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Syllabus of Electronics and Telecommunication Engineering Mumbai University |

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Re: Syllabus of Electronics and Telecommunication Engineering Mumbai University
As you want syllabus of 3rd Semester of BE Electronics and Telecommunication Engineering Course of Mumbai University, so here I am providing following syllabus: Mumbai University BE Electronics and Telecommunication Engineering 3rd Semester Syllabus Applied Mathematics III Analog Electronics I Digital Electronics Circuits and Transmission Lines Electronic Instruments and Measurements Object Oriented Programming Methodology Analog Electronics I Laboratory Digital Electronics Laboratory Circuits and Measurements Laboratory Object Oriented Programming Methodology Laboratory Applied Mathematics III Laplace Transform 1.1 Laplace Transform (LT) of Standard Functions: Definition. unilateral and bilateral Laplace Transform, LT of sin(at), cos(at), at ne t, , sinh(at), cosh(at), erf(t), Heavi-side unit step, dirac-delta function, LT of periodic function 1.2 Properties of Laplace Transform: Linearity, first shifting theorem, second shifting theorem, multiplication by n t , division by t , Laplace Transform of derivatives and integrals, change of scale, convolution theorem, initial and final value theorem, Parsavel’s identity 1.3 Inverse Laplace Transform: Partial fraction method, long division method, residue method 1.4 Applications of Laplace Transform: Solution of ordinary differential equations Fourier Series 2.1 Introduction: Definition, Dirichlet’s conditions, Euler’s formulae 2.2 Fourier Series of Functions: Exponential, trigonometric functions, even and odd functions, half range sine and cosine series 2.3 Complex form of Fourier series, orthogonal and orthonormal set of functions, Fourier integral representation Bessel Functions 3.1 Solution of Bessel Differential Equation: Series method, recurrence relation, properties of Bessel function of order +1/2 and -1/2 3.2 Generating function, orthogonality property 3.3 Bessel Fourier series of functions Vector Algebra 4.1 Scalar and Vector Product: Scalar and vector product of three and four vectors and their properties 4.2 Vector Differentiation: Gradient of scalar point function, divergence and curl of vector point function 4.3 Properties: Solenoidal and irrotational vector fields, conservative vector field 4.4 Vector Integral: Line integral, Green’s theorem in a plane, Gauss’ divergence theorem, Stokes’ theorem Complex Variable 5.1 Analytic Function: Necessary and sufficient conditions, Cauchy Reiman equation in polar form 5.2 Harmonic function, orthogonal trajectories 5.3 Mapping: Conformal mapping, bilinear transformations, cross ratio, fixed points, bilinear transformation of straight lines and circles
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