LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034 M.Sc. DEGREE EXAMINATION – STATISTICS
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FIRST SEMESTER – NOV 2006
ST 1812 – STATISTICAL COMPUTING – I
Date & Time : 04-11-2006/1.00-4.00 Dept. No. Max. : 100 Marks
Answer any THREE questions.
- a.) The following data relates to the family size(X) and average food expenditure per week (Y) of 8 persons randomly selected from a small urban population.
Y: 40 50 50 70 80 100 110 105
X: 1 1 2 3 4 2 5 6
Assuming there is a linear relationship between Y and X, perform a regression of Y on X and estimate the regression coefficients. Also find the standard error of the estimate.
b.) Consider the following ANOVA table based on OLS regression.
Source of Variation df Sum of Squares
Regression ? 800
Residual 45 ?
Total 49 1200
- How many observations are there in the sample?
- How many independent variables are used in the model ?
- Find an unbiased estimate of the variance of the disturbance term?
- Calculate the value of the coefficient of determination and interpret it.
- Test the overall significance of the model at 5% level.
(20+14)
- a.) 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.
i.) Find TSS and ESS.
ii.) Test the hypothesis that R2 = 0 Vs R2 # 0 at 5% level.
b.) Test whether there is structural change in the model Y = β0 + β1X + u
between the two groups where the observations under group I and group
II are as given below:
Group I Y: 10 15 17 14 12
X: 3 5 4 6 7
Group II Y: 12 14 13 15 18
X: 5 3 7 6 4
Use 5% level.
c.) Consider the following OLS regression results:
Y = 16.5 + 2.1X1 + 50X2
(10) (0.5) (20) n = 28
where the numbers in the parenthesis are the standard error of the
regression coefficients.
i.) Construct a 95% confidence interval for β1.
ii.) Test whether in intercept is significantly different from zero at 5%
level.
(7+20+7)
- a.) Consider the following data on annual income (in 000’s $) categorized by
gender and age.
Income: 12 10 14 15 6 11 17
Gender: 0 1 1 0 0 1 1
Age: 1 1 0 1 0 0 1
where Gender = 1 if male; 0 if female
Age = 1 if less than or equal to 35; 0 if greater than 35.
Perform a linear regression of Income on Gender and age. Interpret the results.
What is the benchmark category for the above model ?
b.) Fit a Poisson distribution for the following data relating to the number of
printing mistakes per page in a book containing 200 pages:
Number of mistakes: 0 1 2 3 4 5
Frequency: 60 50 40 30 15 5
(17+17)
- Fit a normal distribution for the following heights (in cms) 0f 200 men
randomly selected from a village.
Height: 144 – 150 150 – 156 156 – 160 160 – 164
frequency: 3 10 25 50
Height: 164 – 168 168 – 172 172 – 176
Frequency: 63 30 19
Also test the goodness of fit at 5% level. (33)
- a.) Fit a truncated binomial distribution to the following data and test the
goodness of fir at 5% level.
X: 1 2 3 4 5 6 7
f: 6 15 18 12 9 8 2
b.) Fit a negative binomial distribution to the following data and test the
goodness of fit at 5% level.
X: 0 1 2 3 4 5
f: 180 120 105 90 40 12
(20+14)
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