Answer:
4.00
Explanation:
Given:
Upper Specification Limit, USL = 27
Lower Specification Limit, LSL = 21
Mean = 22
Standard deviation, [tex] \sigma [/tex] = 0.25
Required:
Find the process capability index
First center the mean by taking the average of the LSL and USL.
[tex] X = \frac{21 + 27}{2} [/tex]
[tex] \frac{48}{2} = 24 [/tex]
[tex] X = 24 [/tex]
Use formula below to find process capability index:
[tex] C_p_i = min [(\frac{USL - X}{3*\sigma}), (\frac{X - LSL}{3*\sigma})] [/tex]
[tex] C_p_i = min [(\frac{27 - 24}{3*0.25}), (\frac{24 - 21}{3*0.25})] [/tex]
[tex] = min [(\frac{3}{0.75}), (\frac{3}{0.75})] [/tex]
[tex] min [ (4.00), (4.00)] [/tex]
We are sullosed to take the minimum value, but since both values are equal, our process capability index will be 4.00
Therefore, the process capability index = 4.00
