Deck 21: Nonparametric Techniques

A non-parametric test is one that makes no assumptions about the specific shape of the population from which a sample is drawn.

The Friedman test statistic is approximately chi-squared distributed with (k - 1) degrees of freedom, provided that either the number of blocks b or the number of treatments k is greater than or equal to 5.

The z-test approximation to the Wilcoxon rank sum test for two independent samples requires that at least one of the two sample sizes exceed 10.

The Wilcoxon signed rank sum test is applied to compare two populations when the samples are matched pairs and the data are interval but not normally distributed.

A Wilcoxon rank sum test for comparing two independent samples involves two samples of sizes 5 and 8. The alternative hypothesis is that the location of population 1 is different from the location of population 2. Using the 0.10 significance level, the appropriate critical values are 21 and 49.

The Wilcoxon signed rank sum test is the nonparametric counterpart of the t-test of µ_D.

The Kruskal-Wallis test can be used to determine whether a difference exists between two populations. However, to determine whether one population location is larger than another, we must apply the Wilcoxon rank sum test.

The sign test and the Wilcoxon signed rank sum test require matched pairs.

A Wilcoxon rank sum test for comparing two independent samples involves two samples of sizes 6 and 9. The alternative hypothesis is that the location of population 1 is to the left of the location of population 2. Using the 0.05 significance level, the appropriate critical values are 31 and 65.

The Kruskal-Wallis test requires independent sample.

The Friedman test is the non-parametric counterpart of the randomised block experimental design of the analysis of variance.

In a normal approximation to the sign test, the standardised test statistic is calculated as z = 2.07. If the alternative hypothesis states that the location of population 1 is to the right of the location of population 2, then the p-value of the test is 0.0192.

The Kruskal-Wallis test uses the Chi-squared distribution.

The critical value is taken from the t-distribution whenever the test is a Kruskal-Wallis test.

A two-independent-sample t-test corresponds to a Wilcoxon signed rank sum test for paired samples.

The Wilcoxon rank sum test for independent samples actually tests whether the population distributions are identical.

A Wilcoxon rank sum test for comparing two populations involves two independent samples of sizes 15 and 20. The value of the unstandardised test statistic is T = 225. The value of the standardised test statistic is z = -1.50.

A one-sample t-test is the parametric counterpart of the Friedman test for randomised block experimental design.

In a Wilcoxon rank sum test for independent samples, the two sample sizes are 4 and 6, and the value of the Wilcoxon test statistic is T = 25. If the test is two-tailed and the level of significance is 0.05, then the null hypothesis will be rejected.

In a normal approximation to the Wilcoxon rank sum test, the standardised test statistic is calculated as z = 1.96. For a two-tailed test, the p-value is 0.025.

The Kruskal-Wallis test is applied to compare two or more populations when the samples are independent and the data are ordinal or numerical and non-normal.

Radio advertising is big business, second only to television advertising. The objective for radio advertisements is to get listeners to remember as much as possible about the product/service being advertised. The advertising executive of a large company must decide between two pitched radio advertisements for their company. In order to ascertain the general public's perception, 12 randomly chosen people are selected to listen to both potential advertisements and are then asked a series of 5 questions regarding the radio advertisement's content. The number of correct responses are recorded and listed below. Assume that responses are non-normal. a. Which test is appropriate for this situation?
b. Do these data provide enough evidence at the 5% significance level to conclude that the two radio advertisements differ?

Use the 5% significance level to test the hypotheses. The two population locations are the same The two population locations are different,
given that the data below are drawn from a matched pair experiment.

One of the required conditions of the sign test is that the number of nonzero differences n must be smaller than or equal to 10.

The Wilcoxon rank sum test is used to compare two populations when the samples are independent and the data are either ordinal or interval but not normally distributed.

We can use the Friedman test to determine whether two populations differ. The conclusion will be the same as that produced by the sign test.

In testing the hypotheses: The two population locations are the same The two population locations are different,
with data drawn from two independent samples, the following statistics are calculated: , , , .
a. Which test is used for testing the hypotheses above?
b. What is the p-value of this test?

The following data were generated from a randomised blocked experiment. Conduct a Friedman test at the 5% significance level to determine if at least two population locations differ.

Perform the Wilcoxon signed rank sum test for the following matched pairs to determine at the 10% significance level whether the two population locations differ.

In testing the hypotheses
H₀: The two population locations are the same
H₁: The location of population A is to the left of the location of population B,
with data drawn from two independent samples, the following statistics are calculated: , , , .
a. Which test is used for testing the hypotheses above?
b. What is the p-value of this test?

Use the 5% significance level to test the hypotheses. $H _ { 0 } :$ The two population locations are the same $H _ { 1 } :$ The location of population A is to the left of the location of population B,
given that the data below are drawn from a matched pairs experiment. $$\begin{array} { | c | c | c | c | c | c | c | c | c | } \hline \text { Matched Pair } & 1 & 2 & 3 & 4 & 5 & 6 & 7 & 8 \\\hline \text { A } & 8 & 10 & 11 & 7 & 6 & 7 & 13 & 10 \\\hline \text { B } & 6 & 9 & 12 & 10 & 12 & 10 & 5 & 8 \\\hline\end{array}$$

Given the following statistics from a matched pairs experiment, perform the Wilcoxon signed rank sum test to determine whether we can infer at the 10% significance level that the two population locations differ. , n = 50

The Friedman test is employed to compare two or more populations when the data are generated from a matched pairs experiment, and are either ordinal or interval but not normally distributed.

We can use the Friedman test to determine whether a difference exists between two populations. However, if we want to determine whether one population location is larger than another, we must use the sign test.

The following data represent the test scores of eight students on a statistics test before and after attending extra help sessions for the test. Uses the Wilcoxon signed rank sum test to determine at the 5% significance level whether the extra help sessions have been effective.

Given the following statistics, use the Wilcoxon rank sum test to determine at the 5% significance whether the location of population A is to the right of the location of population B. , , , .

Use the Wilcoxon rank sum test on the data below to determine at the 5% significance level whether the location of population A is to the left of the location of population B.

Each year the personnel department in a large corporation assesses the performance of all of its employees. Each employee is rated for various aspects of his or her job on a 7-point scale where
1 = very unsatisfactory and 7 = satisfactory. The president of the company believes that the assessment scores this year are lower than last year's. To examine the validity of this belief, she draws a random sample of six employees' scores from last year and another six employees' scores this year. Do the data listed below allow the president to conclude at the 5% significance level that her belief is correct?

A matched pairs experiment yielded the following results:
Number of positive differences = 18, number of negative differences = 7, number of zero differences = 3.
Can we infer at the 5% significance level that the location of population 1 is to the right of the location of population 2?

The Kruskal-Wallis test can be used to test for a difference between two populations. It will produce the same outcome as the two-tailed Wilcoxon rank sum test.

The sign test is employed to compare two populations when the experimental design is matched pairs, and the data are ordinal but not normally distributed.