Engineering mathematics /
A.C. Bajpai, L.R. Mustoe, D. Walker ; in collaboration with W.T. Martin.
- 2nd edition.
- Chichester ; New York : Wiley, c1989.
- xiii, 714 p. : ill. ; 23 cm.
CONTENTS:
Chapter 0 open letters
Chapter 1 Why mathematics 1.1 mathematical models 1.2 solutions to mathematical models 1.3 algorithms and flow charts, etc
Chapter 2 FUNCTIONS AND SETS 2.1 number systems and inequalities 2.2 relations and functions 2.3 standard functions, etc
Chapter3 ELEMENTARY IDEAS ON LIMITS 3.1 sequences and limits 3.2 functions of a discrete variable-induction, etc
Chapter 4 INTRODUCTION TO STATISTICAL METHODS 4.1 sets and Venn diagrams 4.2 graphical representations, etc
Chapter 5 SETS AND PROBABILITY 5.1 sets and Venn diagrams 5.2 probability and chance, etc
Chapter 6 DISCRETE MATHEMATICS 6.1 prepositions and propositional logic 6.2 arguments and proof, logical implications, etc
Chapter 7 GEOMENTRY AND CURVES 7.1 coordinate geometry and the plane 7.2 inequalities involving two variables, etc
Chapter 8 LINEAR ALGEBRA 1- VECTORS 8.1 elementary vector algebra 8.2 vectors in Cartesian coordinates, etc
Chapter 9 LINEAR ALGEBRA II 9.1 INTRODUCTION 9.2 Gauss elimination, etc
Chapter 10 LINEAR ALGEBRA III 10.1 MATRIX ALGEBRA 10.2 matrix notation for simultaneous equations, etc
Chapter 11 COMPLEX NUMBERS 11.1 The idea of complex numbers 11.2 complex arithmetic, etc
Chapter 12 DIFFERENCIATION 12.1 Techniques of differentiation 12.2 maximum and mi minimum values of functions, etc