MGT 6203 MIDTERM – SOLUTION KEY THEORY QUESTIONS WITH ANSWERS.*Q1) Consider a linear regression model with 2 independent variables (assume both are
... [Show More] correlated with the response variable). If we add an interaction term between the independent variables to the model, how will the model be affected:
A) The R2 will increase (or remain the same) with certainty while the adjusted R2 can increase or decrease
B) Both the R2 and adjusted R2 will increase with certainty.
C) The R2 will decrease (or remain the same) with certainty while the adjusted R2 can increase or decrease
D) Both the R2 and adjusted R2 will decrease with certainty.
Solution A: The R2 is bound to increase with the addition of new variables or stay the same if the interaction variable doesn’t improve model. The adjusted R2 adds a penalty term on the number of variables in the model, hence it may go down or up (if the new interaction variable offers significant predictive performance). (Week 1 Lesson 4)
*Q2) Consider the correlation matrix of independent variables below. What pair of variables would be least valuable to use in a linear regression model?
A) Education and Income
B) CompPrice and Price
C) Population and CompPrice
D) Income and Price
Solution B: An assumption of linear regression is the lack of multicollinearity in the independent variables. As a result, it is natural to reject the most highly correlated pair of variables, which from the correlation matrix above is clearly Price and CompPrice. (Week 1 Lesson 8)
*Q3) Which of the following is NOT a binary dependent variable? (a). Whether a customer will default on his debt.
(b). Would a student pass a course. (c). Change in value of an investment.
(d). If a firm would go bankrupt in the next year.
Answer – Option C (Week 4 Lesson 2)
Change in value of an investment can have more than two values. Rest all only take two values. Hence Option C is not a binary dependent variable
Q4)In the model log(Y) = b0 + b1*log(X), the elasticity of Y is the percentage change in Y (the dependent variable), when X (the independent variable) increases by one unit.
A. False
B. True
Answer: False (A) (Week 3 Lesson 4)
Explanation: Elasticity is the percent change in Y when X increases by 1%
*Q5) The odds for your team winning is 0.6 in the next game. What is the probability of your team losing in the next game?
(A) 0.4 (B) 0.375
(C) 0.6 (D) 0.625
Ans) (D) (Week 4 Lesson 1) odds = 0.6 = p/(1-p)
This means that p = 0.6/1.6 = 0.375
Hence probability of team losing = 1-0.375 = 0.625 [Show Less]