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
? 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
? 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, 2.3 | Player C, 3.8 |
Examine your confidence intervals and describe how the home run percentages for these players compare to the population average.
We can say Player A falls close to the average, Player B is above average, and Player C is below average.We can say Player A falls close to the average, Player B is below average, and Player C is above average. We can say Player A and Player B fall close to the average, while Player C is above average.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.
Yes. According to the central limit theorem, when n ? 30, the x distribution is approximately normal.Yes. According to the central limit theorem, when n ? 30, the x distribution is approximately normal. No. According to the central limit theorem, when n ? 30, the x distribution is approximately normal.No. According to the central limit theorem, when n ? 30, the x distribution is approximately normal.
(a)
Mean x = 2.293 %
Standard deviation s = 1.40%
(b)
90% confidence intervla = x +- t42,0.10 * s/sqrt(n)
= 2.293 +- 1.68195 * 1.40/sqrt(43)
= (1.93%, 2.65%)
(c) 99% confidence intervla = x +- t42,0.01 * s/sqrt(n)
= 2.293 +- 2.698 * 1.40/sqrt(43)
= (1.72%, 2.87%)
(d)We can say Player A and Player B fall close to the average, while Player C is above average. Option C is correct.
(e) Yes. According to the central limit theorem, when n > 30, the x distribution is approximately normal
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