__Spreadsheet and SPSS macro inputs__ * alpha is the likelihood of making a type I error (usually = 0.05) * etasq is partial $$\eta^text{2}$$/100 so, for example, 5.9% = 0.059 Partial $$\eta^text{2}$$ = $$ \frac{\mbox{SS(effect)}}{\mbox{SS(effect) + SS(its error)}}$$ where SS represents the sum of squares associated with a particular term in the anova. In other words, partial $$\eta^text{2}$$ represents the proportion of variance in outcome predicted by the effect after adjusting for other terms in the anova. Click [[attachment:etasqrp.pdf|here]] for further details on partial $$\eta^text{2}$$ and [[attachment:etasq.pdf|here.]] If the Sums of Squares are not available you can[[FAQ/power/rsqform| construct eta-squared]]. * num(erator) = df of term of interest = the product of the (number of levels of each factor -1) in term of interest * sum (B-1) = sum of dfs involving '''only''' between subject factors in the anova or zero otherwise. df = Product of number of levels minus 1 of each between subject factor in term of interest. e.g. For a three way interaction involving three between subject factors, abc, we sum the dfs of the six lower order combinations: ab, ac and bc, a, b and c to that of abc * Prod (W-1) = df of within subject effect if in term of interest or 1 otherwise. df = Product of number of levels minus 1 of each within subject factor in term of interest * Prod W = The product of all the ithin subject levels in term of interest * corr is the average correlation between levels of the repeated measures (=0 if no within subjects factors) * Total sample size [[FAQ/power/powexampleN| Example input]] Power can be computed using an EXCEL [[attachment:aovp.xls|spreadsheet]] or the SPSS syntax below. Power analysis software using Winer (1991, pp 136-138) for balanced anovas may be downloaded from [[http://www.soton.ac.uk/~cpd/anovas/datasets/|here]] with details of how to compute inputs [[FAQ/Doncaster| here.]] [ COPY AND PASTE THE SYNTAX IN THE BOX BELOW INTO A SPSS SYNTAX WINDOW AND RUN; ADJUST INPUT DATA AS REQUIRED] {{{ DATA LIST free /alpha num bsum wdf corr ntot rsq. BEGIN DATA. .05 2 1 2 0.0 60 0.0588 .05 2 1 2 0.3 67 0.0588 END DATA. set errors=none. matrix. get m /variables=alpha num bsum wdf corr ntot rsq /missing=omit. compute alpha=make(1,1,0). compute num=make(1,1,0). compute bsum=make(1,1,0). compute wdf=make(1,1,0). compute corr=make(1,1,0). compute ntot=make(1,1,0). compute rsq=make(1,1,0). compute alpha=m(:,1). compute num=m(:,2). compute bsum=m(:,3). compute wdf=m(:,4). compute corr=m(:,5). compute ntot=m(:,6). compute rsq=(m:,7). end matrix. compute denom = (ntot-1-bsum)*wdf. COMPUTE power = 1 - NCDF.F(IDF.F(1-ALPHA,num,denom),num,denom,((NTOT-1-bsum)*wdf*RSQ/(1-RSQ))/(1-corr)). EXE. formats ntot (f7.0) alpha (f5.2) num (f5.2) denom (f5.2) corr (f5.2)rsq (f5.2) power (f5.2). variable labels ntot 'Total Sample Size' /alpha 'Alpha' /num 'Numerator F' /denom 'Denominator F' /corr 'Correlation' /rsq 'R-squared' /power 'Power'. report format=list automatic align(center) /variables=ntot alpha num denom corr rsq power /title "ANOVA power, between subjects factor possibly in a mixed design for given total sample size" . }}} __Reference__ Doncaster CP and Davey AJH (2007) Analysis of covariance. How to choose and construct models for the life sciences. CUP:Cambridge. Winer BJ, Brown DR and Michels KM (1991) Statistical principles in experimental design, 3rd edition. McGraw-Hill:New York.