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1st August 2016, 12:24 PM
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| Re: B Tech Syllabus Kannur University
Ok, as you want the syllabus of B.Tech Computer Science And Engineering II year of Kannur University so here I am providing you. Kannur University B.Tech CSE II year syllabus Third Semester Code Subject 2K6CS 301 Engineering Mathematics II 2K6CS 302 Humanities 2K6CS 303 Discrete Computational Structures 2K6CS 304 Computer Programming 2K6CS 305 Switching Theory & Logic Design 2K6CS 306 Electronic Circuits & Systems 2K6CS 307(P) Programming Lab 2K6CS 308(P) Electronics Lab Fourth Semester Code Subject 2K6CS 401 Engineering Mathematics III 2K6CS 402 Data Structures & Algorithms 2K6CS 403 Systems Programming 2K6CS 404 Microprocessors & Microcontrollers 2K6CS 405 Computer Organization & Design 2K6CS 406 Electric Circuits & Systems 2K6CS 407(P) Data Structures Lab 2K6CS 408(P) Hardware Lab 2K6 CS 301 : ENGINEERING MATHEMATICS II 3 hours lecture and 1 hour tutorial per week Module I: Infinite Series: Convergence and divergence of infinite series – Ratio test – Comparison test – Raabe’s test – Root test – Series of positive and negative terms- absolute convergence – Test for alternating series. Power Series: Interval of convergence – Taylors and Maclaurins series representation of functions – Leibnitz formula for the derivative of the product of two functions – use of Leibnitz formula in the Taylor and Maclaurin expansions Module II: Matrices: Concept of rank of a matrix –echelon and normal forms – System of linear equation - consistency – Gauss elimination– Homogeneous liner equations-Fundamental system of solutions- Inverse of a matrix – solution of a system of equations using matrix inversion – eigen values and eigen vectors - Cayley- Hamilton Theorem. Module III: Vector Integral Calculus: Evaluation of line integral, surface integral and volume integrals – Line integrals independent of the path, conservative force fields, scalar potential- Green’s theorem- Gauss’ divergence theorem- Stoke’s theorem (proof of these not required). Module IV: Vector Spaces: subspaces–linear dependence and independence–bases and dimension-linear transformations -sums, products and inverse of linear transformations. References: 1. Kreyszing E. Advanced Engineering Mathematics, Wiley Eastern 2. Sastri. S. S. Engineering Mathematics, Prentice Hall of India. 3. Wylie .C. R. Advanced Engineering Mathematics, Mc Grawhill. 4. B .S. Grewal. Higher Engineering Mathematics, Khanna Publishers. 5. Greenberg. M.D. Advanced Engineering Mathematics, Pearson Education Asia. 6. Narayanan .S. Manickavachagom Pella and Ramaiah. Advanced Mathematics for Engineering Students, S. Viswanathan Publishers Kannur University B.Tech CSE II year syllabus      For complete syllabus here is the attachment Contact- Kannur University Thavakkara Civil Station P.O. Kannur, Kerala 670002 |