#1
30th October 2017, 01:36 PM
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Engineering Unipune.ac.in
Hi buddy here I am looking for Unipune (Pune University) S.E. Mechanical and Automobile Engineering program syllabus , so would you plz provide me same here ??
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#2
30th October 2017, 02:36 PM
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Re: Engineering Unipune.ac.in
As you want here I am providing Unipune (Pune University) S.E. Mechanical and Automobile Engineering program syllabus, on your demand : Unipune (Pune University) S.E. Mechanical and Automobile Engineering program syllabus 207002: Engineering Mathematics III (Mechanical + SW / Production + SW / Industrial /Automobile Engineering) Unit I: Linear Differential Equations (LDE) and Applications (09 Hours) LDE of nth order with constant coefficients, Method of variation of parameters, Cauchys & Legendres DE, Simultaneous & Symmetric simultaneous DE. Modeling of mass-spring systems, free and forced damped and undamped systems. Unit II: Transforms (09 Hours) Laplace Transform (LT): LT of standard functions, properties and theorems, Inverse LT, Application of LT to solve LDE. Fourier Transform (FT): Fourier integral theorem, Fourier transform, Fourier Sine & Cosine transform, Inverse Fourier Transforms. Unit III: Statistics and Probability (09 Hours) Measure of central tendency, Standard deviation, Coefficient of variation, Moments, Skewness and Kurtosis, Correlation and Regression, Probability, Probability distributions: Binomial, Poisson and Normal distributions, Population and sample, Sampling distributions, t-distribution, Chi-square distribution. Unit IV: Vector Differential Calculus (09 Hours) Physical interpretation of Vector differentiation, Vector differential operator, Gradient, Divergence and Curl, Directional derivative, Solenoidal, Irrotational and Conservative fields, Scalar potential, Vector identities. Unit V: Vector Integral Calculus and Applications (09 Hours) Line, Surface and Volume integrals, Work-done, Greens Lemma, Gausss Divergence theorem, Stoke’s theorem. Applications to problems in Fluid Mechanics, Continuity equations, Streamlines, Equations of motion, Bernoullis equation. Unit VI: Applications of Partial Differential Equations (PDE) (09 Hours) Basic concepts, modeling of Vibrating String, Wave equation, one and two dimensional Heat flow equations, method of separation of variables, use of Fourier series. Solution of Heat equation by Fourier Transforms, Two-dimensional wave equation. Unipune (Pune University) S.E. Mechanical and Automobile Engineering program syllabus |