TEST OF HYPOTHESIS FOR THE DIFFERENCE BETWEEN POPULATION MEANS (PAIRED EXPERIMENTS)
Null & Alternative Hypothesis |
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Significance Level Of the Test |
a |
a |
a |
Test Statistics
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p-value |
Table VI with d.f.= |
Table VI with d.f.= |
Table VI with d.f.= |
Decision |
ACTIVITY
Eight pairs of slow learners with similar reading IQs are found, one member of each pair is randomly assigned to the standard teaching method while the other is assigned to the new method. The data given in the following table.
Pair
|
New Method
(1)
|
Standard Method
(2)
|
1
|
77
|
72
|
2
|
74
|
68
|
3
|
82
|
76
|
4
|
73
|
68
|
5
|
87
|
84
|
6
|
69
|
68
|
7
|
66
|
61
|
8
|
80
|
76
|
a. Use the data in the table to test the claim that these two methods produces different student learning outcome. Use a significance level of 0.05.
The output will include: Sample size, Mean difference, and Standard deviation of the difference, a 95% confidence interval for the population mean difference and the results of the test.
Report the p-value and interpret.
b. Do the data support the hypothesis that the population maen reading score for slow learners taught by the new method is greater than the mean reading score for those taught by the standard method? Use the significance level of 0.01.
The output will include: Sample size, Mean difference, and Standard deviation of the difference, a 99% confidence interval for the population mean difference and the results of the test.
Report the p-value of the test and present your conclusion.