Question Completion Status: Your instructor (Katie) believes that the average time of taking this exam is...
QUESTION 16 Your instructor (Katie) believes that the average time of taking this is equal to 140 minutes. A sample of 4 students was taken and the following times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) The critical value for this test at a 0.1 level of significance is: a. 1.638, -1.638 b. 1.645, -1.645 c. 2.353, -2.353 d. 1.285, -1.285 Your instructor (Katie) believes that...
Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) The critical value for this test at a 0.1 level of significance is: O a. 1.285.-1.285 O b.2.353,-2.353 1.645,-1.645 OC. d. 1.638,-1.638
QUESTION 15 Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) The value of test statistic is: O a. 3 b.-1.5 OC-3 Od. 15 QUESTION 16 Your instructor (Katie) believes that the average time of taking this exam is...
Your instructor (Katie) believes that the average time of taking this test is equal to 140 minutes. A sample of 4 students was taken and the following test times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) (1) The critical value for this test at a 0.1 level of significance is: a. 1.285, -1.285 b. 1.645, -1.645 c. 1.638, -1.638 d. 2.353, -2.353 (2) At a 0.1...
Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) At a 0.1 level of significance, it can be concluded that the mean of the population is: O a significantly less than 140 O b. not significantly different than 140...
Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) The value of test statistic is: O a.-1.5 O b.1.5 OC -3 O d. 3
Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) The correct set of hypothesis is: Hou < 140and H1 : > 140 a. Ho :u = 140 and Hiru # 140 Ob. Ho: u < 140 and Hı: u...
QUESTION 17 Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) At a 0.1 level of significance, it can be concluded that the mean of the population is: a significantly less than 140 Ob not significantly different than 140...
QUESTION 14 Your instructor (Katie) believes that the average time of taking this exam is equal to 140 minutes. A sample of 4 students was taken and the following exam times were obtained. Assume the distribution of the population is normally distributed. Sample: 150, 150, 180, 170 (Sample Std. Dev = 15) The correct set of hypothesis is: Hos 140and H : L> 140 Ho:11= 140 and H: 140 140 b. H: 11 < 140 and H: 140 H:12 140...
An official of a large national union claims that the fraction of women in the union is not significantly different from 58%. To test this claim, a random sample of 400 individuals in the union is taken. Of those 400,215 are women. Use the p-value to conduct the hypothesis test and use a =0.05 level of significance. p-value = 0.0446 <0.05; Fail to reject H. - O a. p-value = 0.0446 <0,05; Reject H. Ob. p-value = 0.4714 > 0.05;...