The annual earnings of 13 randomly selected computer software engineers have a sample standard deviation of...

The annual earnings of 14 randomly selected computer software engineers have a sample standard deviation of...

The annual earnings of 14 randomly selected computer software engineers have a sample standard deviation of $3668. Assume the sample is from a normally distributed population. Construct a confidence interval for the population variance sigma squared σ2 and the population standard deviation σ. Use a 95% level of confidence. Interpret the results. 1. What is the confidence interval for the population variance σ2​? (____,___) 2. Interpret the results. Select the correct choice below and fill in the answer​ box(es) to...

The prices of a random sample of 24 new motorcycles have a sample standard deviation of...

The prices of a random sample of 24 new motorcycles have a sample standard deviation of $3738. Assume the sample is from a normally distributed population. Construct a confidence interval for the population variance sigma squaredσ2 and the population standard deviation sigmaσ. Use a 99% level of confidence. Interpret the results.

In a random sample of 17 senior-level chemical engineers, the mean annual earnings was 123950 and...

In a random sample of 17 senior-level chemical engineers, the mean annual earnings was 123950 and the standard deviation was 34940. Assume the annual earnings are normally distributed and construct a 95% confidence interval for the population mean annual earnings for senior-level chemical engineers. 1. The critical value: 2. The standard error of the sample mean: 3. The margin of error: 4. The lower limit of the interval: 5. The upper limit of the interval:

In a random sample of 15 senior-level chemical engineers, the mean annual earnings was 122050 and...

In a random sample of 15 senior-level chemical engineers, the mean annual earnings was 122050 and the standard deviation was 34680. Assume the annual earnings are normally distributed and construct a 95% confidence interval for the population mean annual earnings for senior-level chemical engineers. 1. The critical value: 2. The standard error of the sample mean: 3. The margin of error: 4. The lower limit of the interval: 5. The upper limit of the interval:

In a random sample of 14 senior-level chemical engineers, the mean annual earnings was 138850 and...

In a random sample of 14 senior-level chemical engineers, the mean annual earnings was 138850 and the standard deviation was 35800. Assume the annual earnings are normally distributed and construct a 95% confidence interval for the population mean annual earnings for senior-level chemical engineers. 1. The critical value: 2. The standard error of the sample mean: 3. The margin of error: 4. The lower limit of the interval: 5. The upper limit of the interval:

In a random sample of 19 senior-level chemical engineers, the mean annual earnings was 132150 and...

In a random sample of 19 senior-level chemical engineers, the mean annual earnings was 132150 and the standard deviation was 35660. Assume the annual earnings are normally distributed and construct a 95% confidence interval for the population mean annual earnings for senior-level chemical engineers. 1. What is the critical value? 2. What is the standard error of the sample mean? 3. The margin of error? 4. The lower limit of the interval? 5. The upper limit of the interval?

The diameters​ (in inches) of 17 randomly selected bolts produced by a machine are listed. Use...

The diameters​ (in inches) of 17 randomly selected bolts produced by a machine are listed. Use a 99​% level of confidence to construct a confidence interval for ​(a) the population variance sigma squared and ​(b) the population standard deviation sigma. Interpret the results. 4.477 4.427 4.024 4.309 4.006 3.742 3.829 3.749 4.224 3.961 4.128 4.573 3.958 3.742 3.857 3.832 4.465 ​ (a) The confidence interval for the population variance is ​(__,__​). ​(Round to three decimal places as​ needed.)

The waiting times​ (in minutes) of a random sample of 20 people at a bank have...

The waiting times​ (in minutes) of a random sample of 20 people at a bank have a sample standard deviation of 4.4 minutes. Construct a confidence interval for the population variance sigma squared and the population standard deviation sigma. Use a 90 % level of confidence. Assume the sample is from a normally distributed population. What is the confidence interval for the population variance sigma squared​? ​( nothing​, nothing​) ​(Round to one decimal place as​ needed.) Interpret the results. Select...

The thicknesses of 13 randomly selected linoleum tiles were found to have a standard deviation of...

The thicknesses of 13 randomly selected linoleum tiles were found to have a standard deviation of 4.76. Construct the 90% confidence interval for the population standard deviation of the thicknesses of all linoleum tiles in this factory. Round your answers to two decimal places.

The waiting times​ (in minutes) of a random sample of 22 people at a bank have...

The waiting times​ (in minutes) of a random sample of 22 people at a bank have a sample standard deviation of 4.2 minutes. Construct a confidence interval for the population variance sigma squaredσ2 and the population standard deviation sigmaσ. Use a 90% level of confidence. Assume the sample is from a normally distributed population.