Loyola College B.Sc. Statistics April 2009 Econometric Methods Question Paper PDF Download

     LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – STATISTICS

YB 31

FIFTH SEMESTER – April 2009

ST 5405 – ECONOMETRIC METHODS

 

 

 

Date & Time: 30/04/2009 / 1:00 – 4:00  Dept. No.                                                    Max. : 100 Marks

 

 

SECTION A

Answer all questions                                                                         (10 x 2 = 20)

 

  1. What is the difference between a ‘Mathematical model’ and an ‘Econometric model’?
  2. Define Sample Regression Function.
  3. Mention any two properties of OLS estimators.
  4. What is meant by ‘Time series’ data? Give an example for the same.
  5. Interpret the following regression equation.

Y = 2.5 + 0.21X1 + 1.0X2 ,

where Y denotes the weekly sales( in ‘000’s)

X1 denotes the weekly advertisement expenditure

X2 denotes the number of sales persons.

  1. In a multiple regression model, the value of R2 is found to be 0.657. How is it interpreted?
  2. For a two variable regression model, the observed and estimated (under OLS) values of Y are given below:

Observed Y:   10         14        13        12        17

Estimated Y:  10         13        11        14        15

Calculate the standard error of the regression.

  1. What is meant by ‘dummy variable’?
  2. Mention any two methods of overcoming multicollinearity.
  3. Define Heteroscedasticity.

 

SECTION B

Answer any five questions                                                                (5 x 8 = 40)

 

  1. Explain the various steps involved in an Econometric study.
  2. Explain the method of least squares and hence obtain the OLS estimators for the intercept and slope parameters based on a two variable linear model.
  3. The following data relates to the family income(X) and expenditure(Y) (both in dollars per week) of 8 families randomly selected from a small urban population.

Y: 40   55   50   70   80   100  90  78

X: 60   65   70   63  120  75    68  52

Assuming there is a linear relationship between Y and X, perform a regression of Y on X and estimate the regression coefficient. Also find an unbiased estimate for the variance of the disturbance term.

  1. Consider the following information from a 4 variable regression equation:

Residual sum of squares = 94;

Y = 10,12,14,9,7,8,2,22,4,12.

a.) Find TSS and ESS.

b.) Test the hypothesis that R2 = 0 at 5% level.

  1. Explain the procedure of obtaining a 100(1-α) % confidence interval for the slope parameter in a two variable linear model.
  2. What is meant by ‘structural change’? Explain the Chow test for detecting structural change in a ‘k’ variable model.

 

  1. What is meant by dummy variable trap? Explain the methods to overcome it.
  2. Consider the following data set:

Sample no.:     1           2          3          4          5

Y:    15         10        14        8          3

X:    1           2          3          4          5

Calculate the standard errors of the intercept and slope coefficients if their OLS

estimates are 17.8 and -2.6 respectively.

 

SECTION C

Answer any two questions                                                                (2 x 20 = 40)

 

  1. a.) For a two variable linear model, show that the least squares estimators are
    unbiased.

b.) Mention the various assumptions in a Classical Linear Regression model.

(10 + 10)

  1. Consider the following data on annual income (Y) (in 000’s $), total
    experience (X1) and age (X2).

Y: 12        10                    14      15       6      11       17

X1: 8          7          9       10       4       6.5      12

X2: 32        29        35     33       26     28       39

Perform a regression of Y on X1 and X2. Interpret the results. Also test the
hypothesis that all the slope parameters are significantly different from zero at

5% level by constructing the ANOVA table.

  1. a.) Consider the following ANOVA table based on an OLS regression

 

Source of

Variation

Degrees of

Freedom

Sum of

Squares

Regression ? 1000
Error 35 ?
Total 39 2200

 

  1. i)  How many observations are there in the sample?
  2. ii) How many independent variables are used in the regression?

iii) Find the missing values in the above table

  1. iv) What is the standard error of regression?
  2. v) Calculate the value of R2
  3. vi) Test the hypothesis Ho : R2 = 0 vs H1 : R2 ≠ 0 at  5% level.

b.) What is meant by multicollinearity? Explain its consequences.  (12+8)

  1. a) Explain the method of generalized least squares to obtain the estimators of

a linear model in the presence of heteroscedasticity.

b.) Write short notes on:

1.) Disturbance term in a linear model.

2.) Differences between correlation and regression.

3.) Differential intercept coefficient.

4.) Adjusted R2.                                                                      (10+10)

 

 

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