#1
12th March 2016, 03:33 PM
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ANNA university numerical methods question paper
Hello sir I am preparing for the Numerical methods exam of Anna University so can you provide me previous year question paper of this exam.
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#2
12th March 2016, 03:38 PM
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Re: ANNA university numerical methods question paper
Numerical methods subject comes in the fourth semester of civil engineering course. The code of this subject is MA2264. Subject details Subject Code- MA2264 Subject Name- Numerical Methods Dept- Civil Regulation- 2008 Type- Question Papers Syllabus of Numerical methods MA6459 NUMERICAL METHODS SYLLABUS REGULATION 2013 . UNIT I SOLUTION OF EQUATIONS AND EIGENVALUE PROBLEMS Solution of algebraic and transcendental equations - Fixed point iteration method – Newton Raphson method- Solution of linear system of equations - Gauss elimination method – Pivoting - Gauss Jordan method – Iterative methods of Gauss Jacobi and Gauss Seidel - Matrix Inversion by Gauss Jordan method - Eigen values of a matrix by Power method. UNIT II INTERPOLATION AND APPROXIMATION Interpolation with unequal intervals - Lagrange's interpolation – Newton’s divided difference interpolation – Cubic Splines - Interpolation with equal intervals - Newton’s forward and backward difference formulae. UNIT III NUMERICAL DIFFERENTIATION AND INTEGRATION Approximation of derivatives using interpolation polynomials - Numerical integration using Trapezoidal, Simpson’s 1/3 rule – Romberg’s method - Two point and three point Gaussian quadrature formulae – Evaluation of double integrals by Trapezoidal and Simpson’s 1/3 rules. UNIT IV INITIAL VALUE PROBLEMS FOR ORDINARY DIFFERENTIAL EQUATIONS Single Step methods - Taylor’s series method - Euler’s method - Modified Euler’s method - Fourth order Runge-Kutta method for solving first order equations - Multi step methods - Milne’s and Adams- Bash forth predictor corrector methods for solving first order equations. UNIT V BOUNDARY VALUE PROBLEMS IN ORDINARY AND PARTIAL DIFFERENTIAL EQUATIONS Finite difference methods for solving two-point linear boundary value problems - Finite difference techniques for the solution of two dimensional Laplace’s and Poisson’s equations on rectangular domain – One dimensional heat flow equation by explicit and implicit (Crank Nicholson) methods –One dimensional wave equation by explicit method. Previous year question paper of Numerical methods |
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