5: FACTORIAL ANOVA (INDEPENDENT DESIGN) Flashcards
factorial ANOVA
used to test for differences when we have more than 1 IV
- including more than 1 IV we can explore the effects of each IV and interactions between IVs
each IV will have 2 or more levels
3 broad factorial ANOVA designs:
- all IV’s are between subjects (independent)
- all IV’s are within-subjects (RM)
- a mixture of between-subjects and within subjects IVs (mixed)
factorial ANOVA terminology
the terms ‘IV’ and ‘factor’ are interchangeable
- ANOVAs with more than 1 IV called factorial ANOVAs
Factorial ANOVAs can include:
2-way …, 3 way…, 4 way…
IVs/ factors always have at least 2 levels
- 22 ANOVA: 2 IVS, each 2 levels
- 24 ANOVA: 2 IVs, one 2 lvls, one 4
benefits of factorial ANOVA
- controls familywise error rate
- tells us about interaction effects
2-way independent ANOVA: partitioning the Variance
Variance between IV levels:
- IV1
- IV2
- interaction
variance within IV levels:
- error (incl. individual diffs & experimental error)
2 way independent ANOVA: F ratio
F = variance between IV levels / variance within
= MSm/MSr
F(IV1) = variance due to manipulation of IV1 (+ error) / variance due to error alone
interaction effects: factorial ANOVA
- the combined effects of multiple IVs/factors on the DV
- a significant interaction indicates that the effect of manipulating one IV depends on the level of the other IV
interpretation of main effects when the interaction is significant: factorial ANOVA
- for a main effect to be genuine and meaningful, it would influence the measurement of the DV across all conditions
- sometimes when an interaction is present it’s not meaningful to draw conclusions from the main effects (the interpretation of the interaction is far more informative)
assumptions: 2-way independent ANOVA
- normality: the DV should be normally distributed, within each condition
- homogeneity of variance: the variance in the DV, within each condition, should be (reasonably) equivalent (SPSS checks with levenes, no correction)
- equivalent sample size: sample size within each condition should be roughly equal
- independence of observations: scores within each condition shoudl be independent
no parametric equivalent, can only attempt to ‘fix’ or simplify the design
effect size: n^2 vs. partial n^2
classical eta^2: pproportional of total variance attributable to the factor
- n^2 = SSm/SSt
partial n^2 = SSm/ SSm + SSr
- only takes into account variance from one IV at a time
- proportion of the total variance attributable to the factor, partialling out (excluding) variance due to other factors
interaction F value
F(IV1xIV2) = MS(IV1xIV2) / MSr
2-way independent ANOVA: simple effects
the ANOVA looks for differences between marginal means to determine main effects (deals with 1 IV at a time, ignoring the other IV)
the presence of an interaction suggests we need to consider differences at the level of cell means (simple effects)
- the effect of the main IV at different levels of the secondary IV
simple effects: the effect of an IV at a single level of another IV (comparison of cell means (conditions))
to determine whether simple effects are significant, we conduct t-tests between individual cell means (only when interaction significant)
run cohen’s d for each test of simple effects considered
