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Introductory Econometrics 4th Edition by Jeffrey Wooldridge
Edition 4ISBN: 978-0324660609Introductory Econometrics 4th Edition by Jeffrey Wooldridge
Edition 4ISBN: 978-0324660609 Exercise 11
Use the data set 401KSUBS.RAW for this exercise.
(i) Using OLS, estimate a linear probability model for e401k, using as explanatory variables inc, inc 2 , age, age 2 , and male. Obtain both the usual OLS standard errors and the heteroskedasticity-robust versions. Are there any important differences
(ii) In the special case of the White test for heteroskedasticity, where we regress the squared OLS residuals on a quadratic in the OLS fitted values,![Use the data set 401KSUBS.RAW for this exercise. (i) Using OLS, estimate a linear probability model for e401k, using as explanatory variables inc, inc 2 , age, age 2 , and male. Obtain both the usual OLS standard errors and the heteroskedasticity-robust versions. Are there any important differences (ii) In the special case of the White test for heteroskedasticity, where we regress the squared OLS residuals on a quadratic in the OLS fitted values, i = 1,..., n, argue that the probability limit of the coefficient on i should be one, the probability limit of the coefficient on i 2 should be - 1, and the probability limit of the intercept should be zero. {Hint: Remember that Var(y|x 1 , x k ) = p(x)[1 - p(x)], where p(x) = 0 + 1 x 1 +... + k x k.} (iii) For the model estimated from part (i), obtain the White test and see if the coefficient estimates roughly correspond to the theoretical values described in part (ii). (iv) After verifying that the fitted values from part (i) are all between zero and one, obtain the weighted least squares estimates of the linear probability model. Do they differ in important ways from the OLS estimates](https://d2lvgg3v3hfg70.cloudfront.net/SM2712/11eb9ee2_f0e3_cb14_8edd_efa49fe32b5a_SM2712_11.jpg)
i = 1,..., n, argue that the probability limit of the coefficient on i should be one, the probability limit of the coefficient on i 2 should be - 1, and the probability limit of the intercept should be zero. {Hint: Remember that Var(y|x 1 , x k ) = p(x)[1 - p(x)], where p(x) = 0 + 1 x 1 +... + k x k.}
(iii) For the model estimated from part (i), obtain the White test and see if the coefficient estimates roughly correspond to the theoretical values described in part (ii).
(iv) After verifying that the fitted values from part (i) are all between zero and one, obtain the weighted least squares estimates of the linear probability model. Do they differ in important ways from the OLS estimates
(i) Using OLS, estimate a linear probability model for e401k, using as explanatory variables inc, inc 2 , age, age 2 , and male. Obtain both the usual OLS standard errors and the heteroskedasticity-robust versions. Are there any important differences
(ii) In the special case of the White test for heteroskedasticity, where we regress the squared OLS residuals on a quadratic in the OLS fitted values,
i = 1,..., n, argue that the probability limit of the coefficient on i should be one, the probability limit of the coefficient on i 2 should be - 1, and the probability limit of the intercept should be zero. {Hint: Remember that Var(y|x 1 , x k ) = p(x)[1 - p(x)], where p(x) = 0 + 1 x 1 +... + k x k.}(iii) For the model estimated from part (i), obtain the White test and see if the coefficient estimates roughly correspond to the theoretical values described in part (ii).
(iv) After verifying that the fitted values from part (i) are all between zero and one, obtain the weighted least squares estimates of the linear probability model. Do they differ in important ways from the OLS estimates
Explanation
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(i)
Estimating the linear probability mo...
Introductory Econometrics 4th Edition by Jeffrey Wooldridge
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