You wish to test the following claim (HaHa) at a significance level of α=0.05. For the context of this problem, μd=PostTest−PreTestμd=PostTest-PreTest where the first data set represents a pre-test and the second data set represents a post-test. (Each row represents the pre and post test scores for an individual. Be careful when you enter your data and specify what your μ1 and μ2 are so that the differences are computed correctly.) Ho:μd=0 Ha:μd≠0 You believe the population of difference scores is normally distributed, but you do not know the standard deviation. You obtain the following sample of data: pre-test post-test 53.5 76.6 35.1 27.3 42.8 12 54.3 -1.8 40.9 -65 67.5 87 46.2 34.7 61.7 23.5 41.4 40 59.9 5.3 61.2 90.3 35.1 -21 58.2 49.1 37.7 55.4 33.6 33.5 35.8 28 32.8 30.1 56.6 -36.2 47 29.4 67.5 45.1 What is the test statistic for this sample? test statistic = (Report answer accurate to 4 decimal places.) What is the p-value for this sample? p-value = (Report answer accurate to 4 decimal places.) The p-value is... less than (or equal to) αα greater than αα This test statistic leads to a decision to... reject the null accept the null fail to reject the null As such, the final conclusion is that... There is sufficient evidence to warrant rejection of the claim that the mean difference of post-test from pre-test is not equal to 0. There is not sufficient evidence to warrant rejection of the claim that the mean difference of post-test from pre-test is not equal to 0. The sample data support the claim that the mean difference of post-test from pre-test is not equal to 0. There is not sufficient sample evidence to support the claim that the mean difference of post-test from pre-test is not equal to 0.
You wish to test the following claim (HaHa) at a significance level of α=0.05. For the context of this problem, μd=PostTest−PreTestμd=PostTest-PreTest where the first data set represents a pre-test and the second data set represents a post-test. (Each row represents the pre and post test scores for an individual. Be careful when you enter your data and specify what your μ1 and μ2 are so that the differences are computed correctly.) Ho:μd=0 Ha:μd≠0 You believe the population of difference scores is normally distributed, but you do not know the standard deviation. You obtain the following sample of data: pre-test post-test 53.5 76.6 35.1 27.3 42.8 12 54.3 -1.8 40.9 -65 67.5 87 46.2 34.7 61.7 23.5 41.4 40 59.9 5.3 61.2 90.3 35.1 -21 58.2 49.1 37.7 55.4 33.6 33.5 35.8 28 32.8 30.1 56.6 -36.2 47 29.4 67.5 45.1 What is the test statistic for this sample? test statistic = (Report answer accurate to 4 decimal places.) What is the p-value for this sample? p-value = (Report answer accurate to 4 decimal places.) The p-value is... less than (or equal to) αα greater than αα This test statistic leads to a decision to... reject the null accept the null fail to reject the null As such, the final conclusion is that... There is sufficient evidence to warrant rejection of the claim that the mean difference of post-test from pre-test is not equal to 0. There is not sufficient evidence to warrant rejection of the claim that the mean difference of post-test from pre-test is not equal to 0. The sample data support the claim that the mean difference of post-test from pre-test is not equal to 0. There is not sufficient sample evidence to support the claim that the mean difference of post-test from pre-test is not equal to 0.
Glencoe Algebra 1, Student Edition, 9780079039897, 0079039898, 2018
18th Edition
ISBN:9780079039897
Author:Carter
Publisher:Carter
Chapter4: Equations Of Linear Functions
Section: Chapter Questions
Problem 9SGR
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Question
You wish to test the following claim (HaHa) at a significance level of α=0.05. For the context of this problem, μd=PostTest−PreTestμd=PostTest-PreTest where the first data set represents a pre-test and the second data set represents a post-test. (Each row represents the pre and post test scores for an individual. Be careful when you enter your data and specify what your μ1 and μ2 are so that the differences are computed correctly.)
Ho:μd=0
Ha:μd≠0
You believe the population of difference scores isnormally distributed , but you do not know the standard deviation. You obtain the following sample of data:
What is the test statistic for this sample?
test statistic = (Report answer accurate to 4 decimal places.)
What is the p-value for this sample?
p-value = (Report answer accurate to 4 decimal places.)
The p-value is...
This test statistic leads to a decision to...
As such, the final conclusion is that...
Ho:μd=0
Ha:μd≠0
You believe the population of difference scores is
pre-test | post-test |
---|---|
53.5 | 76.6 |
35.1 | 27.3 |
42.8 | 12 |
54.3 | -1.8 |
40.9 | -65 |
67.5 | 87 |
46.2 | 34.7 |
61.7 | 23.5 |
41.4 | 40 |
59.9 | 5.3 |
61.2 | 90.3 |
35.1 | -21 |
58.2 | 49.1 |
37.7 | 55.4 |
33.6 | 33.5 |
35.8 | 28 |
32.8 | 30.1 |
56.6 | -36.2 |
47 | 29.4 |
67.5 | 45.1 |
What is the test statistic for this sample?
test statistic = (Report answer accurate to 4 decimal places.)
What is the p-value for this sample?
p-value = (Report answer accurate to 4 decimal places.)
The p-value is...
- less than (or equal to) αα
- greater than αα
This test statistic leads to a decision to...
- reject the null
- accept the null
- fail to reject the null
As such, the final conclusion is that...
- There is sufficient evidence to warrant rejection of the claim that the
mean difference of post-test from pre-test is not equal to 0. - There is not sufficient evidence to warrant rejection of the claim that the mean difference of post-test from pre-test is not equal to 0.
- The sample data support the claim that the mean difference of post-test from pre-test is not equal to 0.
- There is not sufficient sample evidence to support the claim that the mean difference of post-test from pre-test is not equal to 0.
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