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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 in PNTSPRD.RAW for this exercise.
(i) The variable favwin is a binary variable if the team favored by the Las Vegas point spread wins. A linear probability model to estimate the probability that the favored team wins is
P(favwin = 1|spread) = 0 + 1 spread.
Explain why, if the spread incorporates all relevant information, we expect 0 =.5.
(ii) Estimate the model from part (i) by OLS. Test H0: 0 =.5 against a two-sided alternative. Use both the usual and heteroskedasticity-robust standard errors.
(iii) Is spread statistically significant What is the estimated probability that the favored team wins when spread = 10
(iv) Now, estimate a probit model for P(favwin = 1|spread). Interpret and test the null hypothesis that the intercept is zero. [Hint: Remember that (0) =.5.]
(v) Use the probit model to estimate the probability that the favored team wins when spread = 10. Compare this with the LPM estimate from part (iii).
(vi) Add the variables favhome, fav25, and und25 to the probit model and test joint significance of these variables using the likelihood ratio test. (How many df are in the chi-square distribution ) Interpret this result, focusing on the question of whether the spread incorporates all observable information prior to a game.
(i) The variable favwin is a binary variable if the team favored by the Las Vegas point spread wins. A linear probability model to estimate the probability that the favored team wins is
P(favwin = 1|spread) = 0 + 1 spread.
Explain why, if the spread incorporates all relevant information, we expect 0 =.5.
(ii) Estimate the model from part (i) by OLS. Test H0: 0 =.5 against a two-sided alternative. Use both the usual and heteroskedasticity-robust standard errors.
(iii) Is spread statistically significant What is the estimated probability that the favored team wins when spread = 10
(iv) Now, estimate a probit model for P(favwin = 1|spread). Interpret and test the null hypothesis that the intercept is zero. [Hint: Remember that (0) =.5.]
(v) Use the probit model to estimate the probability that the favored team wins when spread = 10. Compare this with the LPM estimate from part (iii).
(vi) Add the variables favhome, fav25, and und25 to the probit model and test joint significance of these variables using the likelihood ratio test. (How many df are in the chi-square distribution ) Interpret this result, focusing on the question of whether the spread incorporates all observable information prior to a game.
Explanation
Verified
Verified
(i)
The variable 
is a binary variable, ...
Introductory Econometrics 4th Edition by Jeffrey Wooldridge
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