**Higher Engineering Mathematics PDF**** :: ****Book Description : **On this edition the material has been re-ordered into the following twelve handy classes: quantity and algebra, geometry and trigonometry, graphs, vector geometry, complicated numbers, matrices and determinants, differential calculus, integral calculus, differential equations, statistics and likelihood, Laplace transforms and Fourier collection. Higher Engineering Mathematics is a comprehensive book for undergraduate students of engineering. The book comprises of chapters on algebra, geometry and vectors, calculus, series, differential equations, complex analysis, transforms, and numerical techniques. In addition, the book consists of several solved and unsolved questions for thorough revision and final practice. This book is essential for engineering students preparing for various competitive exams like Graduate Aptitude Test in Engineering. The book provides a clear exposition of essential tools of applied mathematics from a modern point of view and meets complete requirements of engineering and computer science students. Every effort has been made to keep the presentation at once simple and lucid.

It is written with the firm conviction that a good book is one that can be read with minimum guidance from the instructor. To achieve this, more than the usual number of solved examples, followed by properly graded problems have been given. Many of the examples and problems have been selected from recent papers of various university and other engineering examinations. Basic Concepts and Useful Information has been given in an Appendix.

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**Main Contents of Book :**

Number and Algebra

Geometry and Trigonometry

Complex Numbers

Matrices and Determinants

Vector Geometry

Differential Calculus

Integral Calculus

Differential Equations

Laplace Transforms

Fourier Series

**Book Contents in Depth**

Unit I : Algebra, Vectors and Geometry

Solution of Equations

Linear Algebra: Determinants, Matrices

Vector Algebra and Solid Geometry

Unit II : Calculus

Differential Calculus & Its Applications

Partial Differentiation & Its Applications

Integral Calculus & Its Applications

Multiple Integrals & Beta, Gamma Functions

Vector Calculus & Its Applications

Univ III : Series

Infinite Series

Fourier Series & Harmonic Anslysis

Unit IV : Differential Equations

Differential Equations of First Order

Applications of Differential Equations of First Order

Linear Differential Equations

Applications of Linear Differential Equations

Differential Equations of Other Types

Series Solution of Differential Equations and Special Functions

Partial Differential Equations

Applications of Partial Differential Equations

Unit V : Complex Analysis

Complex Numbers and Functions

Calculus of Complex Functions

Unit VI : Transforms

Laplace Transforms

Fourier Transforms

Z-Transforms

Unit VII : Numerical Techniques

Empirical Laws and Curve-fitting

Statistical Methods

Probability and Distributions

Sampling and Inference

Numerical Solution of Equations

Finite Differences and Interpolation

Numerical Differentiation and Integration

Difference Equations

Numerical Solution of Ordinary Differential Equations

Numerical Solution of Partial Differential Equations

Linear Programming

Unit VIII : Special Topics

Calculus of Variations

Integral Equations

Discrete Mathematics

Tensor Analysis

Useful Information

Tables

Answers to Problems

Index

705 Pages

This sixth edition of ‘**Higher Engineering Mathematics**’ covers essential mathematical material suitable for students studying Degrees, Foundation Degrees, Higher National Certificate and Diploma courses in Engineering disciplines.

In “**Higher Engineering Mathematics**” the topics have been arranged into the following twelve convenient categories: number and algebra, geometry and trigonometry, graphs, complex numbers, matrices and determinants, vector geometry, differential calculus, integral calculus, differential equations, statistics and probability, Laplace transforms and Fourier series.

New material has been added on logarithms and exponential functions, binary, octal and hexadecimal, vectors and methods of adding alternating waveforms. Another feature is that a free Internet download is available of an exercise (over 1100) of problems contained in the book.

The basic aim of the content in this text book is to provide the fundamental analytical and underpinning knowledge and techniques needed to successfully complete scientific and engineering principles modules of Degree, Foundation Degree and Higher National Engineering programs.

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