A standard 3 sigma x-bar chart has been enhanced with early warning limits at pl

DofotheroU

DofotheroU

Answered question

2021-10-26

A standard 3 sigma x-bar chart has been enhanced with early warning limits at plus-minus one sigma from the centerline . Three sample means in a row have plotted above the +1 sigma line . what is the probability of this happening if the process is still in control.

Answer & Explanation

SabadisO

SabadisO

Skilled2021-10-27Added 108 answers

Step 1
Introduction:
The empirical rule for a normally distributed random variable is as follows:
1) About 68% of the data lie within the 1-standard deviation interval about the mean;
2) About 95% of the data lie within the 2-standard deviation interval about the mean;
3) About 99.7% of the data lie within the 3-standard deviation interval about the mean.
Step 2
Explanation:
When the process is still in control, the sample mean can be said to follow the normal distribution with the true value of the characteristic of interest as the mean (center line), and the relevant standard error of sample mean. In this case, the above empirical rule will hold true for the process.
Step 3
Calculation:
Assume X1,X2,X3 to be three consecutive sample means obtained from the process. Since the samples are all obtained at random, the values taken by the sample mean will be independent of one another. Further, being taken from the same process, X1,X2,X3 are identically distributed.
Now, it is given that each of the three means are above the +1-standard deviation line, that is, above the upper bound of the 1-standard deviation interval of the mean.
Consider the case of X1
Since 68% of the data lie within the 1-standard deviation interval, the remaining 32%=(100%68%) lie outside the 1-standard deviation interval. The normal distribution being symmetric, half of this 32% would lie above the upper bound of the 1-standard deviation interval, while the remaining half would lie below the lower bound of the interval.
Thus, X1­ would lie above the upper bound of the 1-standard deviation interval, that is, above the +1-standard deviation line, with a 16%=(32%2) or 0.16 probability.
Since X1,X2,X3 are identically distributed, each of X2 and X3 would lie above the +1-standard deviation line with probability 0.16.
The distributions of X1,X2,X3 being independent, the probability that all three of X1,X2,X3 lie above the +1-standard deviation line is the product of the individual probabilities, that is, (0.16)(0.16)(0.16)0.004096
Hence, if the process is still in control, the probability that 3 sample means in a row would plot above the +1-standard deviation line is 0.004096.

Do you have a similar question?

Recalculate according to your conditions!

New Questions in College Statistics

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?