Suppose that you are testing the hypotheses Upper H 0​: pequals0.21 vs. Upper H Subscript Upper...

Suppose that you are testing the hypotheses Upper H 0​: pequals0.25 vs. Upper H Subscript Upper...

Suppose that you are testing the hypotheses Upper H 0​: pequals0.25 vs. Upper H Subscript Upper A​: pnot equals0.25. A sample of size 350 results in a sample proportion of 0.31. ​ a) Construct a 95​% confidence interval for p. ​(Round to three decimal places as​ needed.) b) Based on the confidence​ interval, can you reject Upper H 0 at alphaequals0.05​? Explain. ​c) What is the difference between the standard error and standard deviation of the sample​ proportion? ​ d)...

Suppose that you are testing the hypotheses Upper H 0H0​: pequals=0.160.16 vs. Upper H Subscript Upper...

Suppose that you are testing the hypotheses Upper H 0H0​: pequals=0.160.16 vs. Upper H Subscript Upper AHA​: pnot equals≠0.160.16. A sample of size 300300 results in a sample proportion of 0.220.22. ​a) Construct a 9595​% confidence interval for p.​b) Based on the confidence​ interval, can you reject Upper H 0H0 at alphaαequals=0.050.05​? Explain. ​c) What is the difference between the standard error and standard deviation of the sample​ proportion? ​d) Which is used in computing the confidence​ interval? ​a) The...

Suppose that you are testing the hypotheses Upper H 0​: p=0.21 vs. Upper H Subscript Upper...

Suppose that you are testing the hypotheses Upper H 0​: p=0.21 vs. Upper H Subscript Upper A​: p not equals0.21. A sample of size 200 results in a sample proportion of 0.28. a) The 90​% confidence interval for p is ​( , ​). ​(Round to three decimal places as​ needed.)

Suppose that you are testing the hypotheses H0?: p=0.17 vs. HA?: p?0.17. A sample of size...

Suppose that you are testing the hypotheses H0?: p=0.17 vs. HA?: p?0.17. A sample of size 200 results in a sample proportion of 0.22. ?a) Construct a 99?% confidence interval for p. ?b) Based on the confidence? interval, can you reject H0 at ?=0.01?? Explain. ? c) What is the difference between the standard error and standard deviation of the sample? proportion? ?d) Which is used in computing the confidence? interval?

Suppose that you are testing the hypotheses H0 p=0.21 vs. HA p ?0.21.A sample of size...

Suppose that you are testing the hypotheses H0 p=0.21 vs. HA p ?0.21.A sample of size 300 results in a sample proportion of 0.27. ?a) Construct a 90?% confidence interval for p. ?b) Based on the confidence? interval, can you reject H0 at alpha=0.100?? Explain. ?c) What is the difference between the standard error and standard deviation of the sample? proportion? ?d) Which is used in computing the confidence? interval?

Suppose that you are testing the hypotheses H0​: p=0.22 vs. HA​: p≠0.22. A sample of size...

Suppose that you are testing the hypotheses H0​: p=0.22 vs. HA​: p≠0.22. A sample of size 150 results in a sample proportion of 0.26. ​a) Construct a 95​% confidence interval for p. ​b) Based on the confidence​ interval, can you reject H0at α=0.05​? Explain. ​c) What is the difference between the standard error and standard deviation of the sample​ proportion? ​d) Which is used in computing the confidence​ interval?

Suppose that you are testing the hypotheses H0​: μ=12 vs. HA​: μless than<12. A sample of...

Suppose that you are testing the hypotheses H0​: μ=12 vs. HA​: μless than<12. A sample of size 25 results in a sample mean of 12.5 and a sample standard deviation of 1.9. ​a) What is the standard error of the​ mean? ​b) What is the critical value of​ t* for a 90​% confidence​ interval? ​c) Construct a 90​% confidence interval for μ. ​d) Based on the confidence​ interval, at alphaαequals=0.05 can you reject H0​? Explain.

(a) Write the claim mathematically and identify Upper H 0H0 and Upper H Subscript aHa. ​(b)...

(a) Write the claim mathematically and identify Upper H 0H0 and Upper H Subscript aHa. ​(b) Find the critical​ value(s) and identify the rejection​ region(s). (c) Find the standardized test statistic.​ (d) Decide whether to reject or fail to reject the null hypothesis.In a sample of 10001000 home​ buyers, you find that 431431 home buyers found their real estate agent through a friend. At alphaαequals=0.020.02​, can you reject the claim that 4040​% of home buyers find their real estate agent...

Consider testing Upper H 0 : mu equals 20H0: μ=20 against Upper H Subscript a Baseline...

Consider testing Upper H 0 : mu equals 20H0: μ=20 against Upper H Subscript a Baseline : mu less than 20Ha: μ<20 where μ is the mean number of latex gloves used per week by all hospital​ employees, based on the summary statistics n=43​, x=19.3​, and s=11.1 Complete parts a and b. a. Compute the​ p-value of the test. b. Compare the​ p-value with α=0.05 and make the appropriate conclusion. Choose the correct answer below. There is sufficient evidence to...

Given Upper H 0 H0​: mu μ equals =​25, Upper H Subscript a Ha​: mu μ...

Given Upper H 0 H0​: mu μ equals =​25, Upper H Subscript a Ha​: mu μ not equals ≠​25, and P equals = 0.023 0.023. Do you reject or fail to reject Upper H 0 H0 at the 0.01 level of​ significance?