Chapter 7 Homework. For Exercises 1 & 2, identify the population, the parameter, 3. the sample, and the statistic in each setting.

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7.1 For Exercises 1 & 2, identify the population, the parameter, 3. the sample, and the statistic in each setting. 1. Stop smoking! A random sample of 1000 people who signed a card saying they intended to quit smoking were contacted nine months later. It turned out that 210 (21%) of the sampled individuals had not smoked over the past six months. 2. Hot turkey Tom is cooking a large turkey breast for a holiday meal. He wants to be sure that the turkey is safe to eat, which requires a minimum internal temperature of 165 F. Tom uses a thermometer to measure the temperature of the turkey meat at four randomly chosen points. The minimum reading in the sample is 170 F. For each boldface number in Exercises 3 and 4, (1) state whether it is a parameter or a statistic and (2) use appropriate notation to describe each number; for example, p = 0.65. 3. Get your bearings A large container of ball bearings has mean diameter 2.5003 centimeters (cm). This is within the specifications for acceptance of the container by the purchaser. By chance, an inspector chooses 100 bearings from the container that have mean diameter 2.5009 cm. Because this is outside the specified limits, the container is mistakenly rejected. 4. Unlisted numbers A telemarketing firm in Los Angeles uses a device that dials residential telephone numbers in that city at random. Of the first 100 numbers dialed, 48% are unlisted. This is not surprising because 52% of all Los Angeles residential phones are unlisted. 5. Doing homework A school newspaper article claims that 60% of the students at a large high school did all their assigned homework last week. Some skeptical AP Statistics students want to investigate whether this claim is true, so they choose a SRS of 100 students from the school to interview. What values of the sample proportion would be consistent with the claim that the population proportion of student who completed their homework is p=.60? To find out, we used Fathom software to simulate choosing 250 SRSs of size n = 100 students from a population in which p = 0.60. The figure below is a dotplot of the sample proportion p ˆ of students who did all their homework. (a) Is this the sampling distribution of ˆ p? Justify your answer. (b) Describe the distribution. Are there any obvious outliers? (c) Suppose that 45 of the 100 students in the actual sample say that they did all their homework last week. What would you conclude about the newspaper article s claim? Explain. 6. Doing homework Refer to Exercise 5. (a) Make a graph of the population distribution given that there are 3000 students in the school. (Hint: What type of variable is being measured?) (b) Sketch a possible graph of the distribution of sample data for the SRS of size 100 taken by the AP Statistics students.

7. Cold cabin? The Fathom screen shot below shows the results of taking 500 SRSs of 10 temperature readings from a population distribution that s N(50, 3) and recording the sample variance s x 2 each time. (a) Describe the approximate sampling distribution. (b) Suppose that the variance from an actual sample is s x 2 = 25. What would you conclude about the thermostat manufacturer s claim? Explain. 8. IRS audits The Internal Revenue Service plans to examine an SRS of individual federal income tax returns from each state. One variable of interest is the proportion of returns claiming itemized deductions. The total number of tax returns in each state varies from over 15 million in California to about 240,000 in Wyoming. (a) Will the sampling variability of the sample proportion change from state to state if an SRS of 2000 tax returns is selected in each state? Explain your answer. (b) Will the sampling variability of the sample proportion change from state to state if an SRS of 1% of all tax returns is selected in each state? Explain your answer. 9. Bias and variability The figure below shows histograms of four sampling distributions of different statistics intended to estimate the same parameter (a) Which statistics are unbiased estimators? Justify your answer. (b) Which statistic does the best job of estimating the parameter? Explain.

7.2 10. Predict the election Just before a presidential election, a national opinion poll increases the size of its weekly random sample from the usual 1500 people to 4000 people. (a) Does the larger random sample reduce the bias of the poll result? Explain. (b) Does it reduce the variability of the result? Explain. 11. A sample of teens A study of the health of teenagers plans to measure the blood cholesterol levels of an SRS of 13- to 16-yearolds. The researchers will report the mean x from their sample as an estimate of the mean cholesterol level µ in this population. (a) Explain to someone who knows no statistics what it means to say that x is an unbiased estimator of µ. (b) The sample result x is an unbiased estimator of the population mean µ no matter what size SRS the study chooses. Explain to someone who knows no statistics why a large random sample gives more trustworthy results than a small random sample. MULTIPLE CHOICE: 12. A newspaper poll reported that 73% of respondents liked business tycoon Donald Trump. The number 73% is (a) a population. (b) a parameter. (c) a sample. (d) a statistic. (e) an unbiased estimator. 13. The name for the pattern of values that a statistic takes when we sample repeatedly from the same population is (a) the bias of the statistic. (b) the variability of the statistic. (c) the population distribution. (d) the distribution of sample data. (e) the sampling distribution of the statistic. 14. If we take a simple random sample of size n = 500 from a population of size 5,000,000, the variability of our estimate will be (a) much less than the variability for a sample of size n = 500 from a population of size 50,000,000. (b) slightly less than the variability for a sample of size n = 500 from a population of size 50,000,000. (c) about the same as the variability for a sample of size n = 500 from a population of size 50,000,000. (d) slightly greater than the variability for a sample of size n = 500 from a population of size 50,000,000. (e) much greater than the variability for a sample of size n = 500 from a population of size 50,000,000. 15. Increasing the sample size of an opinion poll will (a) reduce the bias of the poll result. (b) reduce the variability of the poll result. (c) reduce the effect of nonresponse on the poll. (d) reduce the variability of opinions. (e) all of the above.

16. The candy machine Suppose a large candy machine has 45% orange candies. Use the following figures to help answer the following questions. (a) Would you be surprised if a sample of 25 candies from the machine contained 8 orange candies (that s 32% orange)? How about 5 orange candies (20% orange)? Explain. (b) Which is more surprising: getting a sample of 25 candies in which 32% are orange or getting a sample of 50 candies in which 32% are orange? Explain. 17. The candy machine Suppose a large candy machine has 45% orange candies. Imagine taking an SRS of 25 candies from the machine and observing the sample proportion p ˆ of orange candies. (a) What is the mean of the sampling distribution of p ˆ? Why? (b) Find the standard deviation of the sampling distribution of ˆ p. Check to see if the 10% condition is met. (c) Is the sampling distribution of ˆ p approximately Normal? Check to see if the Normal condition is met. (d) If the sample size were 50 rather than 25, how would this change the sampling distribution of ˆ p? 18. Airport security The Transportation Security Administration (TSA) is responsible for airport safety. On some flights, TSA officers randomly select passengers for an extra security check before boarding. One such flight had 76 passengers 12 in first class and 64 in coach class. TSA officers selected an SRS of 10 passengers for screening. Let p ˆ be the proportion of first-class passengers in the sample. (a) Is the 10% condition met in this case? Justify your answer. (b) Is the Normal condition met in this case? Justify your answer. 19. Do you drink the cereal milk? A USA Today Poll asked a random sample of 1012 U.S. adults what they do with the milk in the bowl after they have eaten the cereal. Of the respondents, 67% said that they drink it. Suppose that 70% of U.S. adults actually drink the cereal milk. Let p ˆ be the proportion of people in the sample who drink the cereal milk. (a) What is the mean of the sampling distribution of p ˆ? Why? (b) Find the standard deviation of the sampling distribution of ˆ p. Check to see if the 10% condition is met. (c) Is the sampling distribution of ˆ p approximately Normal? Check to see if the Normal condition is met. (d) Find the probability of obtaining a sample of 1012 adults in which 67% or fewer say they drink the cereal milk. Do you have any doubts about the result of this poll?

20. Do you drink the cereal milk? What sample size would be required to reduce the standard deviation of the sampling distribution to one-half the value you found in Exercise 19(b)? Justify your answer. 21. Students on diets A sample survey interviews an SRS of 267 college women. Suppose (as is roughly true) that 70% of college women have been on a diet within the past 12 months. What is the probability that 75% or more of the women in the sample have been on a diet? Follow the four-step process. 7.3 22. On-time shipping Your mail-order company advertises that it ships 90% of its orders within three working days. You select an SRS of 100 of the 5000 orders received in the past week for an audit. The audit reveals that 86 of these orders were shipped on time. (a) If the company really ships 90% of its orders on time, what is the probability that the proportion in an SRS of 100 orders is as small as the proportion in your sample or smaller? Follow the four-step process. (b) A critic says, Aha! You claim 90%, but in your sample the on-time percentage is lower than that. So the 90% claim is wrong. Explain in simple language why your probability calculation in (a) shows that the result of the sample does not refute the 90% claim. MULTIPLE CHOICE: Select the best answer for Exercises 23 to 26, which refer to the following setting. The magazine Sports Illustrated asked a random sample of 750 Division I college athletes, Do you believe performance-enhancing drugs are a problem in college sports? Suppose that 30% of all Division I athletes think that these drugs are a problem. Let p ˆ be the sample proportion who say that these drugs are a problem. 23. The sampling distribution of ˆ p has mean (a) 225. (b) 0.30. (c) 0.017. (d) 0. 24. The standard deviation of the sampling distribution is about (a) 0.0006. (b) 0.033. (c) 0.017. (d) 1. 25. Decreasing the sample size from 750 to 375 would multiply the standard deviation by (a) 2. (b) 2. (c) 1/2. (d) 1/ 2. 26. The sampling distribution of p ˆ is approximately Normal because (a) there are at least 7570 Division I college athletes. (b) np = 225 and n(1 p) = 525. (c) a random sample was chosen. (d) a large sample size like n = 750 guarantees it. (e) the sampling distribution of p ˆ always has this shape.

27. Songs on an ipod David s ipod has about 10,000 songs. The distribution of the play times for these songs is heavily skewed to the right with a mean of 225 seconds and a standard deviation of 60 seconds. Suppose we choose an SRS of 10 songs from this population and calculate the mean play time X of these songs. What are the mean and the standard deviation of the sampling distribution of X? Explain. 28. Songs on an ipod Refer to Exercise 27. How many songs would you need to sample if you wanted the standard deviation of the sampling distribution of X to be 30 seconds? Justify your answer. 29. Larger sample Suppose that the blood cholesterol level of all men aged 20 to 34 follows the Normal distribution with mean µ = 188 milligrams per deciliter (mg/dl) and standard deviation σ = 41 mg/dl. (a) Choose an SRS of 100 men from this population. What is the sampling distribution of X? (b) Find the probability that X estimates µ within ±3 mg/dl. (This is the probability that X takes a value between 185 and 191 mg/dl.) Show your work. (c) Choose an SRS of 1000 men from this population. Now what is the probability that X falls within ±3 mg/dl of µ? Show your work. In what sense is the larger sample better? 30. Bottling cola A bottling company uses a filling machine to fill plastic bottles with cola. The bottles are supposed to contain 300 milliliters (ml). In fact, the contents vary according to a Normal distribution with mean µ = 298 ml and standard deviation σ = 3 ml. (a) What is the probability that an individual bottle contains less than 295 ml? Show your work. (b) What is the probability that the mean contents of six randomly selected bottles is less than 295 ml? Show your work. 31. What does the CLT say? Asked what the central limit theorem says, a student replies, As you take larger and larger samples from a population, the histogram of the sample values looks more and more Normal. Is the student right? Explain your answer. 32. Songs on an ipod Refer to Exercise 27. (a) Explain why you cannot safely calculate the probability that the mean play time X is more than 4 minutes (240 seconds) for an SRS of 10 songs. (b) Suppose we take an SRS of 36 songs instead. Explain how the central limit theorem allows us to find the probability that the mean play time is more than 240 seconds. Then calculate this probability. Show your work. 33. Airline passengers get heavier In response to the increasing weight of airline passengers, the Federal Aviation Administration (FAA) in 2003 told airlines to assume that passengers average 190 pounds in the summer, including clothes and carry-on baggage. But passengers vary, and the FAA did not specify a standard deviation. A reasonable standard deviation is 35 pounds. Weights are not Normally distributed, especially when the population includes both men and women, but they are not very non-normal. A commuter plane carries 30 passengers. (a) Explain why you cannot calculate the probability that a randomly selected passenger weighs more than 200 pounds. (b) Find the probability that the total weight of the passengers on a full flight exceeds 6000 pounds. Show your work. (Hint: To apply the central limit theorem, restate the problem in terms of the mean weight.) 34. More on insurance An insurance company knows that in the entire population of homeowners, the mean annual loss from fire is µ = $250 and the standard deviation of the loss is σ = $300. The distribution of losses is strongly right-skewed: many policies have $0 loss, but a few have large losses. If the company sells 10,000 policies, can it safely base its rates on the assumption that its average loss will be no greater than $275? Follow the four-step process.

MULTIPLE CHOICE: Exercises 35 and 36 refer to the following setting. Scores on the mathematics part of the SAT exam in a recent year were roughly Normal with mean 515 and standard deviation 114. You choose an SRS of 100 students and average their SAT Math scores. Suppose that you do this many, many times. 35. The mean of the average scores you get should be close to (a) 515. (b) 515/100 = 5.15. (c) 515/ 100 = 51.5. (d) 0. 36. The standard deviation of the average scores you get should be close to (a) 114. (b) 114/100 = 1.14. (c) 114/ 100 = 11.4. (d) 1.