Use the summary of the design to examine the key design properties. Most properties of the design will match the selections that you made for the base design.
However, if the design includes folds or blocks, the final design resolution can differ from the resolution of the base design. Folds can increase the resolution of the design. Blocks can decrease the resolution of the design.
For this design, all of the design characteristics are the same as selections made during the creation of the design.
Factors: | 6 | Base Design: | 6, 16 | Resolution: | IV |
Runs: | 16 | Replicates: | 1 | Fraction: | 1/4 |
Blocks: | 1 | Center pts (total): | 0 |
This design has 4 blocks. Each block contains 4 runs. The resolution is different from the unblocked design because blocks are confounded with two-way interactions.
Factors: | 6 | Base Design: | 6, 16 | Resolution with blocks: | III |
Runs: | 16 | Replicates: | 1 | Fraction: | 1/4 |
Blocks: | 4 | Center pts (total): | 0 |
This design has 4 blocks and 2 replicates. Each block contains 8 runs. Because the blocks can be partly generated from the replicates, the design resolution with blocks is IV. Because the design has 2 replicates, two runs for each factor level combination in the base design are in the final design. Thus, the number of runs is twice the number of runs for the base design.
Factors: | 6 | Base Design: | 6, 16 | Resolution with blocks: | IV |
Runs: | 32 | Replicates: | 2 | Fraction: | 1/4 |
Blocks: | 4 | Center pts (total): | 0 |
This design includes 2 center points. Because the design has all numeric factors, a total of 2 center points are included in the design.
Factors: | 6 | Base Design: | 6, 16 | Resolution: | IV |
Runs: | 18 | Replicates: | 1 | Fraction: | 1/4 |
Blocks: | 1 | Center pts (total): | 2 |
This design includes 2 center points but because one of the factors is a text factor, Minitab adds a total of 4 center points to the design. When the design includes a text factor, Minitab adds center points at the low level and at the high level of the text factor with the numeric factors set at their mid-point levels.
Factors: | 6 | Base Design: | 6, 16 | Resolution: | IV |
Runs: | 20 | Replicates: | 1 | Fraction: | 1/4 |
Blocks: | 1 | Center pts (total): | 4 |
The alias structure describes the confounding pattern that occurs in a design. Terms that are confounded are also said to be aliased.
Aliasing, also known as confounding, occurs in fractional factorial designs because the design does not include all of the combinations of factor levels. For example, if factor A is confounded with the 3-way interaction BCD, then the estimated effect for A is the sum of the effect of A and the effect of BCD. You cannot determine whether a significant effect is because of A, because of BCD, or because of a combination of both. When you analyze the design in Minitab, you can include confounded terms in the model. Minitab removes the terms that are listed later in the terms list. However, certain terms are always fit first. For example, if you include blocks in the model, Minitab retains the block terms and removes any terms that are aliased with blocks.
To see how to determine the alias structure, go to All statistics for Create 2-Level Factorial Design (Default Generators) and click "Defining relation".
Factors: | 5 | Base Design: | 5, 8 | Resolution: | III |
Runs: | 8 | Replicates: | 1 | Fraction: | 1/4 |
Blocks: | 1 | Center pts (total): | 0 |
I + ABD + ACE + BCDE |
---|
A + BD + CE + ABCDE |
B + AD + CDE + ABCE |
C + AE + BDE + ABCD |
D + AB + BCE + ACDE |
E + AC + BCD + ABDE |
BC + DE + ABE + ACD |
BE + CD + ABC + ADE |
In this design, the alias structure table shows that several terms are confounded with each other. For example, the second line in the table indicates that factor A is confounded with the terms BD, CE, and ABCDE. The third line shows that factor B is confounded with the terms AD, CDE, and ABCE.
The engineer who planned this design determines that the interaction AB is an important term and it cannot be aliased with any main effects. However, the alias structure shows that AB is aliased with the factor D. The engineer also sees that there are several other 2-way interactions that are not aliased with any main effects, including BC, DE, BE, and CD. By changing the order that the factors are entered in Minitab, the engineer can create a design where the important interaction is not aliased with any main effects. The engineer recreates the design and enters factor A in the third row in the dialog box, instead of the first row, so factor A becomes factor C. The original interaction between A and B is now the interaction between B and C, which is not aliased with any main effects.
When you create your design, Minitab stores the design information in the worksheet. Minitab includes columns for standard order (StdOrder), run order (RunOrder), center points (CenterPt), blocks (Blocks), and a column for each factor. For more information, go to How Minitab stores design information in the worksheet.
You can use the worksheet to guide your experiment because it lists the factor settings for each experimental run and, if you randomized the design, the order in which you should perform the runs. If you didn't randomize the design, you can do that with Modify Design. Before you perform the experiment, you should name one or more columns in the worksheet for the response data. After you enter the response data, you can use Analyze Factorial Design to analyze the design.
For example, this worksheet shows a design with 2 factors, Temperature and Time. The first row in the worksheet contains the first experimental run, where temperature is set to 100 and time is set to 5. After this run is performed, the measurement for strength can be entered into the worksheet.
C1 | C2 | C3 | C4 | C5 | C6 | C7 |
---|---|---|---|---|---|---|
StdOrder | RunOrder | CenterPt | Blocks | Temperature | Time | Strength |
6 | 1 | 1 | 1 | 100 | 5 | |
2 | 2 | 1 | 1 | 200 | 10 | |
9 | 3 | 0 | 1 | 150 | 7.5 | |
5 | 4 | 1 | 1 | 200 | 10 | |
1 | 5 | 1 | 1 | 200 | 5 |
For more information, go to Checklist of pre-experiment activities.