Introduction to Engineering Mathematics VolI
Introduction to Engineering Mathematics VolI
 ISBN: 9788121935241
 Author: H K Dass
 Number of Pages: 795
 Availability: In Stock
 Snapshot
 Description
About The Book Introduction to Engineering Mathematics VolI by H K Dass

Book Summary: 
The book has been thoroughly revised according to the New Syllabi (20132014) of Gautam Buddha Technical University, Lucknow. Errors and misprints which came to my notice have been removed. Latest Solved Question Papers of 20102011 and 20122013 have been solved and included in the textbook. 
Audience of the Book : 
(FIRST SEMESTER)[For B.E./B.Tech./B.Arch. Students of First Semester of all Engineering Colleges of Gautam Buddha Technical University, Lucknow] 
Table of Contents: 
UNIT  I : DIFFERENTIAL CALCULUS – I Leibnitz’s Theorem, Partial Derivatives, Euler’s theorem for homogeneous functions, Total derivatives,Change of Variables, Curve Tracing, Cartesian and Polar Coordinates. UNIT  II : DIFFERENTIAL CALCULUS – II Taylor’s and Maclaurin’s Theorems, Expansion of function of several variables, Jacobian, Approximation of Errors, Extrema of Functions of Several Variables, Lagrange’s Method of Multipliers (Simple Applications) UNIT  III : LINEAR ALGEBRA Inverse of a matrix by elementary transformations, Rank of a matrix (Echelon & Normal form), Linear Dependence, Consistency of Linear System of Equations and their Solution , Characteristic Equation, Eigen values and eigen vectors, CayleyHamilton Theorem, Application of matrices to engineering problems, A brief introduction to Vector Spaces, Subspaces, Rank & Nullity, Linear Transformations. UNIT  IV : MULTIPLE INTEGRALS Double and triple integrals, Change of order of integration, Change of variables, Application of integration to lengths, Volumes and Surface areas, Cartesian and Polar Coordinates, Beta and Gamma function,s Dirichlet’s integral and applications. UNIT  V : VECTOR CALCULUS Point function, Gradient, Divergence and curl and their physical interpretations, Vector identities, Directional derivatives, Line, Surface and volume Integrals, Applications of Green’s, Stoke’s and Gauss divergence theorems (without proofs). 