A control chart consists of: • Points representing a statistic (e.g., a
mean, range, proportion) of measurements of a quality characteristic in samples taken from the process at different times (i.e., the data) • The mean of this statistic using all the samples is calculated (e.g., the mean of the means, mean of the ranges, mean of the proportions) - or for a reference period against which change can be assessed. Similarly a median can be used instead. • A centre line is drawn at the value of the mean or median of the statistic • The
standard deviation (e.g., sqrt(variance) of the mean) of the statistic is calculated using all the samples - or again for a reference period against which change can be assessed. in the case of XmR charts, strictly it is an approximation of standard deviation, the does not make the assumption of homogeneity of process over time that the standard deviation makes. • Upper and lower
control limits (sometimes called "natural process limits") that indicate the threshold at which the process output is considered statistically 'unlikely' and are drawn typically at 3 standard deviations from the center line The chart may have other optional features, including: • More restrictive upper and lower warning or control limits, drawn as separate lines, typically two standard deviations above and below the center line. This is regularly used when a process needs tighter controls on variability. • Division into zones, with the addition of rules governing frequencies of observations in each zone • Annotation with events of interest, as determined by the Quality Engineer in charge of the process' quality • Action on special causes (n.b., there are several rule sets for detection of signal; this is just one set. The rule set should be clearly stated.) • Any point outside the control limits • A Run of 7 Points all above or all below the central line - Stop the production • Quarantine and 100% check • Adjust Process. • Check 5 Consecutive samples • Continue The Process. • A Run of 7 Point Up or Down - Instruction as above
Control chart constant The
control chart constant or
bias correction factor are
constants used in control charts. The constants are based on the subgroup size (n) and are derived from the statistical properties of sampling distributions. The first control chart constants proposed were and .
Chart usage If the process is in control (and the process statistic is normal), 99.7300% of all the points will fall between the control limits. Any observations outside the limits, or systematic patterns within, suggest the introduction of a new (and likely unanticipated) source of variation, known as a
special-cause variation. Since increased variation means increased
quality costs, a control chart "signaling" the presence of a special-cause requires immediate investigation. This makes the control limits very important decision aids. The control limits provide information about the process behavior and have no intrinsic relationship to any
specification targets or
engineering tolerance. In practice, the process mean (and hence the centre line) may not coincide with the specified value (or target) of the quality characteristic because the process design simply cannot deliver the process characteristic at the desired level. Control charts limit
specification limits or targets because of the tendency of those involved with the process (e.g., machine operators) to focus on performing to specification when in fact the least-cost course of action is to keep process variation as low as possible. Attempting to make a process whose natural centre is not the same as the target perform to target specification increases process variability and increases costs significantly and is the cause of much inefficiency in operations.
Process capability studies do examine the relationship between the natural process limits (the control limits) and specifications, however. The purpose of control charts is to allow simple detection of events that are indicative of an increase in process variability. This simple decision can be difficult where the process characteristic is continuously varying; the control chart provides statistically objective criteria of change. When change is detected and considered good its cause should be identified and possibly become the new way of working, where the change is bad then its cause should be identified and eliminated. The purpose in adding warning limits or subdividing the control chart into zones is to provide early notification if something is amiss. Instead of immediately launching a process improvement effort to determine whether special causes are present, the Quality Engineer may temporarily increase the rate at which samples are taken from the process output until it is clear that the process is truly in control. Note that with three-sigma limits,
common-cause variations result in signals less than once out of every twenty-two points for skewed processes and about once out of every three hundred seventy (1/370.4) points for normally distributed processes. The two-sigma warning levels will be reached about once for every twenty-two (1/21.98) plotted points in normally distributed data. (For example, the means of sufficiently large samples drawn from practically any underlying distribution whose variance exists are normally distributed, according to the Central Limit Theorem.)
Choice of limits Shewhart set
3-sigma (3-standard deviation) limits on the following basis. • The coarse result of
Chebyshev's inequality that, for any
probability distribution, the
probability of an outcome greater than
k standard deviations from the
mean is at most 1/
k2. • The finer result of the
Vysochanskii–Petunin inequality, that for any
unimodal probability distribution, the
probability of an outcome greater than
k standard deviations from the
mean is at most 4/(9
k2). • In the
Normal distribution, a very common
probability distribution, 99.7% of the observations occur within three
standard deviations of the
mean (see
Normal distribution). Shewhart summarized the conclusions by saying:
... the fact that the criterion which we happen to use has a fine ancestry in highbrow statistical theorems does not justify its use. Such justification must come from empirical evidence that it works. As the practical engineer might say, the proof of the pudding is in the eating. Although he initially experimented with limits based on
probability distributions, Shewhart ultimately wrote:
Some of the earliest attempts to characterize a state of statistical control were inspired by the belief that there existed a special form of frequency function f
and it was early argued that the normal law characterized such a state. When the normal law was found to be inadequate, then generalized functional forms were tried. Today, however, all hopes of finding a unique functional form f
are blasted. The control chart is intended as a
heuristic.
Deming insisted that it is not a
hypothesis test and is not motivated by the
Neyman–Pearson lemma. He contended that the disjoint nature of
population and
sampling frame in most industrial situations compromised the use of conventional statistical techniques.
Deming's intention was to seek insights into the
cause system of a process
...under a wide range of unknowable circumstances, future and past.... He claimed that, under such conditions,
3-sigma limits provided
... a rational and economic guide to minimum economic loss... from the two errors: •
Ascribe a variation or a mistake to a special cause (assignable cause) when in fact the cause belongs to the system (common cause). (Also known as a
Type I error or False Positive) •
Ascribe a variation or a mistake to the system (common causes) when in fact the cause was a special cause (assignable cause). (Also known as a
Type II error or False Negative)
Calculation of standard deviation As for the calculation of control limits, the
standard deviation (error) required is that of the
common-cause variation in the process. Hence, the usual
estimator, in terms of sample variance, is not used as this estimates the total squared-error loss from both
common- and special-causes of variation. An alternative method is to use the relationship between the
range of a sample and its
standard deviation derived by
Leonard H. C. Tippett, as an estimator which tends to be less influenced by the extreme observations which typify
special-causes. ==Rules for detecting signals==