b. Determine the sample mean and sample standard deviation of the cholesterol of all 100 patients....

A sample of size 20 yields a sample mean of 23.5 and a sample standard deviation...

A sample of size 20 yields a sample mean of 23.5 and a sample standard deviation of 4.3. Test H0: Mean ≥ 25 at α = 0.10. HA: Mean < 25. This is a one-tailed test with lower reject region bounded by a negative critical value. Which of the following are: 1) Pvalue 0.135. H0 not rejected. Conclude mean ≥ 25 plausible 2) None of the other answers are correct 3) Pvalue 0.068 H0 rejected. Conclude mean < 25 4)...

A sample mean, sample standard deviation, and sample size are given. Use the one-mean t-test to...

A sample mean, sample standard deviation, and sample size are given. Use the one-mean t-test to perform the required hypothesis test about the mean, μ, of the population from which the sample was drawn. Use the critical-value approach. , , n = 18, H0: μ = 10, Ha: μ < 10, α = 0.01 Group of answer choices Test statistic: t = -4.43. Critical value: t = -2.33. Reject H0. There is sufficient evidence to support the claim that the...

4. With 90% confidence, for sample mean 341.00, sample standard deviation 14.80, and sample size 35,...

4. With 90% confidence, for sample mean 341.00, sample standard deviation 14.80, and sample size 35, what is the upper confidence limit with 2 decimal places? 8. Match the rules for rejecting H0 at the right to the following tests a. Two-tail test with lower and upper reject regions b. One-tail test with lower reject region c. For any test hypothesis, ANOVA, or Chi Squared, this rule for rejecting H0 always applies. d. One-tail test with upper reject region                ...

In a test of the effectiveness of garlic for lowering​ cholesterol, 64 subjects were treated with...

In a test of the effectiveness of garlic for lowering​ cholesterol, 64 subjects were treated with raw garlic. Cholesterol levels were measured before and after the treatment. The changes​ (before minus​ after) in their levels of LDL cholesterol​ (in mg/dL) have a mean of 0.3 and a standard deviation of 24.6 Use a 0.10 significance level to test the claim that with garlic​ treatment, the mean change in LDL cholesterol is greater than 0. What do the results suggest about...

A random sample of 20 observations produced a sample mean of 9.5. Find the critical and...

A random sample of 20 observations produced a sample mean of 9.5. Find the critical and observed z-values for each of the following and test each hypothesis at α = 0.05. Write a separate conclusion for each hypothesis. The underlying population standard deviation is known to be 3.5 and the population distribution is normal (5 points): H0: µ = 8.75; H1: µ ≠ 8.75 H0: µ = 8.75; H1: µ > 8.75

1)    A test sample of 40 items showed a mean of 26.8 and a standard deviation...

1)    A test sample of 40 items showed a mean of 26.8 and a standard deviation of 4.5. Use α= .05 significance; original claim μ ≥ 25.4. (H0: μ ≥ 25.4, H1: μ < 25.4) a.     Determine p= _____________ b.    Reject or fail to reject H0 ___________

A sample mean, sample standard deviation, and sample size are given. Use the one-mean t-test to...

A sample mean, sample standard deviation, and sample size are given. Use the one-mean t-test to perform the required hypothesis test about the mean, μ, of the population from which the sample was drawn. Use the critical-value approach. , , n = 11, H0: μ = 18.7, Ha: μ ≠ 18.7, α = 0.05 Group of answer choices Test statistic: t = 1.03. Critical values: t = ±2.201. Do not reject H0. There is not sufficient evidence to conclude that...

A sample of 42 observations has a mean of 103 and a population standard deviation of...

A sample of 42 observations has a mean of 103 and a population standard deviation of 7. A second sample of 61 has a mean of 100 and a population standard deviation of 9. Conduct a z-test about a difference in sample means using a 0.04 significance level and the following hypotheses:   H0: μ1 - μ2 = 0   H1: μ1 - μ2 ≠ 0 a) What is the correct decision rule? Reject H0 in favour of H1 if the computed...

6.The expected mean of a normal population is 100, and its standard deviation is 12. A...

6.The expected mean of a normal population is 100, and its standard deviation is 12. A sample of 49 measurements gives a sample mean of 96. Using the α = 0.01 level of significance a test is to be made to decide between “population mean is 100” or “population mean is different than 100.” a) State null H0. b) What conclusion can be drawn at the given level of significance α = 0.01. c) What conclusion can be drawn if...

6. The expected mean of a normal population is 100, and its standard deviation is 12....

6. The expected mean of a normal population is 100, and its standard deviation is 12. A sample of 49 measurements gives a sample mean of 96. Using the α = 0.01 level of significance a test is to be made to decide between “population mean is 100” or “population mean is different than 100.” a) State null H0. b) What conclusion can be drawn at the given level of significance α = 0.01. c) What conclusion can be drawn...