Suppose we test H0: μ = 42 versus the alternative Ha: μ ≠ 42.   The p-value...

Suppose we test H0: μ = 42 versus the alternative Ha: μ ≠ 42.   The p-value...

Suppose we test H0: μ = 42 versus the alternative Ha: μ ≠ 42.   The p-value for this test is 0.03, which is less than 0.05, so the null hypothesis will be rejected. Suppose that after this test, we form a 95% confidence interval for μ. Which of the following intervals is the only possible confidence interval for these data? (Hint: use chapter 13 and the relationship between confidence intervals and hypothesis tests) Question 10 options: (35, 54) (24, 79)...

a. If for the test of H0: μ = μ h   vs. Ha: μ ≠ μ...

a. If for the test of H0: μ = μ h   vs. Ha: μ ≠ μ h the null hypothesis cannot be rejected at α = .05, then it ______ be rejected at α = .10 for the test of H0: μ = μ h   vs. Ha: μ > μ h. A. might B. must always C. will never ​​​​​​​b. If the 80% confidence interval for μ contains the value μ h, then the P-value for the test of H0:...

We wish to test H0: μ = 120 versus Ha: μ ¹ 120, where ? is...

We wish to test H0: μ = 120 versus Ha: μ ¹ 120, where ? is known to equal 14. The sample of n = 36 measurements randomly selected from the population has a mean of ?̅ = 15. a. Calculate the value of the test statistic z. b. By comparing z with a critical value, test H0 versus Ha at ? = .05.

Suppose we want to test H0: μ ≥ 30 versus H1: μ <30. Which of the...

Suppose we want to test H0: μ ≥ 30 versus H1: μ <30. Which of the following possible sample results based on a sample size 36 provides the strongest evidence for rejecting H0 in favor of H1?

Question 1 The p-value of a test H0: μ= 20 against the alternative Ha: μ >20,...

Question 1 The p-value of a test H0: μ= 20 against the alternative Ha: μ >20, using a sample of size 25 is found to be 0.3215. What conclusion can be made about the test at 5% level of significance? Group of answer choices Accept the null hypothesis and the test is insignificant. Reject the null hypothesis and the test is insignificant. Reject the null hypothesis and the test is significant Question 2 As reported on the package of seeds,...

The p-value for testing a hypothesis of H0: μ=100 Ha: μ≠100 is 0.064 with a sample...

The p-value for testing a hypothesis of H0: μ=100 Ha: μ≠100 is 0.064 with a sample size of n= 50. Using this information, answer the following questions. (a) What decision is made at the α= 0.05 significance level? (b) If the decision in part (a) is in error, what type of error is it? (c) Would a 95% confidence interval forμcontain 100? Explain. (d) Suppose we took a sample of size n= 200 and found the exact same value of...

Suppose we want to test H0 : μ ≥ 30 versus H1 : μ < 30....

Suppose we want to test H0 : μ ≥ 30 versus H1 : μ < 30. Which of the following possible sample results based on a sample of size 36 gives the strongest evidence to reject H0 in favor of H1? a) X¯=28,s=6 b) X¯=27,s=4 c) X¯=32,s=2 d) X¯=26,s=9

Test H0: μ ≤ 8 versus HA: μ > 8, given α = 0.01, n =...

Test H0: μ ≤ 8 versus HA: μ > 8, given α = 0.01, n = 25, X = 8.13 and s = 0.3. Assume the sample is selected from a normally distributed population.

n = 36 = 24.06 S = 12 H0: μ 20 Ha: μ > 20 If...

n = 36 = 24.06 S = 12 H0: μ 20 Ha: μ > 20 If the test is done at 95% confidence, the null hypothesis should Select one: A. not be rejected B. be rejected C. Not enough information is given to answer this question. D. None of these alternatives is correct.

For the following hypothesis test, where H0: μ ≤ 10; vs. HA: μ > 10, we...

For the following hypothesis test, where H0: μ ≤ 10; vs. HA: μ > 10, we reject H0 at level of significance α and conclude that the true mean is greater than 10, when the true mean is really 14. Based on this information, we can state that we have: Made a Type I error. Made a Type II error. Made a correct decision. Increased the power of the test.