Design of Engineering Experiments Part 4 – Introduction to Factorials Text reference, Chapter 5 General principles of factorial experiments The two-factor factorial with fixed effects The ANOVA for factorials Extensions to more than two factors Quantitative and qualitative factors – response curves and surfaces
Basic Principles and Advantages A factorial design – all possible combinations of the levels of the factors are investigated in each complete trial or replication Most efficient for two or more factor experiments Both main effects and interaction effects can be dealt with The effects of a factor can be estimated at several levels of the other factors – wider range of validity of conclusions Factor A (a levels), factor B (b levels), ab treatment combinations.
Some Basic Definitions Definition of a factor effect (main effect): The change in the mean response when the factor is changed from low to high The procedure will be different when having more than two levels.
Some Basic Definitions Interaction occurs when differences in response between the levels of one factor is not the same at all levels of the other factors At the low level of B (B-): A = 40 – 20 = 20 At the high level of B (B+): A = 52 – 30 = 22 The magnitude of the interaction effect is the average difference in the two A effects:
The Case of Interaction:
Regression Model & The Associated Response Surface Assume the factors are quantitative. Another way of illustrating the concept of interaction.
The Effect of Interaction on the Response Surface Suppose that we add an interaction term to the model: Interaction is actually a form of curvature
Some Basic Definitions The knowledge of the interaction is more useful than knowledge of the main effect A significant interaction will often mask the significance of main effects. The main effect of one factor needs to be examined with the levels of other factors fixed when there is a significant interaction The factorial design is more efficient than one-factor-at-a-time design, and the efficiency increases with the number of factors
Example 5-1 The Battery Life Experiment Text reference pg. 175 A = Material type; B = Temperature (A quantitative variable) What effects do material type & temperature have on life? 2. Is there a choice of material that would give long life regardless of temperature (a robust product)?
The General Two-Factor Factorial Experiment a levels of factor A; b levels of factor B; n replicates This is a completely randomized design
Statistical (effects) model: Other models (means model, regression models) can be useful
Hypotheses testing Equality of row treatment effects Ho: t1 = t2 = = ta = 0 H1: at least one ti 0 Equality of column treatment effects Ho: b1 = b2 = = bb = 0 H1: at least one bj 0 Equality of row and column treatment interactions Ho: (tb)ij = 0 for all i, j H1: at least one (tb)ij 0
Extension of the ANOVA to Factorials (Fixed Effects Case) – pg. 167
ANOVA Table – Fixed Effects Case Design-Expert will perform the computations Text gives details of manual computing
Design-Expert Output – Example 5-1 Response: Life ANOVA for Selected Factorial Model Analysis of variance table [Partial sum of squares] Sum of Mean F Source Squares DF Square Value Prob > F Model 59416.22 8 7427.03 11.00 < 0.0001 A 10683.72 2 5341.86 7.91 0.0020 B 39118.72 2 19559.36 28.97 < 0.0001 AB 9613.78 4 2403.44 3.56 0.0186 Pure E 18230.75 27 675.21 C Total 77646.97 35 Std. Dev. 25.98 R-Squared 0.7652 Mean 105.53 Adj R-Squared 0.6956 C.V. 24.62 Pred R-Squared 0.5826 PRESS 32410.22 Adeq Precision 8.178
Residual Analysis – Example 5-1
Residual Analysis – Example 5-1
Residual Analysis – Example 5-1
Interaction Plot
Choice of Sample Size OC curves can be used to determine sample size (n) An effective way is to specify a min. diff. between any two treatment means. E.g. if the difference in any two row means is D, the min. value of F2 is If the difference in any two columns is specified, If the difference in any two interactions is specified,
One Observation per Cell If there are two factors and only one observation per cell, the effect model is Reminder: when n 2, The two-factor interaction effect (tb)ij and the experimental error cannot be separated in obvious manner. Therefore, there are no tests on main effects unless the interaction effect is zero. And the model will be The main effects may be tested by comparing MSA and MSB to MSResidual