Twenty-five samples of 100 items each were inspected when a process was considered to be operating...

Twenty-five samples of 100 items each were inspected when a process was considered to be operating...

Twenty-five samples of 100 items each were inspected when a process was considered to be operating satisfactorily. In the 25 samples, a total of 180 items were found to be defective. (a)What is an estimate of the proportion defective when the process is in control? _________________. (b)What is the standard error of the proportion if samples of size 100 will be used for statistical process control? (Round your answer to four decimal places.) ________________. (c)Compute the upper and lower control...

Twelve​ samples, each containing five​ parts, were taken from a process that produces steel rods at...

Twelve​ samples, each containing five​ parts, were taken from a process that produces steel rods at Emmanual​ Kodzi's factory. The length of each rod in the samples was determined. The results were tabulated and sample means and ranges were computed. Refer to Table S6.1 - Factors for computing control chart limits (3 sigma) for this problem. Sample ​Size, n Mean​ Factor, A2 Upper​ Range, D4 Lower​ Range, D3 2 1.880 3.268 0 3 1.023 2.574 0 4 0.729 2.282 0...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart for control. The samples and the number of defectives in each are shown in the following table: SAMPLE n NUMBER OF DEFECTIVE ITEMS IN THE SAMPLE 1 15 0 2 15 2 3 15 0 4 15 3 5 15 1 6 15 3 7 15 1 8 15 0 9 15 0 10 15 0 a. Determine the p−p−, Sp, UCL and LCL...

A process sampled 20 times with a sample of size 8 resulted in  = 23.5 and R...

A process sampled 20 times with a sample of size 8 resulted in  = 23.5 and R = 1.8. Compute the upper and lower control limits for the x chart for this process. (Round your answers to two decimal places.) UCL=________. LCL=________. Compute the upper and lower control limits for the R chart for this process. (Round your answers to two decimal places.) UCL=_________. LCL=___________.

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart for control. The samples and the number of defectives in each are shown in the following table: SAMPLE n NUMBER OF DEFECTIVE ITEMS IN THE SAMPLE 1 15 1 2 15 1 3 15 3 4 15 1 5 15 0 6 15 0 7 15 2 8 15 1 9 15 2 10 15 1 a. Determine the p−p− , Sp, UCL and...

Twenty-five samples, each consisting of 150 loan applications at a bank resulted in a total of...

Twenty-five samples, each consisting of 150 loan applications at a bank resulted in a total of 22 applications that had some type of error. Round your answer to 5 digits after the decimal point if it is not an integer. Do NOT use comma in your numeric answers. Sample size is ______ Number of samples is .________ When constructing a p chart the center line should be .________ ESD(p) equals ._______ The upper control limit (UCL) should be .________ The...

A manufacturing process produces steel rods in batches of 2,200. The firm believes that the percent...

A manufacturing process produces steel rods in batches of 2,200. The firm believes that the percent of defective items generated by this process is 4.3%. a. Calculate the centerline, the upper control limit (UCL), and the lower control limit (LCL) for the p¯p¯ chart. (Round your answers to 3 decimal places.) centerline- Upper control limit- Lower control limit- b. An engineer inspects the next batch of 2,200 steel rods and finds that 5.5% are defective. Is the manufacturing process under...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart for control. The samples and the number of defectives in each are shown in the following table: SAMPLE n NUMBER OF DEFECTIVE ITEMS IN THE SAMPLE 1 15 0 2 15 0 3 15 0 4 15 2 5 15 0 6 15 3 7 15 1 8 15 0 9 15 3 10 15 1 a. Determine the p−p−, Sp, UCL and LCL...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart...

Ten samples of 15 parts each were taken from an ongoing process to establish a p-chart for control. The samples and the number of defectives in each are shown in the following table: SAMPLE n NUMBER OF DEFECTIVE ITEMS IN THE SAMPLE 1 15 2 2 15 2 3 15 2 4 15 0 5 15 2 6 15 1 7 15 3 8 15 2 9 15 1 10 15 3 a. Determine the p−p− , Sp, UCL and...

A manufacturing process produces steel rods in batches of 1,700. The firm believes that the percent...

A manufacturing process produces steel rods in batches of 1,700. The firm believes that the percent of defective items generated by this process is 5.4%. a. Calculate the centerline, the upper control limit (UCL), and the lower control limit (LCL) for the p⎯⎯ chart. (Round your answers to 3 decimal places.) b. An engineer inspects the next batch of 1,700 steel rods and finds that 6.5% are defective. Is the manufacturing process under control?