Given the following information: n1=61, s21=3.496, n2=61, s22=6.05, Ha: σ21≠σ22, α=0.1 Step 1 of 2 :  ...

Given the following information: n1=21 , s21=65.396, n2=16, s22=50.452, Ha: σ21≠σ22, α=0.05 Step 1 of 2...

Given the following information: n1=21 , s21=65.396, n2=16, s22=50.452, Ha: σ21≠σ22, α=0.05 Step 1 of 2 : Determine the critical value(s) of the test statistic. If the test is two-tailed, separate the values with a comma. Round your answer(s) to four decimal places. step 2 of 2: Make a decision. A. reject null hypothesis B. Fail to reject null hypothesis

n1=12, s21=0.439, n2=19, s22=1.638, Ha: σ21<σ22, α=0.05 Step 1 of 2: Determine the critical value(s) of...

n1=12, s21=0.439, n2=19, s22=1.638, Ha: σ21<σ22, α=0.05 Step 1 of 2: Determine the critical value(s) of the test statistic. If the test is two-tailed, separate the values with a comma. Round your answer(s) to four decimal places. Step 2 of 2: Make a decision. Reject Null Hypothesis or Fail to Reject Null Hypothesis

Consider testing H0: σ21 ≤ σ22 vs. Ha: σ21 > σ22 given that ?1 = 25,...

Consider testing H0: σ21 ≤ σ22 vs. Ha: σ21 > σ22 given that ?1 = 25, s21  = 7.4, ?2 = 31, s22 = 6.2. a) Calculate the value of the test statistic, F*. b) Test the hypothesis at the 0.025 level of significance, using the classical approach. Critical region: c) Decision: d) Reason:

Consider the following hypothesis test. H0: σ12 = σ22 Ha: σ12 ≠ σ22 (a) What is...

Consider the following hypothesis test. H0: σ12 = σ22 Ha: σ12 ≠ σ22 (a) What is your conclusion if n1 = 21, s12 = 8.2, n2 = 26,  and s22 = 4.0? Use α = 0.05 and the p-value approach Find the value of the test statistic. Find the p-value. (Round your answer to four decimal places.) p-value = State your conclusion. Reject H0. We cannot conclude that σ12 ≠ σ22. Do not reject H0. We cannot conclude that σ12 ≠...

Consider the following hypothesis test. H0: σ12 = σ22 Ha: σ12 ≠ σ22 (a) What is...

Consider the following hypothesis test. H0: σ12 = σ22 Ha: σ12 ≠ σ22 (a) What is your conclusion if n1 = 21, s12 = 2.2, n2 = 26, and s22 = 1.0? Use α = 0.05 and the p-value approach. Find the value of the test statistic. Find the p-value. (Round your answer to four decimal places.) p-value = State your conclusion. Reject H0. We cannot conclude that σ12 ≠ σ22.Do not reject H0. We cannot conclude that σ12 ≠...

Consider the following competing hypotheses and relevant summary statistics: Use Table 4. H0: σ21/σ22σ12/σ22 ≥ 1...

Consider the following competing hypotheses and relevant summary statistics: Use Table 4. H0: σ21/σ22σ12/σ22 ≥ 1 HA: σ21/σ22σ12/σ22 < 1 Sample 1: s21s12 = 1,370, and n1 = 23 Sample 2: s22s22 = 1,441, and n2 = 15 a. Calculate the value of the test statistic. Remember to put the larger value for sample variance in the numerator. (Round your answer to 2 decimal places.)   Test statistic    b-1. Approximate the critical value at the 10% significance level.    2.05...

A bolt manufacturer is very concerned about the consistency with which his machines produce bolts. The...

A bolt manufacturer is very concerned about the consistency with which his machines produce bolts. The bolts should be 0.18 centimeters in diameter. The variance of the bolts should be 0.015. A random sample of 18 bolts has an average diameter of 0.19cm with a standard deviation of 0.0607. Can the manufacturer conclude that the bolts vary from the required variance at α=0.1 level? Step 1: State the null and alternative hypothesis Step 2: Determine the critical value(s) of the...

Given two independent random samples with the following results: n1=573, p^1=0.5  n2=454, pˆ2=0.6 Can it be...

Given two independent random samples with the following results: n1=573, p^1=0.5  n2=454, pˆ2=0.6 Can it be concluded that the proportion found in Population 2 exceeds the proportion found in Population 1?  Use a significance level of α=0.1α=0.1for the test. Step 1 of 5: State the null and alternative hypotheses for the test. Step 2 of 5: Compute the weighted estimate of p, p‾p‾. Round your answer to three decimal places. Step 3 of 5: Compute the value of the test statistic....

A standardized test is given to a sixth grade class and a ninth grade class. The...

A standardized test is given to a sixth grade class and a ninth grade class. The superintendent believes that the variance in performance from the sixth grade class is different than the variance in performance from the ninth grade class. The sample variance of a sample of 16 test scores from the sixth grade class is 23.64. The sample variance of a sample of 10 test scores from the ninth grade class is 14.9. Test the claim using a 0.05...

Given two independent random samples with the following results: n1=469 x1=250 n2=242 x2=95 Can it be...

Given two independent random samples with the following results: n1=469 x1=250 n2=242 x2=95 Can it be concluded that there is a difference between the two population proportions? Use a significance level of α=0.05 for the test. Step 1 of 6: State the null and alternative hypotheses for the test. Step 2 of 6: Find the values of the two sample proportions, pˆ1p^1 and pˆ2p^2. Round your answers to three decimal places. Step 3 of 6: Compute the weighted estimate of...