Test the claim about the difference between the two population means µ1 and µ2 at the level of significance α. Important! Please remember to include all 5 parts of a hypothesis test mentioned in the module summary. Assume the samples are random and independent, and the populations are normally distributed.
Test the claim about the difference between the two population means µ1 and µ2 at the...
Suppose you want to test the claim that µ1 < µ2. Two samples are randomly selected from each population. The sample statistics are given below. At a level of significance of α = 0.05, when should you reject H0? n1 = 35 n2 = 42 x̅1 = 29.05 x̅2 = 31.6 s1 = 2.9 s2 = 2.8 Suppose you want to test the claim that u1<p2. Two samples are randomly selected from each population. The sample statistics are given...
Test the claim about the difference between two population means phy and ly at the level of significance a. Assume the samples are random and independent, and the populations are normally distributed Claim: My SM2; �.01. Assume o to Sample statistics: X2 = 2413, 5, - 176, n, = 14 and X2 - 2306, 6, 53, n2 - 11 Identify the null and alternative hypotheses. Choose the correct answer below. O A HO:44 <H2 Hg: 49 212 Oc. Họ t...
Find the critical value to test the claim that μ1 < μ2. Two samples are random, independent, and come from populations that are normal. The sample statistics are given below. Assume that σ 2/1= σ2/2. Use α = 0.05. n1 = 15 n2 = 15 x1 = 25.74 x2 = 28.29 s1 = 2.9 s2 = 2.8
Find the critical values, t0, to test the claim that μ1 = μ2. Two samples are random, independent, and come from populations that are normal. The sample statistics are given below. Assume that σ 2 1 ≠ σ 2 2 . Use α = 0.05. n1 = 32 n2 = 30 x1 = 16 x2 = 14 s1 = 1.5 s2 = 1.9
Find the standardized test statistic, t, to test the claim that u, u. Two samples are randomly selected and come from 02 populations that are normal. The sample statistics are given below. Assume that o n1-25, n2 30, x, 17 , x2 15, s1 1.5, s2 1.9 O A. 4.361 B. 3.287 C. 1.986 D. 2.892
Find the standardized test statistic to test the claim that μ1 < μ2. Two samples are random, independent, and come from populations that are normally distributed. The sample statistics are given below. Assume that σ 2 /1 = σ 2 /2 . n1 = 15 n2 = 13 x1 = 27.88 x2 = 30.43 s1 = 2.9 s2 = 2.8
Find the standardized test statistic to test the claim that μ1 ≠ μ2. Two samples are random, independent, and come from populations that are normally distributed. The sample statistics are given below. Assume that σ 2 /1 ≠ σ 2 /2 . n1 = 11 n2 = 18 x1 = 6.9 x2 = 7.3 s1 = 0.76 s2 = 0.51
Find the standardized test statistic, t, to test the claim that μ1 < μ2. Two samples are random, independent, and come from populations that are normally distributed. The sample statistics are given below. Assume that two populations' variance is the same (σ21= σ22). n1 = 15 n2 = 15 x1 = 25.76 x2 = 28.31 s1 = 2.9 s2 = 2.8
12. Test the claim that ul = u2. Two samples are randomly selected and come from populations that are normal. The sample statistics are given below. Assume that o2 equal o"2 (2). Use a = 0.05. nl=25 xbarl-30 .s1= 1.5 n2-30 xbar2-28 s2=1.9
Test the claim about the differences between two population variances o, and on at the given level of significance a using the given sample statistics. Assume that the sample statistics are from independent samples that are randomly selected and each population has a normal distribution Claim: o> , a = 0.10 Sample statistics: 8 = 757, n, = 6, s = 175, n2 = 5 Find the null and alternative hypotheses O A. He:0; <o 1. Ha: 0² 203 OC....