What is the research hypothesis for the null hypothesis, H0: µ1 = 4.05 H1: µ1 =...

Consider the hypothesis test with null hypothesis µ1=µ2 and alternative hypothesis µ1 > µ2. Suppose that...

Consider the hypothesis test with null hypothesis µ1=µ2 and alternative hypothesis µ1 > µ2. Suppose that sample sizes n1 = 10 and n2 =10, that the sample means are 7.8 and 5.6 respectively, and that the sample variances are 4 and 9 respectively. Assume that the population variances are equal and that the data are drawn from normal distributions. a) Test the hypothesis that at α= 0.05 and provide a conclusion statement b) Provide an adequate confidence interval with 95%...

You are testing H0: µ1 - µ 2 = 0 vs H1: µ1 - µ2 ≠...

You are testing H0: µ1 - µ 2 = 0 vs H1: µ1 - µ2 ≠ 0. In doing so, you are choosing n1 observations from population 1, and n2 observations from population 2. Keeping the same total N = 100 = n1 + n2, compute the power of the test to detect a difference of 0.6, with a population standard deviation of 1.0 when: n1 = 0.1×n2, n1 = 0.2×n2, n1 = 0.3×n2, …, n1 = 1.0×n2, n1 =...

Use the following for question 1, 2, and 3. Consider the following hypothesis test: H0: µ1...

Use the following for question 1, 2, and 3. Consider the following hypothesis test: H0: µ1 – µ2 = 0 Ha: µ1 – µ2 ≠ 0 The following results are from samples from two populations. Sample 1 Sample 2 sample size 12 15 sample mean 13 10 sample std. dev. 5 8 1) What is the estimate of the difference between the two population means? Use Sample1 – Sample2? 2) What is the value of the test statistic? Give your...

The null hypothesis and the alternate hypothesis are: H0: The frequencies are equal. H1: The frequencies...

The null hypothesis and the alternate hypothesis are: H0: The frequencies are equal. H1: The frequencies are not equal. Category f0 A 10 B 20 C 30 D 20 State the decision rule, using the 0.05 significance level. (Round your answer to 3 decimal places.) Compute the value of chi-square. What is your decision regarding H0?

The null hypothesis and the alternate hypothesis are: H0: The frequencies are equal. H1: The frequencies...

The null hypothesis and the alternate hypothesis are: H0: The frequencies are equal. H1: The frequencies are not equal. Category f0 A 25 B 15 C 25 D 15 State the decision rule, using the 0.01 significance level. (Round your answer to 3 decimal places.) Reject H0 if chi-sqaure > _____. Compute the value of chi-square. (Round your answer to 2 decimal place.) Chi-square value: _____. What is your decision regarding H0? Do not reject or Reject H0. The frequencies...

Match the null hypothesis (Ho) to the correct hypothesis (H1) H0: Lot A tensile strength is...

Match the null hypothesis (Ho) to the correct hypothesis (H1) H0: Lot A tensile strength is not greater than lot B tensile strength H0: Lot A tensile strength exceeds or equal lot B tensile strength H0: Lot A tensile strength is comparable to lot B tensile Strength 1. H1: The mean of Lot A tensile strength is < the mean of Lot B tensile strength. 2. H1: The mean of Lot A tensile strength is > the mean of Lot...

Jovon conducts a hypothesis test for a population mean difference. The null and alternative hypotheses are...

Jovon conducts a hypothesis test for a population mean difference. The null and alternative hypotheses are as follows: Ho: µ1 ≤ µ2; Ha: µ1 > µ2. His t-test statistic = 2.85 with df = 19. What is the p-value associated with his hypothesis test using Table A.5 or TI function?

Identify the null hypothesis, alternative hypothesis, test statistic, P-value, conclusion about the null hypothesis, and final...

Identify the null hypothesis, alternative hypothesis, test statistic, P-value, conclusion about the null hypothesis, and final conclusion that addresses the original claim. Use the P-value method. A study was done on body temperatures of men and women. Here are the sample statistics for the men: x1 = 97.55oF, s1 = 0.83oF, n1 = 11, and for the women: x2 = 97.31oF, s2 = 0.65oF, n2 = 59. Use a 0.06 significance level to test the claim that µ1 > µ2.

A manufacturing firm need to test the null hypothesis H0 that the probability p of a...

A manufacturing firm need to test the null hypothesis H0 that the probability p of a defective item is 0.1 or less, against the alternative hypothesis H1:p>0.1. The procedure is to select two items at random. If both are defective, H0 is rejected; otherwise, a third item is selected. If the third item is defective, H0 is rejected. In all other cases, H0 is accepted. What is the power of the test in terms of p?

A manufacturing firm need to test the null hypothesis H0 that the probability p of a...

A manufacturing firm need to test the null hypothesis H0 that the probability p of a defective item is 0.1 or less, against the alternative hypothesis H1:p>0.1. The procedure is to select two items at random. If both are defective, H0 is rejected; otherwise, a third item is selected. If the third item is defective, H0 is rejected. In all other cases, H0 is accepted. What is the power of the test in terms of p?