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LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034
B.Sc. DEGREE EXAMINATION – STATISTICS
SECOND SEMESTER – April 2009
YB 05
ST 2502 / 2501 - STATISTICAL MATHEMATICS - I
Date & Time: 23/04/2009 / 1:00 - 4:00 Dept. No.
Max. : 100 Marks
SECTION A
Answer ALL questions.
1.
2.
3.
4.
5.
6.
7.
(10 x 2 =20 marks)
Define a function.
What is a monotonic sequence?
State the comparison test for convergence of a series.
Define probability generating function of a random variable.
How is the variance of a random variable obtained from its moment generating function?
Define the derivative of a function at a point.
What do you mean by probability distribution function of a random variable?

8. Does the series
x
(x ≥ 1) converge?
n
n0
9. Define rank of a matrix.
10. Define symmetric matrix and give an example.
SECTION B
Answer any FIVE questions.
(5 x 8 =40 marks)
11. If lim f x   L and lim g x   M , then prove the following:
x a
xa
(i)
lim  f ( x)  g ( x) L  M
(ii)
lim  f ( x) . g ( x) L .M
x a
x a
12. Prove that the sequence {an} defined by an = 1 
1 1
1
  ....... 
1! 2 !
n!
is convergent.
13. Consider the experiment of tossing a biased coin with P (H) = ⅓, P (T) = ⅔ until a head
appears. Let X = number of tails preceding the first head. Find moment generating function
of X.
14. Show that if a function is derivable at a point, then it is continuous at that point.
15. Verify Lagrange’s mean value theorem for the following function:
f(x) = x2 -3 x + 2 in [-2, 3]
16. When is a set of n vectors said to be linearly independent? Find whether the vectors (1, 0,
0), (4,1,2) and (2, -1, 4) are linearly independent or not.
1
17. A random variable has the following probability distribution:
0 1 2 3 4 5
6
7
8
X
p(x) k 3k 5k 7k 9k 11k 13k 15k 17k
(i) Determine the value of k, (ii) Find the distribution function of X.
2 3 4 
18. Find the inverse of A = 3 2 1 


1 1  2
SECTION C
Answer any TWO questions.
(2 x 20 =40 marks)
19. (i) Prove that a non decreasing sequence of real numbers which is bounded above is
convergent.
 1
(ii) Discuss the bounded ness of the sequence {an}where an is given by, an = 1  
 n
n
20. State D’Alembert’s ratio test and hence discuss the convergence of the following series:
2 ! 3! 4!
1  2  3  4  .........
(i)
2 3 4
2 p 3p 4 p
(ii)
1
  ......... ( p  0)
2! 3! 4!
21. (i) State and prove Rolle’s Theorem.
(ii) Verify Rolle’s theorem for the following function: f (x) = x2 – 6 x - 8 in [2, 4].
22. (i) A two-dimensional random variable has a bivariate distribution given by,
x2  y
P(X=x, Y=y) =
, for x = 0,1,2,3 and y = 0, 1. Find the marginal distributions
32
of X and Y.
1
(2 x  y ) , where x and y can assume only the integer values 0,
(ii) If P(X=x, Y=y) =
27
1 and 2. Find the conditional distribution of Y given X = x.
☺☺☺☺☺☺☺
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