INTRODUCTION TO ECONOMETRICS II ECO 306 NOUN 57
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Assumption 7: The number of observations n must be greater than the number of parameters to be estimated. On the other hand, the number of observations
n must be greater than the number of descriptive (explanatory) variables.
Assumption 8: Variability in X values. The X values in a given sample must not all be the same. That is,
var(X) must be a finite positive number.
Assumption 9: The regression model is correctly specified. On the other hand, there is no error in the model used in observed analysis.
Assumption 10: There is no perfect multicollinearity. That is, there are no perfect linear relationships among the descriptive variables.
Multicollinearity as a problem associated with CLRM is discussed in unit 3.
- Properties of Ordinary Least Square (OLS) estimator The following properties are associated with OLS estimators
1. Linearity
2. Unbiasedness
3. Efficient
it has the minimum variance 4. Consistency
5. Asymptotic Unbiasedness
INTRODUCTION TO ECONOMETRICS II ECO 306 NOUN 58 The OLS estimator is sometimes referred to as the CLRM and in data analysis the best estimator is refer to as BLUE (best linear unbiased estimator. Therefore, the OLS estimator requires that the descriptive variables are received outside a data group and there is no perfect multicollinearity. Also, OLS is best in the class of linear unbiased estimators when the errors are vector of random variables and successively uncorrelated.
Within these conditions, the OLS offers minimum-variance mean- unbiased estimation when the errors have fixed variances. Again, the OLS is a maximum likelihood estimator under the additional assumption that the errors are normally distributed. So, whenever students are planning to use a linear regression model by means of OLS, each time check for the OLS assumptions. Inasmuch as the
OLS assumptions are satisfied, the analysis becomes simpler.
Through the Gauss-Markov theorem (as will be seen later in this unit) students can directly use OLS for the best results. When the OLS estimator is asymptotically normal and a consistent estimator of the asymptotic covariance matrix is available to carryout hypothesis tests on the coefficients of a linear regression model.
2.2.2.0 OBJECTIVE The main objective of this unit is to provide basic understanding of the topic, properties of regression coefficients and hypothesis testing. As well as how these properties form the basis for prediction and forecasting analyses. Focus will also be on the use of
regression analysis to recognise which among the independent variables are related to the dependent variable and to explore the forms of these relationships.
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