Mumbai University Notes Engineering

Does Mumbai University provide Notes, Syllabus and old Question Paper for engineering courses online? Do I need to register to get the engineering courses notes online? Is there any option available for getting the notes off line of Mumbai University?

Hello sir, Im doing engineering from Mumbai University. I want computer Engineering notes. Is there any one can provide me Mumbai University Notes Engineering?

[pawan]

The University of Mumbai is one of the earliest state universities in India and the oldest in Maharashtra.

The University of Mumbai offers Bachelors, Masters and Doctoral courses, as well as diplomas and certificates in many disciplines.

The University of Mumbai has three campuses across Mumbai (Kalina Campus, Thane Sub Campus and Fort Campus) and one outside Mumbai.

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Mumbai University Notes Engineering:

Applied Mathematics-III

Laplace Transform
Laplace Transform of Standard Functions:
Introduction, Definition of Laplace transform, Laplace transform of at 1, ensin(at), cos(at),sinh(at),cosh(at),t erf (t), Heavi-side unit step, dirac-delta function, LT of periodic function.

Properties of Laplace Transform:
Linearity, first shifting property, second shifting property, multiplication by n t, division by t, Laplace Transform of derivatives and integrals, change of scale property. (without proof)

Inverse Laplace Transform
Inverse Laplace Transform by Partial fraction method, Convolutiontheorem
Application to solve initial and boundary value problem involving ordinary differential equations with one dependent variable and constant coefficients.

Fourier Series 10
Dirichlets conditions, Fourier series of periodic functions with period 2 and 2L, Fourier series for even and odd functions.
Half range sine and cosine Fourier series, Parsevels identities (without proof)
Complex form of Fourier series, Orthogonal and Orthonormal set of functions.

Complex Variable & mapping 09
Functions of a complex variable, Analytic functions, CauchyRiemann equations in Cartesian co-ordinates & Polar co-ordinates.
Harmonic functions, Analytic method and Milne Thomson methods to find f(z), Orthogonal trajectories.
Mapping: Conformal mapping, bilinear transformations, cross ratio, fixed points, bilinear transformation of straight lines and circles.