Review

1. Review Three subjects measured in four conditions. Find the sum of squares for condition differences, SStreatment • 84 • 152 • 252 • 336

2. Review Three subjects measured in four conditions. Find the sum of squares for individual differences, SSsubject • 38 • 114 • 152 • 252

3. Review Three subjects measured in four conditions. SStreatment = 252 SSsubject = 152 SStotal = 420 dftreatment = 3 dfresidual = 6 Calculate the F statistic for testing condition differences • 1.20 • 1.88 • 3.32 • 31.50

4. Factorial ANOVA 11/14

5. Multiple Independent Variables • Simple (one-way) ANOVA tells whether groups differ • Compares levels of a single independent variable • Sometimes we have multiple IVs • Factors • Subjects divided in multiple ways • Training type & testing type • Not always true independent variables • Undergrad major & sex • Some or all can be within-subjects (gets more complicated) • Memory drug & stimulus type • Dependent variable measured for all combinations of values • Factorial ANOVA • How does each factor affect the outcome? • Extends ANOVA in same way regression extends correlation

6. Basic Approach • Calculate sum of squares for each factor • Variability explained by that factor • Essentially by averaging all data for each level of that factor • Separate hypothesis test for each factor • Convert SS to mean square • Divide by MSresidual to get F

7. Interactions • Effect of one factor may depend on level of another • Pick any two levels of Factor A, find difference of means, compare across levels of Factor B • Testable in same way as main effect of each factor • SSinteraction, MSinteraction, F, p • Can have higher-order interactions • Interaction between Factors A and B depends on C • Partitioning variability • SStotal = SSA + SSB + SSC + SSA:B + SSA:C + SSB:C + SSA:B:C + SSresidual

8. Example: Memory and Brain Injury 37% 36% Mean 72% 55% 59% 62% Testing main effects and interactions: • Rule for an interaction: • Pick any two levels of Factor A (A1, A2) and any two levels of Factor B (B1, B2) • There’s an interaction if • Equivalently:

9. Logic of Sum of Squares • Total sum of squares: • Null hypothesis assumes all data are from same population • Expected value of is s2 for each raw score • No matter how we break up SStotal, every individual square has expected value s2 • SStreatment, SSinteraction,SSresidual are all sums of numbers with expected value s2 • Every MShas expected value s2 • Average of many numbers that all have expected value s2 • E(MStreatment), E(MSinteraction), E(MSresidual) all equal s2, according to H0 • If H0 false, then MStreatment and MSinteraction tend to be larger • F is sensitive to such an increase

10. Review A factorial experiment compares men and women on their memory for different word types, with different distractor tasks. Factors: • Sex (male, female) • Word type (noun, verb, adjective, preposition) • Second task (speech, manual, none) How many groups of subjects are there? • 2 • 3 • 9 • 24

11. Review A factorial experiment compares people on their memory for different word types, with different distractor tasks. Group Means: (ignoring sex) Is there an interaction? • Yes, because adjectives and prepositions are differently affected by the second task • Yes, because the difference between Speech and Manual is different for nouns than for verbs • No, because the difference between Manual and None is the same for all word types • Yes, because the overall averages for different word types are different

12. Review A factorial experiment compares people on their memory for different word types, with different distractor tasks. ANOVA table: Find the Fs for the three effects • FWord type = 27.08, F2nd task = 30.33, FWord type:2nd task = 0.28 • FWord type = 0.37, F2nd task = 0.28, FWord type:2nd task = 0.03 • FWord type = 7.33, F2nd task = 8.53, FWord type:2nd task = 0.28 • FWord type = 6.52, F2nd task = 3.37, FWord type:2nd task = 0.03