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Please provide me the old papers of the Kerala university that were according to the 2008 scheme? The University of Kerala was founded as the University of Travancore in the erstwhile princely state of Travancore (now southern part of Kerala and some neighbouring parts of state of Tamilnadu) in 1937. this university is among the first universities that wrer established in India. These were some of the papers that were held by the scheme of the 08.801 DESIGN AND DRAWING OF REINFORCED CONCRETE STRUCTURES 08.802 DESIGN AND DRAWING OF STEEL STRUCTURES (C) 08.803 Environmental Engineering – II (C) 08.804 Quantity Surveying and Valuation 08.805 Construction Management 08.806.4 Elective-IV : ADVANCED FOUNDATION ENGINEERING 08.806.8 Repair & Rehabilitation of Structures 08.806.10 Elective IV Earthquake Resistant Design of Structures 08.806.11 ELECTIVE-IV - ENVIRONMENTAL IMPACT ASSESSMENT 08.807.1 Elective V Geotechnical Earthquake Engineering 08.807.3 ELECTIVE-V -INDUSTRIAL WASTE WATER MANAGEMENT 08.807.7 Elective V Optimization Techniques in Engineering 08.807.10 REINFORCED EARTH In order to get these papers please go through the following process- 1. visit the home page of the university of . 2. go to the news section of the home page. 3. on that you will find the papers of the 2008 scheme , you can select the paper f your choice and download it. ![]() As you are asking for Kerala University B.Tech Question Papers 2008 Scheme so on your demand I am providing same here : Kerala University B.Tech Question Papers 2008 Scheme ![]() ![]() ![]() ![]() Kerala University B.Tech 2008 Scheme 08.101 ENGINEERING MATHEMATICS I L-T-P : 2-1-0 Credits: 6 MODULE I Applications of differentiation: Definition of Hyperbolic functions and their derivatives- Successive differentiation- Leibnitz Theorem(without proof)- Curvature- Radius of curvature- centre of curvatureEvolute ( Cartesian ,polar and parametric forms) Partial differentiation and applications:- Partial derivatives- Eulers theorem on homogeneous functionsTotal derivatives- Jacobians- Errors and approximations- Taylors series (one and two variables) - Maxima and minima of functions of two variables - Lagranges method- Leibnitz rule on differentiation under integral sign. Vector differentiation and applications :- Scalar and vector functions- differentiation of vector functionsVelocity and acceleration- Scalar and vector fields- Operator - Gradient- Physical interpretation of gradientDirectional derivative- Divergence- Curl- Identities involving (no proof) - Irrotational and solenoidal fields Scalar potential. MODULE II Laplace transforms:- Transforms of elementary functions - shifting property- Inverse transforms- Transforms of derivatives and integrals- Transform functions multiplied by t and divided by t - Convolution theorem(without proof)-Transforms of unit step function, unit impulse function and periodic functions-second shifiting theorem- Solution of ordinary differential equations with constant coefficients using Laplace transforms. Differential Equations and Applications:- Linear differential eqations with constant coefficients- Method of variation of parameters - Cauchy and Legendre equations Simultaneous linear equations with constant coefficients- Application to orthogonal trajectories (cartisian form only). MODULE III Matrices:-Rank of a matrix- Elementary transformations- Equivalent matrices- Inverse of a matrix by gaussJordan method- Echelon form and normal form- Linear dependence and independence of vectors- ConsistencySolution of a system linear equations-Non homogeneous and homogeneous equations- Eigen values and eigen vectors Properties of eigen values and eigen vectors- Cayley Hamilton theorem(no proof)- DiagonalisationQuadratic forms- Reduction to canonical forms-Nature of quadratic forms-Definiteness,rank,signature and index. Last edited by Aakashd; December 24th, 2019 at 03:56 PM. |