1) You are testing to see if the population mean, $\displaystyle \mu$ is greater than 59. You sample and find your sample mean to be 65. Does this necessarily mean that $\displaystyle \mu$ is greater than 59?  Select an answer Unable to determine Yes No

2) You are testing to see if the population mean, $\displaystyle \mu,$ is greater than 59. You sample and find your sample mean to be 65. You run a right-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you reject the null hypothesis. This means that you are:  Select an answer able to show the population mean is greater than 59 unable to show the population mean is greater than 59 unable to show the sample mean is greater than 59 able to show the sample mean is greater than 59

3) You are testing to see if the population mean, $\displaystyle \mu,$ is greater than 59. You sample and find your sample mean to be 65. You run a right-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you do not reject the null hypothesis. This means that you are:  Select an answer unable to show the sample mean is greater than 59 able to show the population mean is greater than 59 able to show the sample mean is greater than 59 unable to show the population mean is greater than 59

4) You are testing to see if the population mean, $\displaystyle \mu$ is less than 65. You sample and find your sample mean to be 59. Does this necessarily mean that $\displaystyle \mu$ is less than 65?  Select an answer Unable to determine Yes No

5) You are testing to see if the population mean, $\displaystyle \mu,$ is less than 65. You sample and find your sample mean to be 59. You run a left-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you reject the null hypothesis. This means that you are:  Select an answer unable to show the sample mean is less than 65 able to show the population mean is less than 65 unable to show the population mean is less than 65 able to show the sample mean is less than 65

6) You are testing to see if the population mean, $\displaystyle \mu,$ is less than 65. You sample and find your sample mean to be 59. You run a left-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you do not reject the null hypothesis. This means that you are:  Select an answer unable to show the population mean is less than 65 able to show the population mean is less than 65 unable to show the sample mean is less than 65 able to show the sample mean is less than 65

7) You are testing to see if the population mean, $\displaystyle \mu$ is different than ($\displaystyle \ne$ ) 59. You sample and find your sample mean to be 65. Does this necessarily mean that $\displaystyle \mu$ $\displaystyle \ne$  59?  Select an answer Unable to determine No Yes

8) You are testing to see if the population mean, $\displaystyle \mu$ is different than ($\displaystyle \ne$ ) 59. You sample and find your sample mean to be 65. You run a two-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you reject the null hypothesis. This means that you are:  Select an answer able to show the population mean is different than 59 able to show the population mean is less than 59 unable to show the population mean is less than 59 unable to show the population mean is greater than 59 able to show the population mean is greater than 59 unable to show the population mean is different than 59

9) You are testing to see if the population mean, $\displaystyle \mu$ is different than ($\displaystyle \ne$ ) 65. You sample and find your sample mean to be 59. You run a two-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you reject the null hypothesis. This means that you are:  Select an answer able to show the population mean is less than 65 unable to show the population mean is different than 65 able to show the population mean is different than 65 unable to show the population mean is less than 65 unable to show the population mean is greater than 65 able to show the population mean is greater than 65

10) You are testing to see if the population mean, $\displaystyle \mu$ is different than ($\displaystyle \ne$ ) 65. You sample and find your sample mean to be 59. You run a two-tailed hypothesis test for the population mean, $\displaystyle \mu$ ,and you do not reject the null hypothesis. This means that you are:  Select an answer unable to show the population mean is greater than 65 unable to show the population mean is different than 65 able to show the population mean is different than 65 unable to show the population mean is less than 65 able to show the population mean is less than 65 able to show the population mean is greater than 65