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Process
Sampling
The following is
an excerpt from Chapter 11 of Pyzdek's
Guide to SPC, Volume 2: Applications and Special Topics by Thomas
Pyzdek, © 1992 by Quality Publishing. It may be ordered from
the Quality Publishing
Order Form.
Sampling to determine
process control is more an art form than a science. The objective is to
select subgroups such that the variation of measurements or counts within
the subgroup will be produced by only common causes. The spread of the
control limits will be based on only within subgroup variation. Thus,
any addition variation will cause the production of subgroup statistics
which fall beyond the control limits, signaling a special cause of variation.
I have always found it
helpful to think about the process as a bowl of blue chips with numbers
written on them. A controlled process is one where the same bowl of chips
is sampled time-after-time. If the chips in the bowl have different numbers
on them, there will be a variation in the sample. However since the bowl
doesn’t change, the variation will be relatively consistent from
one sample to the next. After sampling the bowl numerous times we will
become more and more comfortable setting up some limits on the variation
we expect to see in the future samples from the same bowl. The bowl represents
a controlled process, a predictable process.
Now lets say that there
are two bowls, one with blue chips and one with green chips. Assume further
that the number written on the blue chips are quite different than those
written on the green chips. Furthermore, lets say that you don’t
get to see the chips themselves; all you know is the numbers you obtained.
Sometimes the sample is taken from the blue chips and sometimes from the
green chips. Could you tell the difference?
The answer depends a great
deal on the way you formed your subgroups. If your subgroups were formed
from a mixture of blue and green chips, then the process is neither blue
nor green; the process is blue + green. The subgroup variation would include
the variation from both the blue + green and the difference between them.
For example, if the blue chip varied from 10 to 50 and the green varied
from 60 to 100, a mixed sample of both blue and green would vary from
10 to 100. Control limits based on the mixed sample would show a greater
spread, and your estimate of the process capability would indicate a less
capable process than either the blue or the green alone. In other words,
you would probably conclude that the blue + green process was "in
control and capable of holding a tolerance of 10 to 100."
The objective of forming
rational subgroups is to identify the underlying process so that departure
from the underlying process can be quickly detected and corrected. The
underlying process can be thought of as the performance that could be
attained if all special causes of variation were eliminated and the process
was operating at its best. To do this you must plan carefully to avoid
mixing processes from different cause systems, which is comparable to
mixing the blue chips and the green chips.
Here’s a more down-
to- earth example. An o-ring is made in a mold with fifty cavities. It
is known that there is a substantial difference between the cavities.
It would be a mistake to form a subgroup using a o-ring from cavities
known to be different because the cavity- to- cavity variation would mask
the variation caused by other factors such as material, temperature, etc..
SPC methods useful for this type of data are presented in chapter 21.
However, taking a longer-term perspective, you should try to modify the
mold so that there is less variation between the different cavities. Eventually
you would like to get the molding process so consistent that the o-rings
are all alike regardless of which cavity in the mold produced them. That
is the ultimate goal of SPC, to change the real world for the better not
to make a control chart look better.
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