Process Capability - Variable Data

Quick reference

• 00:05 Hi, I'm Ray Sheen.
• 00:06 Now, I've alluded to process capability many times.
• 00:10 Now, let's dig in and study what process capability means in particular when
• 00:14 managing a process with variable data.
• 00:17 >> Process capability is a quantified metric that compares the needs of
• 00:21 the customer with the process performance.
• 00:24 Think of it as voice of the customer divided by voice of the process.
• 00:28 The voice of the customer will be expressed as the specification or
• 00:32 target value and tolerance limits on that process parameter.
• 00:36 In particular, we'll need the upper spec limit and the lower spec limit for
• 00:40 the performance parameter.
• 00:43 For the voice of the process,
• 00:44 we'll be using some of our descriptive statistic values.
• 00:47 In particular, the mean and the standard deviation will be used for variable data.
• 00:53 And with quantified voice of the customer and
• 00:56 quantified voice of the process, we can create the process capability metric.
• 01:01 With quantified voice of the customer and quantified voice of the process,
• 01:05 we can create the process capability metrics.
• 01:07 With variable data,
• 01:09 we'll calculate ratios that serve as our process capability indices.
• 01:13 These ratios of customer expectation divided by customer performance are Cp and
• 01:19 Cpk for short-term data, and Pp and Ppk, for long-term or full population dataset.
• 01:26 All four indices follow the same pattern.
• 01:29 It's the ratio of the desired performance for
• 01:32 a process parameter divided by the actual process performance of that parameter.
• 01:38 That means it's the range allowed on the specification divided by the range of
• 01:42 the actual process variability.
• 01:44 So you may be wondering why there are four indices.
• 01:48 Each of these is a different take on the process performance data.
• 01:51 The Cp and Pp indices provide a best case perspective.
• 01:56 These ratios assume that the process is being managed as designed and all is going
• 02:02 well, while the Cpk and Ppk indices will look at the current performance.
• 02:07 That means that the Cpk and Ppk are what the customer and
• 02:10 the process are actually feeling at this time.
• 02:14 So one immediate insight is that we can never have a better ratio than the Cpp or
• 02:20 Ppp ratio, they are the best case.
• 02:23 Now, another perspective in the indices is the Cp and
• 02:27 Cpk are short-term look at a dataset, a sample dataset ,while Pp and
• 02:32 Ppk are a longer-term look at the full data population.
• 02:36 So bottom line, Cpk is what the customer is feeling right now and
• 02:41 Ppk is what the customer has been feeling for a long time.
• 02:46 So let's take a look at the calculations.
• 02:49 I'll talk about Cp and Pp first.
• 02:51 These are calculated in exactly the same manner.
• 02:54 The only difference is that the Cp is using the standard
• 02:57 deviation from the sample of recent experience and
• 03:01 the Pp is using the standard deviation from the long-term full population.
• 03:05 This calculation is the allowable range of performance divided by the span of normal
• 03:09 variation within the process output.
• 03:12 The allowable range based on customer expectation
• 03:15 is the span from the upper spec limit to the lower spec limit.
• 03:19 And the normal performance variation will be from minus 3 standard deviations to
• 03:23 plus 3 standard deviations, which is a total of six standard deviations.
• 03:28 And as I said, the only difference between Cp and
• 03:32 Pp is the size of the dataset that's used in calculating the standard deviation.
• 03:38 So what does this look like?
• 03:40 Let's first consider a case where Cp is greater than 1.
• 03:45 In this case, the span between the spec limits is greater than the span between
• 03:49 plus and minus 3 sigma.
• 03:52 As you can see in this diagram, the spec limits are outside the plus or
• 03:55 minus 3 sigma lines in the normal distribution.
• 03:59 But when Cp is less than 1, the opposite condition exists.
• 04:02 The specification is still the same, but
• 04:05 the variation in the parameter is much larger, so the distribution is much wider.
• 04:09 Therefore, the span from minus 3 sigma to plus 3 sigma is greater than
• 04:14 the spec limits, and that means that the ratio is less than 1.
• 04:18 The implication of this is that if the ratio is less than 1,
• 04:21 the process will always be generating some out of spec results.
• 04:25 While if the ratio is greater than 1, the process has the potential to be generating
• 04:30 good results virtually every time.
• 04:32 Notice I said, potential.
• 04:34 We'll use the Cpk and Ppk to look at the reality.
• 04:38 The reality is that the process is seldom perfectly centered in the middle of
• 04:42 the specification limits.
• 04:44 It's either a little high or a little low, so the Cpk and
• 04:47 Ppk calculations will adjust for that.
• 04:50 They will essentially split the ratio into two.
• 04:53 The formula looks like this.
• 04:54 They will modify the numerator to pick the distance from the mean or
• 04:58 average value of the data to the closest specification limit, and
• 05:01 the denominator will then just be threee standard deviations.
• 05:05 We call it the minimum function because we're taking the smaller of
• 05:09 the two numerators.
• 05:10 In our case, that means that we will only use one side of the normal distribution,
• 05:15 which is just the 3 standard deviations.
• 05:18 So let's look at the diagram again.
• 05:20 In this case, the Cpk is less than 1, although the Cp is greater than 1.
• 05:26 You can see that the distribution of the actual value is shifted
• 05:30 down to the low side of the allowable range.
• 05:33 The difference from the lower spec limit to the mean or
• 05:36 x-bar is significantly less than the width of three standard deviations.
• 05:41 If the process output had been centered, it would have fit within the spec limits,
• 05:46 which is why the Cp is greater than 1, even though Cpk is less than 1.
• 05:51 Let me wrap this up with an illustration.
• 05:54 Let's say we have a nice little garage or carport,
• 05:56 and the width of the garage will be my upper spec limit and lower spec limits.
• 06:01 Now, I can either drive a car or ride a motorbike.
• 06:04 The width of the car or
• 06:06 motorbike is analogous to the process width of minus 3 sigma to plus 3 sigma.
• 06:12 If I park the motorbike in the center of the garage,
• 06:15 I have lots of room on either side, and both Cp and Cpk are much greater than 1.
• 06:20 If I parked my car in the center of the garage, it just barely fits.
• 06:24 In that case, my Cp and Cpk are just barely over 1.
• 06:29 Now let's say it's late at night, I've been out with friends,
• 06:32 I'm a little overtired, as I pull my motorbike into the garage,
• 06:35 I don't quite line it up in the center.
• 06:37 That's okay.
• 06:38 Since the Cp is much greater than 1, I can be off to one side and
• 06:42 still have a Cpk greater than 1.
• 06:45 But if I'm driving my car and I'm off to one side, I have a problem,
• 06:49 there will be no allowance for a little bit of drift.
• 06:53 And while my Cp is still slightly greater than 1,
• 06:56 because I'm no longer centered, my Cpk is less than 1.
• 07:00 >> Process capability relates the actual performance of the process to
• 07:04 the specification limits that are defined by the customer.
• 07:07 With these ratios, we can quickly determine if we have a design problem or
• 07:12 a process control problem.

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