In this problem, assume that the distribution of differences is approximately normal. Note: For degrees of freedom d.f. not in the Student's t table, use the closest d.f. that is smaller. In some situations, this choice of d.f. may increase the P-value by a small amount and therefore produce a slightly more "conservative" answer. Are America's top chief executive officers (CEOS) really worth all that money? One way to answer this question is to look at row B, the annual company percentage increase in revenue, versus row A, the CEO's annual percentage salary increase in that same company. Suppose a random sample of companies yielded the following data: B. Percent increase 24 18 20 for company A: Percent increase for CEO USE SALT 27 test statistic = critical value = + 25 19 18 14 6 -4 4 19 21 37 15 30 Do these data indicate that the population mean percentage increase in corporate revenue (row B) is different from the population mean percentage increase in CEO salary? Use a 5% level of significance. Solve the problem using the critical region method of testing. (Let d= B- A. Round your answers to three decimal places.) Interpret your conclusion in the context of the application. Fail to reject the null hypothesis, there is sufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Reject the null hypothesis, there is insufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Reject the null hypothesis, there is sufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Fail to reject the null hypothesis, there is insufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Compare your conclusion with the conclusion obtained by using the P-value method. Are they the same? We reject the null hypothesis using the P-value method, but fail to reject using the critical region method. We reject the null hypothesis The conclusions obtained by using both methods are the same. using the critical region method, but fail to reject using the P-value method.

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16 In this problem, assume that the distribution of differences is approximately normal. Note: For degrees of freedom d.f. not in the Student's ttable, use the closest d. f. that is smaller. In some situations, this choice of d.f. may increase the P-value by a small amount and therefore produce a slightly more "conservative" answer. Are America's top chief executive officers (CEOS) really worth all that money? One way to answer this question is to look at row B, the annual company percentage increase in revenue, versus row A, the CEO's annual percentage salary increase in that same company. Suppose a random sample of companies yielded the following data: B. Percent increase 24 18 20 for company A: Percent increase for CEO USE SALT 27 25 test statistic = critical value = + 19 18 14 6 4 19 21 37 15 30 r Do these data indicate that the population mean percentage increase in corporate revenue (row B) is different from the population mean percentage increase in CEO salary? Use a 5% level of significance. Solve the problem using the critical region method of testing. (Let d= B- A. Round your answers to three decimal places.) Interpret your conclusion in the context of the application. Fail to reject the null hypothesis, there is sufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Reject the null hypothesis, there is insufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Reject the null hypothesis, there is sufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Fail to reject the null hypothesis, there is insufficient evidence to claim a difference in population mean percentage increases for corporate revenue and CEO salary. Compare your conclusion with the conclusion obtained by using the P-value method. Are they the same? We reject the null hypothesis using the P-value method, but fail to reject using the critical region method. We reject the null hypothesis The conclusions obtained by using both methods are the same. using the critical region method, but fail to reject using the P-value method.

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15 Using techniques from an earlier section, we can find a confidence interval for μd. Consider a random sample of n matched data pairs A, B. Let d= B - A be a random variable representing the difference between the values in a matched data pair. Compute the sample mean d of the differences and the sample standard deviation Sd. If d has a normal distribution or is mound- shaped, or if n ≥ 30, then a confidence interval for LL is as follows. d-E< <d+ E where E = te Sd √n c= confidence level (0 <c< 1) te = critical value for confidence level cand d.f. = n-1 B: Percent increase for company A: Percent increase for CEO USE SALT 20 16 28 18 6 4 21 37 30 26 24 14 upper limit -4 19 15 30 (a) Using the data above, find a 95% confidence interval for the mean difference between percentage increase in company revenue and percentage increase in CEO salary. (Round your answers to two decimal places.) lower limit (b) Use the confidence interval method of hypothesis testing to test the hypothesis that population mean percentage increase in company revenue is different from that of CEO salary. Use a 5% level of significance. Since μ = 0 from the null hypothesis is in the 95% confidence interval, reject H at the 5% level of significance. The data do not indicate a difference in population mean percentage increases between company revenue and CEO salaries. Since μ = 0 from the null hypothesis is in the 95% confidence interval, do not reject Ho at the 5% level of significance. The data do not indicate a difference in population O mean percentage increases between company revenue and CEO salaries. Since μ = 0 from the null hypothesis is not in the 95% confidence interval, reject Ho at the 5% level of significance. The data indicate a difference in population mean percentage increases between company revenue and CEO salaries. Since μ = 0 from the null hypothesis is not in the 95% confidence interval, do not reject Ho at the 5% level of significance. The data indicate a difference in population mean percentage increases between company revenue and CEO salaries.