INTRODUCTION TO ECONOMETRICS II ECO 306 NOUN 112 variables that are difficult to measure, such as technical progress or changes in tastes.
Nonstochastic explanatory variables are unusual in regression analysis. A rationale for making the nonstochastic assumption has been one of simplifying the analysis of the properties of the regression estimators. For example, we saw
that in the regression model …[4.01] the OLS estimator of the slope coefficient maybe decomposed as follows
( )
( )
( )
( )
…[4.02]
Here, if
X is nonstochastic, so is
( ) and the expected value of
the error term can be written, ( )- ( ). Also if
X is nonstochastic,
, ( )- is 0. Which
easily helps us to prove that b2
is an unbiased estimator of The desirable properties of the OLS estimators remain unchanged even if the descriptive variables have stochastic components, provided that these components are distributed independently of the disturbance term, and provided that their distributions do
not depend on the parametersu
Let us demonstrate the unbiasedness and consistency properties and as typical, taking an efficient approach.
Share with your friends: 
