The home run percentage is the number of home runs per 100 times at bat. A random sample of 43 professional baseball players gave the following data for home run percentages. 1.6 2.4 1.2 6.6 2.3 0.0 1.8 2.5 6.5 1.8 2.7 2.0 1.9 1.3 2.7 1.7 1.3 2.1 2.8 1.4 3.8 2.1 3.4 1.3 1.5 2.9 2.6 0.0 4.1 2.9 1.9 2.4 0.0 1.8 3.1 3.8 3.2 1.6 4.2 0.0 1.2 1.8 2.4 (a) Use a calculator with mean and standard deviation keys to find x and s. (Round your answers to two decimal places.) x = % s = % (b) Compute a 90% confidence interval for the population mean μ of home run percentages for all professional baseball players. Hint: If you use the Student's t distribution table, be sure to use the closest d.f. that is smaller. (Round your answers to two decimal places.) lower limit % upper limit % (c) Compute a 99% confidence interval for the population mean μ of home run percentages for all professional baseball players. (Round your answers to two decimal places.) lower limit % upper limit % (d) The home run percentages for three professional players are below. Player A, 2.5 Player B, 1.9 Player C, 3.8 Examine your confidence intervals and describe how the home run percentages for these players compare to the population average. A. We can say Player A falls close to the average, Player B is above average, and Player C is below average. B. We can say Player A falls close to the average, Player B is below average, and Player C is above average. C. We can say Player A and Player B fall close to the average, while Player C is above average. D. We can say Player A and Player B fall close to the average, while Player C is below average. (e) In previous problems, we assumed the x distribution was normal or approximately normal. Do we need to make such an assumption in this problem? Why or why not? Hint: Use the central limit theorem. A. Yes. According to the central limit theorem, when n ≥ 30, the x distribution is approximately normal. B. Yes. According to the central limit theorem, when n ≤ 30, the x distribution is approximately normal. C. No. According to the central limit theorem, when n ≥ 30, the x distribution is approximately normal. D. No. According to the central limit theorem, when n ≤ 30, the x distribution is approximately normal.
The home run percentage is the number of home runs per 100 times at bat. A random sample of 43 professional baseball players gave the following data for home run percentages. 1.6 2.4 1.2 6.6 2.3 0.0 1.8 2.5 6.5 1.8 2.7 2.0 1.9 1.3 2.7 1.7 1.3 2.1 2.8 1.4 3.8 2.1 3.4 1.3 1.5 2.9 2.6 0.0 4.1 2.9 1.9 2.4 0.0 1.8 3.1 3.8 3.2 1.6 4.2 0.0 1.2 1.8 2.4 (a) Use a calculator with mean and standard deviation keys to find x and s. (Round your answers to two decimal places.) x = % s = % (b) Compute a 90% confidence interval for the population mean μ of home run percentages for all professional baseball players. Hint: If you use the Student's t distribution table, be sure to use the closest d.f. that is smaller. (Round your answers to two decimal places.) lower limit % upper limit % (c) Compute a 99% confidence interval for the population mean μ of home run percentages for all professional baseball players. (Round your answers to two decimal places.) lower limit % upper limit % (d) The home run percentages for three professional players are below. Player A, 2.5 Player B, 1.9 Player C, 3.8 Examine your confidence intervals and describe how the home run percentages for these players compare to the population average. A. We can say Player A falls close to the average, Player B is above average, and Player C is below average. B. We can say Player A falls close to the average, Player B is below average, and Player C is above average. C. We can say Player A and Player B fall close to the average, while Player C is above average. D. We can say Player A and Player B fall close to the average, while Player C is below average. (e) In previous problems, we assumed the x distribution was normal or approximately normal. Do we need to make such an assumption in this problem? Why or why not? Hint: Use the central limit theorem. A. Yes. According to the central limit theorem, when n ≥ 30, the x distribution is approximately normal. B. Yes. According to the central limit theorem, when n ≤ 30, the x distribution is approximately normal. C. No. According to the central limit theorem, when n ≥ 30, the x distribution is approximately normal. D. No. According to the central limit theorem, when n ≤ 30, the x distribution is approximately normal.
Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018
18th Edition
ISBN:9780079039897
Author:Carter
Publisher:Carter
Chapter10: Statistics
Section10.4: Distributions Of Data
Problem 19PFA
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The home run percentage is the number of home runs per 100 times at bat. A random sample of 43 professional baseball players gave the following data for home run percentages.
| 1.6 | 2.4 | 1.2 | 6.6 | 2.3 | 0.0 | 1.8 | 2.5 | 6.5 | 1.8 |
| 2.7 | 2.0 | 1.9 | 1.3 | 2.7 | 1.7 | 1.3 | 2.1 | 2.8 | 1.4 |
| 3.8 | 2.1 | 3.4 | 1.3 | 1.5 | 2.9 | 2.6 | 0.0 | 4.1 | 2.9 |
| 1.9 | 2.4 | 0.0 | 1.8 | 3.1 | 3.8 | 3.2 | 1.6 | 4.2 | 0.0 |
| 1.2 | 1.8 | 2.4 |
(a) Use a calculator with mean and standard deviation keys to find x and s. (Round your answers to two decimal places.)
(b) Compute a 90% confidence interval for the population mean μ of home run percentages for all professional baseball players. Hint: If you use the Student's t distribution table, be sure to use the closest d.f. that is smaller. (Round your answers to two decimal places.)
(c) Compute a 99% confidence interval for the population mean μ of home run percentages for all professional baseball players. (Round your answers to two decimal places.)
(d) The home run percentages for three professional players are below.
Examine your confidence intervals and describe how the home run percentages for these players compare to the population average.
(e) In previous problems, we assumed the x distribution was normal or approximately normal. Do we need to make such an assumption in this problem? Why or why not? Hint: Use the central limit theorem.
| x = | % |
| s = | % |
(b) Compute a 90% confidence interval for the population mean μ of home run percentages for all professional baseball players. Hint: If you use the Student's t distribution table, be sure to use the closest d.f. that is smaller. (Round your answers to two decimal places.)
| lower limit | % |
| upper limit | % |
(c) Compute a 99% confidence interval for the population mean μ of home run percentages for all professional baseball players. (Round your answers to two decimal places.)
| lower limit | % |
| upper limit | % |
(d) The home run percentages for three professional players are below.
| Player A, 2.5 | Player B, 1.9 | Player C, 3.8 |
A. We can say Player A falls close to the average, Player B is above average, and Player C is below average.
B. We can say Player A falls close to the average, Player B is below average, and Player C is above average.
C. We can say Player A and Player B fall close to the average, while Player C is above average.
D. We can say Player A and Player B fall close to the average, while Player C is below average.
(e) In previous problems, we assumed the x distribution was normal or approximately normal. Do we need to make such an assumption in this problem? Why or why not? Hint: Use the central limit theorem.
A. Yes. According to the central limit theorem, when n ≥ 30, the x distribution is approximately normal.
B. Yes. According to the central limit theorem, when n ≤ 30, the x distribution is approximately normal.
C. No. According to the central limit theorem, when n ≥ 30, the x distribution is approximately normal.
D. No. According to the central limit theorem, when n ≤ 30, the x distribution is approximately normal.
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