UID:
almahu_9948621660802882
Format:
XI, 612 p.
,
online resource.
Edition:
1st ed. 2002.
ISBN:
9783709161463
Series Statement:
Texts & Monographs in Symbolic Computation, A Series of the Research Institute for Symbolic Computation, Johannes Kepler University, Linz, Austria,
Content:
This is a new type of calculus book: Students who master this text will be well versed in calculus and, in addition, possess a useful working knowledge of one of the most important mathematical software systems, namely, MACSYMA. This will equip them with the mathematical competence they need for science and engi neering and the competitive workplace. The choice of MACSYMA is not essential for the didactic goal of the book. In fact, any of the other major mathematical software systems, e. g. , AXIOM, MATHEMATICA, MAPLE, DERIVE, or REDUCE, could have been taken for the examples and for acquiring the skill in using these systems for doing mathematics on computers. The symbolic and numerical calcu lations described in this book will be easily performed in any of these systems by slight modification of the syntax as soon as the student understands and masters the MACSYMA examples in this book. What is important, however, is that the student gets all the information necessary to design and execute the calculations in at least one concrete implementation language as this is done in this book and also that the use of the mathematical software system is completely integrated with the text. In these times of globalization, firms which are unable to hire adequately trained technology experts will not prosper. For corporations which depend heavily on sci ence and engineering, remaining competitive in the global economy will require hiring employees having had a traditionally rigorous mathematical education.
Note:
Functions, limits, and continuity -- 1 Functions -- 2 Elementary functions used in calculus -- 3 Limits and continuity -- Derivatives -- 4 Differentiation -- 5 Differentiation rules -- 6 Extremum problems -- 7 Mean value theorem -- Integrals -- 8 Definite integrals -- 9 Fundamental theorem of calculus -- 10 Integration techniques -- 11 Applications of integrals -- Series and approximations -- 12 Sequences and series -- 13 Series expansions and approximations -- Appendixes -- A Introduction to MACSYMA -- A.1 MACSYMA inputs and outputs -- A.2 Getting on-line help -- A.3 Expressions -- A.4 Constants -- A.5 Numbers -- A.6 Assignments -- A.7 Equations -- A.8 Functions -- A.9 Lists -- A.10 Expanding expressions -- A.11 Simplifying expressions -- A.12 Factoring expressions -- A.13 Making substitutions -- A.14 Extracting parts of an expression -- A.15 Trigonometric functions -- A.16 A simple program -- A.17 Plotting -- B Numbers -- B.1 Arithmetic operations -- B.2 Real numbers -- B.3 Absolute value -- B.4 Equations and inequalities -- B.5 Two fundamental properties of real numbers -- B.6 Complex numbers -- C Analytical geometry -- C.2 Lines -- C.3 Circles -- C.4 Sine, cosine, and tangent -- C.5 Polar coordinates -- D Conic sections -- D.l Conic sections -- D.2 Circle -- D.3 Parabola -- D.4 Ellipse -- D.5 Hyperbola.
In:
Springer Nature eBook
Additional Edition:
Printed edition: ISBN 9783211829240
Additional Edition:
Printed edition: ISBN 9783709172308
Additional Edition:
Printed edition: ISBN 9783709161470
Language:
English
DOI:
10.1007/978-3-7091-6146-3
URL:
https://doi.org/10.1007/978-3-7091-6146-3
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