The following equations are used for an
x-bar-
control chart: :\bar x = \sum_{i=1}^n x_i/n :\sigma_{\bar x} = \sigma/\sqrt n In the example, with
n = 10 samples, the targeted
mean, \bar x, and
standard error of the mean, \sigma_{\bar x} are: :\bar x = 1 :\sigma_{\bar x} = 0.1/\sqrt 10 = 0.0316 That is, independent 10-sample means should themselves have a
standard deviation of 0.0316. It is natural that the means vary this much, for by the
central limit theorem the means should have a
normal distribution, regardless of the distribution of the samples themselves. The importance of knowing the natural process variation becomes clear when we apply
statistical process control. In a stable process, the mean is on target; in the example, the target is the filling, set to 1 litre. The variation within the upper and lower
control limits (UCL and LCL) is considered the natural variation of the process. == Usage ==