Question

Use the information given and the eight-step approach to test the hypotheses. Let α = .01.   ...

Use the information given and the eight-step approach to test the hypotheses. Let α = .01.

  H0:μ=36          Ha:μ≠36⁢         n= 63⁢        x¯=38.4⁢           σ=5.93

The value of test statistics is???

We reject the null hypothesis or fail to reject null hypothesis?

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Use a​ t-test to test the claim about the population mean μ at the given level...
Use a​ t-test to test the claim about the population mean μ at the given level of significance α using the given sample statistics. Assume the population is normally distributed. ​Claim: μ ≠ 24​; α=0.10    Sample​ statistics: x overbar = 21.4​, s = 4.2 ​, n equals = 11 What are the null and alternative​ hypotheses? Choose the correct answer below. A.H0​: μ≠24    Ha​: μ=24 B.H0​: μ≤24    Ha​: μ>24 C.H0​: μ=24 Ha​: μ≠24 D.H0​: μ≥24 Ha​: μ than<24...
Test the claim about the population mean μ at the level of significance α. Assume the...
Test the claim about the population mean μ at the level of significance α. Assume the population is normally distributed. Write out null and alternative hypotheses, your critical z-score and your z-test statistic. Decide whether you would reject or fail to reject your null hypothesis. Claim: μ > 28; α = 0.05, σ = 1.2 Sample statistics: x̅ = 28.3, n = 50 H0: Ha: Critical z-score: Z test statistic: Decision:
1. Test the hypothesis: Population appears to be normally distributed. Given the sample statistics n =...
1. Test the hypothesis: Population appears to be normally distributed. Given the sample statistics n = 20,  = 8.2, and s = 1.2, find the critical value(s) tcr and test statistic t for testing the claim μ = 8.6 at significance α = 10%. Then, state the conclusion of this hypothesis test. Select one: tcr = 1.729, t ≈ 1.491, fail to reject H0 tcr = 1.328, t ≈ 1.491, reject H0 tcr = −1.328, t ≈ −1.491, reject H0 tcr...
Is there a relationship between confidence intervals and two-tailed hypothesis tests? Let c be the level...
Is there a relationship between confidence intervals and two-tailed hypothesis tests? Let c be the level of confidence used to construct a confidence interval from sample data. Let α be the level of significance for a two-tailed hypothesis test. The following statement applies to hypothesis tests of the mean. For a two-tailed hypothesis test with level of significance α and null hypothesis H0: μ = k, we reject H0 whenever k falls outside the c = 1 – α confidence...
Is there a relationship between confidence intervals and two-tailed hypothesis tests? Let c be the level...
Is there a relationship between confidence intervals and two-tailed hypothesis tests? Let c be the level of confidence used to construct a confidence interval from sample data. Let α be the level of significance for a two-tailed hypothesis test. The following statement applies to hypothesis tests of the mean. For a two-tailed hypothesis test with level of significance α and null hypothesis H0: μ = k, we reject H0 whenever k falls outside the c = 1 − α confidence...
Test the claim about the population mean μ at the level of significance α. Assume the...
Test the claim about the population mean μ at the level of significance α. Assume the population is normally distributed. Write out null and alternative hypotheses, your critical t-score and your t-test statistic. Decide whether you would reject or fail to reject your null hypothesis. Claim μ ≥ 13.9 α = 0.05 Sample statistics: x̅ = 13, s = 1.3, n = 10 H0: Ha: t0: t-test statistic: Decision:
n=49, ? ̅ =8.5, µ=9.2, σ=2.6, α=.01, H0: μ = 9.2, H1: μ ≠ 9.2. Determine...
n=49, ? ̅ =8.5, µ=9.2, σ=2.6, α=.01, H0: μ = 9.2, H1: μ ≠ 9.2. Determine z-score __________ Determine p= ____________ Reject or fail to reject H0 __________
#6 Compute the value of the test statistic for the indicated test, based on the information...
#6 Compute the value of the test statistic for the indicated test, based on the information given. Testing H0:μ=342H0:μ=342 vs. Ha:μ<342Ha:μ<342, σ = 11.2, n = 40, x⎯⎯=339x-=339, s = 10.3 Testing H0:μ=105H0:μ=105 vs. Ha:μ>105Ha:μ>105, σ = 5.3, n = 80, x⎯⎯=107x-=107, s = 5.1 Testing H0:μ=−13.5H0:μ=−13.5 vs. Ha:μ≠−13.5Ha:μ≠−13.5, σ unknown, n = 32, x⎯⎯=−13.8x-=−13.8, s = 1.5 Testing H0:μ=28H0:μ=28 vs. Ha:μ≠28Ha:μ≠28, σ unknown, n = 68, x⎯⎯=27.8x-=27.8, s = 1.3
A random sample of 36 values is drawn from a mound-shaped and symmetric distribution. The sample...
A random sample of 36 values is drawn from a mound-shaped and symmetric distribution. The sample mean is 8 and the sample standard deviation is 2. Use a level of significance of 0.05 to conduct a two-tailed test of the claim that the population mean is 7.5. (a) Is it appropriate to use a Student's t distribution? Explain. Yes, because the x distribution is mound-shaped and symmetric and σ is unknown. No, the x distribution is skewed left.     No, the...
A random sample of 36 values is drawn from a mound-shaped and symmetric distribution. The sample...
A random sample of 36 values is drawn from a mound-shaped and symmetric distribution. The sample mean is 14 and the sample standard deviation is 2. Use a level of significance of 0.05 to conduct a two-tailed test of the claim that the population mean is 13.5. (a) Is it appropriate to use a Student's t distribution? Explain. Yes, because the x distribution is mound-shaped and symmetric and σ is unknown.No, the x distribution is skewed left.    No, the x distribution...
ADVERTISEMENT
Need Online Homework Help?

Get Answers For Free
Most questions answered within 1 hours.

Ask a Question
ADVERTISEMENT