All statistics for Create 2-Level Split-Plot Design

Interpretation

The factors are the variables that you control in the experiment. Factors are also known as independent variables, explanatory variables, and predictor variables. Factors assume only a limited number of possible values, known as factor levels. Factors can have text or numeric levels. For numeric factors, you select specific levels for the experiment, even though many values for the factor are possible.

For example, you are studying factors that could affect plastic strength during the manufacturing process. You include factors for additive and temperature in the experiment. The additive is a categorical variable. Additive can be type A or type B. Temperature is a continuous variable. Because temperature is a factor, only two temperatures settings are in the experiment: 100°C and 200°C. If the design includes a center point, the numeric factor can have three levels (100°C, 150°C, and 200°C).

Interpretation

In a split-plot experiment, levels of the hard-to-change factors are held constant for several experimental runs. The experimental runs with the same hard-to-change settings form a whole plot. The combinations of settings for the easy-to-change factors change inside the whole plot. A design usually has multiple replicates of the same whole plots. These replicated whole plots allow estimation of the statistical significance of the hard-to-change factors.

For example, a quality engineer wants to study the factors that affect the texture of frozen yogurt. The engineer can quickly change the amount of air added to the yogurt mix and the mixing speed by adjusting settings on the machine. However, to change the temperature on a machine, the engineer has to change the temperature setting, then wait for the temperature of the yogurt mix to stabilize. Temperature is a hard-to-change factor that defines the whole plots.

The engineer runs all 4 combinations of settings for air and mixing speed at the high level of temperature, which makes one whole plot. The engineer changes the temperature of the machine, then runs the 4 combinations of the other factors again. These second 4 runs form a second whole plot. To complete the design, the engineer replicates the first two whole plots. The entire design has 4 whole plots.

Interpretation

The design resolution describes which effects in a fractional factorial design are aliased with other effects. For more information on aliasing, see the section on Alias structure.

In a split-plot design, the resolution does not account for whole-plot generators. For example, a resolution IV split-plot design can alias a 2-factor interaction with whole plots. Such a 2-factor interaction is not possible to estimate. When the alias table is in the output, Minitab lists all terms aliased with whole plots.

A design with higher resolution has less aliasing among lower-order terms. When you create a design, you need to balance the number of runs you can perform with an alias structure that you can accept. Identifying the important effects can be more complicated in a lower resolution design because of the terms that are aliased but lower resolution designs are usually smaller and more affordable.

Interpretation

In a split-plot experiment, levels of the hard-to-change factor are held constant for several experimental runs, which are collectively treated as a whole plot. For example, temperature is a common hard-to-change factor because temperature often requires a significant amount of time to stabilize after adjustments are made.

Interpretation

The fraction indicates how many different sets of runs exist with a similar alias structure. If an experiment is a ½ fraction, then 2 sets of runs exist with similar alias structures. If an experiment is an 1/8 fraction, then 8 sets of runs exist with similar alias structures.

Before you perform your designed experiment, an important step is to verify that all the runs are feasible to conduct. By default, Minitab uses the principal fraction for a fractional factorial. The principal fraction always includes the run where all the factors are set at the high level. This combination of settings could be unfeasible, unsafe, or too expensive to run. One way to avoid unfeasible settings in a fractional factorial experiment is to change the fraction number of the design. To change the fraction number, go to the Options sub-dialog box.

Interpretation

A run is an experimental condition or factor level combination at which the response is measured. Each run corresponds to a row in the worksheet and results in one or more response measurements, or observations. For example, you perform a full factorial design with 2 factors, each with 2 levels. Your experiment has 4 runs:

The entire set of runs represents the design. Multiple executions of the same factor level settings are considered separate runs and are called replicates.

In the design summary table, Minitab displays the runs for the base design and the total number of runs. For example, you create a fractional factorial design with 3 factors, 2 replicates, and 2 center points. The base design has 4 runs. With the replicates and center points, the final design has 10 total runs.

Interpretation

In Minitab, the principal fraction number equals the denominator of the number displayed as "Fraction". For example, if the design is a 1/8 fraction, then the principal fraction number is 8. The principal fraction is the fraction where all of the signs for the design generators are positive. By default, Minitab uses the principal fraction when creating the design.

If you can't use the principal fraction, it is usually because one or more combinations of factor levels that are in the principal fraction are impractical to run. For example, the principal fraction always includes the run where all of the factors are at their high setting. The other fractions do not. If setting all of the factors to their high levels is expensive or difficult, you can change the fraction number in the Options sub-dialog box.

Interpretation

Blocks account for the differences that might occur between runs that are performed under different conditions. For example, an engineer designs an experiment to study welding and cannot collect all of the data on the same day. Weld quality is affected by several variables that change from day-to-day that the engineer cannot control, such as relative humidity. To account for these uncontrollable variables, the engineer groups the runs performed each day into separate blocks. The blocks account for the variation from the uncontrollable variables so that these effects are not confused with the effects of the factors the engineer wants to study. For more information on how Minitab assigns runs to blocks, go to What is a block?.

Interpretation

Because the settings for factor D are equal to the settings for A × B × C, factor D is confounded with the ABC interaction. Because effects that are confounded cannot be estimated separately from each other, design generators should be carefully chosen. By default, Minitab uses the design generators that create the design with the highest resolution for the number of factors in the design. However, if you want to specify a different design generator, use Create 2-Level Factorial Design (Specify Generators).

Interpretation

Hard-to-change factors stay at the same setting for an entire whole plot. For example, temperature is a common hard-to-change factor because adjusting temperature often requires significant time to stabilize. Use the list to identify the design.

Interpretation

Whole plot generators are terms that are held constant and determine which runs are grouped together in whole plots.

If an effect other than a hard-to-change factor is a whole plot generator, then that effect is aliased with whole plots. The resolution for the design does not account for any aliasing with whole plots. For example, a 6-factor, half-fraction design with 2 hard-to-change factors, 8 whole plots, and 4 subplots is resolution IV, but the whole plots are aliased with a 2-way interaction. Except for hard-to-change factors, Minitab removes effects that are aliased with whole plots from the model when you use Analyze Factorial Design.

The hard-to-change factors are always listed as whole plot generators, but are not always aliased with whole plots. When a design has multiple whole plots with each level of the hard-to-change factor, the whole plots are not aliased with the hard-to-change factors. For example, this design has 1 hard-to-change factor and 3 easy-to-change factors. The design is in standard order. The low level of the hard-to-change factor is in whole plots 1 and 3. The high level of the hard-to-change factor is in whole plots 2 and 4. In this design, the hard-to-change factor is a whole plot generator because the values are constant for entire whole plots. However, the hard-to-change factor is not aliased with whole plots because the same levels are in different whole plots.

Interpretation

These results show the defining relation and alias structure for a ¼ fractional factorial design with five factors (A, B, C, D, and E).

Minitab uses the defining relation to calculate each line of the alias table. Any letter multiplied by itself is the identity, I (for example, A × A = I). The identity, I, multiplied by any letter is the same letter (for example, I × A = A). To determine which effects are confounded with a specific term, multiply the term of interest by each term in the defining relation, and then eliminate the squared terms. For example, the following list shows how to use the defining relation to find the terms that BC is confounded with:

(BC)(ABD) = AB²CD = ACD

(BC)(ACE) = ABC²E = ABE

(BC)(BCDE) = B²C²DE = DE

Therefore, BC is aliased with ACD, AE, and DE.

The identity column I is always a column of 1's (in coded units). Therefore, since I = ABD in our example, the product of the columns A, B, D is a column of 1’s. The same is true for ACE and BCDE.

Interpretation

Interpretation

Use the design table to see the factor settings for each run and the order of the runs in the design. In these results, the design table shows that the design includes 32 runs in 1 block. The whole plots and the runs are randomized. In the first run, factors A, B, and C are at their high level while Factor D is at its low level.