Revision as of 06:01, 23 January 2019 edit 120.17.145.234 (talk) →Model ← Previous edit		Revision as of 06:02, 23 January 2019 edit undo 120.17.145.234 (talk) →Model: spelling of "contigency" corrected to "contingency". Next edit →
Line 21: <math>\mu_{ij} = \mu + \alpha_i + \beta_j + \gamma_{ij}</math>, where <math>\mu</math> is the grand mean, <math>\alpha_i</math> is the additive main effect of level <math>i </math> from the first factor (''i''-th row in the contigency table), <math>\beta_j</math> is the additive main effect of level <math>j</math> from the second factor (''j''-th column in the ~~contigency~~contingency table) and <math>\gamma_{ij}</math> is the non-additive interaction effect of treatment <math>(i,j)</math> from both factors (cell at row ''i'' and column ''j'' in the ~~contigency~~contingency table). Another equivalent way of describing the two-way ANOVA is by mentioning that, besides the variation explained by the factors, there remains some [[statistical noise]]. This amount of unexplained variation is handled via the introduction of one random variable per data point, <math>\epsilon_{ijk}</math>, called [[Errors and residuals in statistics\|error]]. These <math>n</math> random variables are seen as deviations from the means, and are assumed to be independent and normally distributed:

Two-way analysis of variance: Difference between revisions