For a given population, suppose we wish to test H0:μ=20 versus H0:μ=20 at α=0.1 . If we plan to take a random sample of 16 observations from a normally distributed population with unknown variance, then what is the critical value (or rejection point) for this test?
For a given population, suppose we wish to test H0:μ=20 versus H0:μ=20 at α=0.1 . If...
#1 part A.) To test H0: μ=100 versus H1: μ≠100, a random sample of size n=20 is obtained from a population that is known to be normally distributed. Complete parts (a) through (d) below. (aa.) If x̅=104.4 and s=9.4, compute the test statistic. t0 = __________ (bb.) If the researcher decides to test this hypothesis at the α=0.01 level of significance, determine the critical value(s). Although technology or a t-distribution table can be used to find the critical value, in...
To test H0:μ=20 versus H1;μ=less than 20, a simple random sample of size n=16 is obtained from a population that is known to be normally distributed.. If x-bar=18.1 and s=4.2, compute the test statistic.
To test H0: μ= 100 versus H1: μ ≠ 100, a simple random sample size of n = 16 is obtained from a population that is known to be normally distributed.(a) x̅ = 104.7 and s = 8.4. compute the test statistic.
In testing H0:μ=77 versus Ha:μ≠77 for some population, a random sample of 17 observations from a normally distributed population with unknown standard deviation yielded a test statistic of 2.638. The p-value for this test is Select one: a. 0.0041 b. between 0.005 and 0.010 c. between 0.01 and 0.02 d. 0.0082 e. impossible to determine based on the given information.
Consider H0: μ=72 versus H1: μ>72. A random sample of 16 observations taken from this population produced a sample mean of 75.4. The population is normally distributed with σ=6. a. Calculate the p-value. Round your answer to four decimal places.
You wish to test the following hypotheses at a significance level of α=0.05α=0.05. H0:μ=62.1 HA:μ<62.1 You believe the population is normally distributed, but you do not know the standard deviation. You obtain a sample of size n=90 with mean ¯x=60.7 and a standard deviation of s=7.6 What is the test statistic for this sample? (Report answer accurate to two decimal places.) t= What is the degree of freedom? df=
You wish to test the following
claim ( H a ) at a significance level of α = 0.005 . H o : μ 1 = μ
2 H a : μ 1 ≠ μ 2 You believe both populations are normally
distributed, but you do not know the standard deviations for
either. However, you also have no reason to believe the variances
of the two populations are not equal. You obtain a sample of size n
1 = 20...
You wish to test the following claim (H1H1) at a significance level of α=0.10α=0.10. Ho:μ=81.4Ho:μ=81.4 H1:μ≠81.4H1:μ≠81.4 You believe the population is normally distributed, but you do not know the standard deviation. You obtain the following sample of data: data 83.3 77.1 85.9 86.3 77.6 79 88.4 81.3 89 What is the critical value for this test? (Report answer accurate to three decimal places.) critical value = ±± What is the test statistic for this sample? (Report answer accurate to three...
Q4). Suppose that you are drawing a sample of random observations yyy2y, from a population that is normally distributed with a mean- u and variance 2. Derive the two-sided likelihood ratio test for testing Ho : μ Ho versus H! : μ where μ. μο. 123. (5 points)
Q4). Suppose that you are drawing a sample of random observations yyy2y, from a population that is normally distributed with a mean- u and variance 2. Derive the two-sided likelihood ratio test...
A test is made of Ho: μ-20 versus H 1 : μ * 20. A sample of size n-58 is drawn, and x-1 The population standard deviation isa . Part 4 out of 4 Sub Determine whether to reject Ho. Since the test statistic (select) in the critical region, we (select) α-0.05 level. Tim - Ho at the Since the test statistic (select) in the critical region, we (select) α 0.01 level. -Ho at the