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
INTRODUCTION TO ECONOMETRICS II

ECO 306

NOUN
86
2.3.8.0 REFERENCES FURTHER READING
Maddala, GS, &Lahiri, K. (1992).Introduction to econometrics (Vol. 2). New York.
Dougherty, C. (2003). Numeracy, literacy and earnings evidence from the National
Longitudinal Survey of Youth. Economics of education review, 22(5), 511-521. Smith, G. (2013). Econometric Principles and Data Analysis.Centre for Financial and Management Studies SOAS, University of London, London. James H. Stock and Mark W. Watson (2010).Introduction to Econometrics.3
rd
Ed.
Addison-Wesley Series in Economics


INTRODUCTION TO ECONOMETRICS II

ECO 306

NOUN
87
UNIT 4: TRANSFORMATIONS OFVARIABLES
CONTENTS
2.4.1.0 Introduction
2.4.2.0 Objectives
2.4.3.0 Main Content
2.4.4.0 Summary
2.4.5.0 Conclusion
2.4.6.0 References/Further Reading
2.4.1.0 INTRODUCTION
In model transformation, the functional form of an equation or model determines the estimation techniques and interpretation of results obtained from it. Transforming a variable involves using mathematical procedure to modify its measured values. Single equation (or any other form of equation) maybe indifferent forms. There are two kinds of transformations and generally, models can be of the form
i.
Linear transformation this preserves the linear relationships between variables parameters and variables are linear. That is the correlation between xand y say) would be unchanged after a linear transformation. Examples of a linear transformation to variable x would be multiplying x by a constant, dividing x by a constant, or adding a constant to x.
ii.
Nonlinear transformation A nonlinear transformation changes (increases or decreases) linear relationships between variables and, thus, changes the correlation between variables. Examples of a nonlinear transformation of variable x would betaking the square root of x or the reciprocal of x. By extension, nonlinear transformation is a nonlinear model that can be made linear. For example
t
u
t
t
Y
AX e


is an example of production function that can be made linear by taking logarithms, that is ln ln ln
t
t
t
Y
A
X
u







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