Question

In: Statistics and Probability

Use a multiple regression model with dummy variables as follows to develop an equation to account for seasonal effects in the data.

Quarter Year 1 Year 2 Year 3
1 3 6 8
2 2 4 8
3 4 7 9
4 6 9 11
(b) Use a multiple regression model with dummy variables as follows to develop an equation to account for seasonal effects in the data. Qtr1 = 1 if Quarter 1, 0 otherwise; Qtr2 = 1 if Quarter 2, 0 otherwise; Qtr3 = 1 if Quarter 3, 0 otherwise.
If required, round your answers to three decimal places. For subtractive or negative numbers use a minus sign even if there is a + sign before the blank. (Example: -300) If the constant is "1" it must be entered in the box. Do not round intermediate calculation.
ŷ =  +___  Qtr1 + ___ Qtr2 + ___ Qtr3
Compute the quarterly forecasts for next year based on the model you developed in part (b).
If required, round your answers to three decimal places. Do not round intermediate calculation.
Year Quarter Ft
4 1
4 2
4 3
4 4
Use a multiple regression model to develop an equation to account for trend and seasonal effects in the data. Use the dummy variables you developed in part (b) to capture seasonal effects and create a variable t such that t = 1 for Quarter 1 in Year 1, t = 2 for Quarter 2 in Year 1,… t = 12 for Quarter 4 in Year 3.
If required, round your answers to three decimal places. For subtractive or negative numbers use a minus sign even if there is a + sign before the blank. (Example: -300)
ŷ =  + __ Qtr1 +__  Qtr2 +__  Qtr3 +___  t
Compute the quarterly forecasts for next year based on the model you developed in part (d).
Do not round your interim computations and round your final answer to three decimal places.
Year Quarter Period Ft
4 1 13
4 2 14
4 3 15
4 4 16
Is the model you developed in part (b) or the model you developed in part (d) more effective?
If required, round your intermediate calculations and final answer to three decimal places.
Model developed in part (b) Model developed in part (d)
MSE

Solutions

Expert Solution

b)

DATA

y t Q1 Q2 Q3
3 1 1 0 0
2 2 0 1 0
4 3 0 0 1
6 4 0 0 0
6 5 1 0 0
4 6 0 1 0
7 7 0 0 1
9 8 0 0 0
8 9 1 0 0
8 10 0 1 0
9 11 0 0 1
11 12 0 0 0

Excel result

SUMMARY OUTPUT
Regression Statistics
Multiple R 0.562657013
R Square 0.316582915
Adjusted R Square 0.060301508
Standard Error 2.661453237
Observations 12
ANOVA
df SS MS F Significance F
Regression 3 26.25 8.75 1.235294 0.358901
Residual 8 56.66666667 7.083333333
Total 11 82.91666667
Coefficients Standard Error t Stat P-value Lower 95%
Intercept 8.667 1.536590743 5.640191903 0.000487 5.123282
Q1 -3 2.173067468 -1.38053698 0.204764 -8.0111
Q2 -4 2.173067468 -1.840715973 0.102932 -9.0111
Q3 -2 2.173067468 -0.920357987 0.384298 -7.0111

y^= 8.667 - 3 Q1 -4 Q2 -2 Q3

c)

Year Quarter Ft
4 1 5.667
4 2 4.667
4 3 6.667
4 4 8.667

d)

SUMMARY OUTPUT
Regression Statistics
Multiple R 0.990659899
R Square 0.981407035
Adjusted R Square 0.970782484
Standard Error 0.469295318
Observations 12
ANOVA
df SS MS F Significance F
Regression 4 81.375 20.34375 92.37162 3.89E-06
Residual 7 1.541666667 0.220238095
Total 11 82.91666667
Coefficients Standard Error t Stat P-value Lower 95%
Intercept 3.417 0.428406053 7.975299706 9.3E-05 2.403647
t 0.656 0.041480238 15.82078687 9.77E-07 0.558165
Q1 -1.031 0.402878254 -2.559706285 0.037568 -1.98391
Q2 -2.688 0.392055911 -6.854889634 0.000241 -3.61456
Q3 -1.344 0.385416667 -3.486486486 0.010177 -2.25512

y^= 3.417 -1.013 Q1 -2.688 Q2 -1.344 Q3 + 0.656 t

e)

Year Quarter Period Ft
4 1 13 10.917
4 2 14 9.917
4 3 15 11.917
4 4 16 13.917

orchestra answered 1 year ago
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