Concept explainers
For Exercises 3 through 8, the null hypothesis was rejected. Use the Scheffe test when sample sizes are unequal or the Tukey test when sample sizes are equal, to test the differences between the pairs of means. Assume all variables are normally distributed, samples are independent, and the population variances are equal.
8. Exercise 20 in Section 12-1.
20. Average Debt of College Graduates Kiplinger’s listed the top 100 public colleges based on many factors. From that list, here is the average debt at graduation for various schools in four selected states. At a = 0.05, can it be concluded that the average debt at graduation differs for these four states?
Source: www.Kiplinger.com
To test: The difference between the means.
Answer to Problem 8E
There is significant difference between the means
Explanation of Solution
Given info:
The table shows the average debt at graduation for various schools in four selected states. The level of significance is 0.05.
Calculation:
Consider,
Step-by-step procedure to obtain the test mean and standard deviation using the MINITAB software:
- Choose Stat > Basic Statistics > Display Descriptive Statistics.
- In Variables enter the columns New York, Virginia, California and Pennsylvania.
- Choose option statistics, and select Mean, Variance and N total.
- Click OK.
Output using the MINITAB software is given below:
The sample sizes
The means are
The sample variances are
Here, the samples of sizes of four states are equal. So, the test used here is Tukey test.
Tukey test:
Critical value:
Here, k is 4 and degrees of freedom
Where,
Substitute 20 for N and 4 for k in v
The critical F-value is obtained using the Table N: Critical Values for the Tukey test with the level of significance
Procedure:
- Locate 16 in the column of v of the Table H.
- Obtain the value in the corresponding row below 4.
That is, the critical value is 4.05.
Comparison of the means:
The formula for finding
That is,
Comparison between the means
The hypotheses are given below:
Null hypothesis:
Alternative hypothesis:
Rejection region:
The null hypothesis would be rejected if absolute value greater than the critical value.
Absolute value:
The formula for comparing the means
Substitute 14,395, 14,668 for
Thus, the value of
Hence, the absolute value of
Conclusion:
The absolute value is 0.33.
Here, the absolute value is lesser than the critical value.
That is,
Thus, the null hypothesis is not rejected.
Hence, there is no significant difference between the means
Comparison between the means
The hypotheses are given below:
Null hypothesis:
Alternative hypothesis:
Rejection region:
The null hypothesis would be rejected if absolute value greater than the critical value.
Absolute value:
The formula for comparing the means
Substitute 14,395, 14,275 for
Thus, the value of
Hence, the absolute value of
Conclusion:
The absolute value is 0.15.
Here, the absolute value is lesser than the critical value.
That is,
Thus, the null hypothesis is not rejected.
Hence, there is no significant difference between the means
Comparison between the means
The hypotheses are given below:
Null hypothesis:
Alternative hypothesis:
Rejection region:
The null hypothesis would be rejected if absolute value greater than the critical value.
Absolute value:
The formula for comparing the means
Substitute 14,395, 18,327 for
Thus, the value of
Hence, the absolute value of
Conclusion:
The absolute value is 4.75.
Here, the absolute value is greater than the critical value.
That is,
Thus, the null hypothesis is rejected.
Hence, there is significant difference between the means
Comparison between the means
The hypotheses are given below:
Null hypothesis:
Alternative hypothesis:
Rejection region:
The null hypothesis would be rejected if absolute value greater than the critical value.
Absolute value:
The formula for comparing the means
Substitute 14,668 and 14,275 for
Thus, the value of
Hence, the absolute value of
Conclusion:
The absolute value is 0.48.
Here, the absolute value is lesser than the critical value.
That is,
Thus, the null hypothesis is rejected.
Hence, there is no significant difference between the means
Comparison between the means
The hypotheses are given below:
Null hypothesis:
Alternative hypothesis:
Rejection region:
The null hypothesis would be rejected if absolute value greater than the critical value.
Absolute value:
The formula for comparing the means
Substitute 14,668 and 18,327 for
Thus, the value of
Hence, the absolute value of
Conclusion:
The absolute value is 4.42.
Here, the absolute value is greater than the critical value.
That is,
Thus, the null hypothesis is rejected.
Hence, there is significant difference between the means
Comparison between the means
The hypotheses are given below:
Null hypothesis:
Alternative hypothesis:
Rejection region:
The null hypothesis would be rejected if absolute value greater than the critical value.
Absolute value:
The formula for comparing the means
Substitute 14,275 and 18,327 for
Thus, the value of
Hence, the absolute value of
Conclusion:
The absolute value is 4.90.
Here, the absolute value is greater than the critical value.
That is,
Thus, the null hypothesis is rejected.
Hence, there is significant difference between the means
Justification:
Here, there is significant difference between the means
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