Find the regression equation.

Question

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Answer 1

Question

Compare Compare Correlation is the measure of the degree of the relationship between the variables. In regression, the relationship between the variables to predict one by another is assessed. In correlation there is no cause and effect between the variables, whereas in regression there is a cause and effect between the variables. By using correlation, we cannot predict anything, but regression is a predictive tool. Coefficients are symmetrical in correlation but in regression they are asymmetrical. Correlation is independent of change in origin and scale, but regression is not independent of change in scale.

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

b.

To determine

Test whether the slope is significant or not.

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

c.

To determine

Find and interpret the value of coefficient of determination.

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

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Answer 2

Question

Compare Compare Correlation is the measure of the degree of the relationship between the variables. In regression, the relationship between the variables to predict one by another is assessed. In correlation there is no cause and effect between the variables, whereas in regression there is a cause and effect between the variables. By using correlation, we cannot predict anything, but regression is a predictive tool. Coefficients are symmetrical in correlation but in regression they are asymmetrical. Correlation is independent of change in origin and scale, but regression is not independent of change in scale.

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

b.

To determine

Test whether the slope is significant or not.

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

c.

To determine

Find and interpret the value of coefficient of determination.

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Question

Compare Compare Correlation is the measure of the degree of the relationship between the variables. In regression, the relationship between the variables to predict one by another is assessed. In correlation there is no cause and effect between the variables, whereas in regression there is a cause and effect between the variables. By using correlation, we cannot predict anything, but regression is a predictive tool. Coefficients are symmetrical in correlation but in regression they are asymmetrical. Correlation is independent of change in origin and scale, but regression is not independent of change in scale.

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

b.

To determine

Test whether the slope is significant or not.

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

c.

To determine

Find and interpret the value of coefficient of determination.

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Question

Compare Compare Correlation is the measure of the degree of the relationship between the variables. In regression, the relationship between the variables to predict one by another is assessed. In correlation there is no cause and effect between the variables, whereas in regression there is a cause and effect between the variables. By using correlation, we cannot predict anything, but regression is a predictive tool. Coefficients are symmetrical in correlation but in regression they are asymmetrical. Correlation is independent of change in origin and scale, but regression is not independent of change in scale.

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

b.

To determine

Test whether the slope is significant or not.

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

c.

To determine

Find and interpret the value of coefficient of determination.

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

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Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

b.

To determine

Test whether the slope is significant or not.

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

c.

To determine

Find and interpret the value of coefficient of determination.

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

Answer 6

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

Answer 7

Chapter 13, Problem 53CE

a.

To determine

Find the regression equation.

Answer 8

a.

Expert Solution

Answer to Problem 53CE

The regression equation is y^=26.8054−2.4082x.

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Calculation:

The values of x and y are given.

Regression equation:

Software procedure:

Step-by-step procedure to obtain the ‘Regression equation’ using the MegaStat software:

In an EXCEL sheet enter the data values of x and y.
Go to Add-Ins > MegaStat > Correlation/Regression > Regression Analysis.
Select input range as ‘Sheet1!$B$2:$B$16’ under Y/Dependent variable.
Select input range ‘Sheet1!$A$2:$A$16’ under X/Independent variables.
Click on OK.

Output obtained using the MegaStat software is as given below:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 1

From the output, the regression equation is y^=26.8054−2.4082x,

Where, y is the price per share and x is the dividend.

Answer 13

b.

To determine

Test whether the slope is significant or not.

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

Answer 14

b.

To determine

Test whether the slope is significant or not.

Answer 15

b.

Expert Solution

Answer to Problem 53CE

There is sufficient evidence to conclude that the slope of the regression line is different from zero.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

It is given that the regression equation is y^=26.8054−2.4082x.

The sample size is 30 and the standard error of the slope is 0.3279.

From the regression equation, the estimated slope of the regression line is b=−2.4082 and the standard error of b is sb=0.3279.

Let β be the slope of the regression line.

The given test hypotheses are as follows:

Null hypothesis:

H0:β=0

That is, the slope of the regression line is equal to zero.

Alternate hypothesis:

H1:β≠0

That is, the slope of the regression line is not equal to zero.

Assume that the level of significance is 0.05.

Test statistic:

The t-test statistic is as follows:

t=b−0sb,

Where, b is the slope of the computed regression line and sb is the standard error of b.

Thus, the following is obtained:

t=bsb=−2.40820.3279=−7.34

Here, the sample size is n=30. Thus, the degrees of freedom is as follows:

n−2=30−2=28

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value tα2 using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV(0.025,28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 2

From the EXCEL output, the critical value is –2.048 (−tα2).

Decision based on the critical value:

Reject the null hypothesis, if |t|>|tα2|. Otherwise, fail to reject H₀.

Conclusion:

The t-calculated value is –7.34 and the critical value is –2.048.

That is, |t-calculated value|(=7.34)>|tα2|(=2.048).

Thus, the null hypothesis is rejected.

Hence, there is sufficient evidence to conclude that the slope of the regression line is different from zero.

Answer 20

c.

To determine

Find and interpret the value of coefficient of determination.

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

Answer 21

c.

To determine

Find and interpret the value of coefficient of determination.

Answer 22

c.

Expert Solution

Answer to Problem 53CE

The coefficient of determination is 0.658.

Answer 23

c.

Expert Solution

Answer 24

c.

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

From Part (a), the value of coefficient of determination is 0.658.

Therefore, 65.8% of variation in the ‘selling price’ is explained by ‘the annual dividend’.

Answer 27

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

Answer 28

d.

To determine

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

Answer 29

d.

Expert Solution

Answer to Problem 53CE

The correlation coefficient is 0.811.

There is enough evidence to infer that the correlation in the population is greater than zero.

Answer 30

d.

Expert Solution

Answer 31

d.

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

Calculation:

The correlation coefficient is as follows:

Correlation coefficient =r2=0.658=0.811

The given sample size is 30 and correlation is 0.811.

Denote the population correlation as ρ.

The hypotheses are given below:

Null hypothesis:

H0:ρ≤0

That is, the correlation in the population is less than or equal to zero.

Alternative hypothesis:

H1:ρ>0

That is, the correlation in the population is greater than zero.

Test statistic:

The test statistic is as follows:

t=rn−21−r2

Here, the sample size is 30 and the correlation coefficient is 0.811.

The test statistic is as follows:

t=0.81130−21−0.8112=0.811×280.342279=7.335≈7.34

Degrees of freedom:

df=n−2=30−2=28

The level of significance is 0.05. Therefore, 1−α=0.95.

Critical value:

Software procedure:

Step-by-step software procedure to obtain the critical value using the EXCEL software:

Open an EXCEL file.
In cell A1, enter the formula “=T.INV (0.95, 28)”.

Output obtained using the EXCEL is given as follows:

Statistical Techniques in Business and Economics, Chapter 13, Problem 53CE , additional homework tip 3

From the EXCEL output, the critical value is 1.701.

Conclusion:

The value of test statistic is 7.34 and the critical value is 1.701.

Here, |t-calculated|(=7.34)> |t-critical value|(=1.701).

By the rejection rule, reject the null hypothesis.

Thus, there is enough evidence to infer that the correlation in the population is greater than zero.

Answer 34

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Find the regression equation.

Concept explainers

Videos

Find the regression equation.

Answer to Problem 53CE

Explanation of Solution

Test whether the slope is significant or not.

Answer to Problem 53CE

Explanation of Solution

Find and interpret the value of coefficient of determination.

Answer to Problem 53CE

Explanation of Solution

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.

Answer to Problem 53CE

Explanation of Solution

Want to see more full solutions like this?

Chapter 13 Solutions

Find the regression equation.

Concept explainers

Videos

Find the regression equation.

Answer to Problem 53CE

Explanation of Solution

Test whether the slope is significant or not.

Answer to Problem 53CE

Explanation of Solution

Find and interpret the value of coefficient of determination.

Answer to Problem 53CE

Explanation of Solution

Find the value of correlation coefficient. Test whether the correlation in the population is greater than zero or not.

Answer to Problem 53CE

Explanation of Solution

Want to see more full solutions like this?

Chapter 13 Solutions

Find the value of correlation coefficient.

Test whether the correlation in the population is greater than zero or not.