U-chart explained

u-chart
Subgroupsize:n > 1
Measurementtype:Number of nonconformances per unit
Qualitycharacteristictype:Attributes data
Distribution:Poisson distribution
Sizeofshift:≥ 1.5σ
Meanchart:U control chart.svg
Meancenter:

\baru=

m
\sum
n
\sum
j=1
no.ofdefectsforxij
i=1
mn
Meanlimits:

\baru\pm3\sqrt{

\baru
ni
}
Meanstatistic:

\barui=

n
\sumno.ofdefectsforxij
j=1
n

In statistical quality control, the u-chart is a type of control chart used to monitor "count"-type data where the sample size is greater than one, typically the average number of nonconformities per unit.

The u-chart differs from the c-chart in that it accounts for the possibility that the number or size of inspection units for which nonconformities are to be counted may vary. Larger samples may be an economic necessity or may be necessary to increase the area of opportunity in order to track very low nonconformity levels.[1]

Examples of processes suitable for monitoring with a u-chart include:

As with the c-chart, the Poisson distribution is the basis for the chart and requires the same assumptions.

The control limits for this chart type are

\baru\pm3\sqrt{

\baru
ni
} where

\baru

is the estimate of the long-term process mean established during control-chart setup. The observations

ui=

xi
ni
are plotted against these control limits, where xi is the number of nonconformities for the ith subgroup and ni is the number of inspection units in the ith subgroup.

See also

Notes and References

  1. Book: Montgomery, Douglas . Introduction to Statistical Quality Control . John Wiley & Sons, Inc. . 2005 . . 294 . 978-0-471-65631-9 . 56729567 . dead . https://web.archive.org/web/20080620095346/http://www.eas.asu.edu/~masmlab/montgomery/ . 2008-06-20 .