#1
13th May 2015, 08:57 AM
| |||
| |||
sem 6 etrx syllabus mumbai university
hello friends can anybody help for the sem 6 etrx syllabus or important news mumbai university because I don’t know when it comes. So plz help me.
|
#2
13th May 2015, 02:46 PM
| |||
| |||
Re: sem 6 etrx syllabus mumbai university
Hii buddy I am here for you as you want the syllabus of electrical engineering, but friend for syllabus you need to follow a process . so here I am providing the process of how to get the syllabus of its First go to the official sit of Mumbai University A new page will open on your desktop There is the row of usefull links On the bottom of this link it has the option of revised syllabus click on that option you On the next page yoy will see the circular bar On mid of that option of circular bar There is the option of engineering click on it see your syllabus. Link syllabus mumbai university Course Prerequisite: FE C 101: Applied Mathematics I FE C 201: Applied Mathematics II Course Objective: • To provide students with a sound foundation in Mathematics and prepare them for graduate studies in Electronics Engineering • To make students to understand mathematics’ fundamentals necessary to formulate, solve and analyze engineering problems. Expected Outcome: • Students will demonstrate basic knowledge of Laplace Transform. Fourier Series, Bessel Functions, Vector Algebra and Complex Variable. • Students will demonstrate an ability to identify formulate and solve electronics Engineering problems using Applied Mathematics. • Students will show the understanding of impact of engineering mathematics in the engineering • Students will become capable and eligible to participate and succeed in competitive exams like GATE, GRE. Module No. Unit No. Topics Hrs. 1. 0 Laplace Transform 12 1.1 Laplace transform (LT) of standard functions: Definition. Unilateral and bilateral Laplace transform, LT of sin(at), cos(at), n at t , e , sinh(at), cosh(at), erf(t), Heavi-side unit step, direct- 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 derivatives and integrals, change of scale, convolution theorem, initial and final value theorem, Parsevel’s identity 1.3 Inverse Laplace Transform: Partial fraction method, long division method, residue method, theorem of LT to find inverse 1.4 Applications of Laplace transform : Solution of ordinary differential equations 2.0 Fourier Series 10 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, Fourier integral representation 3.0 Bessel functions 08 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 a functions 4.0 Vector Algebra 12 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 pint 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 5.0 Complex Variable 10 5.1 Analytic function: Necessary and sufficient conditions, Cauchy Reiman. equations 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. Total 52 Recommended Books 1. P. N. Wartikar and J. N. Wartikar, “A Text Book of Applied Mathematic”, Vol. I & II, Vidyarthi Griha Prakashan, Pune 2. A Datta, “Mathematical Methods in Science and Engineerin”, 2012 3. Dr. B.S. Grewal, “Higher Engineering Mathematics”, Khanna Publication 4. B. S. Tyagi, “Functions of a Complex Variable,” Kedarnath Ram Nath Publication 5. B V Ramana, “Higher Engineering Mathematics”, Tata McGraw-Hill Publication 6. Wylie and Barret, “Advanced Engineering Mathematics”, McGraw-Hill 6th Edition 7. Erwin Kreysizg, “Advanced Engineering Mathematics”, John Wiley & Sons, Inc 8. Murry R. Spieget, “Vector Analysis”, Schaun’s Out Line Series, McGraw Hill Publication Internal Assessment (IA): Two tests must be conducted which should cover 80% of syllabus. The average marks of two tests will be considered as final IA marks End Semester Examination: 1. Question paper will comprise of 6 questions, each carrying 20 marks. 2. The students need to solve total 4 questions. 3: Question No.1 will be compulsory and based on entire syllabus. 4: Remaining questions (Q.2 to Q.6) will be set on all the modules. 5: Weight age of marks will be as per Blueprint. Term Work: At least 08 assignments covering entire syllabus must be given during the Class Wise Tutorial. The assignments should be students’ centric and an attempt should be made to make assignments more meaningful, interesting and innovative. Term work assessment must be based on the overall performance of the student with every assignment graded from time to time. The grades should be converted into marks as per the Credit and Grading System manual and should be added and averaged. The grading and term work assessment should be done based on this scheme. General Enquiry Contact Fort Campus: 22708700. Kalina Campus: 26543000 / 26543300. Contact Address Registrar University of Mumbai M.G. Road Fort Mumbai-400 032. more detail to atteched a pdf file; |
|