#1
May 21st, 2015, 04:59 PM
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SE CSE Syllabus BAMU
I am doing B.Tech in Computer Science and Engineering (Second Year) from Dr. Babasaheb Ambedkar Marathwada University (BAMU) . I have to buy its books according to its syllabus . Would you please provide me SE CSE Syllabus of BAMU ? As you asking here I am providing Babasaheb Ambedkar Marathwada University (BAMU) Second Year (SE) CSE (Computer Science & Engineering / Information Technology) program syllabus Unit 1: [6 Hours] Linear Differential Equations : Linear Differential Equations with constant coefficients General method, shortcut methods to find particular integral, Homogenous Linear differential equations (Cauchy’s & Legendre’s form), method of variation of parameters. Unit 2: [6 Hours] Application of LDE: To Electrical circuits & to Mechanical system (Analogous study of two systems),To Civil Engineering, Free oscillations / vibrations, Forced oscillation /vibrations, Damped Free oscillations / vibrations, Damped Forced oscillations / vibrations. Unit 3: [8 Hours] Statistics & Probability: Measures of Dispersion, Moments, coefficient of skewness and Kurtosis, Probability distribution for random variables, Binomial, Poisson and Normal distributions, Curve fitting: Principle of least squares, Fitting of linear curve, parabola, exponential curve. Unit4: [6 Hours] Vector Differentiation: Differentiation of vectors, Gradient of scalar point function, Directional derivative, Divergence of vector point function, Curl of a vector point function. Irrotational and solenoidal vector field. Unit 5: [6 Hours] Vector Calculus (Integral calculus): The line integral, Surface integral, volume integral, Gauss Divergence theorem, Stoke’s theorem, Green’s theorem Unit 6: [8 Hours] Numerical Methods: Solution of transdental equations by Newton Raphson method, Gauss Seidel method to solve simultaneous linear equations, Lagranges Interpolation formula for unequal intervals, Numerical Differentiation: - Newton’s forward and Newton’s Backward difference formulae, Solution of ordinary differential equation by Euler’s modified method, and Runge-Kutta IVth order method Babasaheb Ambedkar Marathwada University (BAMU) Second Year (SE) CSE (Computer Science & Engineering / Information Technology) program syllabus Last edited by Neelurk; March 12th, 2020 at 09:31 AM. |
#2
February 21st, 2017, 12:16 PM
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Re: SE CSE Syllabus BAMU
Hi buddy here I am looking for Babasaheb Ambedkar Marathwada University (BAMU) Second Year (SE) CSE (Computer Science & Engineering / Information Technology) program syllabus??
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