Mathematics for Engineers and Scientists (6th Ed.) For Engineers and Scientists
Auteur : Jeffrey Alan
Since its original publication in 1969, Mathematics for Engineers and Scientists has built a solid foundation in mathematics for legions of undergraduate science and engineering students. It continues to do so, but as the influence of computers has grown and syllabi have evolved, once again the time has come for a new edition.
Thoroughly revised to meet the needs of today's curricula, Mathematics for Engineers and Scientists, Sixth Edition covers all of the topics typically introduced to first- or second-year engineering students, from number systems, functions, and vectors to series, differential equations, and numerical analysis. Among the most significant revisions to this edition are:
Although designed as a textbook with problem sets in each chapter and selected answers at the end of the book, Mathematics for Engineers and Scientists, Sixth Edition serves equally well as a supplemental text and for self-study. The author strongly encourages readers to make use of computer algebra software, to experiment with it, and to learn more about mathematical functions and the operations that it can perform.
1 Numbers, trigonometric functions and coordinate geometry, 2 Variables, functions and mappings, 3 Sequences, limits and continuity, 4 Complex numbers and vectors, 5 Differentiation of functions of one or more real variables 6 Exponential, logarithmic and hyperbolic functions and and introduction to complex functions, 7 Fundamentals of integration13 Differential equations and geometry 14 First-order differential equations 15 Higher-order linear differential equations 16 Fourier series 17 Numerical analysis, 18 Probability and statistics , 19 Symbolic algebraic manipulation by computer software,Answers
Date de parution : 08-2004
17.8x25.4 cm
Date de parution : 06-2019
17.8x25.4 cm
Thème de Mathematics for Engineers and Scientists :
Mots-clés :
Cumulative Distribution Function; computer software; Ordinary Differential Equation; engineering mathematics; Differentiable Vector Functions; mathematical analysis; Oblique Asymptote; Odd Function; Finite Jump Discontinuity; Single Real Variable; Plane Polar Coordinates; Arbitrary Constants; Laplace Transform; Indefinite Integral; Iterated Integral; Differential Equation; Dummy Variable; Fourier Series; Improper Integral; Cauchy Riemann Equations; Fourier Series Representation; Double Integral; Definite Integral; Complex Fourier Series; Cent Confidence Interval; Fundamental Interval; Fourier Cosine Expansion; Line Integral