#1
15th April 2015, 03:16 PM
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B.Tech Question Papers Calicut University
I have joined Calicut University to do my B.Tech from computer science department preparing for the exams and for that I am looking for the B.Tech Question Papers of the Calicut University. Can you please help me in providing some sample B.Tech Question Papers for my exam preaparation?
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#2
22nd July 2018, 03:34 PM
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Re: B.Tech Question Papers Calicut University
Can you provide me the Syllabus of B. Tech (Bachelor of Engineering) Civil Engineering offered by University of Calicut on which the question paper is based?
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#3
22nd July 2018, 03:36 PM
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Re: B.Tech Question Papers Calicut University
The Syllabus of B. Tech (Bachelor of Engineering) Civil Engineering offered by University of Calicut on which the question paper is based is as follows: University of Calicut Syllabus - B. Tech Civil Engineering 3rd Semester EN 14 301: Engineering Mathematics III Module I: Functions of a Complex Variable (13 hours) Functions of a Complex Variable Limit Continuity Derivative of a Complex function Analytic functions Cauchy-Riemann Equations Laplace equation Harmonic Functions Conformal Mapping Examples: eZ, sinz, coshz, (z+1/Z ) Mobius Transformation. Module II: Functions of a Complex Variable (13 hours) Definition of Line integral in the complex plane Cauchys integral theorem (Proof of existence of indefinite integral to be omitted) Independence of path Cauchys integral formula Derivatives of analytic functions (Proof not required) Taylor series (No proof) Laurent series (No proof) Singularities - Zeros Poles - Residues Evaluation of residues Cauchys residue theorem Evaluation of real definite integrals. Module III: Linear Algebra (13 hours) (Proofs not required) Vector spaces Definition, Examples Subspaces Linear Span Linear Independence Linear Dependence Basis Dimension Orthogonal and Orthonormal Sets Orthogonal Basis Orthonormal Basis Gram-Schmidt orthogonalisation process Inner product spaces Definition Examples Inequalities ; Schwartz, Triangle (No proof). Module IV: Fourier Transforms (13 hours) Fourier Integral theorem (Proof not required) Fourier Sine and Cosine integral representations Fourier transforms transforms of some elementary functions Elementary properties of Fourier transforms Convolution theorem (No proof) Fourier Sine and Cosine transforms transforms of some elementary functions Properties of Fourier Sine and Cosine transforms. Text Books Module I: Erwin Kreysig, Advanced Engineering Mathematics, 8e, John Wiley and Sons, Inc Sections: 12.3, 12.4, 12.5, 12.6, 12.7, 12.9 Module II: Erwin Kreysig, Advanced Engineering Mathematics, 8e, John Wiley and Sons, Inc Sections: 13.1, 13.2, 13.3, 13.4, 14.4, 15.1, 15.2, 15.3, 15.4 Module III: Bernaed Kolman, David R Hill, Introductory Linear Algebra, An Applied First Course, Pearson Education Sections: 6.1, 6.2, 6.3, 6.4, 6.8, Appendix.B.1 Module IV: Wylie C.R and L.C. Barrett, Advanced Engineering Mathematics, McGraw Hill Sections: 9.1, 9.3, 9.5 Reference books 1. H Parthasarathy, Engineering Mathematics, A Project & Problem based approach, Ane Books India. 2. B V Ramana, Higher Engineering Mathematics, McGrawHill. 3. Sarveswara Rao Koneru, Engineering Mathematics, Universities Press. 4. J K Sharma, Business Mathematics, Theory and Applications, Ane Books India. 5. John bird, Higher Engineering Mathematics, Elsevier, Newnes. 6. M Chandra Mohan, Vargheese Philip, Engineering Mathematics-Vol. I, II, III & IV., Sanguine Technical Publishers 7. Abhimanyu Singh, Applied Mathematics I, Ane Books India 8. V R Lakshmy Gorty, Advanced Engineering Mathematics-Vol. I, II., Ane Books India. 9. Sastry S.S., Advanced Engineering Mathematics-Vol. I and II., Prentice Hall of India. 10. Lary C Andrews, Bhimsen K Shivamoggi, Integral Transforms for Engineers, Prentice Hall of India. 11. K B Datta, Matrix and Linear Algebra, 2e, Prentice Hall of India. |
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