The p value is 0.03
1. In a test of H_0: mu = 100 against H_a: mu < > 100, the sample data yielded the test statistic z = -2.17. Find the p-value for the test. Here "<>" stands for "not equal". (a) 0.03 (b) 0.485 (c) 0.015 2. In a test of H_0: mu = 100 against H_a: mu < 100, the sample data yielded the test statistic z = -2.17. Find the p-value for the test. (a) 0.03 (b)0.485 (c)0.015 3. Specify the...
In a test of H_0: mu = 100 against H_a: mu < 100, the sample data yielded the test statistic z=-2.17. Find the p-value for the test. 0.03 0.485 0.015
Answer all of the following parts of the question(s) (Part A) In a study regarding public opinion about ObamaCare, how many people (at a minimum) should be included in a sample to be 95% sure that the sample estimate is within three percentage points of the population proportion p? Group of answer choices (A) 1068 (B) 1067 (C) 752 (D) 33 (Part B) Specify the rejection region associated with the test of H_0: mu = 10, H_a: mu > 10...
Specify the rejection region associated with the test of H_0: mu = 10, H_a: mu < 10 when alpha=0.05, and n=17 and sample is drawn from normal distribution. OZ<-1.96 Ot< 2.12 ot - 1.746 O Z < -1645
In a test of Upper H 0: mu=100 against Upper H Subscript a: mu not equals100, the sample data yielded the test statistic z=2.24. Find the Upper P-value for the test.
is it -1.96? and if soc how do you do the math to get that? O 0.0322 Question 20 Find a value zo of the standard normal random variable Z such that p(Z <= Zo) =0.025 -1.96 O 0.06 O 1.96 None Question 21
In a test of H0:μ = 100 against Ha:μ ≠ 100, the sample data yielded the test statistic z = 2.30. Find the P-value for the test. P = _______
In a test of H0:μ = 100 against Ha:μ ≠ 100, the sample data yielded the test statistic z = 2.07. Find the P-value for the test. P= (Round to four decimal places as needed.)
QUESTION 1 For the hypothesis test HO mu<-5 against H1: mu >5 with variance unknown and ne11, find the best approximation for the P-value for the test statistic t0=1.945. 0.25 Sp S 0.50 O 0.10 5p 30.25 0.010 SP S 0.025 0.025 SP S 0.050 0.0025 SP 50.0050
In a test of Upper H 0H0: muμequals=100 against Upper H Subscript aHa: muμnot equals≠100, the sample data yielded the test statistic z equals 2.16z=2.16. Find the Upper PP-value for the test.