INTRODUCTION TO ECONOMETRICS II ECO 306 NOUN 76 From [3.57] and working through [3.55] to [3.56], the following expression for
b2
is
obtained (
) (
) (
) (
)
(
) (
) , (
)-
,∑(
)(
)- ,∑(
)(
)-
,∑(
)∑(
) ∑,(
)-
…[2.58] Similarly, theexpressionof
b3
can
be obtained by switching X2
and
X3
in [2.58]. Clearly, the principles behind the derivation of the regression coefficients have been shown to be the same for multiple regression as that of the simple regression. But, it should also be observed that the expressions are however different and so should not try to use expressions derived for simple regression in a multiple regression situations. A generalized framework for the multiple regression model is
1 2
2
iikkiiYXX
…[2.59] We may write [2.59] for three variables as,
1 2
2 3
3
iiiiYXX
…[2.60] where
Y is
the dependent variable, and
kXX(
kth term) the regressors, the stochastic disturbance term and
i the
ith (
tth, if in time series) observation. Also
1 and
k are the partial regression coefficients but is the intercept term which
gives the mean effect on Y of all the variables excluded from the model. That is, in the case of [2.50], when and
kXXare set equal to zero. Zero mean value of
i
in [2.60] is
2 3
(
|
,
)
0
iiiEXX
…[2.61]
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