Loyola College M.Sc. Mathematics Nov 2006 Ordinary Differential Equations Question Paper PDF Download

             LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034  M.Sc. DEGREE EXAMINATION – MATHEMATICS

AA 20

FIRST SEMESTER – NOV 2006

         MT 1806 – ORDINARY DIFFERENTIAL EQUATIONS

 

 

Date & Time : 31-10-2006/1.00-4.00           Dept. No.                                                       Max. : 100 Marks

 

 

 

 

ANSWER ALL QUESTIONS

 

  1. (a) If the Wronskian of 2 functions x1(t) and x2(t) on I is non-zero for at

least one point of the interval I, show that x1(t) and x2(t) are linearly

independent on I.

OR

Consider the Differential Equation x” + λ2 x = 0, prove that

A cos λx + B sin λx is also a solution of the Differential equation.

(5 Marks)

(b) State and prove the method of variation of parameters.

OR

By the method of variation of parameters solve x”’ − x’ = t.   (15 Marks)

 

  1. (a) Obtain the indicial form of the equation

2x2 (d2y/dx2 ) +  (dy/dx)   + y = 0

OR

Obtain the indicial form of the Bessel’s differential equation. (5 Marks)

(b) Solve the differential equation using Frobenius Method ,

x2 (d2y/dx2)  + x q(x) (dy/dx)  + r(x) y = 0 and discuss about their

solutions when it’s  roots differ by an integer .

OR

Solve the  Legendre’s equation,

(1 – x2) (d2y/dx2)  – 2x (dy/dx)   + L(L+1)y = 0.                     (15 Marks)

 

 

III. (a) Prove that ∫+1-1 Pn(x) dx = 2 if n = 0 and

+1-1 Pn(x) dx = 0 if n ≥ 1

OR

Show that Hypergeometric function does not change if the parameter α and

β are interchanged, keeping γ fixed.                                                 (5 Marks)

(b) Obtain Rodrigue’s Formula and hence find P0(x), P1(x), P2(x) & P3(x).

OR

Show that Pn(x) = 2F1[-n, n+1; 1; (1-x)/2]                                    (15 Marks)

 

 

 

 

 

 

 

 

 

IV.(a) Considering an Initial Value Problem x’ =  -x, x(0) = 1, t ≥ 0, find xn(t).

OR

Find the eigen value and eigen function of x” + λ x = 0, 0 < t ≤   (5 Marks)

(b) State and prove Picard’s Boundary Value Problem.

OR

State Green’s Function. Show that x(t) is a solution of L(x) + f(t) = 0 if and

only if  x(t) = ∫ba G(t,s) f(s) ds.                                                      (15 Marks)

 

V.(a) Discuss the fundamental Theorem on the stability of the equilibrium of

the system x’ = f(t, x).

OR

Obtain the condition for the null solution of the system x’ = A(t) x is

asymptotically stable.                                                                     (5 Marks)

(b) Study the stability of a linear system by Lyapunov’s direct method.

OR

Study the stability of a non-linear system by Lyapunov’s direct method.

(15 Marks)

 

 

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Loyola College M.Sc. Mathematics April 2008 Ordinary Differential Equations Question Paper PDF Download

LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

XZ 27

M.Sc. DEGREE EXAMINATION – MATHEMATICS

FIRST SEMESTER – APRIL 2008

    MT 1806 – ORDINARY DIFFERENTIAL EQUATIONS

 

 

 

Date : 03/05/2008            Dept. No.                                        Max. : 100 Marks

Time : 1:00 – 4:00

ANSWER ALL QUESTIONS

 

  1. a) Suppose x1 (t) and x2 (t) satisfy a x”(t) + b x'(t) + c x(t) = 0,

where ‘a’ is not zero then show that A x1 (t) + B x2 (t)  satisfy the Differential Equation.

 

OR

If the Wronskian of 2 functions x1(t) and x2(t) on I is non-zero for at least one point of the interval

I, show that x1(t) and x2(t) are linearly independent on I.                                                       (5 Marks)

 

 

  1. b) i) State and prove the Abel’s Formulae.                                                                       (8 Marks)

(ii) Solve x” – x’ – 2x = 4t2 using the method of variation of parameters.

(7 Marks)

OR

(iii) If λ is a root of the quadratic equation a λ2 + b λ + c = 0,

prove that eλt is a solution of a x” + bx’ + c x = 0.                 (15 Marks)

 

  1. a) Prove that exp[ x/2( t – t – 1 )] = .

OR

Prove that (1 – 2tx + t2 ) – ½ = if │t│< 1 & │x│≤ 1.      (5 Marks)

 

  1. b) Solve the Legendre’s Equation ( 1 – x2 ) y´´– 2xy´ + ny = 0

OR

Solve x ( 1 – x ) y´´ + ( 1 – x ) y´ –  y =0                                        (15Marks)

 

III. (a) Prove that  = 2 if n = 0 and

= 0 if n ≥ 1

OR

Find (d/dx) F (α; β; γ; x )                                                               (5 Marks)

 

 

 

 

 

(b) Obtain Rodrigue’s Formula and hence find P0(x), P1(x), P2(x) & P3(x).

OR

Show that Pn(x) = 2F1[-n, n+1; 1; (1-x)/2]                                 (15 Marks)

 

 

  1. a) Considering the Differential Equation of the Sturm-Liouville,

show that the eigen values λm and λn corresponding to eigen functions

xm(t) and xn(t) are orthogonal with respect to  weight function r(t).

OR

Solve the initial value problem x´ = t + x, x(0) = 1                     (5 Marks)

 

  1. b) State Green’s Function. x(t) is a solution of L(x) + f(t) = 0

if and only if x(t) = .

OR

State and prove Picard’s Initial value Problem.                         (15 Marks)

 

  1. a) Define Lyapunov’s Stability Statements.

OR

Prove that the null solution of x’ = A (t) x is stable if and only if there

exists a positive constant k such that | Φ | ≤ k, t ≥ t0 .                   (5 Marks)

 

  1. b) State and prove the Fundamental Theorem on the stability of the

equilibrium of a system x’ = f (t, x).

OR

Explain the stability of Quasi-linear system x’ = A(t) x.               (15 Marks)

 

 

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