Applied Mathematics 4 : Question Paper May 2012 - Electronics Engineering (Semester 4)

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Applied Mathematics 4 - May 2012

Electronics Engineering (Semester 4)

TOTAL MARKS: 80
TOTAL TIME: 3 HOURS (1) Question 1 is compulsory.
(2) Attempt any three from the remaining questions.
(3) Assume data if required.
(4) Figures to the right indicate full marks. 1 (a) Let X be a continuous random variable with probability distribution:

Find K and P(1 ≤ X ≤ 3)(5 marks) 1 (b) A relation R is the set of integers is defined by xRy if and only if x<y+1. Examine whether R is: i) Reflective
ii) Symmetric
iii) Transitive(5 marks) 1 (c) Find the eigen values and eigen vectors corresponding to following matrix:
(5 marks) 1 (d) Find Laurent's series for -
(5 marks) 2 (a) Seven dice are thrown 729 times. How many times do you expect at least four dice to show three or five?(7 marks) 2 (b) Evaluate the following:
(7 marks) 2 (c) Show that the set of matrices

a, b ∈ z form an integral domain. Is it a field?(6 marks) 3 (a) Evaluate ∮_c tan z dz where C is:
(i) is the circle |z|=2
(ii) is the circle |z|=1 (7 marks) 3 (b) "Is the following function injective, surjective?
f : R → R, f( x ) = 2x² + 5x - 3" (7 marks) 3 (c) Fit a binomial distribution to the following data:

X	0	1	2	3	4
Frequency	12	66	109	59	10

(6 marks) 4 (a) "If X is a normal variate with mean 10 and standard deviation 4, find:
i) P( | X - 14 | < 1)
ii) P( 5 ≤ X ≤ 18 )
iii) P( X ≤ 12)" (7 marks) 4 (b) Let (G,*) be a group. Prove that G is an Abelian group if and only if (a * b)² = a² * b².Where a² stands for a * a.(7 marks) 4 (c) Using Poisson distribution find the approximate value of: ³⁰⁰C₂(0.02)²(0.98)²⁹⁸ + ³⁰⁰C₃(0.02)³(0.98)²⁹⁷.(6 marks) 5 (a) Show that the matrix
$A=\begin{bmatrix} 1 &-6 &-4 \\\\0 &4 &2 \\\\0 &-6 &-3 \end{bmatrix}$
is similar to a diagonal matrix. Also find the transforming matrix and the diagonal matrix (7 marks) 5 (b) A die was thrown 132 times and the following frequencies were observed:

No. obtained :	1	2	3	4	5	6	Total
Frequency :	15	20	25	15	29	28	132

(7 marks) 5 (c) If C is a circle |z| = 1, using the integral

where K is real, show that

(6 marks) 6 (a) Let A = {1, 2, 3, 5, 6, 10, 15, 30} and R be the relation 'is divisible by'. Obtain the relation matrix and draw the Hasse diagram.(7 marks) 6 (b) A certain injection administered to 12 patients resulted in the following changes of blood pressure:
5, 2, 8, -1, 3, 0, 6, -2, 1, 5, 0, 4.
Can it be concluded that the injection will be in general accompanied by an increase in blood pressure?(7 marks) 6 (c) If X₁ has mean 5 and variance 5, X₂ has mean -2 and variance 3. If X₁ and X₂ are independant random variables, find -
i) E(X₁ + X₂), V(X₁ + X₂)
ii) E(2X₁ + 3X₂ - 5), V(2X₁ + 3X₂ - 5).(6 marks) 7 (a) A random variable X has the following probability distribution:

X:	-2	3	1
P (X = x):	1/3	1/2	1/6

Find:
(i) Moment Generating function
(ii) First two raw moments
(iii) First two central moments
(7 marks) 7 (b) Verify Cayley Hamilton Theorem for matrix A and hence find A^-1 where

(7 marks) 7 (c) A random sample of 50 items gives the mean 6.2 and standard deviation 10.24. Can it be regarded as drawn from a normal population with mean 5.4 at 5% level of significance? (6 marks)

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