LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – MATHEMATICS

SECOND SEMESTER – APRIL 2012

MT 2100 – MATHEMATICS FOR COMPUTER SCIENCE

Date : 23-04-2012 Dept. No. Max. : 100 Marks

Time : 9:00 – 12:00

PART A

Answer ALL the questions: 10×2 = 20

Define symmetric matrix with an example.
Prove that.
Remove the fractional coefficients from the equation
Find the partial differential coefficients of .
Evaluate.
Evaluate
Solve the equation = 0.
Derive the partial differential equation by eliminating the arbitrary constants from .
Find an iterative formula to , where N is a positive integer.
Write Simpson’s

PART B

Answer any FIVE questions: 5×8 = 40

Show that the equations are consistent and solve them.
Prove that
Find the condition that the roots of the equation may be in geometric progression.
Integrate with respect to x.
(i) Evaluate

(ii) Prove that (4 + 4)

Solve the equation
Solve (i) (ii) (4 + 4)
Determine the root of correct to three decimals using, Regula Falsi method.

PART C

Answer any TWO questions: 2×20 = 40

(i) Find all the characteristic roots and the associated characteristic vectors of the matrix

A =.

(ii) If then prove that (14+6)

(i) Solve the equation

(ii) If , prove that . (14+6)

(i) Integrate with respect to x.

(ii) Solve (6+14)

(i) Solve

(ii) Evaluate using trapezoidal rule and Simpson’s rule. (8+12)

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LOYOLA COLLEGE (AUTONOMOUS), CHENNAI – 600 034

B.Sc. DEGREE EXAMINATION – COMPUTER SCI. & APPL.

FIRST SEMESTER – NOVEMBER 2012

MT 1103 – MATHEMATICS FOR COMPUTER SCIENCE

Date : 03/11/2012 Dept. No. Max. : 100 Marks

Time : 1:00 – 4:00

Part A

Answer ALL questions: (10X2 =20)

Define Unitary Matrix.
Write down the expansion of in terms of cosθ.
If α and β are the roots of 2x² + 3x +5 = 0, find α+β and αβ.
Find partial differential coefficients of u = sin (ax + by + cz) with respect to x, y and z.
Evaluate .
Evaluate.
Solve the differential equation (D² +2D + 1)y = 0.
Find the complete integral of
Write the formula for Trapezoidal rule.
Write Newton’s backward difference formula for first and second order derivatives.

Part B

Answer any FIVE questions: (5 x8 = 40)

Test the consistency of the following system of equations and if consistent solve

2x-y-z = 2, x+2y+z = 2, 4x-7y-5z = 2.

Show that
Solve
What is the radius of curvature of the curve at the point (1,1).
Show that .
Evaluate: .
Solve the equation.
Find by Newton-Raphson method, the real root of, correct to three decimal places.

Part C

Answer any TWO questions: (2 x 20 = 40)

Verify Cayley-Hamilton theorem for the matrix and hence find its inverse.

(i) Evaluate: dx

(ii) Evaluate: .

(15+5)

(a) Solve the equation .

(b) Solve q² – p = y – x.

(14+6)

(i) Solve upto 3 decimals by using Regula-flasi method.

(ii) Evaluate using Simpson’s 1/3^rd rule with

(12+8)

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Loyola College B.Sc. Mathematics April 2012 Mathematics For Computer Science Question Paper PDF Download

MT 2100 – MATHEMATICS FOR COMPUTER SCIENCE

Loyola College B.Sc. Computer Science Nov 2012 Mathematics For Computer Science Question Paper PDF Download

MT 1103 – MATHEMATICS FOR COMPUTER SCIENCE

Part C