Each point on a Laney U' chart represents the number of defects per unit of measurement.
If the process is in control, the points vary randomly around the center line, and the process exhibits only common-cause variation. Investigate points that fall outside the control limits or that exhibit nonrandom patterns for possible special-cause variation.
The center line on a Laney U' chart represents the average number of defects per unit of measurement. The average number of defects per unit is also called the process mean.
Use the center line to observe how the process performs compared to the average. If the process is in control, then the points vary randomly around the center line.
Do not confuse the center line with the target value for your process. The target is your desired outcome. The center line is the actual outcome.
Control limits are the horizontal lines that are above and below the center line. The control limits indicate whether a process is out of control, and they are based on the observed variation within subgroups and on the expected variation in the plotted points. By default, Minitab displays control limits at 3 standard deviations above and below the center line.
Do not confuse control limits with specification limits. Specification limits represent customer requirements and indicate the amount of variation that you want to see in the process. Control limits represent the actual amount of variation that is in the sample data. A process can be in control, yet not be capable of meeting specifications.
Sigma Z measures overdispersion or underdispersion in your data.
The Sigma Z value on a Laney U' chart indicates how much the control limits on the chart are adjusted for overdispersion or underdispersion.
A Sigma Z value of 1 indicates that no adjustment is necessary. In this case, the control limits on a Laney U' chart are exactly the same as the control limits on a traditional U chart.
A Sigma Z value that is greater than 1 indicates that the control limits on the Laney U' chart are wider than the control limits on a traditional U chart to adjust for overdispersion.
A Sigma Z value that is less than 1 indicates that the control limits on the Laney U' chart are narrower than the control limits on a traditional U chart to adjust for underdispersion.
For example, the following graphs show a traditional U chart and a Laney U' chart of the same data. The subgroups are large and the data exhibit overdispersion.
Traditional U chart
On the traditional U chart, the large subgroup sizes result in narrow control limits. The narrow control limits and the overdispersion cause several of the subgroups to appear out of control.
Laney U' chart
The control limits on the Laney U' chart are adjusted for overdispersion. The Laney U' chart shows that only subgroup 23 is out of control.
Tests for special causes
The tests for special causes assess whether the plotted points are randomly distributed within the control limits.
Use the tests for special causes to determine which observations you may need to investigate and to identify specific patterns and trends in your data. Each of the tests for special causes detects a specific pattern or trend in your data, which reveals a different aspect of process instability. For example, Test 1 detects a single out-of-control point. Test 2 detects a possible shift in the process.
Four tests are available with this control chart.
Test 1: One point more than 3σ from center line
Test 1 identifies subgroups that are unusual compared to other subgroups. Test 1 is universally recognized as necessary for detecting out-of-control situations. If small shifts in the process are of interest, you can use Test 2 to supplement Test 1 in order to create a control chart that has greater sensitivity.
Test 2: Nine points in a row on the same side of the center line
Test 2 identifies shifts in the defect rate for the process. If small shifts in the process are of interest, you can use Test 2 to supplement Test 1 in order to create a control chart that has greater sensitivity.
Test 3: Six points in a row, all increasing or all decreasing
Test 3 detects trends. This test looks for a long series of consecutive points that consistently increase in value or decrease in value.
Test 4: Fourteen points in a row, alternating up and down
Test 4 detects systematic variation. You want the pattern of variation in a process to be random, but a point that fails Test 4 might indicate that the pattern of variation is predictable.
Use stages to create a historical control chart that shows how a process changes over specific periods of time. By default, Minitab recalculates the center line and control limits for each stage. For more information, go to Add stages to show how a process changed.
This historical control chart shows three stages of a process, which represent before, during, and after the implementation of a new procedure.