To test the hypothesis that the population means mu=17.0, a sample size n=20 yields a sample...

To test the hypothesis that the population mean mu=15.8, a sample size n=29 yields a sample...

To test the hypothesis that the population mean mu=15.8, a sample size n=29 yields a sample mean 16.805 and sample standard deviation 2.738. Calculate the P-value and choose the correct conclusion. Options: The P-value 0.229 is not significant and so does not strongly suggest that mu>15.8. The P-value 0.229 is significant and so strongly suggests that mu>15.8. The P-value 0.026 is not significant and so does not strongly suggest that mu>15.8. The P-value 0.026 is significant and so strongly suggests...

To test the hypothesis that the population standard deviation sigma=4.9, a sample size n=25 yields a...

To test the hypothesis that the population standard deviation sigma=4.9, a sample size n=25 yields a sample standard deviation 3.437. Calculate the P-value and choose the correct conclusion. Your answer: The P-value 0.018 is not significant and so does not strongly suggest that sigma<4.9. The P-value 0.018 is significant and so strongly suggests that sigma<4.9. The P-value 0.028 is not significant and so does not strongly suggest that sigma<4.9. The P-value 0.028 is significant and so strongly suggests that sigma<4.9....

To test the hypothesis that the population standard deviation sigma=2.8, a sample size n=25 yields a...

To test the hypothesis that the population standard deviation sigma=2.8, a sample size n=25 yields a sample standard deviation 2.387. Calculate the P-value and choose the correct conclusion.

A simple random sample of size n equals 36 is obtained from a population with mu...

A simple random sample of size n equals 36 is obtained from a population with mu equals 72 and sigma equals 12 . ​(a) Describe the sampling distribution of x. ​ B. P (x > 74.9) = ? C. P (x <= 67) = ? D. P (71 < x <7.62) = ?

The MINITAB printout shows a test for the difference in two population means. Two-Sample T-Test and...

The MINITAB printout shows a test for the difference in two population means. Two-Sample T-Test and CI: Sample 1, Sample 2 Two-sample T for Sample 1 vs Sample 2      N Mean StDev SE Mean Sample 1 5 29.00 3.00 1.3 Sample 2 7 28.89 3.63 1.4 Difference = mu (Sample 1) - mu (Sample 2) Estimate for difference: 0.11 95% CI for difference: (-4.3, 4.5) T-Test of difference = 0 (vs not =): T-Value = 0.06 P-Value = 0.96...

A simple random sample of size n equals 12 is obtained from a population with mu...

A simple random sample of size n equals 12 is obtained from a population with mu equals 66 and sigma equals 17. (b)​ P(x overbarless than69.7​) equals ​(Round to four decimal places as​ needed.) How do I use technology to calculate?

Suppose a simple random sample of size n=81 is obtained from a population with mu=89 and...

Suppose a simple random sample of size n=81 is obtained from a population with mu=89 and sigma=27. ​(a) Describe the sampling distribution of x overbar. ​(b) What is P(x overbar > 92.9)? ​(c) What is P( x overbar < or equals 82.7)​? ​ (d) What is P(86 < x overbar < 96.35)​?

Find the P-value of a test of hypothesis if the value found for the sample mean...

Find the P-value of a test of hypothesis if the value found for the sample mean was 35.03 the Null Hypothesis assumes that the population mean is Mu=33, the population standard deviation is 8 and the sample size is sample size is 12

A random sample of n = 81 observations is drawn from a population with a mean...

A random sample of n = 81 observations is drawn from a population with a mean equal to 15 and a standard deviation equal to 9 . Complete parts a through g below. a. Give the mean and standard deviation of the? (repeated) sampling distribution x overbar . mu Subscript x overbar equalsnothingsigma Subscript x overbar equalsnothing ?(Type integers or? decimals.) b. Describe the shape of the sampling distribution of x overbar . Does this answer depend on the sample?...

A simple random sample of size n is drawn from a population that is normally distributed....

A simple random sample of size n is drawn from a population that is normally distributed. The sample​ mean, x overbar ​, is found to be 106 ​, and the sample standard​ deviation, s, is found to be 10 . ​(a) Construct an 80 ​% confidence interval about mu if the sample​ size, n, is 29 . ​(b) Construct an 80 ​% confidence interval about mu if the sample​ size, n, is 13 . How does decreasing the sample size...