Consider that two independent samples of sizes n1 and n2 are taken from multivariate normal populations...

Random samples of sizes n1 = 400 and n2 = 315 were taken from two independent...

Random samples of sizes n1 = 400 and n2 = 315 were taken from two independent populations. In the first sample, 115 of the individuals met a certain criteria whereas in the second sample, 123 of the individuals met the same criteria. Run a 2PropZtest to test whether the proportions are different, and answer the following questions. What is the value of p−, the pooled sample proportion?Round your response to at least 3 decimal places. Number Calculate the z test...

Independent random samples of sizes n1 = 407 and n2 = 307 were taken from two...

Independent random samples of sizes n1 = 407 and n2 = 307 were taken from two populations. In the first sample, 118 of the individuals met a certain criteria whereas in the second sample, 163 of the individuals met the same criteria. Test the null hypothesis H0:p1=p2versus the alternative hypothesis HA:p1≠p2. What is the value of the z test statistic, testing the null hypothesis that the population proportions are equal? Round your response to at least 2 decimal places.

Two independent random samples of sizes n1= 4 and n2=5 are selected from each of two...

Two independent random samples of sizes n1= 4 and n2=5 are selected from each of two normal populations: Population 1: 12 3 8 5 Population 2: 14 7 7 9 5 use a=0.5 What is the correct Test Statistic: A. 5.2889 B. 2.795 C. 2.771 D. 2.575

Consider two independent random samples of sizes n1 = 14 and n2 = 10, taken from...

Consider two independent random samples of sizes n1 = 14 and n2 = 10, taken from two normally distributed populations. The sample standard deviations are calculated to be s1= 2.32 and s2 = 6.74, and the sample means are x¯1=-10.1and x¯2=-2.19, respectively. Using this information, test the null hypothesis H0:μ1=μ2against the one-sided alternative HA:μ1<μ2, using the Welch Approximate t Procedure (i.e. assuming that the population variances are not equal). a) Calculate the value for the t test statistic. Round your...

a) If independent random samples of size n1 = n2 = 8 come from normal populations...

a) If independent random samples of size n1 = n2 = 8 come from normal populations having the same variance, what is the probability that either sample variance will be at least 7 times as large as the other? b) Assume that the time of delivery of a parcel within a city follows a normal distribution. The following is the time taken (in hours) for the delivery of 8 parcels within a city: 28, 32, 20, 26, 42, 40, 28,...

(S 11.1) Random samples of sizes n1 = 405 and n2 = 311 were taken from...

(S 11.1) Random samples of sizes n1 = 405 and n2 = 311 were taken from two independent populations. In the first sample, 120 of the individuals met a certain criteria whereas in the second sample, 131 of the individuals met the same criteria. Run a 2PropZtest to test whether the proportions are different, and answer the following questions. What is the value of p?, the pooled sample proportion?. .3505586 Round your response to at least 3 decimal places Calculate...

(S 11.3) Independent random samples of sizes n1 = 204 and n2 = 208 were taken...

(S 11.3) Independent random samples of sizes n1 = 204 and n2 = 208 were taken from two populations. In the first sample, 177 of the individuals met a certain criteria whereas in the second sample, 179 of the individuals met the same criteria. Test the null hypothesis H0:p1=p2versus the alternative hypothesis HA:p1>p2. Calculate the z test statistic, testing the null hypothesis that the population proportions are equal. _______________ Round your response to at least 2 decimal places.    What...

Suppose we have taken independent, random samples of sizes n1 = 7 and n2 = 6...

Suppose we have taken independent, random samples of sizes n1 = 7 and n2 = 6 from two normally distributed populations having means µ1 and µ2, and suppose we obtain x¯1  = 240 , x¯2  =  208 , s1 = 5, s2 = 5. Use critical values to test the null hypothesis H0: µ1 − µ2 < 22 versus the alternative hypothesis Ha: µ1 − µ2 > 22 by setting α equal to .10, .05, .01 and .001. Using the...

Consider the following results for independent samples taken from two populations. Sample 1 Sample 2 n1...

Consider the following results for independent samples taken from two populations. Sample 1 Sample 2 n1 = 500 n2= 200 p1= 0.46 p2= 0.31 b. Develop a 90% confidence interval for the difference between the two population proportions (to 4 decimals). Use z-table. ______ to ________ c. Develop a 95% confidence interval for the difference between the two population proportions (to 4 decimals). Use z-table. ________ to _________

Two random samples are selected from two independent populations. A summary of the samples sizes, sample...

Two random samples are selected from two independent populations. A summary of the samples sizes, sample means, and sample standard deviations is given below: n1=39,n2=40,x¯1=50.3,x¯2=73.8,s1=6s2=6.1 Find a 98% confidence interval for the difference μ1−μ2 of the population means, assuming equal population variances.