The following notation is used in this section:
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jth response in the ith group |
k |
number of groups |
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sample size of ith group |
N |
total sample size |
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expected value of a response in the ith group |
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standard deviation of response |
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average response in ith group |
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weighted average of k group means |
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sample variance of the responses in the ith group |
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mean square error (MSE) |
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degrees of freedom associated with the mean square error |
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significance level |
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critical value for analysis of means when the sample sizes are equal |
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critical value for analysis of means when the sample sizes are not equal |
A box-and-whisker plot is displayed for the measurements in each group on the ANOM boxchart. Figure 4.9 illustrates the elements of each plot.
Figure 4.9: Box-and-Whisker Plot
The skeletal style of the box-and-whisker plot shown in Figure 4.9 is the default. You can specify alternative styles with the BOXSTYLE= option; see the entry for the BOXSTYLE= option in Dictionary of Options: SHEWHART Procedure.
By default, the central line on an ANOM chart for means represents the weighted average of the group means, which is computed as
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You can specify a value for with the MEAN= option in the BOXCHART statement or with the variable _MEAN_
in a LIMITS= data set.
In the analysis of means for continuous data, it is assumed that the responses in the ith group are at least approximately normally distributed with a constant variance:
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When the group sizes are constant (), then and the decision limits are computed as follows:
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Here the mean square error (MSE) is computed as follows:
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For details concerning the function , see Nelson (1981, 1982a, 1993).
When the group sizes are not constant (the unbalanced case), and the decision limits for the ith group are computed as follows:
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Here the mean square error (MSE) is computed as follows:
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This requires that be positive. A chart is not produced if but MSE is equal to zero (unless you specify the ZEROSTD option). For details concerning the function , see Fritzsch and Hsu (1997), Nelson (1982b, 1991), and Soong and Hsu (1997).
You can specify parameters for the limits as follows:
Specify with the ALPHA= option or with the variable _ALPHA_
in a LIMITS= data set. By default, = 0.05.
Specify a constant nominal sample size for the decision limits in the balanced case with the LIMITN= option or with the variable _LIMITN_
in a LIMITS= data set. By default, n is the observed sample size in the balanced case.
Specify k with the LIMITK= option or with the variable _LIMITK_
in a LIMITS= data set. By default, k is the number of groups.
Specify with the MEAN= option or with the variable _MEAN_
in a LIMITS= data set. By default, is the weighted average of the responses.
Specify with the MSE= option or with the variable _MSE_
in a LIMITS= data set. By default, is computed as indicated above.
Specify with the DFE= option or with the variable _DFE_
in a LIMITS= data set. By default, is determined as indicated above.