#1
30th May 2015, 02:49 PM
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CUSAT EC S3 Syllabus
I am pursing B.Tech EC (Electronics & Communication) S3 (3rd Semester) from CUSAT (Cochin University of Science and Technology) and looking for detailed syllabus and course structure so please inform me if it is available on official website of CUSAT?
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#2
18th July 2018, 04:51 PM
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Re: CUSAT EC S3 Syllabus
Hello sir, Im preparing for CUSAT exam. I want CUSAT EC S3 Syllabus? Is there any one can provide me CUSAT EC S3 Syllabus?
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#3
18th July 2018, 04:54 PM
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Re: CUSAT EC S3 Syllabus
The University of Cochin, the University came into being in 1971 through an Act of the Legislature resultant to a concerted campaign for quality postgraduate education in the State of Kerala. The CUSAT is offering engineering courses. The CUSAT is also provides syllabus EC S3 subject. CUSAT EC S3 Syllabus USAT B.Tech S3 Syllabus for Electronics& Communication Engineering Module 1 Matrices and Vector spaces: Rank of matrix, Echelon and normal form, Solutions of linear systems of algebraic equations, Eigen values and Eigen vectors, Cayley Hamilton theorem (non proof). Vector Spaces Subspaces, Linear Independence of vectors-Linear span-Dimension and Basis. Linear transformations. Module II Fourier series and Fourier integrals: Fourier series of Periodic functions- Euler formulae for Fourier coefficients- functions having period 2π, arbitrary period-even and odd functions-half range expansions, Fourier integral, Fourier cosine and sine transformations, linearity property, transform of derivatives, convolution theorem (no proof) Module III Laplace transforms: Linearity property, transforms of elementary functions, Laplace transforms of derivatives and integrals, differentiation and integration of transforms, convolution theorem (no proof) use of Laplace transforms in the solution of initial value problems, unit step function, impulse function transform of step functions, transforms of periodic functions. Module IV Vector calculus: Scalar and Vector point functions-Gradient and directional derivative of a scalar point function- Divergence and Curl of a vector point functions-their physical meanings. Evaluation of line integral, surface integral and volume integrals, Gausss divergence theorem, Stokes theorem (No Proof of these theorem), conservative force fields, scalar potential. Here is PDF for CUSAT EC S3 Syllabus: |