Cp and Cpk Consider two processes A and B each with sample size of n =...

Consider two processes A and B each with sample size of n = 5            Process...

Consider two processes A and B each with sample size of n = 5            Process A: Mean = 100        Sample Standard deviation = 3            Process B: Mean = 105        Sample Standard deviation = 1                        Specifications are 100 + or -10, Find the process standard deviations Calculate Cp and Cpk for each process and interpret these ratios Find the percentage of production outside the specification limits Which process would you prefer?

For each of the following processes, a sample of size 400 is collected in order to...

For each of the following processes, a sample of size 400 is collected in order to estimate the process mean and variability. Process Mean Sample Standard Deviation (s or σ) Lower Spec Upper Spec A 29.3 0.74 26.8 31.8 B 119.6 2.56 115.5 132.5 Indicate which measure of process capability (Cpvs.Cpk) appears the more appropriate to use for each process, and state why. Compute the appropriate measure of process capability for each process.

A new process is started, and the sum of the sample standard deviation, ∑s, for 25...

A new process is started, and the sum of the sample standard deviation, ∑s, for 25 rows of measurement, each of subgroup size 4, is 750. If the specifications are 700 ± 80 and the process center, Xbar-bar = 720, compute (to 3 decimal places) the Process Capability Index Cpk. (Please show all work)

Consider a sampling distribution with p equals 0.13p=0.13 and samples of size n each. Using the...

Consider a sampling distribution with p equals 0.13p=0.13 and samples of size n each. Using the appropriate​ formulas, find the mean and the standard deviation of the sampling distribution of the sample proportion. a. For a random sample of size n=5000. The standard deviation is ____ (Round to four decimal places as needed) b. For a random sample of size n=1000. The standard deviation is ____ (Round to four decimal places as needed) c. For a random sample of size...

Consider an x distribution with standard deviation σ = 40. (For each answer, enter an exact...

Consider an x distribution with standard deviation σ = 40. (For each answer, enter an exact number.) (a) If specifications for a research project require the standard error of the corresponding distribution to be 5, how large does the sample size need to be? n= (b) If specifications for a research project require the standard error of the corresponding distribution to be 1, how large does the sample size need to be? n=

Please answer with proper steps - Suppose that a random sample of size n is drawn...

Please answer with proper steps - Suppose that a random sample of size n is drawn from a population with mean µ = 220 and standard deviation σ = 20. i. Determine the required sample size such that the standard error of the sample mean is reduced to less than 3. [2 marks] ii. Determine the required sample size if we want to be 90% confident that the maximum error is 5.

Consider two sample means distributions corresponding to the same x distribution. The first sample mean distribution...

Consider two sample means distributions corresponding to the same x distribution. The first sample mean distribution is based on samples of size n=100 and the second is based on sample of size n=225. Illustrate the effect of standard error on each set, and show how the difference in sample size would either increase to decrease the numeric value for each grouping. Illustrate your examples for each answer.

Show in excel if possible: Suppose a sample data set of size n = 20 has...

Show in excel if possible: Suppose a sample data set of size n = 20 has a sample mean x=115, and a sample standard deviation, s = 23. a) Develop a 80% confidence interval for the population mean. b) In words, how do you interpret this confidence interval?

Population Sample size Sample mean Sample Standard Deviation    One n=20 x1= 11.07 s1= 1.74    ...

Population Sample size Sample mean Sample Standard Deviation    One n=20 x1= 11.07 s1= 1.74     Two n=20 x2= 6.36 s2 = 1.50 a) Test at 5% level individually if the mean percentage for each Population is different from 10%. b) Obtain a 95% confidence interval for the difference of means for the two populations. c) Test an appropriate pair of hypotheses for the two means at 5% level of significance.

A simple random sample of size n is drawn from a population that is normally distributed....

A simple random sample of size n is drawn from a population that is normally distributed. The sample​mean, x overbar ​, is found to be 105 ​, and the sample standard​deviation,s, is found to be 10 . ​(a)Construct an 80 ​% confidence interval about mu if the sample​size,n, is 26 . ​(b)Construct an 80 ​% confidence interval about mu if the sample​size,n, is 16 . ​(c)Construct a 70 ​% confidence interval about mu if the sample​size,n, is 26 . ​(d)Could...