Introduction to Econometrics Home assigment # 4 (Deadline 10.12.2016, 23:59, no late submissions will be accepted, please scan your solution and send it to 171922@mail.muni.cz) 1. For this exercise, use the data in fertil.gdt file. It contains information about a sample of women in Botswana: their education (variable educ), their age (variable age), and the number of children they have (variable children). (a) Estimate the model children = β0 + β1educ + ε , interpret the coefficient β1. (b) Conduct the Breusch-Pagan test for heteroskedasticity. Does its result justify the use of robust standard errors? If yes, reestimate the model using these robust standard errors and comment on the difference with respect to the model estimated by simple OLS. (c) Redefine the model as children = β0 + β1educ + β2age + β3age2 + ε and estimate it. i. Does age have a significant impact on number of children of Botswana women? State the hypothesis, and compute the test statistics by hand. Interpret the results and compare it to the results of the test in Gretl. ii. Do you find justification for the inclusion of age in quadratic form? [Hint: State the four specification criteria and argue if they are satisfied for the quadratic in age.] iii. How does the coefficient β1 change when compared to part (a)? Does this signal any bias in the model from part (a)? Where does it come from? Explain the sign of this bias. (d) Do you think the coefficient β1 from the model in part (c) may suffer from some omitted variable bias? What variable(s) could be missing in the model and how would the coefficient β1 change if they were included in the regression? (What is the sign of the potential bias in coefficient β1?) (e) Conduct the RESET test of the model from part (c) and interpret the results. 1 2. Suppose following investment model was estimated with quarterly data from 1997- 2009 (standard errors in parenthesis): It = 7.70 1.10) + 0.55 0.23) Yt + 0.63 0.12) Qt2 + 1.55 1.03) Qt3 + 2.13 0.74) Qt4 , n = 64 , R2 = 0.72 , where It is the investment in period t, Yt is the GDP in period t, and dummy variables Qti are equal to 1 in the i-th quarter and zero otherwise (i = 2, 3, 4). Denote the coefficients associated with the dummies δ2, δ3 and δ4. (a) What restriction on these parameters would lead to the model: It = β0 + βY Yt + δqt + εt , where qt = 0, 1, 2, 3 in the first, second, third and fourth quarters respectively? Briefly discuss this restriction. [Hint: To find the restrictions, compare the coefficients of the two models (restricted and unrestricted) for each quarter.] (b) Test the restriction if the regression R2 of the restricted model was 0.68. (c) Explain how would you test for presence of AR(4) autocorrelation of the error term in this model. Describe all steps that you need to take to conduct the test, the null and alternative hypothesis, and the test statistics. 2