Case Problem: Alumni Giving 1. Use methods of descriptive statistics to summariz

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Question

Case Problem: Alumni Giving

1. Use methods of descriptive statistics to summarize the data

1a. Complete the table given below for the descriptive statistics for graduation rate, % of classes under 20, student-faculty ratio, and alumni giving

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

Mean

Median

standard deviation

Minimum

Maximum

Range

b. Determine the correlations for each pair of variables are shown in the table below.

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

c. What type of relationship does the % of classes under 20 and student-faculty ratio demonstrate? Use data to support your answer.

2. Develop an estimated simple linear regression model that can be used to predict the alumni giving rate, given the graduation rate. Discuss your findings.

2a. PASTE the image of your Excel output BELOW that provides the estimated simple linear regression model showing how the alumni giving rate (y) is related to the graduate rate (x)

2b. i. The estimated simple linear regression equation is

ii. The coefficient of determination r2 is

iii. Interpret the meaning of the coefficient of determination r2

iv. Test the hypothesis of relationship between the alumni giving rate (y) and the graduation rate (x), at the 0.05 level of significance throughout this problem. What conclusion can we draw?

3. Develop an estimated multiple linear regression model that could be used to predict the alumni giving rate using the Graduation Rate, % of Classes Under 20, and Student/Faculty Ratio as independent variables. Discuss your findings.

3a. PASTE the Excel output that provides the estimated multiple linear regression model showing how the alumni giving rate (y) is related to the graduate rate (x1), % of Classes Under 20 (x2), and Student-Faculty Ratio (x3).

3b. i. The multiple simple linear regression equation is

ii. The coefficient of determination r2 is

iii. Interpret the meaning of the coefficient of determination r2

iv. Test the hypothesis of relationship between the alumni giving rate (y) and the graduation rate (x1), at the 0.05 level of significance throughout this problem. What conclusion can we draw about the effect of graduation rate on alumni giving rate while holding the holding % of classes under 20 and student-faculty ratio constant?

v. Test the hypothesis of relationship between the alumni giving rate (y) and the % of classes under 20 (x2), at the 0.05 level of significance throughout this problem. What conclusion can we draw about the alumni giving rate and when controlling for the graduation rate and the % of classes under 20?

vi. Test the hypothesis of relationship between the alumni giving rate (y) and student-faculty ratio (x3), at the 0.05 level of significance throughout this problem. What conclusion can we draw about the alumni giving rate and student-faculty ratio when controlling for the graduation rate and the % of classes under 20

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

Mean

Median

standard deviation

Minimum

Maximum

Range

Explanation / Answer

Answer:

1. Use methods of descriptive statistics to summarize the data

1a. Complete the table given below for the descriptive statistics for graduation rate, % of classes under 20, student-faculty ratio, and alumni giving

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

mean

83.04

55.73

11.54

29.27

sample standard deviation

8.61

13.19

4.85

13.44

minimum

maximum

range

median

83.50

59.50

10.50

29.00

mode

92.00

65.00

13.00

b. Determine the correlations for each pair of variables are shown in the table below.

Correlation Matrix

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

Graduation Rate

1.000

% of Classes Under 20

.583

1.000

Student-Faculty Ratio

-.605

-.786

1.000

Alumni Giving Rate

.756

.646

-.742

1.000

sample size

± .285

critical value .05 (two-tail)

± .368

critical value .01 (two-tail)

c. What type of relationship does the % of classes under 20 and student-faculty ratio demonstrate? Use data to support your answer.

The correlation r = -0.786. The relation is negative.

2. Develop an estimated simple linear regression model that can be used to predict the alumni giving rate, given the graduation rate. Discuss your findings.

2a. PASTE the image of your Excel output BELOW that provides the estimated simple linear regression model showing how the alumni giving rate (y) is related to the graduate rate (x)

2b. i. The estimated simple linear regression equation is

alumni giving rate =-68.7612+1.1805* graduate rate

ii. The coefficient of determination r2 is 0.571

iii. Interpret the meaning of the coefficient of determination r2

57.1% of variance in alumni giving rate is explained by graduate rate.

iv. Test the hypothesis of relationship between the alumni giving rate (y) and the graduation rate (x), at the 0.05 level of significance throughout this problem. What conclusion can we draw?

Calculated t=7.832, P=0.000 which is < 0.05 level. Regression coefficient is significant.

The relationship between the alumni giving rate (y) and the graduation rate (x) is significant.

Regression Analysis

r²

0.571

0.756

Std. Error

8.894

Dep. Var.

Alumni Giving Rate

ANOVA table

Source

p-value

Regression

4,852.4618

61.34

5.24E-10

Residual

3,639.0173

79.1091

Total

8,491.4792

Regression output

confidence interval

variables

coefficients

std. error

t (df=46)

p-value

95% lower

95% upper

Intercept

-68.7612

12.5827

-5.465

1.82E-06

-94.0888

-43.4336

Graduation Rate

1.1805

0.1507

7.832

5.24E-10

0.8771

1.4839

3b. i. The multiple simple linear regression equation is

alumni giving rate =-20.7201 +0.7482 x1+0.0290 x2-1.1920 x3

ii. The coefficient of determination r2 is 0.70

iii. Interpret the meaning of the coefficient of determination r2

70.0 % of variance in alumni giving rate is explained by regression model.

Calculated t=4.508, P=0.000 which is < 0.05 level. Regression coefficient is significant.

The relationship between the alumni giving rate (y) and the graduation rate (x1) is significant.

Calculated t=0.208, P=0.8358 which is > 0.05 level. Regression coefficient is not significant.

The relationship between the alumni giving rate (y) and the % of classes under 20 (x2), is not significant.

Calculated t=-3.082, P=0.0035 which is < 0.05 level. Regression coefficient is significant.

The relationship between the alumni giving rate (y) and the student-faculty ratio (x3) is significant.

Regression Analysis

R²

0.700

Adjusted R²

0.679

0.837

Std. Error

7.610

Dep. Var.

Alumni Giving Rate

ANOVA table

Source

p-value

Regression

5,943.5311

1,981.1770

34.21

1.43E-11

Residual

2,547.9481

57.9079

Total

8,491.4792

Regression output

confidence interval

variables

coefficients

std. error

t (df=44)

p-value

95% lower

95% upper

Intercept

-20.7201

17.5214

-1.183

.2433

-56.0321

14.5919

Graduation Rate

0.7482

0.1660

4.508

4.80E-05

0.4137

1.0827

% of Classes Under 20

0.0290

0.1393

0.208

.8358

-0.2517

0.3098

Student-Faculty Ratio

-1.1920

0.3867

-3.082

.0035

-1.9714

-0.4126

Graduation Rate

% of Classes Under 20

Student-Faculty Ratio

Alumni Giving Rate

mean

83.04

55.73

11.54

29.27

sample standard deviation

8.61

13.19

4.85

13.44

minimum

maximum

range

median

83.50

59.50

10.50

29.00

mode

92.00

65.00

13.00

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