test whether p1>p2 x 1 equals 119x1=119​, n 1 equals 256n1=256​, x 2 equals 144x2=144​, and...

Conduct a test at the alpha α equals = 0.01 0.01 level of significance by determining...

Conduct a test at the alpha α equals = 0.01 0.01 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume the samples were obtained independently from a large population using simple random sampling. Test whether p 1 greater than p 2 p1>p2. The sample data are x 1 equals 119 x1=119​, n 1 equals 249 n1=249​, x 2 equals 135 x2=135​, and n 2 equals 305 n2=305. Thank you...

1. Consider this hypothesis test: H0: p1 - p2 = 0 Ha: p1 - p2 >...

1. Consider this hypothesis test: H0: p1 - p2 = 0 Ha: p1 - p2 > 0 Here p1 is the population proportion of “yes” of Population 1 and p2 is the population proportion of “yes” of Population 2. Use the statistics data from a simple random sample of each of the two populations to complete the following: (8 points) Population 1 Population 2 Sample Size (n) 400 600 Number of “yes” 300 426 Compute the test statistic z. What...

Construct a confidence interval for p 1 minus p 2 p1−p2 at the given level of...

Construct a confidence interval for p 1 minus p 2 p1−p2 at the given level of confidence. x 1 equals x1= 374 374​, n 1 equals n1= 535 535​, x 2 equals x2= 418 418​, n 2 equals n2= 563 563​, 90 90​% confidence The researchers are nothing ​% confident the difference between the two population​ proportions, p 1 minus p 2 p1−p2​, is between nothing and nothing . ​(Use ascending order. Type an integer or decimal rounded to three...

Construct a confidence interval for p1−p2 at the given level of confidence. x 1 =399​, n...

Construct a confidence interval for p1−p2 at the given level of confidence. x 1 =399​, n 1 =533​, x 2 =433​, n 2=569​, 90​% confidence The researchers are ---------​% confident the difference between the two population​ proportions, p1−p2​, is between ------------ and ------------ ​(Use ascending order. Type an integer or decimal rounded to three decimal places as​ needed.)

Construct a confidence interval for p1−p2 at the given level of confidence. x 1=399 n 1...

Construct a confidence interval for p1−p2 at the given level of confidence. x 1=399 n 1 =522 x 2 =413 n 2 =583 99% confidence

Conduct a test at the alpha α equals = 0.01 level of significance by determining ​(a)...

Conduct a test at the alpha α equals = 0.01 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume the samples were obtained independently from a large population using simple random sampling. Test whether p1>p2. The sample data are x1=128​, n1=245​, x2=144​, and n2=315. ​(a) Choose the correct null and alternative hypotheses below. A. H0: p1=p2 versus H1: p1<p2 B. H0: p1=0 versus H1: p1≠0 C. H0: p1=p2 versus...

Conduct a test at the alpha α equals = 0.01 level of significance by determining ​(a)...

Conduct a test at the alpha α equals = 0.01 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume the samples were obtained independently from a large population using simple random sampling. Test whether p1>p2. The sample data are x1=128​, n1=245​, x2=144​, and n2=315. ​(a) Choose the correct null and alternative hypotheses below. A. H0: p1=p2 versus H1: p1p2 B. H0: p1=0 versus H1: p1≠0 C. H0: p1=p2 versus...

Conduct a test at the alpha α equals = 0.01 0.01 level of significance by determining...

Conduct a test at the alpha α equals = 0.01 0.01 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume the samples were obtained independently from a large population using simple random sampling. Test whether p 1 greater than p 2 p1>p2. The sample data are x 1 equals 116 x1=116​, n 1 equals 247 n1=247​, x 2 equals 133 x2=133​, and n 2 equals 315 n2=315. ​(a) Choose...

Conduct a test at the alphaαequals=0.100.10 level of significance by determining ​(a) the null and alternative​...

Conduct a test at the alphaαequals=0.100.10 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume the samples were obtained independently from a large population using simple random sampling.Test whether p 1 greater than p 2p1>p2. The sample data are x 1 equals 121x1=121​, n 1 equals 249n1=249​, x 2 equals 137x2=137​, and n 2 equals 314n2=314. ​(a) Choose the correct null and alternative hypotheses below. A. Upper H 0...

Conduct a test at the alphaαequals=0.050.05 level of significance by determining ​(a) the null and alternative​...

Conduct a test at the alphaαequals=0.050.05 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume the samples were obtained independently from a large population using simple random sampling.Test whether p 1 greater than p 2p1>p2. The sample data are x 1 equals 116x1=116​, n 1 equals 243n1=243​, x 2 equals 138x2=138​, and n 2 equals 303n2=303. ​(a) Choose the correct null and alternative hypotheses below. A. Upper H 0...