Suppose you are going to test the hypothesis that two populations have the same mean. You...

The primary purpose of hypothesis testing is to attempt to reject the null hypothesis not to...

The primary purpose of hypothesis testing is to attempt to reject the null hypothesis not to accept the alternative hypothesis. True False In hypothesis testing, a Type 1 error is failing to reject the null hypothesis when it is true. failing to reject the null hypothesis when it is false. rejecting the null hypothesis when it is true. rejecting the null hypothesis when it is false. In general, the power of a statistical test is the probability that a test...

1.Suppose you wish to test the null hypothesis that the mean of a population is 100...

1.Suppose you wish to test the null hypothesis that the mean of a population is 100 versus the alternative that the mean is not equal to 100. You then take a sample and calculate a sample of mean of 90. Which of the following conclusions is correct? a. You should reject the null hypothesis b. You should not reject the null hypothesis c. You should reject the null if n > 30, otherwise do not reject d.You should accept the...

Suppose you have a two sided hypothesis test, Ha: ? ? ?0 with a test statistic...

Suppose you have a two sided hypothesis test, Ha: ? ? ?0 with a test statistic z=2.70.  Determine the p-value and give the decision of this test. Use a 5% level of significance. a) P-value of 0.0035, reject the null hypothesis. b) P-value of 0.0035, fail to reject the null hypothesis. c) P-value of 0.9931, fail to reject the null hypothesis. d) P-value of 0.0069, reject the null hypothesis.

Suppose you conduct a hypothesis test for the following hypotheses from a sample of n =...

Suppose you conduct a hypothesis test for the following hypotheses from a sample of n = 25 observations, and you calculate a test statistic of t = 1.75. (2 points each) H0: m = 0 Ha: m > 0 What are the degrees of freedom for this statistic? What are the two critical values t* from the t-Distribution Critical Values table that bracket this test statistic? What are the one-sided p-values for these two entries? Is the value t =...

Describe a situation where you would use ANOVA by stating 1. the quantity of populations that...

Describe a situation where you would use ANOVA by stating 1. the quantity of populations that are to be investigated, 2. a quantitative variable on these populations, 3. the sizes of samples from these Populations, 4. your null hypothesis, 5. your alternative hypothesis, and 6. a significance level. Then find 7. The degrees of freedom of the numerator of your F-statistic, p 8. the degrees of freedom of the denominator of your F-statistic, and state 9. what the P-value for...

Suppose you are planning to use a test of the population mean when the population standard...

Suppose you are planning to use a test of the population mean when the population standard deviation is known (a z test) to test the following one-tailed hypotheses. H₀: μ ≤ 0 H₁: μ > 0 Since you want to maximize the power of your study, you are considering which factors might decrease power so that you can adjust your plans to avoid them, if possible, before conducting your research. The following are your considerations for decreasing power. Fill in...

Independent random samples, each containing 80 observations, were selected from two populations. The samples from populations...

Independent random samples, each containing 80 observations, were selected from two populations. The samples from populations 1 and 2 produced 16 and 10 successes, respectively. Test H0:(p1−p2)=0 against Ha:(p1−p2)≠0. Use α=0.1 (a) The test statistic is (b) The P-value is (c) The final conclusion is A. There is not sufficient evidence to reject the null hypothesis that (p1−p2)=0 B. We can reject the null hypothesis that (p1−p2)=0 and accept that (p1−p2)≠0

Independent random samples, each containing 60 observations, were selected from two populations. The samples from populations...

Independent random samples, each containing 60 observations, were selected from two populations. The samples from populations 1 and 2 produced 26 and 15 successes, respectively. Test H0:(p1−p2)=0 against Ha:(p1−p2)>0 Use α=0.08 (a) The test statistic is (b) The P-value is (c) The final conclusion is A. We can reject the null hypothesis that (p1−p2)=0 and accept that (p1−p2)>0 B. There is not sufficient evidence to reject the null hypothesis that (p1−p2)=0

10. For a particular scenario, we wish to test the hypothesis H0 : p = 0.52....

10. For a particular scenario, we wish to test the hypothesis H0 : p = 0.52. For a sample of size 50, the sample proportion p̂ is 0.42. Compute the value of the test statistic zobs. (Express your answer as a decimal rounded to two decimal places.) 4. For a hypothesis test of H0 : μ = 8 vs. H0 : μ > 8, the sample mean of the data is computed to be 8.24. The population standard deviation is...

Suppose Sony would like to test the hypothesis that the standard deviation for the age of...

Suppose Sony would like to test the hypothesis that the standard deviation for the age of PlayStation users is higher than the standard deviation for the age of Xbox users. The following table summarizes sample statistics from each population. Playstation Xbox Sample standard deviation 6.5years 1.9 years Sample size 25 28 Using alpha?equals=?0.05, what is the conclusion for this hypothesis? test? A. Since the test statistic is more than the critical? value, we reject the null hypothesis and cannot conclude...