ECC301: Applied Mathematics-III Syllabus for EC 3rd Sem 2017 Pattern Mumbai University

Applied Mathematics-III detailed syllabus scheme for Electronics & Telecommunication Engineering (EC), 2017 regulation has been taken from the University of Mumbai official website and presented for the Bachelor of Engineering students. For Course Code, Course Title, Test 1, Test 2, Avg, End Sem Exam, Team Work, Practical, Oral, Total, and other information, do visit full semester subjects post given below.

For all other Mumbai University Electronics & Telecommunication Engineering 3rd Sem Syllabus 2017 Pattern, do visit EC 3rd Sem 2017 Pattern Scheme. The detailed syllabus scheme for applied mathematics-iii is as follows.

Applied Mathematics-III Syllabus for Electronics & Telecommunication Engineering SE 3rd Sem 2017 Pattern Mumbai University

Prerequisites:

For the complete Syllabus, results, class timetable, and many other features kindly download the iStudy App
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Course Objectives:

1. To build the strong foundation in Mathematics of students needed for the field of electronics and Telecommunication Engineering
2. To provide students with mathematics fundamentals necessary to formulate, solve and analyses complex engineering problems.
3. To prepare student to apply reasoning informed by the contextual knowledge to engineering practice.
4. To prepare students to work as part of teams on multi-disciplinary projects.

Course Outcomes:

After successful completion of the course student will be able to

1. Students will demonstrate basic knowledge of Laplace Transform. Fourier series, Bessel Functions, Vector Algebra and Complex Variable.
2. Students will demonstrate an ability to identify and Model the problems of the field of Electronics and Telecommunication and solve it.
3. Students will be able to apply the application of Mathematics in Telecommunication Engineering

Module 1

Laplace Transform 07

1. Laplace Transform (LT) of Standard Functions: Definition of Laplace transform, Condition of Existence of Laplace transform, Laplace transform of c^Sacs^shcWt’ Heaviside unit step function, Dirac-delta function, Laplace transform of Periodic function
2. Properties of Laplace Transform: Linearity, first shifting theorem, second shifting theorem, multiplication by tn, Division by t, Laplace Transform of derivatives and integrals, change of scale, convolution theorem, Evaluation of integrals using Laplace transform.

Module 2

For the complete Syllabus, results, class timetable, and many other features kindly download the iStudy App
It is a lightweight, easy to use, no images, and no pdf platform to make students’s lives easier.
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Module 3

Fourier Series 11

1. Introduction: Orthogonal and orthonormal set of functions, Introduction of Dirchlets conditions, Eulers formulae.
2. Fourier Series of Functions: Exponential, trigonometric functions of any period =2L, even and odd functions, half range sine and cosine series
3. Complex form of Fourier series, Fourier integral representation, Fourier Transform and Inverse Fourier transform of constant and exponential function.

Module 4

Vector Algebra & Vector Differentiation 07

1. Review of Scalar and Vector Product: Scalar and vector product of three and four vectors, Vector differentiation, Gradient of scalar point function, Divergence and Curl of vector point function
2. Properties: Solenoidal and irrotational vector fields, conservative vector field

Module 5

Vector Integral 06

1. Line integral
2. Greens theorem in a plane, Gauss divergence theorem and Stokes theorem

Module 6

For the complete Syllabus, results, class timetable, and many other features kindly download the iStudy App
It is a lightweight, easy to use, no images, and no pdf platform to make students’s lives easier.
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Text Books:

1. H.K. Das, Advanced engineering mathematics, S . Chand, 2008
2. A. Datta, Mathematical Methods in Science and Engineering, 2012
3. B.S. Grewal, Higher Engineering Mathematics, Khanna Publication

Reference Books:

1. B. V. Ramana, Higher Engineering Mathematics, Tata Mc-Graw Hill Publication
2. Wylie and Barret, Advanced Engineering Mathematics, Tata Mc-Graw Hill 6th Edition
3. Erwin Kreysizg, Advanced Engineering Mathematics, John Wiley & Sons, Inc
4. Murry R. Spieget, Vector Analysis, Schaums outline series, Mc-Graw Hill Publication

For detail syllabus of all other subjects of Electronics & Telecommunication Engineering (EC) 3rd Sem 2017 regulation, visit EC 3rd Sem Subjects syllabus for 2017 regulation.