Title: Boxes of Honey-Nut Oatmeal are produced to contain 16.0 16.0 ounces, with a standard ... Post by: Catracho on Jul 25, 2019 Boxes of Honey-Nut Oatmeal are produced to contain
16.0 16.0 ounces, with a standard deviation of 0.10 0.10 ounce. For a sample size of 36 36, the 3-sigma x overbar x chart control limits are Title: Re: Boxes of Honey-Nut Oatmeal are produced to contain 16.0 16.0 ounces, with a standard ... Post by: bio_man on Jul 25, 2019 Content hidden
Title: Re: Boxes of Honey-Nut Oatmeal are produced to contain 16.0 16.0 ounces, with a standard ... Post by: Catracho on Jul 30, 2019 You need to use the formula: \(UCL_{\overline{x}}=\overline{\overline{x}}+3\frac{\sigma }{\sqrt{n}}\) where UCL and LCL are the upper and lower control limits, n is the subgroup size, and σ is the estimated standard deviation of the individual values. \(UCL_{\overline{x}}=16.0+3\frac{0.10}{\sqrt{36}}\) Title: Re: Boxes of Honey-Nut Oatmeal are produced to contain 16.0 16.0 ounces, with a standard ... Post by: bio_man on Jul 30, 2019 Are we good here? Any further questions?
Title: Re: Boxes of Honey-Nut Oatmeal are produced to contain 16.0 16.0 ounces, with a standard ... Post by: websitestinks on Feb 26, 2020 Hopefully this works on my test
|