- Complete a two-sample [latex]t[/latex]-test for dependent population means from hypotheses to conclusions
Hypothesis Testing for Dependent Samples (continued)
The third step in hypothesis testing is to calculate a test statistic, which we will utilize to find the P-value, write a conclusion, and make an inference about the population.
test statistic ([latex]t[/latex])
The notations for the summary statistics used to compare paired populations/samples are shown in the following table. We will use [latex]d[/latex] to represent the difference variable.
| Summary Statistics | Notation |
| Population Mean of Difference | [latex]\mu_d[/latex] |
| Sample Mean of Difference | [latex]\bar{d}[/latex] |
| Population Standard Deviation of Difference | [latex]\sigma_d[/latex] |
| Sample Standard Deviation of Difference | [latex]s_d[/latex] |
The test statistic for the dependent (paired) t-test is calculated using the following formulas:
[latex]\text{standard error of the difference}=\dfrac{s_d}{\sqrt{n}}[/latex]
[latex]\text{test statistic }(t)=\dfrac{\text{estimator - null value}}{\text{standard error of estimator}}=\dfrac{\bar{d}-\text{null value}}{\text{standard error of difference}}[/latex]
Step 1: Click on the tab Two Dependent Samples.
Step 2: In the “Dataset” drop-down menu, choose “Reaction Times (Paired Experiment).”
Step 3: In the left column, go to the drop-down menu for “Type of Inference” and select “Significance Test.”
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Take advantage of the statistical tool to calculate the standard deviation of the difference in the sample means.