9: Related Samples t-Tests

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Page ID: 42045

Linda R. Cote, Rupa G. Gordon, Chrislyn E. Randell, Judy Schmitt, and Helena Marvin
University of Missouri System

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9.1: Changes and Differences
This page analyzes the change in data over time, focusing on how a variable's value alters between two time points for the same individuals. It emphasizes the calculation of difference scores to assess improvement, using employee training scores as an example. The analysis involves related samples—referred to as paired samples or repeated measures. The mechanics of hypothesis testing remain consistent, provided the hypotheses are correctly formatted for these difference scores.
9.2: Hypotheses about Changes and Differences
This page discusses the application of difference scores in research on change, focusing on the null hypothesis (H0) that asserts no change, reflected in average change score (μD) being zero. Alternative hypotheses (HA) suggest potential increases, decreases, or any change. It outlines the determination of critical values and decision criteria for hypothesis testing based on significance levels, directionality, and degrees of freedom, consistent with procedures from earlier sections.
9.3: Related Samples t-Statistic
This page explains how to calculate a test statistic for change scores in a dependent samples t-test, comparing it to a one-sample t-test. It outlines the steps for computing the mean of difference scores, standard deviation, standard error, and t statistic using specific formulas. Emphasizing consistency in calculation methods for both tests, it includes an example for illustration and highlights notation differences from a video resource.
9.4: Example Related Samples t-Tests
This page discusses two statistical analyses: one assessing employee satisfaction in a company through a t-test, showing significant improvement, and another evaluating a bank's commercial impact, yielding no significant change in public perception. It also details a 90% confidence interval calculation suggesting the null hypothesis cannot be rejected, indicating that the average change in opinion after viewing the commercial is not statistically significant.

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