LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034 B.Sc. DEGREE EXAMINATION – STATISTICS
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FIFTH SEMESTER – NOV 2006
ST 5503 – COMPUTATIONAL STATISTICS
(Also equivalent to STA 508)
Date & Time : 01-11-2006/9.00-12.00 Dept. No. Max. : 100 Marks
Answer FIVE questions choosing at least two questions from each section
SECTION A ( 5 x20 =100)
1] Consider a population of 6 units with values : 1, 2, 4, 7, 8, 9
[i] Write down all possible samples of size 3 without replacement from this population
[ii] Verify that the sample mean is an unbiased estimate of the population mean
[iii] Calculate the Sampling variance and verify that it agrees with the variance of the
sample mean under SRSWOR.
[iv] Also , Verify that the Sampling Variance is less than the variance of the Sample
mean which is obtained from SRSWR.
2] The table given below shows the summary of data for Paddy crop census of all the 2500
farms in a state. The farms were stratified according to farm size(in acres) into 4 strata as
given below:
| Stratum
Number |
Farm
Size (inacres) |
No. of
Farms Ni |
Average area Under paddy crop (in acres) per farm
ŸNi |
Standard
Deviation si |
| 1 | 0-100 | 600 | 45 | 8 |
| 2 | 101-200 | 900 | 105 | 12 |
| 3 | 200-500 | 700 | 130 | 20 |
| 4 | >500 | 300 | 180 | 40 |
[i] Estimate the total area under Paddy cultivation for the state
[ii] Find the sample sizes of each stratum under proportional allocation.
[iii] Find the sample sizes of each stratum under Nayman’s Optimum allocation
[iv] Calculate the variance of the estimated total area under Proportional allocation
[v] Calculate the variance of the estimated total area under Nayman’s Optimum
allocation
[vi] Calculate the variance of the estimated total area under un-stratified simple random
sampling without replacement.
[vii] Estimate the gain in efficiency resulting from [iv] and [v] as compared with [vi]
3] Five samples were collected using systematic sampling from 4 different pools located in a
region to study the mosquito larvae population( in ‘000/ gl) ,where the mosquito population
exhibits a fairly steady rising trend. i] Find the average mosquito population in all four pools
and also find sample means. ii] Compare the precision of systematic sampling , SRSWOR
and Stratified sampling.
Sample Number( mosquito nos. in ‘000/ gl)
Pool # |
1 | 2 | 3 | 4 | 5 |
| I | 3 | 7 | 8 | 9 | 12 |
| II | 4 | 9 | 16 | 18 | 20 |
| III | 8 | 16 | 17 | 19 | 24 |
| IV | 14 | 18 | 23 | 28 | 32 |
4] The following data furnishes the software earnings of India (in ‘00 crore) for the time period
1996 To 2005. Fit a second degree parabola and hence predict the expected software earnings
of India for the financial year 2006.
| Year | 1996 | 1997 | 1998 | 1999 | 2000 | 2001 | 2002 | 2003 | 2004 | 2005 |
| Earnings(‘00Cr) | 4 | 8 | 15 | 30 | 90 | 50 | 110 | 150 | 300 | 500 |
SECTION B
- a.) From the following data construct an index for 2001 taking 2000 as base by the
average of relatives method using i.) arithmetic mean and ii.) geometric mean for
averaged relatives:
Commodity Price in 2000 Price in 2001
( Rs ) ( Rs )
A 50 70
B 40 60
C 80 90
D 110 120
E 20 20
b.) Construct the consumer price index number for 2003 on the basis of 2002 from the following data using ’ family budget method’.
| Items | Price in 2002 ( Rs ) | Price in 2003 ( Rs ) | Weights |
| Food | 200 | 280 | 30 |
| Rent | 100 | 200 | 20 |
| Clothing | 150 | 120 | 20 |
| Fuel | 50 | 100 | 10 |
| Miscellaneous | 100 | 200 | 20 |
(14+6)
- a.) The life time of 10 electric bulbs selected randomly from a large consignment gave
the following data :
Life time (Hours ) 4.2 4.6 3.9 4.1 5.2 3.8 3.9 4.3 4.4 5.6
Test at 5% level the hypothesis that the average life time of bulbs is 4.
- In a cross- breeding experiment with plants of certain species, 240 offsprings were classified into 4 classes with respect to the structure of the leaves as follows:
Class : I II III IV
Frequencey: 21 127 40 52
According to theory, the probabilities of the 4 classes should be in the ratio
1: 9: 3: 3. Are these data consistent with the theory? Use 5% level. (10+10)
- Two samples are drawn from two normal population. From the following data, test whether the two populations have i) Equal variance ii) Equal means at 5% level.
Sample 1 60 65 71 74 76 82 85 87
Sample 2 61 66 67 85 78 63 85 86 88 91
- a.) IQ Test on two groups of boys and girls gave the following results
| Mean | SD | Sample Size | |
| Boys | 73 | 15 | 100 |
| Girls | 78 | 10 | 50 |
Is there a significant difference in the Mean scores of boys and girls ? Test at 1% level.
- Let X denote the length of a fish selected at random from the lake . The
observed length of n=10 fish , were 5.0 , 3.9 ,5.2 , 5.5 , 2.8 , 6.1, 6.4 , 2.6 , 1.7
and 4.3. Test at 5 % level the hypothesis that the median length of fish in the
lake is 3.7 . (6+14)
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