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More on ANOVA
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Overview ANOVA as Regression Comparison Methods
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ANOVA AS REGRESSION Predict scores on Y (the DV) Predictors are dummy variables indicating group membership
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Dummy Variables Group membership is categorical Need one less dummy variable than the number of groups If you are in the group, your score on that dummy variable = 1 If you are not in that group, your score on that dummy variable = 0
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Example of Dummy Variables for Three Groups X1X1 X2X2 Group 110 Group 201 Group 300
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Regression Equation for ANOVA b o is mean of base group b 1 and b 2 indicate differences between base group and each of the other two groups
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COMPARISON METHODS A significant F-test tells you that the groups differ, but not which groups. Multiple comparison methods provide specific comparisons of group means.
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Planned Contrasts Decide which groups (or combinations) you wish to compare before doing the ANOVA. The comparisons must be orthogonal to each other (statistically independent).
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Choosing Weights Assign a weight to each group. The weights have to add up to zero. Weights for the two sides must balance. Check for orthogonality of each pair of comparisons.
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Example of a Planned Comparison GroupWeight Placebo+2 Treatment A-1 Treatment B-1 This compares the average of Treatments A and B to the Placebo mean.
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Another Planned Comparison GroupWeight Placebo 0 Treatment A-1 Treatment B +1 This one leaves out the Placebo group and compares the two treatments.
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Check for Orthogonality GroupC 1C 2 Placebo+20 Treatment A-1-1 Treatment B-1 +1 Multiply the weights and then add up the products. The two comparisons are orthogonal if the sum is zero. 0 +1
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Non-Orthogonal Comparisons GroupC 1C 2 Placebo+2+1 Treatment A-10 Treatment B-1 -1 These two comparisons do not ask independent questions +2 0 +1
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Selecting Comparisons Maximum number of comparisons is number of groups minus 1. Start with the most important comparison. Then find a second comparison that is orthogonal to the first one. Each comparison must be orthogonal to every other comparison.
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How Planned Contrasts Work A Sum of Squares is computed for each contrast, depending on the weights. An F-test for the contrast is then computed.
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SPSS Contrasts Deviation: compare each group to the overall mean Simple: compare a reference group to each of the other groups Difference: compare the mean of each group to the mean of all previous group means
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More SPSS Contrasts Helmert: compare the mean of each group to the mean of all subsequent group means Repeated: compare the mean of each group to the mean of the subsequent group Polynomial: compare the pattern of means across groups to a function (e.g., linear, quadratic, cubic)
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POST HOC COMPARISONS Done after an ANOVA has been done Need not be orthogonal Less powerful than planned contrasts
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Fisher’s LSD Least Significant Difference Pairwise comparisons only Liberal
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Bonferroni Pairwise comparisons only Divide alpha by number of tests More conservative than LSD
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Tukey’s HSD Similar to Bonferroni, but more powerful with large number of means Pairwise comparisons only Critical value increases with number of groups
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Take-Home Points ANOVA is a special case of linear regression. There are lots of ways to compare specific means.
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