Consider the following hypothesis statement using alphaαequals=0.10 and the following data from two independent samples. complete...

Consider the following hypothesis statement using alphaαequals=0.10 and the following data from two independent samples. complete...

Consider the following hypothesis statement using alphaαequals=0.10 and the following data from two independent samples. complete the parts below. H0: p1-p2 equal to 0 H1: p1 - p2 not equal to 0 x1= 18  x2= 23 n1= 90  n2=105 1.) what is the test statistic? 2.) what is/are the critical value(s)? 3.) interpret the result. 4,) what is the p value? 5.) interpret the result.

Consider the following hypothesis statement using α = 0.05 and the following data from two independent...

Consider the following hypothesis statement using α = 0.05 and the following data from two independent samples: H0: p1 - p2 = 0 H1: p1 - p2 ≠ 0 x1 = 18                                    x2 = 24 n1 = 85                                    n2 = 105 Calculate the appropriate t-test statistic and interpret the result. Calculate the p-value and interpret the result.

Consider the following hypothesis statement using a = 0.10 and data from two independent samples: H0:μ1...

Consider the following hypothesis statement using a = 0.10 and data from two independent samples: H0:μ1 – μ2 ≤ 0 H1:μ1 – µ2 > 0 X1 = 86   x2 = 78 Ó1 = 24   Ó2 = 18 N1 = 50   n2 = 55 a) Calculate the appropriate test statistic and interpret the result. b) Calculate the p-value and interpret the result.

Consider the following hypothesis statement using alphaαequals=0.10 and data from two independent samples. Assume the population...

Consider the following hypothesis statement using alphaαequals=0.10 and data from two independent samples. Assume the population variances are equal and the populations are normally distributed. Complete parts below. H0: μ1−μ2 = 0 x overbar 1 = 14.8 x overbar 2 = 13.0 H1: μ1−μ2 ≠ 0 s1= 2.8 s2 = 3.2 n1 = 21 n2 = 15 a.) what is the test statistic? b.) the critical values are c.) what is the p value?

Consider the following hypothesis statement using α= 0.10 and data from two independent samples. Assume the...

Consider the following hypothesis statement using α= 0.10 and data from two independent samples. Assume the population variances are equal and the populations are normally distributed. Complete parts a and b. H0: μ1−μ2≤11    x1=66.8 x2=54.3 H1: μ1−μ2>11 s1=19.1    s2=17.7 \ n1=19    n2=21 a. Calculate the appropriate test statistic and interpret the result. The test statistic is . ​(Round to two decimal places as​ needed.) The critical​ value(s) is(are) . ​(Round to two decimal places as needed. Use...

Conduct the following test at the a=0.10 level of significance by determining ​(a) the null and...

Conduct the following test at the a=0.10 level of significance by determining ​(a) the null and alternative​ hypotheses, ​(b) the test​ statistic, and​ (c) the​ P-value. Assume that the samples were obtained independently using simple random sampling. Test whether p1 ≠ p2. Sample data are x 1=28​, n1=54​, x2 =36​, and n2=302. a. Determine the null and alternative hypotheses. Choose the correct answer below. A. H0: p1=p2 versus H1:p1> p 2 B. H0:p1=p2 versus H1:p1< p 2 C. H0:p1=p2 versus...

Conduct a test at the α=0.05 level of significance by determining (a) the null and alternative...

Conduct a test at the α=0.05 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 p1>p2. The sample data are x1=125, n1=243,x2=139, and n2=307. (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 H1: p1 D.H0: p1=p2 versus...

Conduct a test at the alphaαequals=0.05 level of significance by determining ​(a) the null and alternative​...

Conduct a test at the alphaαequals=0.05 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 p1>p2. The sample data are x1=128​, n1=246​, x2=134​,n2=312. ​(b) Determine the test statistic. z0= ​(Round to two decimal places as​ needed.) ​(c) The​ P-value depends on the type of hypothesis test. The hypothesis test H0: p1=p2 versus H1: p1>p2...

Independent random samples of n1 = 900 and n2 = 900 observations were selected from binomial...

Independent random samples of n1 = 900 and n2 = 900 observations were selected from binomial populations 1 and 2, and x1 = 120 and x2 = 150 successes were observed. (a) What is the best point estimator for the difference (p1 − p2) in the two binomial proportions? p̂1 − p̂2 n1 − n2     p1 − p2 x1 − x2 (b) Calculate the approximate standard error for the statistic used in part (a). (Round your answer to three decimal...

1) Independent random samples, each containing 90 observations, were selected from two populations. The samples from...

1) Independent random samples, each containing 90 observations, were selected from two populations. The samples from populations 1 and 2 produced 21 and 14 successes, respectively. Test H0:(p1?p2)=0 against Ha:(p1?p2)?0. Use ?=0.07. (a) The test statistic is (b) The P-value is (c) The final conclusion is A. We can reject the null hypothesis that (p1?p2)=0 and accept that (p1?p2)?0. B. There is not sufficient evidence to reject the null hypothesis that (p1?p2)=0. 2)Two random samples are taken, one from among...