A simple random sample of size n = 49 is obtained from a population with / (a) Describe the sampling distribution of /. (b) What is / (c) What is / (d) What is /
> A simple random sample of size n = 1000 is obtained from a population whose size is N = 1,000,000 and whose population proportion with a specified characteristic is p = 0.35. (a) Describe the sampling distribution of /. (b) What is the probability of o
> A simple random sample of size n = 200 is obtained from a population whose size is N = 25,000 and whose population proportion with a specified characteristic is p = 0.65. (a) Describe the sampling distribution of /. (b) What is the probability of obtaini
> A simple random sample of size n = 75 is obtained from a population whose size is N = 10,000 and whose population proportion with a specified characteristic is p = 0.8. (a) Describe the sampling distribution of /. (b) What is the probability of obtaining
> n = 1010, p = 0.84
> n = 1000, p = 0.103
> n = 300, p = 0.7
> n = 500, p = 0.4
> What happens to the standard deviation of / as the sample size increases? If the sample size is increased by a factor of 4, what happens to the standard deviation of /?
> Describe the circumstances under which the shape of the sampling distribution of / is approximately normal.
> True or False: The mean of the sampling distribution of / is p.
> The Future Government Club wants to sponsor a panel discussion on the upcoming national election. The club wants to have four of its members lead the panel discussion. To be fair, however, the panel should consist of two Democrats and two Republicans. Fr
> True or False: The population proportion and sample proportion always have the same value.
> True or False: The distribution of the sample mean, /, will be approximately normally distributed if the sample is obtained from a population that is normally distributed, regardless of the sample size.
> The standard deviation of the sampling distribution of / is called the ____ ____of the____.
> Suppose a simple random sample of size is drawn from a large population with mean and standard deviation . The sampling distribution of / and standard deviation /
> The of the sample mean, /, is the probability distribution of all possible values of the random variable / computed from a sample of size n from a population with mean and standard deviation
> A bull market is defined as a market condition in which the price of a security rises for an extended period of time. A bull market in the stock market is often defined as a condition in which a market rises by 20% or more without a 20% decline. The data
> Suppose you want to study the number of hours of sleep full-time college students at your college get each evening. To do so, you obtain a list of full-time students at your college, obtain a simple random sample of ten students, and ask each of them to
> Suppose you want to study the number of hours of sleep you get each evening. To do so, you look at the calendar and randomly select 10 days out of the next 300 days and record the number of hours you sleep. (a) Explain why number of hours of sleep in a n
> Suppose Jack and Diane are each using simulation to describe the sampling distribution from a population that is skewed left with mean 50 and standard deviation 10. Jack obtains 1000 random samples of size n = 3 from the population, finds the mean of the
> For the three probability distributions shown, rank each distribution from lowest to highest in terms of the sample size required for the distribution of the sample mean to be approximately normally distributed. Justify your choice.
> A quality-control expert wishes to obtain a cluster sample by selecting 10 of 795 clusters. She numbers the clusters from 1 to 795. Using Table I from Appendix A, she closes her eyes and drops a pencil on the table. It points to the digit in row 8, colum
> Number on a football player’s jersey
> Without doing any computation, decide which has a higher probability, assuming each sample is from a population that is normally distributed with = 100 and = 15. Explain your reasoning. (a) /for a random sample of size n = 10. (b) /for a random sampl
> We assume that we are obtaining simple random samples from infinite populations when obtaining sampling distributions. If the size of the population is finite, we technically need a finite population correction factor. However, if the sample size is smal
> State the Central Limit Theorem.
> Explain what a sampling distribution is.
> In the game of roulette, a wheel consists of 38 slots numbered 0, 00, 1, 2, . . . , 36. (See the photo.) To play the game, a metal ball is spun around the wheel and is allowed to fall into one of the numbered slots. If the number of the slot the ball fal
> Bicycle sharing exists in a variety of cities around the country. Los Angeles has the Metro Bike Share system. Users pick up a bike from one station, go for a ride, and return the bike to any station. Go to www.pearsonhighered.com/sullivanstats and downl
> The data set “Tornadoes_2017” located at www.pearsonhighered.com/sullivanstats contains a variety of variables that were measured for all tornadoes in the United States in 2017. (a) Draw a relative histogram of the variable “Length.” Describe the shape o
> The following data represent the running lengths (in minutes) of the winners of the Academy Award for Best Picture for the years 2012–2017. (a) Compute the population mean, . (b) List all possible samples with size n = 2. There should be 6C2 = 15 sample
> The following data represent the ages of the winners of the Academy Award for Best Actor for the years 2012–2017. (a) Compute the population mean, . (b) List all possible samples with size n = 2. There should be 6C2 = 15 samples. (c) Construct a samplin
> According to Crown ATM Network, the mean ATM withdrawal is $67. Assume that the standard deviation for withdrawals is $35. (a) Do you think the variable “ATM withdrawal” is normally distributed? If not, what shape would you expect the variable to have? (
> A salesperson obtained a systematic sample of size 20 from a list of 500 clients. To do so, he randomly selected a number from 1 to 25, obtaining the number 16. He included in the sample the 16th client on the list and every 25th client thereafter. List
> The amount of time Americans spend watching television is closely monitored by firms such as AC Nielsen because this helps determine advertising pricing for commercials. (a) Do you think the variable “weekly time spent watching television” would be norma
> Suppose that cars arrive at Burger King’s drive-thru at the rate of 20 cars every hour between 12:00 noon and 1:00 P.M. A random sample of 40 one- hour time periods between 12:00 noon and 1:00 P.M. is selected and has 22.1 as the mean number of cars arri
> The Food and Drug Administration sets Food Defect Action Levels (FDALs) for some of the various foreign substances that inevitably end up in the food we eat and liquids we drink. For example, the FDAL for insect filth in peanut butter is 3 insect fragmen
> The quality-control manager of a Long John Silver’s restaurant wants to analyze the length of time that a car spends at the drive-thru window waiting for an order. It is determined that the mean time spent at the window is 59.3 seconds with a standard de
> The shape of the distribution of the time required to get an oil change at a 10-minute oil-change facility is skewed right. However, records indicate that the mean time for an oil change is 11.4 minutes, and the standard deviation for oil-change time is
> A very good poker player is expected to earn $1 per hand in $100/$200 Texas Hold’em. The standard deviation is approximately $32. (a) What is the probability a very good poker player earns a profit (more than $0) after playing 50 hands in $100/$200 Texas
> The S&P 500 is a collection of 500 stocks of publicly traded companies. Using data obtained from Yahoo! Finance, the monthly rates of return of the S&P 500 since 1950 are approximately normal. The mean rate of return is 0.007233 (0.7233%), and the standa
> The most famous geyser in the world, Old Faithful in Yellowstone National Park, has a mean time between eruptions of 85 minutes. If the interval of time between eruptions is approximately normal with standard deviation 21.25 minutes, answer the following
> The reading speed of second-grade students is approximately normal, with a mean of 90 words per minute (wpm) and a standard deviation of 10 wpm. (a) What is the probability a randomly selected student will read more than 95 words per minute? (b) What is
> The upper leg length of 20- to 29-year-old males is approximately normal with a mean length of 43.7 cm and a standard deviation of 4.2 cm. Source: “Anthropometric Reference Data for Children and Adults: U.S. Population, 1999–2002”; Volume 361, July 7, 20
> 24 Hour Fitness wants to administer a satisfaction survey to its current members. Using its membership roster, the club randomly selects 40 club members and asks them about their level of satisfaction with the club.
> The length of human pregnancies is approximately normal with mean = 266 days and standard deviation = 16 days. (a) What is the probability a randomly selected pregnancy lasts less than 260 days? (b) Suppose a random sample of 20 pregnancies is obtain
> A simple random sample of size n = 20 is obtained from a population with = 64 and = 17. (a) What must be true regarding the distribution of the population in order to use the normal model to compute probabilities involving the sample mean? Assuming t
> A simple random sample of size n = 12 is obtained from a population with = 64 and = 17. (a) What must be true regarding the distribution of the population in order to use the normal model to compute probabilities involving the sample mean? Assuming t
> A simple random sample of size n = 36 is obtained from a population with = 64 and = 18. (a) Describe the sampling distribution of /. (b) What is / (c) What is / (d) What is /
> Answer the following questions for the sampling distribution of the sample mean shown to the right. (a) What is the value of / (b) What is the value of / (c) If the sample size is n = 9,what is likely true about the shape of the population? (d) If the
> Answer the following questions for the sampling distribution of the sample mean shown to the right. (a) What is the value of / (b) What is the value of / (c) If the sample size is n = 16, what is likely true about the shape of the population? (d) If the
> = 27, = 6, n = 15
> = 52, = 10, n = 21
> = 64, = 18, n = 36
> To determine his DSL Internet connection speed, Shawn divides up the day into four parts: morning, midday, evening, and late night. He then measures his Internet connection speed at 5 randomly selected times during each part of the day.
> = 80 = 14, n = 49
> A simple random sample of size n = 40 is obtained from a population with = 50 and = 4. Does the population need to be normally distributed for the sampling distribution of / to be approximately normally distributed? Why? What is the sampling distribu
> A simple random sample of size n = 10 is obtained from a population that is normally distributed with = 30 and = 8. What is the sampling distribution of /?
> True or False: To cut the standard error of the mean in half, the sample size must be doubled.
> True or False: The distribution of the sample mean, /, will be approximately normally distributed if the sample is obtained from a population that is not normally distributed, regardless of the sample size.
> Suppose X is a binomial random variable. To approximate /
> When adding or subtracting 0.5 from x, we are making a correction for_____.
> In a binomial experiment with n trials and probability of success p, if_____ , the binomial random variable X is approximately normal with /
> According to a USA Today “Snapshot,” 3% of Americans surveyed lie frequently. You conduct a survey of 500 college students and find that 20 of them lie frequently. (a) Compute the probability that, in a random sample of 500 college students, at least 20
> In a Pew Research poll, 42% of adult Americans had a positive view of socialism. You conduct a survey of 200 randomly selected students at your school and find that 103 have a positive view of socialism. (a) Approximate the probability that, in a random
> The presider of a guest-lecture series at a university stands outside the auditorium before a lecture begins and hands every fifth person who arrives, beginning with the third, a speaker evaluation survey to be completed and returned at the end of the pr
> According to the Current Population Survey (Internet release date: September 15, 2004), 46% of females between the ages of 18 and 24 years lived at home in 2003. (Unmarried college students living in a dorm are counted as living at home.) Suppose a surve
> According to the Current Population Survey (Internet release date: September 15, 2004), 55% of males between the ages of 18 and 24 years lived at home in 2003. (Unmarried college students living in a dorm are counted as living at home.) Suppose a survey
> According to a study done by Nick Wilson of Otago University Wellington, the probability a randomly selected individual will not cover his or her mouth when sneezing is 0.267. Suppose you sit on a bench in a mall and observe 300 randomly selected individ
> In the Healthy Handwashing Survey conducted by Bradley Corporation, it was found that 64% of adult Americans operate the flusher of toilets in public restrooms with their foot. Suppose you survey a random sample of 740 adult American women aged 18–24 yea
> In a recent poll, the Gallup Organization found that 45% of adult Americans believe that the overall state of moral values in the United States is poor. Suppose a survey of a random sample of 500 adult Americans is conducted in which they are asked to di
> According to American Airlines, Flight 215 from Orlando to Los Angeles is on time 90% of the time. Randomly select 150 flights and use the normal approximation to the binomial to (a) approximate the probability that exactly 130 flights are on time. (b) a
> n = 85, p = 0.8, x = 70
> n = 75, p = 0.75, x = 60
> n = 100, p = 0.05, x = 50
> n = 40, p = 0.25, x = 30
> A survey regarding download time on a certain website is administered on the Internet by a market research firm to anyone who would like to take it.
> n = 80, p = 0.15, x = 18
> n = 60, p = 0.4, x = 20
> The probability that fewer than 35 people support the privatization of Social Security
> The probability that no more than 500 adult Americans support a bill proposing to extend daylight savings time
> The probability that fewer than 40 households have a pet
> The probability that more than 20 people want to see the marriage tax penalty abolished
> The probability that the number of tornadoes that occur in the month of May is between 30 and 40, inclusive
> The probability that the number of people with blood type O-negative is between 18 and 24, inclusive
> The probability that exactly 12 students pass the course
> The probability that exactly eight defective parts are in the shipment
> A college official divides the student population into five classes: freshman, sophomore, junior, senior, and graduate student. The official takes a simple random sample from each class and asks the members’ opinions regarding student services.
> The probability no more than 20 people want to see Roe v. Wade overturned
> The probability that at least 40 households have a gas stove
> Suppose X is a binomial random variable. To approximate /
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> True or False: A normal score is the expected z-score of a data value, assuming the distribution of the random variable is normal.
> A_____ ____ ______ is a graph that plots observed data versus normal scores.
> Retrieve the data 7_3_13 at www.pearsonhighered.com/sullivanstats using the file format of your choice for the text you are using. The data represent the time spent waiting in line (in minutes) for the Dinosaur Ride at Walt Disney World for 100 randomly
> A random sample of college students aged 18–24 years was obtained, and the number of hours of television watched in a typical week was recorded. (a) Draw a normal probability plot to determine if the data could have come from a normal distribution. (b) D
> A farmer divides his orchard into 50 subsections, randomly selects 4, and samples all the trees within the 4 subsections to approximate the yield of his orchard.
> In a 1998 advertising campaign, Nabisco claimed that every 18-ounce bag of Chips Ahoy! cookies contained at least 1000 chocolate chips. Brad Warner and Jim Rutledge tried to verify the claim. The following data represent the number of chips in an 18-ounc
