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To test each
factor at each level would require a full factorial
experiment consisting of 729 different treatment
combinations (3 6 = 729). If the experiment is conducted
only using the Level I and II the experiment is reduced to 2
6 = 64 treatment combinations. This is still a large
experiment, hence the need to develop some sort of
fractional experiment or Taguchi orthogonal array. Different types
of fractional factorials can be developed based on the
instructors preferences. The following example is for a
one-eighth fractional factorial with two replications of
each treatment. The response variable is the distance the
ball is thrown in inches.
This
data has been analyzed by Stat Ease Design Ease Software.
The results are shown on the following pages. The most
significant factors according to the analysis are Pivot Arm
Location, Ball Seat Position, and Turn Table Position.
Model
15211.94
7
2173.13
183.97 <
0.0001
significant
A
473.06
1
473.06
40.05 0.0002
Std.
Dev.
3.44
R-Squared
0.9938
PRESS
378.00
Adeq
Precision
36.416
In this case A, B, C, D, E, F, AF are significant model
terms.
"Adeq Precision" measures the signal to noise
ratio. A ratio greater than 4 is desirable. Your
Final Equation in Terms of Coded Factors:
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