estimated evaporation level. The absolute value of the deviation between the actual and estimated evaporation level was then recorded as a percentage. The researchers reported the following summary statistics for absolute deviation percentage: $\bar{x}=18, s=20$. Assume that the sample contained $n=15$ swimming pools
a. Estimate the true mean absolute deviation percentage for the new formula with a $90 \%$ contidence interval.
b. The American Society of Heating. Refrigerating, and Air-Conditioning Engineers (ASHRAE) handbook also provides a formula for estimating pool evaporation. Suppose the ASHRAE mean absolute deviation percentage is $\mu=34 \%$. (This value was reported in the article.) On average, is the new formula "better" than the ASHRAE formula? Explain.

Sheryl Ezze

Numerade Educator

Problem 35

Oxygen bubbles in molten salt. Molten salt is used in an electro-refiner to treat nuclear fuel waste. Eventually. the salt needs to be purified (for reuse) or disposed of: A promising method of purification involves oxidation. Such a method was investigated in Chemical Engineering Restarch and Design (March. 2013). An important aspect of the purification process is the rising velocity of oxygen bubbles in the molten salt. An experiment was conducted in which oxygen was inserted (at a designated sparging rate) into molten salt and photographic images of the bubbles were taken. A random sample of 25 images yielded the data on bubble velocity (measared in meters per second) shown in the table. (Note: These data are simulated based on information provided in the article.)
$$
\begin{array}{lllllllll}
\hline 0.275 & 0.261 & 0.209 & 0.266 & 0.265 & 0.312 & 0.285 & 0.317 & 0.229 \\
0.251 & 0.256 & 0.339 & 0.213 & 0.178 & 0.217 & 0.307 & 0.264 & 0.319 \\
0.298 & 0.169 & 0.342 & 0.270 & 0.262 & 0.228 & 0.220 & & \\
\hline
\end{array}
$$
a. Use statistical software to find a $95 \%$ confidence interval for the mean bubble rising velocity of the population. Interpret the result.
b. The researchers discovered that the mean bubble rising velocity is $\mu=338$ when the sparging rate of oxygen is $3.33 \times 10^{-6}$. Do you believe that the data in the table were generated at this sparging rate? Explain.

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 36

Performance of stock screeners. In Exercise 2.44 (p. 95) you learned that stock screeners are automated tools used by investment companies to help clients select a portfolio of stocks to invest in. The table below lists the annualized percentage return on investmeat (as compared to the Standard \& Poor's 500 Index) for 13 randomly selected stock screeners provided by the American Association of Individual Investors (AAII).
$$
\begin{array}{|c|c|c|c|c|c|c|c|c|}
\hline 9.0 & -.1 & 1-1.6 \quad 14.6 \quad 16.0 & 7.7 & 19.9 & 9.8 & 3.2 & 24.817 .6 \quad 10.7 & 9.1 \\
\hline
\end{array}
$$
a. Find a $90 \%$ confidence interval for the average annualbed percentage return on investment of all stock screen. ers provided by AAII. Interpret the result.
b. Recall that a negative annualized return reflects a stock portfolio that performed worse than the S\&P 500. On average, do the AAII stock screeners perform worse or better than the S\&P 500? Explain.
c. What assumption about the distribution of the annualized percentage returns on investment is required for the inference, part b, to be valid? Is this assumption reasonably satisfied?

Nick Johnson

Numerade Educator

Problem 37

Minimizing tracter skidding distance. When planning for a new forest road to be used for tree harvesting, planners must select the location to minimize tractor skidding distance. In the Journal of Forest Engineering (July 1999), researchers wanted to estimate the true mean skidding distance along a new road in a European forest. The skidding distances (in meters) were measured at $20 \mathrm{ran}$ domly selected road sites. These values are given in the accompanying table.
a. Fstimate the true mean skidding distance for the road with a $95 \%$ confidence interval.
b. Give a practical interpretation of the interval, part a. c. What conditions are required for the inference, part b, to be valid? Are these conditions reasonably satisfied? d. A logger working on the road claims the mean skidding distance is at least 425 meters. Do you agree?
$$
\begin{array}{llllllllll}
\hline 488 & 350 & 457 & 199 & 285 & 409 & 435 & 574 & 439 & 546 \\
385 & 295 & 184 & 261 & 273 & 400 & 311 & 312 & 141 & 425 \\
\hline
\end{array}
$$

Sheryl Ezze

Numerade Educator

Problem 38

Crude oil biodegradation. Refer to the Journal of Petrolelun Geology (April 2010) study of the environmental factors associated with biodegradation in crude oil reservoirs, Exercise 229 (p. 85). One indicator of biodegradation is the level of dioxide in the water. Recall that 16 water specimens were randomly selected from various locations in a reservoir on the floor of a mine and the amount of dioxide (milligrams/liter) as well as presence of oil was determined for each specimen. These data are reproduced in the next table.
a. Estimate the true mean amount of dioxide present in water specimens that contain oil using a $95 \%$ confidence interval. Give a practical interpretation of the interval.
b. Repeat part a for water specimens that do not contain oil.
c. Based on the results, parts a and $\mathbf{b}$, make an inference about biodegradation at the mine reservoir.
$$
\begin{array}{cc}
\hline \text { Dioxide Amount } & \text { Crude Oil Present } \\
\hline 3.3 & \text { No } \\
0.5 & \text { Yes } \\
1.3 & \text { Yes } \\
0.4 & \text { Yes } \\
0.1 & \text { No } \\
4.0 & \text { No } \\
0.3 & \text { No } \\
0.2 & \text { Yes } \\
2.4 & \text { No } \\
2.4 & \text { No } \\
1.4 & \text { No } \\
0.5 & \text { Yes } \\
0.2 & \text { Yes } \\
4.0 & \text { No } \\
4.0 & \text { No } \\
4.0 & \text { No } \\
\hline
\end{array}
$$

Victor Salazar

Numerade Educator

Problem 39

Largest private companies. IPOs-initial public offerings of stock - create billions of dollars of new wealth for owners. managers, and employees of companies that were previously privately owned. Nevertheless, hundreds of large and thousands of smatl companies remain privately owned. The revenues of a random sample of 15 firms from Forbes 216 Largest Private Companies list are given in the table below,
$$
\begin{array}{lc}
\hline \text { Company } & \text { Revenue (in billions) } \\
\hline \text { Toys, R, Us } & \$ 12.4 \\
\text { Pilot Flying J } & 31.0 \\
\text { Tenaska Energy } & 12.2 \\
\text { Wawa } & 9.7 \\
\text { Gulf States Toyota } & 8.0 \\
\text { Brookshire Grocery } & 2.5 \\
\text { Sinclair Oil } & 7.0 \\
\text { Bose } & 3.4 \\
\text { Mary Kay } & 4.0 \\
\text { Drummond } & 2.4 \\
\text { Petco } & 4.0 \\
\text { SAS } & 3.1 \\
\text { Forever 21 } & 4.4 \\
\text { Rock Ventures } & 5.1 \\
\text { Conair } & 2.3 \\
\hline
\end{array}
$$
a. Describe the population from which the random sample was drawn.
b. Use a $98 \%$ confidence interval to estimate the mean revenue of the population of companies in question.
c. Interpret your confidence interval in the context of the problem.
d. What characteristic must the population possess to ensure the appropriateness of the estimation procedure used in part b?
e. Suppose Forbes reports that the true mean revenue of the 216 companies on the list is $\$ 5.0$ billion. Is the claim belicvable?

Evelyn Cunningham

Evelyn Cunningham

Numerade Educator

Problem 40

Describe the sampling distribution of $\hat{p}$ based on large samples of size $n$-that is, give the mean, the standard deviation, and the (approximate) shape of the distribution of $\hat{p}$ when large samples of size $n$ are (repeatedly) selected from the binomial distribution with probability of success $p$.

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 41

For the binomial sample information summarized in cach part, indicate whether the sample size is large enough to use the methods of this chapter to construct a confidence interval for $p$.
a. $n=400, \hat{p}=.10$
b. $n=50, \hat{p}=.10$
c. $n=20, \hat{p}=.5$
d. $n=20, \hat{p}=3$

Lucas Finney

Numerade Educator

Problem 42

A random sample of size $n=121$ yiclded $\hat{p}=.88$.
a. Is the sample size large enough to use the methods of this section to construct a confidence interval for $p$ ? Explain.
b. Construct a $90 \%$ confidence interval for $p$.
c. What assumption is necessary to ensure the validity of this confidence interval?

Lucas Finney

Numerade Educator

Problem 43

A random sample of size $n=225$ yielded $\hat{p}=.46$.
a. Is the sample size large enough to use the methods of this section to construct a confidence interval for $p$ ? Explain.
b. Construct a $95 \%$ confidence interval for $p$.
c. Interpret the $95 \%$ confidence interval.
d. Explain what is meant by the phrase $495 \%$ confidence interval-"

James Kiss

Numerade Educator

Problem 44

A random sample of 50 consumers taste-tested a new snack food. Their responses were coded (0. do not like; 1 : like; 2 indifferent) and recorded as follows:
$$
\begin{array}{llllllllll}
\hline 1 & 0 & 0 & 1 & 2 & 0 & 1 & 1 & 0 & 0 \\
0 & 1 & 0 & 2 & 0 & 2 & 2 & 0 & 0 & 1 \\
1 & 0 & 0 & 0 & 0 & 1 & 0 & 2 & 0 & 0 \\
0 & 1 & 0 & 0 & 1 & 0 & 0 & 1 & 0 & 1 \\
0 & 2 & 0 & 0 & 1 & 1 & 0 & 0 & 0 & 1 \\
\hline
\end{array}
$$
a. Use an $80 \%$ confidence interval to estimate the proportion of consumers who like the saack food.
b. Provide a statistical interpretation for the confidence interval you constructed in part a.

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 45

Customer participation in store loyalty card pregrams. [Wivi Customers who participate in a store's free loyalty card program save money on their purchases but allow the store to keep track of their shopping habits and potentially sell these data to third parties. A Pew Internet \& American Life Project Survey (January 2016) revealed that half (225) of a random sample of 250 U.S. adults would agree to participate in a store loyalty card program, despite the potential for information sharing.
a. Estimate the true proportion of all US adults who would agree to participate in a store loyalty card program, despite the potential for information sharing.
b. Form a $90 \%$ confidence interval around the estimate, part a.
c. Provide a practical interpretation of the confidence interval, part b. Your answer should begin with, "We are $90 \%$ confident..."
d. Explain the theoretical meaning of the phrase, "We are $90 \%$ confident."

James Kiss

Numerade Educator

Problem 46

Crash risk of asing cell phenes while driving. Studies have shown that drivers who use cell phones while operating a motor passenger vehicle increase their risk of an accident. To quantify this risk, the New England Journal of Medicine (January 2, 2014) reported on the risk of a crash (or near crash) for both novice and expert drivers when using a cell phone. In a sample of 371 cases of novices using a cell phone while driving, 24 resulted in a crash (or near crash). In a sample of 1,467 cases of experts using a cell phone while driving, 67 resulted in a crash (or near crash).
a. Give a point estimate of $p$, the true crash risk (probability) for novice drivers who use a cell phone while driving.
b. Find a $95 \%$ confidence interval for $p$.
c. Give a practical interpretation of the interval, part b. d. Repeat parts $a-c$ for expert drivers.

Sheryl Ezze

Numerade Educator

Problem 47

Zillow,com estimates of home values. Zillow.com is a real estate Web site that provides free estimates of the market value of homes Refer to The Appraisal Joumal (Winter 2010) study of the accuracy of Zillow's estimates, Exercise 1.25 (p. 51). Data were collected for a sample of 2.045 single-family residential properties in Arlington, Texas. The researchers determined that Zillow overestimated by more than $10 \%$ the market value of 818 of the 2,045 homes. Suppose you want to estimate $P$, the true proportion of Arlington, Texas, homes with market values that are overestimated by more than $10 \%$ by Zillow.
a. Find $\hat{p}$, the point estimate of $p$.
b. Describe the sampling distribution of $\hat{p}$.
c. Find a $95 \%$ confidence interval for $p$.
d. Give a practical interpretation of the confidence interval, part c.
e. Suppose a Zillow representative claims that $p=3$. Is the claim believable? Explain.

Nick Johnson

Numerade Educator

Problem 48

Do social robets walk or roll? Refer to the International Conference on Social Robotics (Vol. 6414, 2010) study of the trend in the design of social robots, Exercise 5.44 (p. 320). The rescarchers obtained a random sample of 106 social robots through a Web search and determined that 63 were designed with legs, but no wheels
a. Find a $99 \%$ confidence interval for the proportion of all social robots designed with legs, but no wheels. Interpret the result.
b. In Exercise 5.42, you assumed that $40 \%$ of all social robots are designed with legs, but no wheek Comment on the validity of this assumption.

Christopher Stanley

Christopher Stanley

Numerade Educator

Problem 49

Is Starbucks coffee overpriced? The Minneapolis Star Tribune (August 12,2008) reported that 73\% of Americans say that Starbucks coffee is overpriced. The source of this information was a national telephone survey of 1,000 American adults conducted by Rasmussen Reports. a. Identify the population of interest in this study.
b. Identify the sample for the study.
c. Identify the parameter of interest in the study.
d. Find and interpret a $95 \%$ confidence interval for the parameter of interest.

Lucas Finney

Numerade Educator

Problem 50

Nannies who are INA certified. The International Nanny
WW Association (INA) reports that in a sample of 928 inhome child care providers (annies), 128 have passed the INA Nanny Credential Exam (2014 International Nanuy Association Salary and Benefits Survey). Use Wilson's adjustment to find a $95 \%$ confidence interval for the true proportion of all nannies who have passed the INA certification exam.

Sheryl Ezze

Numerade Educator

Problem 51

Cybersecurity survey. Refer to the Shate of Cybersecurity (2015) survey of firms from around the world, Exercise 1.20 (p. 50). Recall that of the 766 firms that responded to the survey, 628 (or $82 \%)$ expect to experience a cyberattack (c.g., a Malware, hacking, or phishing attack) during the year. Estimate the probability of an expected cyberattack at a firm during the year with a $90 \%$ confidence interval. Explain how $90 \%$ is used as a measure of reliability for the interval.

Rashmi Sinha

Numerade Educator

Problem 52

Who prepares your tax return? Refer to the Behavioral Rescarch and Accounting (January 2015) study on income tax compliance, Exercise 5.50 (p, 321), Recall that in a sample of 270 U.S adult workers the researchers found that $37 \%$ prepare their own tax returm.
a. Construct a $$99 \%$$ confidence interval for the true proportion of all U.S. adult workers who prepare their own tax return.
b. Suppose an IRS tax consultant claims that $$50 \%$$ of all U.S, adult workers prepare their own tax return. Make an infereace about this claim.
c. According to the researchers, about $$70 \%$$ of the sampled workers were recruited from a shopping mall (where they were reimbursed $$\$ 5$$ for their time) and about $$30 \%$$ were full-time workers enrolled in a professional graduate degree program. How might this information impact the inference you made in part b?

Rashmi Sinha

Numerade Educator

Problem 53

Minarity ownership of franchises According to a 2011 report for IFA Educational Foundation, $20.5 \%$ of all franchised businesses in the United States are minority owned. (This information is based on the US Census Bureau' survey of 27 million business owners.) Suppose that you obtain a sample of 100 franchised businesses located in Mississippi and find that 15 are owned by minorities. Does this result lead you to conclude that the percentage of minority-owned franchises in Mississippi is less than the national value of $20.5 \%$ ? Explain.

Robin Corrigan

Numerade Educator

Problem 54

Stady of aircraft bird-strikes. As worldwide air traffic volume has grown over the years, the problem of airplanes striking birds and other flying wildlife has increased dramatically. The Intemetional Journal for Traffic and Transport Engineering (Vol. 3.2013) reported on a study of aircraft bird strikes at Aminu Kano International Airport in Nigeria. During the survey period, a sample of 44 aircraft bird strikes were analyzed. The researchers found that 36 of the 44 bird strikes at the airport occurred above 100 feet. Suppose an airport air traffic controller estimates that less than $70 \%$ of aircraft bird strikes oceur above 100 feet. Comment on the accuracy of this estimate. Use a $95 \%$ confidence interval to support your inference.

Sheryl Ezze

Numerade Educator

Problem 55

Splinting in mountain climbing accidents The most common injury that occurs among mountain climbers is trauma to the lower extremity (leg). Consequently, rescuers must be proficient in immobilizing and splinting fractures. In High Altitude Medicine \& Biology (Vol. 10, 2009), tesearchers examined the likelihoxd of mountain climbers needing certain types of splints. A Scottish Mountain Rescue study reported that there was 1 femoral shaft splint needed among 333 live casualties. The researchers will use this study to estimate the proportion of all mountain casualties that require a femoral shaft splint.
a. Is the sample large enough to apply the large-sample estimation method of this section? Show why or why not.
b. Use Wilson's adjustment to find a $95 \%$ confidence interval for the true proportion of all mountain casualties that require a femoral shaft splint. Interpret the result.

Sheryl Ezze

Numerade Educator

Problem 56

Diamonds sold on the open market. Refer to the sample of 308 diamond stones that were listed for sale on the open market in Singapore's Business Times. Recall that the color of each diamond is classified as D, E, F, G, H, or I, while the clarity of each is classified as VVS1, VVS2, VS1, or $\mathrm{VS} 2$
a. Find a $99 \%$ confidence interval for the proportion of all diamonds for sale on the open market that are classified as " $\mathrm{D}$ " color. Interpret the result.
b. Find a $99 \%$ confidence interval for the proportion of all diamonds for sale on the open market that are classified as "VS1" clarity. Interpret the result.

Adriano Chikande

Adriano Chikande

Numerade Educator

Problem 57

Are you really being served red saapper? Refer to the Nature (July 15, 2004) study of fish specimens labeled "red snapper,"- Exercise 3.75 (p. 196). Recall that federal law prohibits restaurants from serving a cheaper, look-alike variety of fish (e.g, vermillion snapper or lane snapper) to customers who order red snapper. A team of University of North Carolina (UNC) researchers analyzed the meat from each in a sample of 22 "red snapper" fish fillets purchased from vendors across the United States in an effort to estimate the true proportion of fillets that are really red snapper. DNA tests revealed that 17 of the 22 fillets (or $77 \%$ ) were not red snapper but the cheaper, look-alike variety of fish.
a. Identify the parameter of interest to the UNC researchers.
b. Explain why a large-sample confidence interval is inappropriate to apply in this study.
c. Construct a $95 \%$ confidence interval for the parameter of interest using Wilson's adjustment.
d. Give a practical interpretation of the confidence interval.

Sheryl Ezze

Numerade Educator

Problem 58

Eye shades, mascara, and nickel allergies. Pigmented makeup products like mascara and eye shadow may contain metal (e.g., nickel) allergens. Is a nickel allergy more likely to occur in women who report cosmetic dermatitis from using eye shadow or mascara? This was the question of interest in a paper published in the Joumal of the European Acadeny of Dematology and Venereology (June 2010). In a sample of 131 women with cosmetic dermatitis from using eye shadow, 12 were diagnosed with a nickel allergy. In a sample of 250 women with cosmetic dermatitis from using mascara, 25 were diagnosed with a nickel allergy.
a. Compute a $95 \%$ confidence interval for the proportion of women with cosmetic dermatitis from using cye shadow who have a nickel allergy. Interpret the result.
b. Compute a $95 \%$ confidence interval for the proportion of women with cosmetic dermatitis from using mascara who have a nickel allergy. Interpret the result.
c. Suppose you are informed that the true proportion with a nickel allergy for one of the two groups (eye shadow or mascara) is 12. Can you determine which group is referenced? Explain.

Sheryl Ezze

Numerade Educator

Problem 59

U.S. Pestal Service's performance. The U.S. Postal Service (USPS) reports that $95 \%$ of first-class mail within the same city is delivered on time (i.e., within 2 days of the time of mailing). To gauge the USPS performance, Price Waterhouse monitored the delivery of first-class mail items between Dec. 10 and Mar. 3-the most difficult delivery season due to bad weather conditions and holidays. In a sample of 332,000 items, Price Waterhouse determined that 282,200 were delivered on time. Comment on the performance of USPS first-class mail service over this time period.

Md.Daniyal Arshad

Md.Daniyal Arshad

Numerade Educator

Problem 60

If you wish to estimate a population mean with a sampling error of SE $=.3$ using a $95 \%$ confidence interval, and you know from prior sampling that $\sigma^2$ is approximately equal to 72 , how many observations would have to be included in your sample?

Lucas Finney

Numerade Educator

Problem 61

Suppose you wish to estimate a population mean correct to within 20 with probability equal to 90 . You do not know $\sigma^2$, but you know that the observations will range in value between 30 and 34 .
a. Find the approximate sample size that will produce the desired accuracy of the estimate. You wish to be conservative to ensure that the sample size will be ample to achieve the desired accuracy of the estimate. [Hint: Using your knowledge of data variation from Section 2.6, assume that the range of the observations will equal $4 \sigma_{\text {. }}$ ]
b. Calculate the approximate sample size, making the less conservative assumption that the range of the observations is equal to $6 \sigma$.

Sheryl Ezze

Numerade Educator

Problem 62

In each case, find the approximate sample size required to construct a $95 \%$ confidence interval for $p$ that has sampling error of $\mathrm{SE}=.0 \mathrm{~S}$.
a. Assume $p$ is near 2 .
b. Assume you have no prior knowledge about $p$, but you wish to be certain that your sample is large enough to achieve the specified accuracy for the estimate.

Sheryl Ezze

Numerade Educator

Problem 63

The following is a $90 \%$ confidence interval for $p$ : $(.26, .54)$. How large was the sample used to construct this interval?

Sheryl Ezze

Numerade Educator

Problem 64

It costs you $$\$ 10$$ to draw a sample of size $$n=1$$ and measure the attribute of interest. You have a budget of $$\$ 1,500$$.
a. Do you have sufficient funds to estimate the population mean for the attribute of interest with a $$95 \%$$ confidence interval 5 units in width? Assume $$\sigma=14$$.
b. If you used a $$90 \%$$ confidence level, would your answer to part a change? Explain.

Sheryl Ezze

Numerade Educator

Problem 65

Suppose you wish to estimate the mean of a normal population using a $95 \%$ confidence interval, and you know from prior information that $\sigma^2=1$.
a. To see the effect of the sample size on the width of the confidence interval, calculate the width of the confidence interval for $n=16,25,49,100$, and 400 .
b. Plot the width as a function of sample size $n$ on graph paper. Coanect the points by a smooth curve and note how the width decreases as $n$ increases.

Sheryl Ezze

Numerade Educator

Problem 66

If nothing is known about $p, 5$ can be substituted for $p$ in the sample size formula for a population proportion. But when this is done, the resulting sample sine may be larger than needed. Under what circumstances will using $p=5$ in the sample size formula yield a sample size larger than needed to construct a confidence interval for $p$ with a specified bound and a specified confidence level?

Lucas Finney

Numerade Educator

Problem 67

Aluminum cans contaminated by fire. $A$ gigantic warehouse located in Tampa. Florida, stores approximately 60 million empty aluminum beer and soda cans. Recently, a fire occurred at the warehouse. The smoke from the fire contaminated many of the cans with blackspot, rendering them unusable. A University of South Florida statistician was hired by the insurance company to estimate $p$, the true proportion of cans in the warchouse that were contaminated by the fire. How many aluminum cans should be randomly sampled to estimate $p$ to within .02 with $90 \%$ confidence?

Sheryl Ezze

Numerade Educator

Problem 68

Aceounting and Machiavellianism. Refer to the Behavioral Rescarch in Accounting (January 2008) study of Machiavellian traits in accountants, Exercise 6.19 (p. 341). where a Mach rating score was determined for each in a sample of accounting alumni who work as purchasing managers Suppose you want to reduce the width of the $95 \%$ confidence interval for the true mean Mach rating score of all purchasing managers you obtained in Exercise 6.19b. How many purchasing managers should be included in the sample if you desire a sampling error of only 1.5 Mach rating points? Use o $=12$ in your calculations.

Kari Hasz

Numerade Educator

Problem 69

Lobster trap placement. Refer to the Bullerin of Marine Science (April 2010) study of lobster trap placement. Exercise 629 (p. 348). Recall that you used a $95 \%$ confidence interval to estimate the mean trap spacing (in meters) for the population of red spiny lobster fishermen fishing in Baja California Sur, Mexica. How many teams of fishermen would need to be sampled in onder to reduce the width of the confidence interval to 5 meters? Use the sample standard deviation from Exercise 6.29 in your calculation.

Sheryl Ezze

Numerade Educator

Problem 70

Evaporation from swimming pools, Refer to the Hearing' Piping/Air Conditioning Engineering (April 2013) study of evaporation from occupied swimming pools, Exercise 6.34 (p. 349). The researchers desired an estimate of the mean absolute value of the deviation between the actual and estimated evaporation level (recorded as a percentage). Using a small sample, the researchers obtained the following summary statistics for absolute deviation percentage $\bar{x}=18 \%, s=20 \%$. How many swimming pools must be sampled to estimate the true mean absolute deviation percentage to within $5 \%$ using a $90 \%$ confidence interval?

Sheryl Ezze

Numerade Educator

Problem 71

Do social robots walk or roll? Refer to the International Conference on Social Robotics (Vol. 6414. 2010) study of the trend in the design of social robots. Exercise 6.48 (p, 357). Recall that you used a $99 \%$ confidence interval to estimate the proportion of all social robots designed with legs, but no wheels. How many social robots would need to be sampled in order to estimate the proportion to within .075 of its true value?

Sheryl Ezze

Numerade Educator

Problem 72

Study of aircraft bird-strikes. Refer to the International lournal for Traffic and Transport Enginecring (Vol. 3. 2013) study of aircraft bird strikes at a Nigerian airport. Exercise 6.54 (p. 357). Recall that an air traffic controller wants to estimate the true proportion of aircraft bird strikes that occur above 100 feet. Determine how many aircraft bird strikes need to be analyzed to estimate the true proportion to within .05 if you use a $95 \%$ confidence interval.

Sheryl Ezze

Numerade Educator

Problem 73

Bacteria in bottled water. Is the bottled water you drink safe? The Natural Resources Defense Council warns that the bottled water you are drinking may contain more bacteria and other potentially carcinogenic chemicals than allowed by state and federal regulations Of the more than 1,000 bottles studied, nearly one-third exceeded government levels (www.nrdciorg). Suppose that the Natural Resources Defense Council wants an updated estimate of the population proportion of bottled water that violates at least one government standard. Determine the sample size (number of bottles) needed to estimate this proportion to within \pm 0.01 with $99 \%$ confidence.

Sheryl Ezze

Numerade Educator

Problem 74

Shopping ea Black Friday. Refer to the Internafional Journal of Relail and Distribution Management (Vol 39 , 2011) survey of Black Friday shoppers, Exercise 6.16 (p. 340). One question was, "How many hours do you usually spend shopping on Black. Friday?"
a. How many Black. Friday shoppers should be included in a sample designed to estimate the average number of hours spent shopping on Black Friday if you want the estimate to deviate no more than 5 hour from the true mean?
b. Devise a sampling plan for collecting the data that will tikely result in a representative sample.

Andrew Kim

Numerade Educator

Problem 75

Monitoring phone calls to a toll-free number. A large food-products company receives about 100,000 phone calls a year from consumers on its toll-free number. A computer monitors and records how many rings it takes for an operator to answer, how much time each caller spends "on hold," and other data. However, the reliability of the monitoring system has been called into question by the operators and their labor union. As a check on the computer system, approximately how many calls should be manually monitored during the next year to estimate the true mean time that callers spend on hold to within 3 seconds with $95 \%$ confidence? Answer this question for the following values of the standard deviation of waiting times (in seconds) 10,20 , and 30 .

Sheryl Ezze

Numerade Educator

Problem 76

Eye shadow, mascara, and nickel allergies. Refer to the Journal of the European Academy of Dermatology and Venereology (June 2010) study of the link between nickel allergies and use of mascara or eye shadow, Exercise 6.58 (p. 358). Recall that two groups of women were sampledone group with cosmetic dermatitis from using eye shadow and another group with cosmetic dermatitis from using mascara. In either group, how many women would need to be sampled in order to yield an estimate of the population percentage with a nickel allergy that falls no more than $3 \%$ from the true value?

Sheryl Ezze

Numerade Educator

Problem 77

USGA golf ball tests. The United States Golf Association (USGA) tests all new brands of golf balls to ensure that they meet USGA specifications. One test conducted is intended to measure the average distance traveled when the ball is hit by a machine called "Iron Byron," a name inspired by the swing of the famous golfer Byron Nelson. Suppose the USGA wishes to estimate the mean distance for a new brand to within 1 yard with $90 \%$ confidence. Assume that past tests have indicated that the standard deviation of the distances Iron Byron hits golf balls is approximately 10 yards. How many golf balls should be hit by Iron Byron to achieve the desired accuracy in estimating the mean?

Sheryl Ezze

Numerade Educator

Problem 78

Is caffeine addictive? Does the caffeine in coffec, tea, and cola induce an addiction similar to that induced by alcohol, tobacco, heroin, and cocaine? In an attempt to answer this question, rescarchers at Johns Hopkins University examined 27 caffeine drinkers and found 25 who displayed some type of withdrawal symptoms when abstaining from caffeine. [Nole: The 27 caffeine drinkers volunteered for the study.] Furthermore, of 11 caffeine drinkers who were diagnosed as caffeine dependent, 8 displayed dramatic withdrawal symptoms (including impairment in normal functioning) when they consumed a caffeine-free diet in a controlled setting. The National Coffee Association claimed, however, that the study group was too small to draw conclusions. Is the sample large enough to estimate the true proportion of caffeine drinkers who are caffeine dependent to within 05 of the true value with $99 \%$ confidence? Explain.

Harsh Gadhiya

Numerade Educator

Problem 79

Preventing production of defective items. It costs more to produce defective items-because they must be scrapped or reworked - than it does to produce nondefective items. This simple fact suggests that manufacturers should ensure the quality of their products by perfecting their production processes rather than through inspection of finished products (Out of the Crisis, Deming, 1986). In order to better understand a particular metal-stamping process, a manufacturer wishes to estimate the mean length of items produced by the process during the past 24 hours
a. How many parts should be sampled in order to estimate the population mean to within 1 millimeter (mm) with $90 \%$ confidence? Previous studies of this machine have indicated that the standard deviation of lengths produced by the stamping operation is about $2 \mathrm{~mm}$.
b. Time permits the use of a sample size no larger than 100. If a $90 \%$ confidence interval for $\mu$ is constructed using $n=100$, will it be wider or narrower than would have been obtained using the sample size determined in part a? Explain.
c. If management requires that $\mu$ be estimated to within $1 \mathrm{~mm}$ and that a sample size of no more than 100 be used, what is (approximately) the maximum confidence level that could be attained for a confidence interval that meets management's specifications?

Sheryl Ezze

Numerade Educator

Problem 80

Calculate the percentage of the population sampled and the finite population correction factor for each of the following situations.
a. $n=1,000, N=2,500$
b. $n=1,000, N=5,000$
c. $n=1,000, N=10,000$
d. $n=1.000, N=100.000$

Blank Blank

Numerade Educator

Problem 81

Suppose the standard deviation of the population is known to be $\sigma=200$. Calculate the standard error of $\vec{x}$ for each of the situations described in Exercise 6.80 .

Beth Stone

Numerade Educator

Problem 82

Suppose $N=5,000, n=64$, and $s=24$.
a. Compare the size of the standard error of $\bar{X}$ computed with and without the finite population correction factor.
b. Repeat part a, but this time assume $n=400$.
c. Theoretically, when sampling from a finite population, the finite population correction factor should always be used in computing the standard error of $\bar{x}$. However, when $n$ is small relative to $N$, the finite population correction factor is close to 1 and can safely be ignored. Explain how parts $\mathbf{a}$ and $\mathbf{b}$ illustrate this point.

Andrew Kim

Numerade Educator

Problem 83

Suppose $N=10,000, n=2,000$, and $s=50$.
a. Compute the standard error of $\bar{x}$ using the finite population correction factor.
b. Repeat part a assuming $n=4,000$.
c. Repeat part a assuming $n=10,000$.
d. Compare parts $\mathbf{a}, \mathbf{b}$, and $\mathbf{c}$ and describe what happens to the standard error of $\vec{x}$ as $n$ increases.
e. The answer to part $c$ is 0 . This indicates that there is no sampling error in this case. Explain.

Andrew Kim

Numerade Educator

Problem 84

Suppose you want to estimate a population mean, $\mu$, and $\bar{x}=422, s=14, N=375$, and $n=40$. Find an approximate $95 \%$ confidence interval for $\mu$.

Sarah X

Numerade Educator

Problem 85

Suppose you want to estimate a population proportion, $p$, and $\hat{p}=.42, N=6,000$, and $n=1,600$. Find an approximate $95 \%$ confidence interval for $p$.

Narayan Hari

Numerade Educator

Problem 86

A random sample of size $n=30$ was drawn from a population of size $N=300$. The following measurements were obtained:
$$
\begin{array}{llllllllllll}
\hline 21 & 33 & 19 & 29 & 22 & 38 & 58 & 29 & 52 & 36 & 37 & 30 \\
53 & 37 & 29 & 18 & 35 & 42 & 36 & 41 & 35 & 36 & 33 & 38 \\
29 & 38 & 39 & 54 & 42 & 42 & & & & & & \\
\hline
\end{array}
$$
a. Estimate $\mu$ with an approximate $95 \%$ confidence interval.
b. Estimate $p$, the proportion of measurements in the population that are greater than 30 , with an approximate $95 \%$ confidence interval.

Lucas Finney

Numerade Educator

Problem 87

NFL. player survey. Researchers at the University of Pennsylvania's Wharton Sports Business Initiative collaborated with the National Football League Players Association (NFLPA) to produce the first NFL Player Survey. Of the 1,696 active NFL players, 1,355 (almost 80\%) responded to the survey. One of the survey questions asked, "Who is the coach - protessional, college, or high school - that has been the most influential in your career?"- Of the 1,355 respondents, 759 selected an NFL (professional) coach.
a. Construct a $95 \%$ confidence interval for the true proportion of active NFL players who select a professional coach as the most influential in their careers
b. Why is it necessary to use the continuity correction factor in the construction of the interval, part a?
c. Give a practical interpretation of the interval, part a.

Nick Johnson

Numerade Educator

Problem 88

Magazine subscriber salaries. Each year, the trade magazine Qualiry Progress publishes a study of subscribers' salaries One year, the 223 vice presidents sampled had a mean salary of $$\$ 116,754$$ and a standard deviation of $$\$ 39,185$$. Suppose the goal of the study is to estimate the true mean salary of all vice presidents who subscribe to Qualisy Progress.
EWI a. If 2,193 vice presidents subscribe to Quality Progress, estimate the mean with an approximate $$95 \%$$ confidence interval.
b. Interpret the result.

Adriano Chikande

Adriano Chikande

Numerade Educator

Problem 89

Auditing sampling methods. Traditionally, auditors have relied to a great extent on sampling techniques, rather than $100 \%$ audits, to help them test and evaluate the financial records of a client firm. When sampling is used to obtain an estimate of the total dollar value of an account-the acoount balance-the examination is known as a substantive test (Audit Sanpling-AICPA Audit Guide, 2015). In order to evaluate the reasonableness of a firm's stated total value of its parts inventory, an auditor randomly samples 100 of the total of 500 parts in stock, prices each part, and reports the results shown in the table.
$$
\begin{array}{crc}
\hline \text { Part Number } & \text { Part Price } & \text { Sample Size } \\
\hline 002 & \$ 108 & 3 \\
101 & 55 & 2 \\
832 & 500 & 1 \\
077 & 73 & 10 \\
688 & 300 & 1 \\
910 & 54 & 4 \\
839 & 92 & 6 \\
121 & 833 & 5 \\
271 & 50 & 9 \\
399 & 125 & 12 \\
761 & 1,000 & 2 \\
093 & 62 & 8 \\
505 & 205 & 7 \\
597 & 88 & 11 \\
830 & 100 & 19 \\
\hline
\end{array}
$$
a. Give a point estimate of the mean value of the parts inventory.
b. Find the estimated standard error of the point estimate of part a.
c. Construct an approximate $95 \%$ confidence interval for the mean value of the parts inventory.
d. The firm reported a mean parts inventory value of $\$ 300$. What does your confidence interval of part e suggest about the reasonableness of the firm's reported figure? Explain.

Sheryl Ezze

Numerade Educator

Problem 90

Furniture brand familiarity. A brand name that consumers recognize is a highly valued commodity in any industry. To assess brand familiarity in the furniture industry, NPD (a market rescarch firm) surveyed 1,333 women who head U.S housebolds that have incomes of $$\$ 25,000$$ or more. The sample was drawn from a database of 25,000 households that match the criteria listed above. Of the 10 furniture brands evaluated, La-Z.Boy was the most recognized brand; $$70.8 \%$$ of the respondents indicated they were "very familiar" with La-Z-Boy.
a. Describe the population being investigated by NPD.
b. In constructing a confidence interval to estimate the proportion of houscholds that are very familiar with the La-Z-Boy brand, is it necessary to use the finite population correction factor? Fxplain.
c. What estimate of the standard error of $$\hat{p}$$ should be used in constructing the confidence interval of part $$\mathbf{b}$$ ?
d. Construct a $$90 \%$$ confidence interval for the true proportion and interpret it in the context of the problem.

Dominador Tan

Numerade Educator

Problem 91

Invoice errors in a billing system. In a study of invoice errors in a company's new billing system, an auditor randomly sampled 35 invoices produced by the new system and recorded actual amount $$(A)$$, invoice amount $$(I)$$, and the difference (or error), $$x=(A-I)$$. The results were $$\bar{x}=\$ 1$$ and $$s=\$ 124$$. At the time that the sample was drawn, the new system had produced 1,500 invoices. Use this information to find an approximate $$95 \%$$ confidence interval for the true mean erfor per invoice of the new system. Interpret the result.

Jameson Kuper

Numerade Educator

Problem 92

Pesticide residue in corn products. The U.S. Environmental Protection Agency (EPA) bans use of the cancer-causing pesticide ethylene dibromide (EDB) as a fumigant for grain- and flour-milling equipment. EDB was once used to protect against infestation by microscopic roundworms called nematodes. The EPA sets maximum safe levels for EDB presence in raw grain, flour, cake mixes, cereak, bread, and other grain products on supermarket shelves and in warehouses. Of the 3,000 com-related products sold in one state, tests indicated that 15 of a random sample of 175 had EDB residues above the safe level. Will more than $7 \%$ of the corn-related products in this state have to be removed from shelves and warehouses? Explain.

Victor Salazar

Numerade Educator

Problem 93

For each of the following combinations of confidence interval and degrees of freedom $(d f)$, use Table IV in Appendix D to find the values of $x_{a / 2}^2$ and $x_1^2=\pi / 2$
a. $90 \%$ confidence interval with $d f=5$
b. $95 \%$ confidence interval with $d f=13$
c. $95 \%$ confidence interval with $d f=28$
d. $99 \%$ confidence interval with $d f=13$

Ajiboye Tunde

Numerade Educator

Problem 94

Given the following values of $\bar{x}, s$ and $n$, form a $90 \%$ confidence interval for $a^2$.
a. $\vec{x}=21, x=2.5, n=50$
b. $\bar{x}=1.3, s=02, n=15$
c. $\bar{x}=167, s=31.6, n=22$
d. $\vec{x}=9.4, s=1.5, n=5$

Sheryl Ezze

Numerade Educator

Problem 95

Refer to Exercise 6.94. For each part, a-d, form a $90 \%$ confidence interval for $a$.

Sheryl Ezze

Numerade Educator

Problem 96

A random sample of $n=6$ observations from a normal distribution resulted in the data shown in the table. Compute a $95 \%$ confidence interval for $a^2$.
$$
\begin{array}{llllll}
\hline 8 & 2 & 3 & 7 & 11 & 6 \\
\hline
\end{array}
$$

Sheryl Ezze

Numerade Educator

Problem 97

Oil content of fried sweet potato chips. The characteristics of sweet potato chips fried at different temperatures were investigated in the Journal of Food Engineering (September 2013). A sample of 6 sweet potato slices were fried at $130^{\circ}$ using a vacuum fryer. One characteristic of interest to the researchers was internal oil content (measured in millions of grams). The results were: $\bar{x}=178$ and $s=11$. The researchers are interested in estimating the variance of the interval cil content measurements for sweet potato chips.
a. Identify the target parameter, in symbols and words. b. Compute a $95 \%$ confidence interval for $\sigma^2$.
c. What does it mean to say that the target parameter lies within the interval with "95\% confidence"?
d. What assumption about the data must be satisfied in onder for the confidence interval to be valid?
e. To obtain a practical interpretation of the interval, part b, explain why a confidence interval for the standard deviation, $r$, is desired.
f. Use the results, part b, to compute a $95 \%$ confidence interval for $\sigma$. Give a practical interpretation of the interval.

Sheryl Ezze

Numerade Educator

Problem 98

Corporate sustainability of CPA firms. Refer to the Business and Society (March 2011) study on the sustainability behaviors of CPA corporations, Excrcise 6.12 (p. 339). Recall that the level of support for corporate sustainability (measured on a quantitative scale ranging. from 0 to 160 points) was obtained for each in a sample of 992 senior managers at CPA firms. The accompanying Minitab printout gives $90 \%$ confidence intervals for both the variance and standard deviation of level of support for all senior managers at CPA firms
(figure can't copy)
a. Locate the $90 \%$ confidence interval for $\sigma^2$ on the printout. Interpret the result.
b. Use the sample variance on the printout to calculate the $90 \%$ confidence interval for $\sigma^2$. Does your result agree with the interval shown on the printout?
c. Locate the $90 \%$ confidence interval for $\sigma$ on the printout.
d. Use the result, part a, to calculate the $90 \%$ confidence interval for $\sigma$. Does your result agree with the interval shown on the printout?
e. Give a practical interpretation of the $90 \%$ confidence interval for $\sigma$.
f. What assumption about the distribution of level of support is required for the inference, part e, to be valid? Is this assumption reasonably satisfied? (Use your answer to Exercise 4.125, p. 270.)

Sheryl Ezze

Numerade Educator

Problem 99

Facial structure of CEOs. Refer to the Psychological Science (Vol. 22, 2011) study of a chief executive officer's facial structure, Exercise $6.20 \quad$ (p. 341). Recall that the facial width-to-height ratio (WHR) was determined by computer analysis for each in a sample of 55 CEOs at publicly traded Fortune 500 firms, with the following results: $\bar{x}=1.96, s=.15$.
a. Find and interpret a $95 \%$ confidence interval for the standard deviation, $\sigma$, of the facial WHR values for all CEOs at publicly traded Fortune 500 firms. Interpret the result.
b. For the interval, part a, to be valid, the population of WHR values should be distributed how? Draw a sketch of the required distribution to support your answer.

Sheryl Ezze

Numerade Educator

Problem 100

Radon exposure in Egyptian tombs. Refer to the Radiation Protection Dosimetry (December 2010) study of radon exposure in tombs carved from limestone in the Egyptian Valley of Kings, Exercise 6.30 (p. 349). The radon levels in the inner chambers of a sample of 12 tombs were determined, yielding the following summary statistics: $\bar{x}=3,643 \mathrm{~Bq} / \mathrm{m}^3$ and $s=4,487 \mathrm{~Bq} / \mathrm{m}^3$. Use this information to estimate, with $95 \%$ confidence, the true standard deviation of radon levels in tombs in the Valley of Kings. Interpret the resulting interval.

Sheryl Ezze

Numerade Educator

Problem 101

Drug content assessment. Refer to the Analytical Chemistry (Dec. 15, 2009) study of a new method used by GlaxoSmithKline Medicines Research Center to determine the amount of drug in a tablet, Exercise 4.123 (p. 269). Drug concentrations (measured as a percentage) for 50 randomly selected tablets are repeated in the accompanying table. For comparisons against a standard method, the scientists at GlaxoSmithKline desire an estimate of the variability in drug concentrations for the new method. Obtain the estimate for the scientists using a $99 \%$ confidence interval. Interpret the interval.
$$
\begin{array}{lllllllll}
\hline 91.28 & 92.83 & 89.35 & 91.90 & 82.85 & 94.83 & 89.83 & 89.00 & 84.62 \\
86.96 & 88.32 & 91.17 & 83.86 & 89.74 & 92.24 & 92.59 & 84.21 & 89.36 \\
90.96 & 92.85 & 89.39 & 89.82 & 89.91 & 92.16 & 88.67 & 89.35 & 86.51 \\
89.04 & 91.82 & 93.02 & 88.32 & 88.76 & 89.26 & 90.36 & 87.16 & 91.74 \\
86.12 & 92.10 & 83.33 & 87.31 & 88.20 & 92.78 & 86.35 & 93.84 & 91.20 \\
93.44 & 86.77 & 83.77 & 93.19 & 81.79 & & & & \\
\hline
\end{array}
$$

Jameson Kuper

Numerade Educator

Problem 102

Jitter in a water power system. Jitter is a term used to describe the variation in conduction time of a water power system. Low throughput jitter is critical to successful waterline technology. An investigation of throughput jitter in the opening switch of a prototype system (Journal of Applied Physics) yielded the following descriptive statistics on conduction time for $n=18$ trials: $\bar{x}=334.8$ nanoseconds, $s=6.3$ nanoseconds. (Conduction time is defined as the length of time required for the downstream current to equal $10 \%$ of the upstream current.)
a. Construct a $95 \%$ confidence interval for the true standard deviation of conduction times of the prototype system.
b. Practically interpret the confidence interval, part a.
c. A system is considered to have low throughput jitter if the true conduction time standard deviation is less than 7 nanoseconds. Does the prototype system satisfy this requirement? Explain.

Sheryl Ezze

Numerade Educator

Problem 103

Lobster trap placement. Refer to the Bulletin of Marine Science (April 2010) observational study of teams fishing for the red spiny lobster in Baja California Sur, Mexico, Exercise 6.29 (p. 348). Trap-spacing measurements (in meters) for a sample of seven teams of red spiny lobster fishermen are repeated in the table. The researchers want to know how variable the trap-spacing measurements are for the population of red spiny lobster fishermen fishing in Baja California Sur, Mexico. Provide the researchers with an estimate of the target parameter using a $99 \%$ confidence interval.
$$
\begin{array}{lllllll}
\hline 93 & 99 & 105 & 94 & 82 & 70 & 86 \\
\hline
\end{array}
$$

Sheryl Ezze

Numerade Educator

Problem 104

Phishing attacks on e-mail accounts. Refer to the Chance (Summer 2007) study of an actual phishing attack against an organization, Exercise 5.33 (p. 316). Recall that phishing describes an attempt to extract personal/financial information from unsuspecting people through fraudulent e-mail. The interarrival times (in seconds) for 267 fraud box e-mail notifications are saved in the accompanying file. As with Exercise 5.33, consider these interarrival times to represent the population of interest.
a. Obtain a random sample of $n=10$ interarrival times from the population.
b. Use the sample, part b, to obtain an interval estimate of the population variance of the interarrival times. What is the measure of reliability for your estimate?
c. Find the true population variance for the data. Does the interval, part b, contain the true variance? Give one reason why it may not.

Dominador Tan

Numerade Educator

Problem 105

Is honey a cough remedy? Refer to the Archives of Pediatrics and Adolescent Medicine (December 2007) study of honey as a remedy for coughing, Exercise 2.31 (p. 86). Recall that the 105 ill children in the sample were randomly divided into groups. One group received a dosage of an over-the-counter cough medicine (DM); another group received a dosage of honey $(\mathrm{H})$. The coughing improvement scores (as determined by the children's parents) for the patients in the two groups are reproduced in the accompanying table. The pediatric researchers desire information on the variation in coughing improvement scores for each of the two groups.
a. Find a $90 \%$ confidence interval for the standard deviation in improvement scores for the honey dosage group.
b. Repeat part a for the DM dosage group.
c. Based on the results, parts $\mathbf{a}$ and $\mathbf{b}$, what conclusions can the pediatric researchers draw about which group has the smaller variation in improvement scores? (We demonstrate a more statistically valid method for comparing variances in Chapter 8.)
$$
\begin{array}{cl}
\text { Honey } & 1112151110131041516914106101112128 \\
\text { Dosage: } & 12911151015913812109512 \\
\text { DM } & 4694777912101163491276812 \\
\text { Dosage: } & 12412137101394410159
\end{array}
$$

Lucas Finney

Numerade Educator

Problem 106

In each of the following instances, determine whether you would use a $z$-or $t$-statistic (or neither) to form a $90 \%$ confidence interval and then state the appropriate $z$-or $t$-statistic value for the confidence interval.
a. Random sample of size $n=32$ from a normal distribution with a population mean of 60 and population standard deviation of 4 .
b. Random sample of size $n=108$ from an unknown population.
c. Random sample of size $n=12$ from a normal distribution with sample mean of 83 and sample standard deviation of 2 .
d. Random sample of size $n=24$ from a normal distribution with unknown mean and sample standard deviation of 3

Sheryl Ezze

Numerade Educator

Problem 107

Use Table III, Appendix D to determine the $t_0$ values for each of the following probability statements and their respective degrees of freedom $(d f)$.
a. $P\left(t \leq t_0\right)=.25$ with $d f=15$
b. $P\left(t \geq t_0\right)=.1$ with $d f=8$
c. $P\left(-t_0 \leq t \leq t_0\right)=.01$ with $d f=19$
d. $P\left(-t_0 \leq t \leq t_0\right)=.05$ with $d f=24$

Robin Corrigan

Numerade Educator

Problem 108

In a random sample of 250 people from a city, 148 of them favor apples over other fruits.
a. Use a $90 \%$ confidence interval to estimate the true proportion $p$ of people in the population who favor apples over other fruits.
b. How large a sample would be needed to estimate $p$ to be within .15 with $90 \%$ confidence?

Sheryl Ezze

Numerade Educator

Problem 109

A random sample of 225 measurements is selected from a population, and the sample mean and standard deviation are $\bar{x}=32.5$ and $s=30.0$, respectively.
a. Use a $99 \%$ confidence interval to estimate the mean of the population, $\mu$.
b. How large a sample would be needed to estimate $m$ to within 5 with $99 \%$ confidence?
*c. Use a $99 \%$ confidence interval to estimate the population variance, $\sigma^2$.
d. What is meant by the phrase $99 \%$ confidence as it is used in this exercise?

Sheryl Ezze

Numerade Educator

Problem 110

Calculate the finite population correction factor for each of the following situations:
a. $n=50, N=2,000$
b. $n=20, N=100$
c. $n=300, N=1,500$

Blank Blank

Numerade Educator

Problem 111

Find $\chi_{\alpha / 2}^2$ and $\chi_{(1-\alpha / 2)}^2$ from Table IV, Appendix D, for each of the following:
a. $n=10, \alpha=.05$
b. $n=20, \alpha=.05$
c. $n=50, \alpha=.01$

Sheryl Ezze

Numerade Educator

Problem 112

Latex allergy in health care workers. Health care workers who use latex gloves with glove powder on a daily basis are particularly susceptible to developing a latex allergy. Each in a sample of 46 hospital employees who were diagnosed with latex allergy based on a skin-prick test reported on their exposure to latex gloves (Current Allergy \& Clinical Immunology, March 2004). Summary statistics for the number of latex gloves used per week are $\bar{x}=19.3$, $s=11.9$.
a. Give a point estimate for the average number of latex gloves used per week by all health care workers with a latex allergy.
b. Form a $95 \%$ confidence interval for the average number of latex gloves used per week by all health care workers with a latex allergy.
c. Give a practical interpretation of the interval, part b.
d. Give the conditions required for the interval, part $\mathbf{b}$, to be valid.

Lucas Finney

Numerade Educator

Problem 113

General health survey. The Centers for Disease Control and Prevention (CDCP) in Atlanta, Georgia, conducts an annual survey of the general health of the U.S. population as part of its Behavioral Risk Factor Surveillance System. Using random-digit dialing, the CDCP telephones U.S. citizens over 18 years of age and asks them the following four questions:
1. Is your health generally excellent, very good, good, fair, or poor?
2. How many days during the previous 30 days was your physical health not good because of injury or illness?
3. How many days during the previous 30 days was your mental health not good because of stress, depression, or emotional problems?
4. How many days during the previous 30 days did your physical or mental health prevent you from performing your usual activities?
Identify the parameter of interest for each question.

Tony Wilson

Numerade Educator

Problem 114

Products "Made in the USA." Refer to Exercise 2.154 (p. 143) and the Journal of Global Business (Spring 2002) survey to determine what "Made in the USA" means to consumers. Recall that 106 shoppers at a shopping mall in Muncie, Indiana, responded to the question, "Made in the USA" means what percentage of U.S. labor and materials?" Sixty-four shoppers answered, "100\%."
a. Define the population of interest in the survey.
b. What is the characteristic of interest in the population?
c. Estimate the true proportion of consumers who believe "Made in the USA" means $100 \%$ U.S. labor and materials using a $90 \%$ confidence interval.
d. Give a practical interpretation of the interval, part c.
e. Explain what the phrase "90\% confidence" means for this interval.
f. Compute the sample size necessary to estimate the true proportion to within . 05 using a $90 \%$ confidence interval.

Marc Lauzon

Numerade Educator

Problem 115

Material safety data sheets. The Occupational Safety \& Health Administration has required companies that handle hazardous chemicals to complete material safety data sheets (MSDSs). These MSDSs have been criticized for being too hard to understand and complete by workers. A study of 150 MSDSs revealed that only $11 \%$ were satisfactorily completed (Chemical \& Engineering News, February $7,2005)$
a. Give a point estimate of $p$, the true proportion of MSDSs that are satisfactorily completed.
b. Find a $95 \%$ confidence interval for $p$.
c. Give a practical interpretation of the interval, part b.

Adriano Chikande

Adriano Chikande

Numerade Educator

Problem 116

Lead and copper in drinking water. Periodically, the
(n1) Hillsborough County (Florida) Water Department tests the drinking water of homeowners for contaminants such as lead and copper. The lead and copper levels in water specimens collected for a sample of 10 residents of the Crystal Lakes Manors subdivision are shown below, followed by a Minitab printout analyzing the data.
$$
\begin{array}{cc}
\hline \text { Lead }(\mu \mathrm{g} / \mathrm{L}) & \text { Copper }(\mathrm{mg} / \mathrm{L}) \\
\hline 1.32 & .508 \\
0 & .279 \\
13.1 & .320 \\
.919 & .904 \\
.657 & .221 \\
3.0 & .283 \\
1.32 & .475 \\
4.09 & .130 \\
4.45 & .220 \\
0 & .743 \\
\hline
\end{array}
$$
(FIGURE CAN'T COPY)
a. Locate a $90 \%$ confidence interval for the mean lead level in water specimens from Crystal Lakes Manors on the printout.
b. Locate a $90 \%$ confidence interval for the mean copper level in water specimens from Crystal Lakes Manors on the printout.
c. Interpret the intervals, parts $\mathbf{a}$ and $\mathbf{b}$, in the words of the problem.
d. Discuss the meaning of the phrase "90\% confident."

Nick Johnson

Numerade Educator

Problem 117

Water pollution testing. The EPA wants to test a randomly selected sample of $n$ water specimens and estimate the mean daily rate of pollution produced by a mining operation. If the EPA wants a $95 \%$ confidence interval estimate with a sampling error of 1 milligram per liter $(\mathrm{mg} / \mathrm{L})$, how many water specimens are required in the sample? Assume prior knowledge indicates that pollution readings in water samples taken during a day are approximately normally distributed with a standard deviation equal to $5 \mathrm{mg} / \mathrm{L}$.

Sheryl Ezze

Numerade Educator

Problem 118

Bankruptcy effect on U.S. airfares. Both Delta Airlines and USAir filed for bankruptcy. A study of the impact of bankruptcy on the fares charged by U.S. airlines was published in Research in Applied Economics (Vol. 2, 2010). The researchers collected data on Orlando-bound airfares for three airlines-Southwest (a stable airline), Delta (just entering bankruptcy at the time), and USAir (emerging from bankruptcy). A large sample of nonrefundable ticket prices was obtained for each airline following USAir's emergence from bankruptcy, and then a $95 \%$ confidence interval for the true mean airfare was obtained for each. The results for 7-day advance bookings are shown in the accompanying table.
$$
\begin{array}{lc}
\hline \text { Airline } & 95 \% \text { Confidence Interval } \\
\hline \text { Southwest } & (\$ 412, \$ 496) \\
\text { Delta } & (\$ 468, \$ 500) \\
\text { USAir } & (\$ 247, \$ 372) \\
\hline
\end{array}
$$
a. What confidence coefficient was used to generate the confidence intervals?
b. Give a practical interpretation of each of the $95 \%$ confidence intervals. Use the phrase "95\% confident" in your answer.
c. When you say you are "95\% confident," what do you mean?
d. If you want to reduce the width of each confidence interval, should you use a smaller or larger confidence coefficient? Explain.

Foster Wisusik

Numerade Educator

Problem 119

Employees with substance abuse problems. According to the New Jersey Governor's Council for a Drug-Free Workplace Report, 50 of the 72 sampled businesses that are members of the council admitted that they had employees with substance abuse problems. At the time of the survey, 251 New Jersey businesses were members of the Governor's Council. Use the finite population correction factor to find a $95 \%$ confidence interval for the proportion of all New Jersey Governor's Council business members who have employees with substance abuse problems. Interpret the resulting interval.

Robin Corrigan

Numerade Educator

Problem 120

Motivation of drug dealers. Refer to the Applied Psychology in Criminal Justice (September 2009) study of the personality characteristics of convicted drug dealers, Exercise 5.75 (p. 325). A random sample of 100 drug dealers had a mean Wanting Recognition (WR) score of 39 points, with a standard deviation of 6 points. The researchers are interested in $\sigma^2$, the variation in WR scores for all convicted drug dealers.
a. Identify the target parameter, in symbols and words.
b. Compute a $99 \%$ confidence interval for $\sigma^2$.
c. What does it mean to say that the target parameter lies within the interval with " $99 \%$ confidence"?
d. What assumption about the data must be satisfied in order for the confidence interval to be valid?
e. To obtain a practical interpretation of the interval, part b, explain why a confidence interval for the standard deviation, $\sigma$, is desired.
f. Use the results, part b, to compute a $99 \%$ confidence interval for $\sigma$. Give a practical interpretation of the interval.

Rashmi Sinha

Numerade Educator

Problem 121

Budget lapsing at army hospitals. Budget lapsing occurs when unspent funds do not carry over from one budgeting period to the next. Refer to the Journal of Management Accounting Research (Vol. 19, 2007) study on budget lapsing at U.S. Army hospitals, Exercise 2.113 (p. 126). Because budget lapsing often leads to a spike in expenditures at the end of the fiscal year, the researchers recorded expenses per full-time equivalent employee for each in a sample of 1,751 army hospitals. The sample yielded the following summary statistics: $$\bar{x}=\$ 6,563$$ and $$s=\$ 2,484$$. Estimate the mean expenses per full-time equivalent employee of all U.S. Army hospitals using a $$90 \%$$ confidence interval. Interpret the result.

Caleb Miller

Numerade Educator

Problem 122

Size of diamonds sold at retail. Refer to Exercise 2.158 (p. 144) and the Journal of Statistics Education data on diamonds saved in the accompanying file. Consider the quantitative variable, number of carats, recorded for each of the 308 diamonds for sale on the open market.
a. Select a random sample of $\mathbf{3 0}$ diamonds from the $\mathbf{3 0 8}$ diamonds.
b. Find the mean and standard deviation of the number of carats per diamond for the sample.
c. Use the sample information, part b, to construct a $95 \%$ confidence interval for the mean number of carats in the population of 308 diamonds.
d. Interpret the phrase $95 \%$ confidence when applied to the interval, part $\mathbf{c}$.
e. Refer to the mean of all 308 diamonds you calculated in Exercise 2.157. Does the "population" mean fall within the confidence interval of part c?

SP

Sarthi Patil

Numerade Educator

Problem 123

Fish contaminated by a plant's discharge. Refer (Example 1.5, p. 38) to the U.S. Army Corps of Engineers data on a sample of 144 contaminated fish collected from the river adjacent to a chemical plant. Estimate the proportion of contaminated fish that are of the channel catfish species. Use a $90 \%$ confidence interval and interpret the result.

Victor Salazar

Numerade Educator

Problem 124

Improving the productivity of chickens. Farmers have discovered that the more domestic chickens peck at objects placed in their environment, the healthier and more productive the chickens seem to be. White string has been found to be a particularly attractive pecking stimulus. In one experiment, 72 chickens were exposed to a string stimulus. Instead of white string, blue-colored string was used. The number of pecks each chicken took at the blue string over a specified time interval was recorded. Summary statistics for the 72 chickens were $\bar{x}=1.13$ pecks, $s=2.21$ pecks (Applied Animal Behaviour Science, October 2000).
a. Estimate the population mean number of pecks made by chickens pecking at blue string using a $99 \%$ confidence interval. Interpret the result.
b. Previous research has shown that $\boldsymbol{\mu}=7.5$ pecks if chickens are exposed to white string. Based on the results, part $\mathbf{a}$, is there evidence that chickens are more apt to peck at white string than blue string? Explain.

Sheryl Ezze

Numerade Educator

Problem 125

Surface roughness of pipe. Refer to the Anti-corrosion Methods and Materials (Vol. 50, 2003) study of the surface roughness of coated interior pipe used in oil fields, Exercise 2.46 (p. 96). The data (in micrometers) for 20 sampled pipe sections are reproduced in the accompanying table; a Minitab analysis of the data appears below.
$$
\begin{array}{llllllllll}
\hline 1.72 & 2.50 & 2.16 & 2.13 & 1.06 & 2.24 & 2.31 & 2.03 & 1.09 & 1.40 \\
2.57 & 2.64 & 1.26 & 2.05 & 1.19 & 2.13 & 1.27 & 1.51 & 2.41 & 1.95 \\
\hline
\end{array}
$$
a. Locate a $95 \%$ confidence interval for the mean surface roughness of coated interior pipe on the accompanying Minitab printout.
b. Would you expect the average surface roughness to be as high as 2.5 micrometers? Explain.
(FIGURE CAN'T COPY)

Dominador Tan

Numerade Educator

Problem 126

Interviewing candidates for a job. The costs associated with conducting interviews for a job opening have skyrocketed over the years. According to a Harris Interactive survey, 211 of 502 senior human resources executives at U.S. companies believe that their hiring managers are interviewing too many people to find qualified candidates for the job (Business Wire, June 8, 2006).
a. Describe the population of interest in this study.
b. Identify the population parameter of interest, $p$.
c. Is the sample size large enough to provide a reliable estimate of $p$ ?
d. Find and interpret an interval estimate for the true proportion of senior human resources executives who believe that their hiring managers interview too many candidates during a job search. Use a confidence level of $98 \%$.
e. If you had constructed a $90 \%$ confidence interval, would it be wider or narrower?

Kaylee Mcclellan

Kaylee Mcclellan

Numerade Educator

Problem 127

Overbooking policies for major airlines. Airlines overbook flights in order to reduce the odds of flying with unused seats. An article in Transportation Research (Vol. 38, 2002) investigated the optimal overbooking policies for major airlines. One of the variables measured for each airline was the compensation (in dollars) per bumped passenger required to maximize future revenue. Consider the threshold levels of compensation for a random sample of 10 major airlines shown in the next table. Estimate the true mean threshold compensation level for all major worldwide airlines using a $90 \%$ confidence interval. Interpret the result practically.
$$
\begin{array}{rrrrr}
\hline 825 & 850 & 1,210 & 1,370 & 1,415 \\
1,500 & 1,560 & 1,625 & 2,155 & 2,220 \\
\hline
\end{array}
$$

Willis James

Numerade Educator

Problem 128

Paying for music downloads. If you use the Internet, have you ever paid to access or download music? This was one of the questions of interest in a recent Pew Internet \& American Life Project Survey (October 2010). Telephone interviews were conducted on a representative sample of 1,003 adults living in the United States. For this sample, 506 adults admitted that they have paid to download music.
a. Use the survey information to find a point estimate for the true proportion of U.S. adults who have paid to download music.
b. Find an interval estimate for the proportion, part a. Use a $90 \%$ confidence interval.
c. Give a practical interpretation of the interval, part b. Your answer should begin with "We are $90 \%$ confident. ..."
d. Explain the meaning of the phrase "90\% confident."
e. How many more adults need to be sampled to reduce the margin of error in the confidence interval by half?

Sheryl Ezze

Numerade Educator

Problem 129

Accuracy of price scanners at Walmart. The National Institute for Standards and Technology (NIST) mandates that for every 100 items scanned through the electronic checkout scanner at a retail store, no more than 2 should have an inaccurate price. A study of the accuracy of checkout scanners at Walmart stores in California was conducted. At each of 60 randomly selected Walmart stores, 100 random items were scanned. The researchers found that 52 of the 60 stores had more than 2 items that were inaccurately priced.
a. Give an estimate of $p$, the proportion of Walmart stores in California that have more than 2 inaccurately priced items per 100 items scanned.
b. Construct a $95 \%$ confidence interval for $p$.
c. Give a practical interpretation of the interval, part b.
d. Suppose a Walmart spokesperson claims that $99 \%$ of California Walmart stores are in compliance with the NIST mandate on accuracy of price scanners. Comment on the believability of this claim.
e. Are the conditions required for a valid large-sample confidence interval for $p$ satisfied in this application? If not, comment on the validity of the inference in part $d$.
f. Determine the number of Walmart stores that must be sampled in order to estimate the true proportion to within 05 with $90 \%$ confidence using the large-sample method.

Sheryl Ezze

Numerade Educator

Problem 130

Contamination of New Jersey wells. Methyl $t$-butyl ether (MTBE) is an organic water contaminant that often results from gasoline spills. The level of MTBE (in parts per billion) was measured for a sample of 12 well sites located near a gasoline service station in New Jersey (Environmental Science \& Technology, January 2005). The data are listed in the accompanying table.
$$
\begin{array}{rrrrrr}
\hline 150 & 367 & 38 & 12 & 11 & 134 \\
12 & 251 & 63 & 8 & 13 & 107 \\
\hline
\end{array}
$$
a. Give a point estimate for $\mu$, the true mean MTBE level for all well sites located near the New Jersey gasoline service station.
b. Calculate and interpret a $99 \%$ confidence interval for $\mu$.
c. What assumptions are required for the interval. part $\mathbf{b}$, to be valid? Are these assumptions reasonably satisfied?

Lucas Finney

Numerade Educator

Problem 131

Cell phone use by drivers. Studies have shown that drivers who use cell phones while operating a motor passenger vehicle increase their risk of an accident. Nevertheless, drivers continue to make cell phone calls while driving. A June 2011 Harris Poll of 2.163 adults found that $60 \%(1,298$ adults) use cell phones while driving.
a. Give a point estimate of $p$, the true driver cell phone use rate (i.e., the proportion of all drivers who are us. ing a cell phone while operating a motor passenger vehicle).
b. Find a $95 \%$ confidence interval for $p$.
c. Give a practical interpretation of the interval, part b.
d. Determine the margin of error in the interval if the number of adults in the survey is doubled.

Sheryl Ezze

Numerade Educator

Problem 132

Salmonella poisoning from eating an ice cream bar. Recently, a case of salmonella (bacterial) poisoning was traced to a particular brand of ice cream bar, and the manufacturer removed the bars from the market. Despite this response, many consumers refused to purchase any brand of ice cream bars for some period of time after the event (McClave, personal consulting). One manufacturer conducted a survey of consumers 6 months after the outbreak. A sample of 244 ice cream bar consumers was contacted, and 23 respondents indicated that they would not purchase ice cream bars because of the potential for food poisoning-
a. What is the point estimate of the true fraction of the entire market who refuse to purchase bars 6 months after the out-break?
b. Is the sample size large enough to use the normal approximation for the sampling distribution of the estimator of the binomial probability? Justify your response.
c. Construct a $95 \%$ confidence interval for the true proportion of the market who still refuses to purchase ice cream bars 6 months after the event.
d. Interpret both the point estimate and confidence interval in terms of this application.

Sheryl Ezze

Numerade Educator

Problem 133

Salmonella poisening from eating an ice cream bar (cont'd). Refer to Exercise 6.132. Suppose it is now 1 year after the outbreak of food poisoning was traced to ice cream bars. The manufacturer wishes to estimate the proportion who still will not purchase bars to within .02 using a $95 \%$ confidence interval. How many consumers should be sampled?

Sheryl Ezze

Numerade Educator

Problem 134

Latex allergy in health care workers. Refer to the Current Allergy \& Clinical Imanunology (March 2004) study of health care workers who use latex gloves, Exercise 6.112 (p. 375). In addition to the 46 hospital employees who were diagnosed with a latex allergy based on a skin-prick test, another 37 health care workers were diagnosed with the allergy using a latex-specific serum test. Of these 83 work. ers with confirmed latex allergy, only 36 suspected that they had the allergy when asked on a questionnaire. Make a statement about the likelihood that a bealth care worker with latex allergy suspects he or she actually has the allergy. Attach a measure of reliability to your inference.

Sheryl Ezze

Numerade Educator

Problem 135

Internal auditing of invoices. A firm's president, vice presidents, department managers, and others use financial data generated by the firm's accounting system to help them make decisions regarding such things as pricing. budgeting, and plant expansion. To provide reasonable certainty that the system provides reliable data, internal auditors periodically perform various checks of the system (Homgren, Foster, and Datar, Cost Accownting: $A$ Managerial Emphasis 2005). Suppose an internal auditor is interested in determining the proportion of sales invoices in a population of 5,000 sales invoices for which the "total sales" figure is in error. She plans to estimate the true proportion of invoices in crror based on a random sample of size 100.
a. Assume that the population of invoices is numbered from 1 to 5,000 and that every invoice ending with a 0 is in error (i.e, 10\% are in error). Use a random number generator to draw a random sample of 100 invoices from the population of 5,000 invoices For example. random number 456 stands for invoice number 456 . List the invoice numbers in your sample and indicate which of your sampled invoices are in error (i.e., those ending in a 0).
b. Use the results of your sample of part a to construct a $90 \%$ confidence interval for the true proportion of invoices in error.
c. Recall that the true population proportion of invoices in error is equal to. 1. Compare the true proportion with the estimate of the true proportion you developed in part b. Does your confidence interval include the true proportion?

Carolyn Behr-Jerome

Carolyn Behr-Jerome

Numerade Educator

Problem 136

Accountants' salary survey. Each year, Management Accounding reports the results of a salary survey of the members of the Institute of Management Accountants (IMA). One year, the 2,112 members responding had a salary distribution with a 20 th percentile of $$\$ 35,100$$, a median of $$\$ 50.000$$; and an 80 th percentile of $$\$ 73.000$$.
a. Use this information to determine the minimum sample size that could be used in next year's survey to estimate the mean salary of IMA members to within $$\$ 2,000$$ with $$98 \%$$ confidence.
b. Explain how you estimated the standard deviation required for the sample size calculation.
c. List any assumptions you make.

Sneha Ravi

Numerade Educator

Problem 137

"Out of control" production process. When companies employ control charts to monitor the quality of their products, a series of small samples is typically used to determine if the process is "in control" during the period of time in which each sample is selected. (We cover quality-control charts in Chapter 13.) Suppose a concrete-block manufacturer samples nine blocks per bour and tests the breaking strength of each. During 1 hour's test, the mean and standard deviation are 985.6 pounds per square inch (psi) and 22.9 poi, respectively. The process is to be considered "out of control" if the true mean strength differs from 1,000 psi. The manufacturer wants to be reasonably certain that the process is really out of control before shutting down the process and trying to determine the problem. What is your recommendation? continues to be the accepted method for determining the sample size necessary to provide a reliable estimate of Medicare and Medicaid providers' claim submission error rates.]

John Long

Numerade Educator

Problem 138

A sampling dispute goes to ceurt. Sampling of Medicare and Medicaid claims by the federal and state agencies who administer those programs has become common practice to determine whether providers of those services are submitting valid claims. (See the Statistics in Action for this chapter.) The reliability of inferences based on those samples depends on the methodology used to collect the sample of claims. Consider estimating the true proportion, $p$, of the population of claims that are invalid. (Invalid claims should not have been reimbursed by the agency.) Of course, to estimate a binomial parameter, $B$, within a given level of precision we use the formula provided in Section 6.5 to determine the necessary sample size. In a recent actual case, the statistician determined a sample size large cnough to ensure that the bound on the error of the estimate would not exceed .05 , using a $95 \%$ confidence interval. He did so by assuming that the true error rate was $p=5$, which, as discussed in Section 6.5, provides the maximum sample size needed to achieve the desired bound on the error.
a. Determine the sample size necessary to estimate $p$ to within .05 of the true value using a $95 \%$ confidence interval.
b. After the sample was selected and the sampled claims were audited, it was determined that the estimated error rate was $\hat{p}=.20$ and a $95 \%$ confidence interval for $p$ was $(.15, .25)$. Was the desired bound on the error of the estimate met?
c. An economist hired by the Medicare provider noted that, since the desired bound on the error of .05 is equal to $25 \%$ of the estimated $\hat{p}=.20$ invalid claim rate, the "true" bound on the error was .25 , not .05 . He argued that a significantly larger sample would be necessary to meet the "relative error" (the bound on the error divided by the error rate) goal of .05 , and that the statistician's use of the "absolute errot" of .05 was inappropriate, and more sampling was required. The statistician argued that the relative error was a moving target, since it depends on the sample estimate of the invalid claim rate, which cannot be known prior to selecting the sample. He noted that if the estimated invalid claim rate turned out to be larger than .5 , the relative error would then be lower than the absolute error bound. As a consequence, the case went to trial over the relative vs absolute error dispute. Give your opinion on the matter.
continues to be the accepted method for determining the sample size necessary to provide a reliable estimate of Medicare and Medicaid providers' claim submission error rates]

Tyler Moulton

Numerade Educator

Problem 139

Scallops, sampling, and the law, Interfaces (March-April 1995) presented the case of a ship that fishes for scallops off the coast of New England. In order to protect baby scallops from being harvested, the U.S. Fisheries and Wildife Service requires that -the average meat per scal. lop weigh at least $\frac{1}{\mathrm{z}}$ of a pound." The ship was accused of violating this weight standard. Author Arnold Barnett lays out the scenario
The vessel arrived at a Massachasets port with 11,000 bags of scallops from which the harbormaster ramdomly selected 18 bags for weighing. From each sach bag, his agenss took a large scoopful of scallops; then, to estimate the bag's average meat per scallop, they divided the rotal weight of mear in the scoopful by the number of scallops it condained, Based ou the I8 / numbers) thas generated, the harbormaster eximated that each of the ship's scallops possessed an average of ty of a pound of meat (that is they were about seven percent lighter than the minimum requirement). Viewing this outcome as conclusive evidence that the weight standard had been violated, federal authorities at once confiscated 95 percent of the catch (which they then sold at auction). The fishing voyage was thas transformed into a financial calastrophe for its participants.
The actual scallop weight measurements for each of the 18 sampled bags are listed in the table below. For case of exposition, Barnett expressed each number as a multiple of $\frac{1}{5}$ of a pound, the minimum permissible average weight per scallop. Consequently, numbers below 1 indicate individual bags that do not meet the standard.
The ship's owner filed a lawsuit against the federal government, declaring that his vessel had fully complied with the weight standard. A Boston law firm was hired to represent the owner in legal proceedings, and Barnett was retained by the firm to provide statistical litigation support and, if necessary, expert witness testimony.
$$
\begin{array}{rrrrrrrrr}
\hline .93 & .88 & .85 & .91 & .91 & .84 & .90 & .98 & .88 \\
.89 & .98 & .87 & .91 & .92 & .99 & 1.14 & 1.06 & .93 \\
\hline
\end{array}
$$
a. Recall that the harbormaster sampled only 18 of the ship's 11,000 bags of scallops. One of the questions the lawyers asked Barnett was, "Can a reliable estimate of the mean weight of all the scallops be obtained from a sample of size 18?" Give your opinion on this issue.
b. As stated in the article, the government's decision rule is to confiscate a catch if the sample mean weight of the scallops is less than $\frac{1}{15}$ of a pound. Do you see any flaws in this rule?
c. Develop your own procedure for determining whether a ship is in violation of the minimum-weight restriction. Apply your rule to the data. Draw a conclusion about the ship in question.

Sana Riaz

Numerade Educator