n1 = 18, n2 = 22
df = ?
df = n1 + n2 - 2
df = 18 + 22 - 2
df = 40 - 2
df = 38
3) n1 = 40, n2 = 40
df = ?
df = n1 + n2 - 2
df = 40 + 40 - 2
df = 80 - 2
df = 78
show work pleas Given the following sample sizes, determine the df. n1 = 18 and n2...
10. If we are doing two-sample hypothesis testing with related samples of sizes n1 = 10 and n2 = 10, what is the number of degrees of freedom? a. 9 b. 10 c. 19 d. 20 11. If we are doing two-sample hypothesis testing with independent samples of sizes n1 = 10 and n2 = 10, what is the number of degrees of freedom? a. 10 b. 18 c. 19 d. 20
Given below are sample sizes for the groups in a dataset and an
outline of an analysis of variance table with some information on
the sums of squares.
Given below are sample sizes for the groups in a dataset and an outline of an analysis of variance table with some information on the sums of squares. Fill in the missing parts of the table. Round your answers to two decimal places, if necessary. Three groups with n1 = 7 n2...
Two samples are taken with the following sample means, sizes, and standard deviations ¯ x1 x¯1 = 31 ¯ x2 x¯2 = 28 n1 n1 = 70 n2 n2 = 46 s1 s1 = 4 s2 s2 = 2 We want to estimate the difference in population means using a 89% confidence level. What distribution does this require? t, df = 108 z NOTE: The more accurate df formula, used above, is: df= ( s 2 1 n1 + s...
Suppose that independent samples of sizes n1, n2, . . . , nk are taken from each of k normally distributed populations with means μ1,μ2, . . . , μk and common variances, all equal to σ 2. Let Yi j denote the j th observation from population i, for j = 1, 2, . . . , ni and i = 1, 2, . . . , k, and let n = n1 + n2 + ··· + nk...
Suppose that two same type process defect proportions are p1=0.05 and p2=0.03. Sample sizes are n1=n2-250. What is the power of the test for two-sided hypothesis testing? Alpha-0.05.
In a test for the difference between two proportions, the sample sizes were n1=68 and n2=76 , and the numbers of successes in each sample were x1=41 and x2=25 . A test is made of the hypothesis Ho:p1=p2 versus H1:P1>p2 are the assumptions satisfied in order to do this test?Explain. B) Find the test statistics value C) Can you reject the null hypothesis at the a=0.01 significance level? Use Ti-84 for calculations please.
a)
b)
Two samples are taken with the following numbers of successes and sample sizes r1 = 40 r2 = 37 and n1 = 76 n2 = 89 Find a 90% confidence interval. Give a 95% confidence interval, for H1 - H2 given the following information. Ni = 25 , T1 = 2.24 , $i = 0.34 , n2 = 10 , T2 = 1.85 , $2 = 0.37
Two samples are taken with the following numbers of successes and sample sizesr1 = 40 r2 = 32n1 = 69 n2 = 85Find a 91% confidence interval, round answers to the nearest thousandth.___ < p1 - p2 < ___
The numbers of successes and the sample sizes are given for independent simple random samples from two populations. Use the two-proportions z-test to conduct the required hypothesis test. Use the critical-value approach. x1 = 24, n1 = 60, x2 = 12, n2 = 40, two-tailed test, α = 0.05
The numbers of successes and the sample sizes are given for independent simple random samples from two populations. Use the two-proportions z-test to conduct the required hypothesis test. Use the critical-value approach. x1 = 24, n1 = 60, x2 = 28, n2 = 40, left-tailed test, α = 0.05