There is some evidence suggesting that you are likely to improve your test score if you rethink and change answers on a multiple-choice exam (Johnston, 1975). To examine this phenomenon, a teacher gave the same final exam to two sections of a psychology course. The students in one section were told to turn in their exams immediately after finishing, without changing any of their answers. In the other section, students were encouraged to reconsider each question and to change answers whenever they felt it was appropriate. Before the final exam, the teacher had matched 9 students in the first section with 9 students in the second section based on their midterm grades. For example, a student in the no-change section with an 89 on the midterm exam was matched with a student in the change section who also had an 89 on the midterm. The difference between the two final exam grades for each matched pair was computed, and the data showed that the students who were allowed to change answers scored higher by an average of MDD = 7 points with SS = 288. Do the data indicate a significant difference between the two conditions? Use a two-tailed test with α = .05. sMDMD = t = t-critical = ± Reject the null hypothesis; conclude that changing answers has a significant effect on exam performance. Fail to reject the null hypothesis; conclude that changing answers does not have a significant effect on exam performance. Reject the null hypothesis; conclude that changing answers does not have a significant effect on exam performance. Fail to reject the null hypothesis; conclude that changing answers has a significant effect on exam performance. t Distribution Degrees of Freedom = 8 -3.0-2.0-1.00.01.02.03.0t Construct a 95% confidence interval to estimate the size of the population mean difference. 1.388 to 10.612 4.388 to 13.612 6.388 to 15.612 2.388 to 11.612 Complete the following sentence demonstrating how the results of the hypothesis test and the confidence interval would appear in a research report. Changing answers in significantly exam scores, , ,

There is some evidence suggesting that you are likely to improve your test score if you rethink and change answers on a multiple-choice exam (Johnston, 1975). To examine this phenomenon, a teacher gave the same final exam to two sections of a psychology course. The students in one section were told to turn in their exams immediately after finishing, without changing any of their answers. In the other section, students were encouraged to reconsider each question and to change answers whenever they felt it was appropriate. Before the final exam, the teacher had matched 9 students in the first section with 9 students in the second section based on their midterm grades. For example, a student in the no-change section with an 89 on the midterm exam was matched with a student in the change section who also had an 89 on the midterm. The difference between the two final exam grades for each matched pair was computed, and the data showed that the students who were allowed to change answers scored higher by an average of MDD = 7 points with SS = 288. Do the data indicate a significant difference between the two conditions? Use a two-tailed test with α = .05. sMDMD = t = t-critical = ± Reject the null hypothesis; conclude that changing answers has a significant effect on exam performance. Fail to reject the null hypothesis; conclude that changing answers does not have a significant effect on exam performance. Reject the null hypothesis; conclude that changing answers does not have a significant effect on exam performance. Fail to reject the null hypothesis; conclude that changing answers has a significant effect on exam performance. t Distribution Degrees of Freedom = 8 -3.0-2.0-1.00.01.02.03.0t Construct a 95% confidence interval to estimate the size of the population mean difference. 1.388 to 10.612 4.388 to 13.612 6.388 to 15.612 2.388 to 11.612 Complete the following sentence demonstrating how the results of the hypothesis test and the confidence interval would appear in a research report. Changing answers in significantly exam scores, , ,

A First Course in Probability (10th Edition)

10th Edition

ISBN:9780134753119

Author:Sheldon Ross

Publisher:Sheldon Ross

Chapter1: Combinatorial Analysis

Section: Chapter Questions

Problem 1.1P: a. How many different 7-place license plates are possible if the first 2 places are for letters and...

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The difference between the two final exam grades for each matched pair was computed, and the data showed that the students who were allowed to change answers scored higher by an average of MDD = 7 points with SS = 288.

Do the data indicate a significant difference between the two conditions? Use a two-tailed test with α = .05.

sMDMD	=
t	=
t-critical	=	±

Reject the null hypothesis; conclude that changing answers has a significant effect on exam performance.

Fail to reject the null hypothesis; conclude that changing answers does not have a significant effect on exam performance.

Reject the null hypothesis; conclude that changing answers does not have a significant effect on exam performance.

Fail to reject the null hypothesis; conclude that changing answers has a significant effect on exam performance.

t Distribution

Degrees of Freedom = 8

-3.0-2.0-1.00.01.02.03.0t

Construct a 95% confidence interval to estimate the size of the population mean difference.

1.388 to 10.612

4.388 to 13.612

6.388 to 15.612

2.388 to 11.612

Complete the following sentence demonstrating how the results of the hypothesis test and the confidence interval would appear in a research report.

Changing answers in significantly exam scores, , ,

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