Use KS test to determine if the following two samples come from the same distribution. What...

The following results come from two independent random samples taken of two populations. Sample 1 Sample...

The following results come from two independent random samples taken of two populations. Sample 1 Sample 2 n1 = 60 n2 = 35 x1 = 13.6 x2 = 11.6 σ1 = 2.3 σ2 = 3 (a) What is the point estimate of the difference between the two population means? (Use x1 − x2.) (b) Provide a 90% confidence interval for the difference between the two population means. (Use x1 − x2. Round your answers to two decimal places.) to (c)...

Test the claim that μ 1 > μ 2. Two samples are random, independent, and come...

Test the claim that μ 1 > μ 2. Two samples are random, independent, and come from populations that are normally distributed. The sample statistics are given below. Assume that o1 ≠ o2. Use α = 0.01. n1=18 n2=13 x1=520 x2=505 s1=40   s2=25

Use a t-distribution and the given matched pair sample results to complete the test of the...

Use a t-distribution and the given matched pair sample results to complete the test of the given hypotheses. Assume the results come from random samples, and if the sample sizes are small, assume the underlying distribution of the differences is relatively normal. Assume that differences are computed using d=x1-x2. Test H0 : μd=0 vs Ha : μd>0 using the paired data in the following table: Situation 1 120 156 145 175 153 148 180 135 168 157 Situation 2 120...

Provided below are summary statistics for independent simple random samples from two populations. Use the pooled​...

Provided below are summary statistics for independent simple random samples from two populations. Use the pooled​ t-test and the pooled​ t-interval procedure to conduct the required hypothesis test and obtain the specified confidence interval. x1= 19, s1= 3, n1= 12, x2= 15, s2= 2, n2=13 a. What are the correct hypotheses for a​ left-tailed test? b. Compute the test statistic. c. Determine the​ P-value. d. The 90​% confidence interval is from _____ to _______ ?

Use KS test to see if it conforms to a Beta distribution with shape1=4, shape2=7. What...

Use KS test to see if it conforms to a Beta distribution with shape1=4, shape2=7. What is the p-value? 0.18573722 0.41073334 0.56355831 0.06673358 0.43762574 0.45158744 0.27369696 0.27787527 0.27522373 0.22834730 0.28829185 0.21342879 0.24438748 0.37434856 0.53836814 0.34561632 0.28320219 0.22540641 0.23575321 0.38607398 0.28625720 0.29384326 0.44312820 0.25625404 0.15563416 0.46424265 0.21000100 0.36114007 0.22198265 0.56719777

The following data are believed to have come from a normal distribution. Use the goodness of...

The following data are believed to have come from a normal distribution. Use the goodness of fit test and  = .05 to test this claim. Use Table 12.4. 18 23 21 24 18 22 18 22 19 13 10 20 17 20 20 20 17 14 24 23 22 43 28 27 26 29 28 33 22 28 Using six classes, calculate the value of the test statistic (to 2 decimals).______ The p value is ? _________ Conclusion? Cannot reject assumption...

4) Test the hypothesis that μ1 ≠ μ2. Two samples are randomly selected from each population....

4) Test the hypothesis that μ1 ≠ μ2. Two samples are randomly selected from each population. The sample statistics are given below. Use α = 0.02. n1 = 51 x1=1 s1 = 0.76 n2 = 38 x2= 1.4 s2 = 0.51 STEP 1: Hypothesis: Ho:________________ vs H1: ________________ STEP 2: Restate the level of significance: ______________________ STEP 4: Find the p-value: ________________________ (from the appropriate test on calc) STEP 5: Conclusion:

Consider the following hypothesis statement using alphaαequals=0.10 and the following data from two independent samples. complete...

Consider the following hypothesis statement using alphaαequals=0.10 and the following data from two independent samples. complete the parts below. H0: p1-p2 equal to 0 H1: p1 - p2 not equal to 0 x1= 18  x2= 23 n1= 90  n2=105 1.) what is the test statistic? 2.) what is/are the critical value(s)? 3.) interpret the result. 4,) what is the p value? 5.) interpret the result.

Consider the following hypothesis test. H0: μ1 − μ2 = 0 Ha: μ1 − μ2 ≠...

Consider the following hypothesis test. H0: μ1 − μ2 = 0 Ha: μ1 − μ2 ≠ 0 The following results are from independent samples taken from two populations. Sample 1 Sample 2 n1 = 35 n2 = 40 x1 = 13.6 x2 = 10.1 s1 = 5.9 s2 = 8.5 (a) What is the value of the test statistic? (Use x1 − x2. Round your answer to three decimal places.) (b) What is the degrees of freedom for the t...

Consider the test of the claims that the two samples described below come from two populations...

Consider the test of the claims that the two samples described below come from two populations whose means are equal vs. the alternative that the population means are different. Assume that the samples are independent simple random samples and that both populations are approximately normal with equal variances. Use a significance level of α=0.05 Sample 1: n1=18, x⎯⎯1=28, s1=7 Sample 2: n2=4, x⎯⎯2=30, s2=10 (a) Degrees of freedom = (b) The test statistic is t =