(2 pts) Consider the test of the claims that the two samples described below come from...
(1 point) Test the claim that the two samples described below come from populations with the same mean. Assume that the samples are independent simple random samples. Sample 1: n1 = 18, X1 = 20, $i = 5. Sample 2: n2 = 30, L2 = 15, S2 = 5. (a) The test statistic is (b) Find the t critical value for a significance level of 0.025 for an alternative hypothesis that the first population has a larger mean (one-sided test)....
(1 point) Test the claim that the two samples described below come from populations with the same mean. Assume that the samples are independent simple random samples. Use a significance level of a = 0.05 Sample 1: n = 6, 11 = 25, $1 = 5.29 Sample 2: n2 = 17, I2 = 21.1, S2 = 5.84 (a) The degree of freedom is (b) The test statistic is (c) The final conclusion is A. We can reject the null hypothesis...
come from populations (1 point) Test t mean. Assume that the samples are independent simple random samples. Use a significance level of a 0.01 Sample 1: n1 15, 1-28.4, 81-6.07 Sample 2: n2 10, 2 22, 82 8.92 (a) The degree of freedom is (b) The standardized test statistic is (c) The final conclusion is O A. We can reject the null hypothesis that (14-Ha) 0 and accept that (M1-μ2) 0 B. There is not sufficient evidence to reject the...
g results for two samples randomly taken from two populations with unequal (9%) Consider the followin variances. (假設兩母體的變異不相等) I. Sample A Sample B n2 35 X2= 102 s2 = 7 Sample size Sample mean Sample standard deviation ni = 31 = 106 (A) (B) (C) Determine the degrees of freedom for the t distribution. Develop a 95% confidence interval for the difference between the two population means. Test the hypothesis that Ho: μ 1 12 against the alternative, Ha: μ...
(1 point) Test the claim that the two samples described below come from populations with the same mean. Assume that the samples are independent simple random samples. Use a significance level of 0.04. Sample 1: ni = 75, I1 = 12, si = 3. Sample 2: n2 = 78, 22 = 11, S2 = 1.5. The test statistic is The P-Value is The conclusion is A. There is not sufficient evidence to warrant rejection of the claim that the two...
(1 point) Suppose you needed to test the claim that the two samples described below come from populations with the same mean. Assume that the samples are independent simple random samples. Sample 1: n = 18, x1 = 24.7, sı = 7.07 Sample 2: n2 = 5, X2 = 27, S2 = 7.99 Find: (a) The estimated degree of freedom is (b) The standardized test statistic is (use Sample 1 - Sample 2)
(1 point) (Give answers to at least two decimal places. For simplicity, use the standard normal distribution bacause the samples are both large.) In order to compare the means of two populations, independent random samples of 93 observations are selected from each population, with the following results: Sample 1 Sample 2 s1 = 170 s2 = 195 (a) Use a 98 % confidence interval to estimate the difference between the population means ( ) - Test the null hypothesis: Ho...
Two samples each of size 20 are taken from independent populations assumed to be normally distributed with equal variances. The first sample has a mean of 43.5 and a standard deviation of 4.1 while the second sample has a mean of 40.1 and a standard deviation of 3.2. A researcher would like to test if there is a difference between the population means at the 0.05 significance level. What can the researcher conclude? There is not sufficient evidence to reject...
Find the degrees of freedom, df to test the hypothesis that μ1 > μ2. Two samples are randomly selected and come from populations that are normal. The sample statistics are given below. n1 = 40 n2 = 40 x1= 63.0 x2= 61.5 s1 = 15.8 s2 = 29.7 Round your answer DOWN to the nearest integer.
You may need to use the appropriate technology to answer this question. Consider the following hypothesis test. The following results are from independent samples taken from two populations assuming the variances are unequal Sample 1 Sample 2 n1-352 x1-13.6x2-10.1 s, 5.5 s = 8.1 n2-40 (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 distribution? (Round your answer down to the...