5.1 TWO FACTOR SPLIT PLOT MODEL (I) Y = B|P'(S'|A) Analysis of terms: B|A + S|A Data: S A B Y 1 1 1 3.29706 2 1 1 -1.46064 3 1 1 4.84585 4 1 1 4.75133 1 1 2 3.29706 2 1 2 -1.46064 3 1 2 4.84585 4 1 2 5.11626 1 2 1 6.07394 2 2 1 -1.92254 3 2 1 -4.42968 4 2 1 6.07394 1 2 2 -1.92254 2 2 2 5.11626 3 2 2 -4.42968 4 2 2 4.75133 Model 5.1(i) A in plots (P) and B in sub-plots (Q) are fixed factors, S is a random blocking factor: Restricted Unrestricted Source DF SS MS F P F P 1 S 3 69.92 23.31 - - 0.82 0.562 2 A 1 12.11 12.11 0.43 0.560 0.43 0.560 3 S*A 3 84.99 28.33 - - - - 4 P(S*A) 0 - - - - - - 5 B 1 0.23 0.23 0.02 0.882 0.02 0.882 6 B*A 1 0.44 0.44 0.05 0.837 0.05 0.837 7 B*S 3 28.37 9.46 - - - - 8 B*S*A 3 28.65 9.55 - - - - 9 B*P(S*A) 0 - - - - - - 10 Q(B*P(S*A) 0 - - Total 15 224.71 __________________________________________________________________ Doncaster, C. P. & Davey, A. J. H. (2007) Analysis of Variance and Covariance: How to Choose and Construct Models for the Life Sciences. Cambridge: Cambridge University Press. http://www.southampton.ac.uk/~cpd/anovas/datasets/