Chapter 5

1. Chapter 5 Regression with a Single Regressor: Hypothesis Tests and Confidence Intervals

2. Regression with a Single Regressor: Hypothesis Tests and Confidence Intervals(SW Chapter 5)

3. But first… a big picture view (and review)

4. Object of interest: 1 in,

5. Hypothesis Testing and the Standard Error of (Section 5.1)

7. Formula for SE( )

9. Summary: To test H0: 1 = 1,0 v. H1: 11,0,

10. Example: Test Scores and STR, California data

12. Confidence Intervals for 1(Section 5.2)

14. A concise (and conventional) way to report regressions:

15. OLS regression: reading STATA output

16. Summary of Statistical Inference about 0 and 1:

17. Regression when X is Binary(Section 5.3)

18. Interpreting regressions with a binary regressor

20. Summary: regression when Xi is binary (0/1)

21. Heteroskedasticity and Homoskedasticity, and Homoskedasticity-Only Standard Errors (Section 5.4)

23. Homoskedasticity in a picture:

24. Heteroskedasticity in a picture:

25. A real-data example from labor economics: average hourly earnings vs. years of education (data source: Current Population Survey):

26. The class size data:

27. So far we have (without saying so) assumed that u might be heteroskedastic.

28. What if the errors are in fact homoskedastic?

30. We now have two formulas for standard errors for

31. Practical implications…

32. Heteroskedasticity-robust standard errors in STATA

33. The bottom line:

34. Some Additional Theoretical Foundations of OLS (Section 5.5)

36. The Extended Least Squares Assumptions

37. Efficiency of OLS, part I: The Gauss-Markov Theorem

38. The Gauss-Markov Theorem, ctd.

39. Efficiency of OLS, part II:

40. Some not-so-good thing about OLS

41. Limitations of OLS, ctd.

42. Inference if u is Homoskedastic and Normal: the Student t Distribution (Section 5.6)

45. Practical implication:

46. Summary and Assessment (Section 5.7)