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Chapter 10: Q. 10.146 (page 445)

Suppose that you want to perform a hypothesis test to compare the means of two populations, using a paired sample. For each part, decide whether you would use the paired t-test, the paired Wilcoxon signed-rank test, or neither of these tests if preliminary data analyses of the sample of paired differences suggest that the distribution of the paired-difference variable is

a. uniform.

b. neither symmetric nor normal; the sample size is 132.

c. moderately skewed but otherwise roughly bell-shaped.

Short Answer

Expert verified

a) The Wilcoxon signed-rank test is utilised.

b) Neither the paired t-test nor the Wilcoxon signed-rank test is appropriate.

c) The paired ttest is performed

Step by step solution

01

Part (a) Step 1: Given Information

Given in the question that, the sample is uniform.

We have to decide Whether paired t-test, paired Wilcoxon signed-rank test or neither of the tests is used.

02

Part(a) Explanation: Step 2

Because the sample is drawn from a simple random paired sample to compare the means of two populations, and the paired-difference variable follows a uniform distribution rather than a normal distribution.

03

Part(b) Step 1: Given Information : Step 1

Given in the question that, the sample is neither symmetric nor normal; the sample size is 132.

We have to decide whether paired t-test, paired Wilcoxon signed-rank test, or neither of the tests is used.

04

Part(b) Explanation : Step 2

The distribution of the paired difference variable is not symmetric, according to preliminary data studies, and sample size 132 is utilised for neither test since the data are not symmetric.

05

Part(c) Step 1: Given Information

Given in the question that, the sample is moderately skewed but otherwise roughly bell-shaped.

We have to decide whether paired t-test paired Wilcoxon signed-rank test or neither of the test is used.

06

Part (c) Step 2: Explanation

The distribution of the paireddifference variable appears to be highly skewed but generally bell-shaped, according to preliminary data analysis of the sample of pair differences. The paired t-test is performed because the data follows an almost normal distribution and the sample is taken from a simple random paired sample to evaluate the means of two populations.

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Most popular questions from this chapter

Wing Length. Refer to Exercise 10.86 and find a 999 con fidence interval for the difference between the mean wing lengths o the two subspecies.

A variable of two populations has a mean of 7.9and a standard deviation of 5.4for one of the populations and a mean of 7.1and a standard deviation of 4.6for the other population. Moreover. the variable is normally distributed in each of the two populations.

a. For independent samples of sizes 3and 6, respectively, determine the mean and standard deviation of x1-x2.

b. Can you conclude that the variable x1-x2is normally distributed? Explain your answer.

c. Determine the percentage of all pairs of independent samples of sizes 4and 16, respectively, from the two populations with the property that the differencex1-x2 between the simple means is between -3and 4.

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In this section, we introduced the pooled t-test, which provides a method for comparing two population means. In deriving the pooled f-test, we stated that the variable

z=f^1-x^2-μ1-μ2σ1/n1+1/n2

cannot be used as a basis for the required test statistic because σ is unknown. Why can't that variable be used as a basis for the required test statistic?

In this Exercise, we have provided summary statistics for independent simple random samples from two populations. In each case, use the pooled t-lest and the pooledt-interval procedure to conduct the required hypothesis test and obtain the specified confidence interval.
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a. Right-tailed test, α=0.05

b. 90%confidence interval
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