IAS MAths Question Paper 2006

SECTION 'A' Q. 1.   Answer any/ive of the following:

(a) Let S be the set of all real numbers except -1. Define * on S

by

a*b = a+ b + ab Is (S, *) a group ? Find the solution of the equation

2*x*3=7inS. 12

(b) If G is a group of real numbers under addition and N is the subgroup of G consisting of integers, prove that G/N is isomorphic to the group H of all complex numbers of absolute value 1 under

multiplication.

(c) Examine the convergence of

dx

12

1/2/1 „xl/2

0

f(x) =

x^'^(l-x)

(d) Prove that the function f defined by

1,    when X is rational -1, when X is irrational

is nowhere continuous. 12

(e) Determine all bilinear transformations which map the half plane Im (z) > 0 into the unit circle 1 w j < 1. 12

(f) Given the programme

Maximize u = 5x + 2y subject to X + 3y < 12

3x - 4y < 9

7x + 8y < 20

THE TEAM VISION IAS

x,y>0

Write its dual in the standard form. 12 Q. 2.   (a) (i) Let O (G) - 108. Show that there exists a normal

subgroup or order 27 or 9.

(ii) Let G be the set of all those ordered pairs (a, b) of

real numbers for which a ?^ 0 and define in G, an operation ® as

follows :

(a, b) O (c, d) = (ac, be + d)

Examine whether G is a group w.r.t. the operation 0 . If it is a group, is G abelian ? 10 (b) Show that

Z[V2 ] = {a+ V2b|a,bG Z}

is a Euclidean domain. 30 Q. 3.   (a) A twice differentiable function f is such that f (a) = f (b) = 0 and f (c) > 0 for a < c < b. Prove that there is at least one value ^ , a < ^ < b for which f" © < 0. 20 (b) Show that the function given by

f(x,y) =

3 3

""'^^^^ (x,y)^(0,0)

2 2

X -hy^

0    : (x,y)>(0..0)

(i) is continuous at (0, 0).

(ii) possesses partial derivatives

f^ (0, 0) and f (0,0). 20 (c) Find the volume of the ellipsoid

2 2 2

x^   y z

a^   b^ c^ Q. 4.   (a) With the aid of residues, evaluate

cos 29

_____n .  2 d0 , - 1< a < 1

15

(b) Prove that all the roots of   - 5z^ + 12 = 0 lie between the

circles | z |   1 and | z ] = 2.

(c) Use the simplex method to solve the problem Vfaximize n= 2x + 3y subject to -2x + 3y < 2 3 x + 2y<5 x,y>0 SECTION *B' Q. 5.    Answer any five of the following:

(a) Solve:

px (z - 2y2) = (z~ qy) {z-f-- 2x^)

(b) Solve:

-4—-— + 4

^^i;r^ = 2sin(3x + 2y)

(c) Evaluate

15

30

12

12

I

=1

e^^^dx

0

by the Simpson's rule

b

Ax

J

a

f (x) dx - — [f (X,) + 4f (x^) + 2f (X,)]

vdth

+ 4f (X3) +.....+ 2 f (X2,_ 2) + 4f (x,^_,) + f (x^^)]

2n-10,Ax = 0.1,Xo = 0,x^ = 0.1,...,x^^j=LO 12

(d) (i) Given the number 59.625 in decimal system. Write its binar}^ equivalent. 6

(ii) Given the number 3898 in decimal system. Write its equivalent in system base 8. 6

(e) Given points A (0, 0) and B {x^, y^) not in the same vertical.

it is required to find a curve in the x - y plane joining A to B so that a particle starting from rest will traverse from A to B along this curve without friction in the shortest possible time. If y = y (x) is the required curve find the function f (x, y z) such that the equation of motion can be written as

dx

— =f(x,y(xXy'(x)). 12

(f) A steady inviscid incompressible flow has a velocity field u = fx, v = -fy, w = 0 where f is a constant. Derive an e?q)ression for the pressure field p {x, y, z} if the pressure

pRO,0}=Poandg = -gi,. 12

Q. 6. (a) The deflection of a vibrating string of length /, is governed by the partial differential equation u^ = u^. The ends of the string are fixed at x = 0 and /. The initial velocity is zero. The initial displacement is given by

u(x, 0)- -,0<

/ ' 2

1 /

= 7(^-xX-

Find the deflection of the string at any instant of time. 30

(b) Find the surface passing through the parabolas z = 0, y^ = 4ax and z = 1, y^ = - 4ax and satisfying the equation

X—+2—=0 15

dK^ dx

(c) Solve the equation

dz dz p^x + q^y = z,p=-,q=­by Charpit's method. 15 Q. 7.   (a) If Q is a polynomial with simple roots    a2,.- cxn and if P is a polynomial of degree < n, show that

h Q'(ock)(x-ai,)-

Hence prove that there exists a unique polynomial of degree < n with given values c^^ at the point aj^, k = 1, 2, ... n. 30

(b) Draw a programme outline and a flow chart and also write a programme in BASIC to enable solving the following system of 3 linear equations in 3 unknowns x^ x^ and X3:

C*X-D

with

Q. 8. (a) A particle of mass m is constrained to move on the surface of a cylinder. The particle is subjected to a force directed towards the origin and proportional to the distance of the particle from the origin. Construct the Hamiltonian and Hamilton's equa­tions of motion. 30

(b) Liquid is contained between two parallel planes, the free surface is a circular cylinder of radius a whose axis is perpendicular to the planes. All the liquid within a concentric circular cylinder of radius b is suddenly annihilated; prove that if P be the pressure at the outer surface, the initial pressure at any point on the liquid, distant r from the centre is

log r - log b log a - log b

30