The following data represent the pH of rain for a random sample of 12 rain dates in a particular region. A normal probability plot suggests the data could come from a population that is normally...


The following data represent the pH of rain for a random sample of 12 rain dates in a particular region. A normal probability plot suggests the data could come from a population that is normally distributed. A boxplot indicates there are no outliers.<br>The sample standard deviation is s = 0.360. Construct and interpret a 95% confidence interval for the standard deviation pH of rainwater in this region.<br>4.55<br>5.22<br>5.14<br>4.76<br>4.80<br>4.68<br>5.85<br>4.82<br>5.14<br>4.76<br>4.78<br>4.63<br>Click the icon to view the table of critical values of the chi-square distribution.<br>Select the correct choice below and fill in the answer boxes to complete your choice.<br>(Use ascending order. Round to three decimal places as needed.)<br>A. There is 95% confidence that the population standard deviation is between<br>and<br>O B. There is a 95% probability that the true population standard deviation is between<br>and<br>C. If repeated samples are taken, 95% of them will have the sample standard deviation between<br>and<br>

Extracted text: The following data represent the pH of rain for a random sample of 12 rain dates in a particular region. A normal probability plot suggests the data could come from a population that is normally distributed. A boxplot indicates there are no outliers. The sample standard deviation is s = 0.360. Construct and interpret a 95% confidence interval for the standard deviation pH of rainwater in this region. 4.55 5.22 5.14 4.76 4.80 4.68 5.85 4.82 5.14 4.76 4.78 4.63 Click the icon to view the table of critical values of the chi-square distribution. Select the correct choice below and fill in the answer boxes to complete your choice. (Use ascending order. Round to three decimal places as needed.) A. There is 95% confidence that the population standard deviation is between and O B. There is a 95% probability that the true population standard deviation is between and C. If repeated samples are taken, 95% of them will have the sample standard deviation between and

Jun 08, 2022
SOLUTION.PDF

Get Answer To This Question

Related Questions & Answers

More Questions »

Submit New Assignment

Copy and Paste Your Assignment Here