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Regression Analysis

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Title: Regression Analysis

1
Regression Analysis
2
Introduction

Derive the a and ß
Assess the use of the T-statistic
Discuss the importance of the Gauss-Markov
assumptions
Describe the problems associated with
autocorrelation, how to measure it and possible
remedies
Introduce the problem of heteroskedasicity

3
Values and Fitted Values
4
Deriving the a and ß

The aim of a least squares regression is to
minimize the distance between the regression line
and error terms (e).

5
The Constant
6
The Slope Coefficient (ß)
7
T-test

When conducting a t-test, we can use either a 1
or 2 tailed test, depending on the hypothesis
We usually use a 2 tailed test, in this case our
alternative hypothesis is that our variable does
not equal 0. In a one tailed test we would
stipulate whether it was greater than or less
than 0.
Thus the critical value for a 2 tailed test at
the 5 level of significance is the same as the
critical value for a 1 tailed test at the 2.5
level of significance.

8
T-test

9
Gauss-Markov Assumptions

10
Gauss-Markov assumptions

11
Additional Assumptions

There are a number of additional assumptions such
as normality of the error term and n (number of
observations) exceeding k (the number of
parameters).
If these assumptions hold, we say the estimator
is BLUE

12
BLUE

Best or minimum variance
Linear or straight line
Unbiased or the estimator is accurate on average
over a large number of samples.
Estimator

13
Consequences of BLUE

If the estimator is not BLUE, there are serious
implications for the regression, in particular we
can not rely on the t-tests.
In this case we need to find a remedy for the
problem.

14
Autocorrelation

Autocorrelation occurs when the second
Gauss-Markov assumption fails.
It is often caused by an omitted variable
In the presence of autocorrelation the estimator
is not longer Best, although it is still
unbiased. Therefore the estimator is not BLUE.

15
Durbin-Watson Test

16
Durbin-Watson Test- decision framework
17
DW Statistic

The DW test statistic lies between 0 and 4, if it
lies below the dl point, we have positive
autocorrelation. If it lies between du and 4-du,
we have no autocorrelation and if above 4-dl we
have negative autocorrelation.
The dl and du value can be found in the DW
d-statistic tables (at the back of most text
books)

18
Lagrange Multiplier (LM) Statistic

Tests for higher order autocorrelation
The test involves estimating the model and
obtaining the error term .
Then run a second regression of the error term on
lags of itself and the explanatory variable (the
number of lags depends on the order of the
autocorrelation, i.e. second order)

19
LM Test

The test statistic is the number of observations
multiplied by the R-squared statistic.
It follows a chi-squared distribution, the
degrees of freedom are equal to the order of
autocorrelation tested for (2 in this case)
The null hypothesis is no autocorrelation, if the
test statistic exceeds the critical value, reject
the null and therefore we have autocorrelation.

20
Remedies for Autocorrelation

21
Heteroskedasticity

This occurs when the variance of the error term
is not constant
Again the estimator is not BLUE, although it is
still unbisased it is no longer Best
It often occurs when the values of the variables
vary substantially in different observations,
i.e. GDP in Cuba and the USA.

22
Conclusion

The residual or error term is the difference
between the fitted value and actual value of the
dependent variable.
There are 4 Gauss-Markov assumptions, which must
be satisfied if the estimator is to be BLUE
Autocorrelation is a serious problem and needs to
be remedied
The DW statistic can be used to test for the
presence of 1st order autocorrelation, the LM
statistic for higher order autocorrelation.