We use Excel function "TINV()" as :
Upper limit = 2.015
We want to test the following hypothesis Ho: = 59 H1: > 59 Consider a=0.05. s=1.751...
We want to test the following hypothesis Ho: u = 60 H1: u 60 Consider a=0.05. S=5.85 n=8 Formulas T-table Calculate the lower limit for the rejection region (x-bar domain)
Consider the following hypothesis test Ho:u=115 H1:u<115 a=0.05 A sample of n=6, xbar=110, and s=3.5 Determine the p value (use interpolation):
1. Consider the following hypothesis test for a Poisson(a) population Ho : α = 1 H1 :a = 2 a) Find the rejection region for a likelihood ratio test with k-4 and sample size n. (b) Find the level of the rejection region found in the previous part with n 15 (c) Find the power of a 05-level test with n 100. 1. Consider the following hypothesis test for a Poisson(a) population Ho : α = 1 H1 :a =...
Consider the hypothesis test Ho : H1 = H2 against H1 : HI # Hz with known variances oj = 1 1 and oz = 4. Suppose that sample sizes ni = 11 and n2 = 16 and that X = 4,7 and X2 = 7.9. Use a = 0.05. Question 1 of 1 < > -/1 View Policies Current Attempt in Progress Consider the hypothesis test Ho: M1 = H2 against H: MM with known variances o = 11...
(3 points) Suppose that we are to conduct the following hypothesis test. Ho H980 H1: μ > 980 suppose that you also know that σ-: 200, n 100, 1020, and take α-: 0.01 . Draw the sampling distribution, and use it to determine each of the following A. The value of the standardized test statistic: Note: For the next part, your answer should use interval notation. An answer of the form -oo, a is expressed (-infty, a), an answer of...
1. Consider the hypothesis test Ho: u1=p2 against H1: u 17 M2. Suppose that sample sizes are n1 = 13, n2 = 10 x1=4.7, x2 =6.8, s1= 2 and s2 =2.5. Assume that the data are randomly drawn from two independent Normal distributions (a) Confirm that it is reasonable to assume 01 2 = 022 by completing the steps i. through v. below. Use a = 0.05. HO: 01 2 = 02 20:01 2 * 022 i. Test Statistic ii....
uestion 3 Consider you want to test the following hypotheis Ho:p=20 H1:2<20 a=0.05 You pick a sample with the following parameters n=7 S=2 if it is known that the true mean is 18 Determine the type II error Formulas 04 OC tables.pdf
Alejandra is using a one-sample t-test to test the null hypothesis Ho: u = 10.0 against the alternative H1: 4 < 10.0 using a simple random sample of size n = 10. She requires her results to be statistically significant at level a = 0.10. Determine the maximum value of t that will reject this null hypothesis. You may find this table of t-critical values useful. If you are using software, you may find this catalog of software guides useful....
N(0,02). We wish to use a 1. [18 marks] Suppose X hypothesis single value X = x to test the null Ho : 0 = 1 against the alternative hypothesis H1 0 2 Denote by C aat the critical region of a test at the significance level of : α-0.05. (f [2 marks] Show that the test is also the uniformly most powerful (UMP) test when the alternative hypothesis is replaced with H1 0 > 1 (g) [2 marks Show...
Consider the following hypothesis test: Ho: mu<=12 H1: mu>12 A sample of 20 provided a sample mean of 14 and a sample standard deviation s = 4.52 . Use a = 0.05 . Step 1: Calculate the test statistic for this problem . Round your answer to four decimal places. Step 2: What is the p-value for your test? Step 3: State the conclusion to this problem.