Introduction to econometrics II eco 356 faculty of social sciences course guide course Developers: Dr. Adesina-Uthman



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Introduction to Econometrics ECO 356 Course Guide and Course Material
3.1.1.0 INTRODUCTION The general aim of this module is to provide you with a thorough understanding of the violation of one of the classical assumptions, equal variances (homoscedastic). The properties of the estimators of the regression coefficients depend on the properties of the disturbance term in the regression model. In this module, we shall be looking at some of the problems that arise when violations of the Gauss–Markov conditions, the assumptions relating to the disturbance term, are not satisfied. Basic understanding of heteroscedasticity (unequal-variances) will be likewise explained.
3.1.2.0 OBJECTIVE
The main objective of this unit is to provide a platform for the students to understand that in statistic, heteroscedasticity is a collection of random variables and the absence of it is homoscedasticity.



INTRODUCTION TO ECONOMETRICS II

ECO 306

NOUN
100

3.1.3.0 MAIN CONTENTS

3.1.3.1 Heteroscedasticity and Its Effects
Gauss–Markov second conditions listed in the previous module states that the variance of the disturbance term in each observation should be constant. This sounds peculiar and needs a bit of explanation. The disturbance term in each observation has only one value, so what can be meant by its "variance The focus point of discussion here is, its potential behaviour before the sample is generated. So when the model is written as;
…[3.01]
Figure 1.1 Homoscedasticity
[3.01]has in it the first two Gauss–Markov conditions stating that the disturbance terms
, ..., in the nobservations are drawn from probability distributions that have
0 mean and the same variance. Their actual values in the sample will sometimes be positive, sometimes negative, sometimes relatively far from 0, sometimes relatively close, but there will be no a priori reason to anticipate a particularly erratic value in any given observation. To put it another way, the probability of ureaching a given positive or negative value will be the same in all observations. This condition is known as homoscedasticity, which means "same dispersion.



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