ISDS CH 8

Why is it not possible to have​ 100% confidence? Explain

A​ 100% confidence interval is not possible unless either the entire population is sampled or an absurdly wide interval of estimates is provided

What does your answer to​ (a) tell you about the​ "practicality" of using the confidence interval estimate​ formula?

If you have a​ sample, you are computing the sample standard deviation needed in confidence interval estimate formula. If you have a population and have computed the population mean and population standard​ deviation, you​ don't need a confidence interval estimate of the population mean`

A 90 confidence interval estimate for the population mean paper length is 10.9957110.99571less than or equals≤muμless than or equals≤11.0022911.00229. Is it true that you do not know for sure whether the population mean is between 10.9957110.99571 and 11.0022911.00229 ​inches? Explain

It is true because the population mean will be in the interval only 9090​% of the time.

A market researcher selects a simple random sample of nequals=100 users of a social media website from a population of over 100 million registered users. After analyzing the​ sample, she states that she has​ 95% confidence that the mean time spent on the site per day is between 15 and 57 minutes. Explain the meaning of this statement

One is​ 95% confident that the true mean time all registered users spend on the site per day is between 15 and 57 minutes.

A market researcher collects a simple random sample of customers from its population of two million customers. After analyzing the​ sample, she states that she has​ 95% confidence that the mean annual income of its two million customers is between $ 56 comma 000$56,000 and $ 72 comma 000.$72,000. Suppose that the population mean annual income is $ 62 comma 000.$62,000. Is the confidence interval estimate​ correct? Explain

Yes​, because the value of muμ isis included within the confidence interval estimate.

Which statistical measure would you compute​ first, the mean or the standard​ deviation? Explain. Choose the correct answer below.

You would compute the mean first because it is needed in order to compute the standard deviation. If you had a​ sample, you would compute the sample mean. If you had the population​ mean, you would compute the population standard deviation