The value of test statistic.

Question

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Answer 1

Question

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

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Answer 2

Question

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

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Answer 3

Question

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

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Answer 4

Question

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

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Answer 5

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

Answer 6

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

Answer 7

Chapter 15, Problem 1CQ

a.

To determine

To find:The value of test statistic.

Answer 8

a.

Expert Solution

Answer to Problem 1CQ

The value of test statistic is −2.7 .

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given information:

The data is 50,38,23,29,57,26,53,42,60,23 and the hypothesis are H0:m=30 and H1:m≠30 .

Concept used:

The test statistic is,

If the sample size is less than or equal to 25 then the test statistic is X .

If the sample size is greater than 25 then the test statics is,

z=x+0.5−n2n2

Here, the number of times the less frequent sign occur is x .

The conditions for test statistics are shown below in table.

Type of test	Test statistic
Right-tailed test	Number of minus signs
Left-tailed test	Number of plus signs
Two-tailed test	Number of plus or minus signs, whichever is smaller

Calculations:

The value of test statistic is shown below.

Sample	Difference	Signs
50	20	-
38	8	+
23	-7	-
29	-1	-
57	27	+
26	-4	-
53	23	+
42	12	+
60	30	+
23	-7	-

From the above table, the number of minus sign is 4 and the number of plus sign is 6 and the sample size is 19 .

Since, the sample size is less than 25 .

The test statistic is given by the number of plus or minus sign which are smaller in number.

x=4

Therefore, the value of test statistic for the given sample is 2 .

Answer 13

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

Answer 14

b.

To determine

To find:Whether the hypothesis H0 rejected or not.

Answer 15

b.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given information:

The level of significance is 0.05 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.05 is 1 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

Answer 20

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

Answer 21

c.

To determine

To find:Whether the hypothesis H0 rejected or not.

Answer 22

c.

Expert Solution

Answer to Problem 1CQ

The hypothesis H0 is not rejected.

Answer 23

c.

Expert Solution

Answer 24

c.

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Given information:

The level of significance is 0.01 .

Calculations:

The critical value for two-tailed test at sample size of 10 and level of significance of 0.01 is 0 .

Since, the test statistics is 4 which greater than the critical value.

Therefore, the hypothesis H0 is not rejected.

Answer 27

Ch. 15.1 - In Exercises 3 and 4, fill in each blank with the...Ch. 15.1 - Prob. 4E Ch. 15.1 - Prob. 5E Ch. 15.1 - In Exercises 5 and 6, determine whether the...Ch. 15.1 - Prob. 7E Ch. 15.1 - Prob. 8E Ch. 15.1 - Prob. 9E Ch. 15.1 - Prob. 10E Ch. 15.1 - Weight loss: A weight loss company claims that the...Ch. 15.1 - At the movies: A sample of 12 movies released in a...

The value of test statistic.

Videos

To find:The value of test statistic.

Answer to Problem 1CQ

Explanation of Solution

To find:Whether the hypothesis H0 rejected or not.

Answer to Problem 1CQ

Explanation of Solution

To find:Whether the hypothesis H0 rejected or not.

Answer to Problem 1CQ

Explanation of Solution

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