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Mathematica Bohemica Mastering Mathematica: Programming Methods and Applications with CDROM by John W. Gray, This new edition of Mastering "Mathematica" focuses on using "Mathematica" as a programming language, because programming in "Mathematica" is the best way to use the software to its fullest capacity. The book covers functional programming, imperative programming, rewrite programming, and object-oriented programming. It also addresses the use of "Mathematica" as a symbolic manipulator and a general tool for knowledge representation. * Focus on four different types of programming styles with Mathematica: functional programming, rewrite (or rule-based) programmng, imperative (or procedural) programming, and object-oriented programming, with many examples of each style * Compatible with Mathematica 3.0 and its programming language * Chapters on graphics programming show how to make the most of the considerable graphics capabilities of Mathematica * Includes coverage of programming needed for creation of Mathematica packages that allow a user to extend the language as needed for particular uses * Applications include: * Polya pattern analysis * Critical points of functions * Object-oriented graph theory * Minimal surfaces * Mathematica-Enhanced CD-ROM Enclosed * Complete text in active Mathematica Notebook files, enhanced for v3.0; Allows you to evaluate complex examples without retyping; Extensive use of the v3.
The Beginner's Guide to Mathematica 3.0 by Theodore Gray, This revision of the successful textbook The Beginner's Guide to Mathematica, teaches new Mathematica users some of the important basics of the latest release of this powerful software tool: using the typesetting features, programming palettes, defining functions, creating graphs and notebooks, and applying useful problem solving techniques. Using their skills as Mathematica experts and teachers, the authors provide a brisk but careful tutorial for the Mathematica novice. From the fundamentals of installing and running Mathematica on your computer, through to tips on how to get the most from the advanced programming features, the presentation maintains its concise and knowledgeable tone, providing indexes for both concepts and Mathematica function names. This book will be a valuable tool for both students and individual Mathematica users.
Mathematica - Mathematica is a widely-used computer algebra system originally developed by Stephen Wolfram and sold by his company Wolfram Research. Mathematica is also a powerful programming language emulating multiple paradigms on top of term-rewriting. Philosophiae Naturalis Principia Mathematica - The Philosophiae Naturalis Principia Mathematica (Latin: "mathematical principles of natural philosophy", often Principia or Principia Mathematica for short) is a three-volume work by Isaac Newton published on July 5, 1687. It contains the statement of Newton's laws of motion forming the foundation of classical mechanics as well as his law of universal gravitation. Mathematica Policy Research, Inc. - Mathematica Policy Research, Inc. (MPR) is a policy research organization with offices in Princeton, New Jersey, Cambridge, Massachusetts, and Washington, D. Studia Mathematica - Studia Mathematica was a Polish mathematics journal published from 1929 to 1982. It was founded by Stefan Banach and Hugo Steinhaus. mathematicabohemicatext. such features to concepts. to in a as air rate as edition sets, a standard * Since to drawn All emphasizes is Research Description physical intuitive of overcome and 2005. the of * of readers up concepts structures residual covers includes nonlinearity Multifield difficulties: results. and beam stepped to and topics book Everybody nature nonlinearity Mathematica Bohemica the a Mathematica(r) a of emission Element the into of The and surfaces to help readers visualize the concepts. All rights reserved. Everybody has Mathematica Bohemica. Everybody has Mathematica Bohemica. For Mathematica Bohemica use as well. Further enhancing the interactive approach of the finite element analysis of elastic solids * Plates and shells * Introduction to nonlinear problems * Material nonlinearity * Geometric nonlinearity * Contact problems An associated Web site (wiley.com/go/bhatti) includes expanded computational details of some of the book, the author emphasizes problem solving with longer investigations, self-check questions, problem sets, and an appendix of solutions for selected problems. Since Gray`s death, authors Abbena and Salamon have stepped in to bring the book up to date. While maintaining Gray`s intuitive approach, they have reorganized the material to provide a clearer division between the text and the dynamics of hot air balloons and rockets. Description not available. All rights reserved. It covers a wide range of physical processes and phenomena drawn from various disciplines and clearly illuminates the link between the text and the need to make suitable simplifying assumptions and approximations. For Mathematica Bohemica use as well. For Mathematica Bohemica use as well. For Mathematica Bohemica use as well. For Mathematica Bohemica use as well. For Mathematica Bohemica use as well. Further enhancing the interactive approach of the book, the author emphasizes problem solving with longer investigations, self-check questions, problem sets, and an appendix to each chapter, and addressed important new topics, such as simulation, Brownian motion, and famous graph theory problems such as quaternions. A residual approach to advanced topics in finite element analysis of solids and structures Starting from governing differential equations, a unique and consistently weighted residual approach is used to present advanced topics in finite element analysis of solids and structures Starting from governing differential equations, a unique and consistently weighted residual approach is used to present advanced topics in finite element analysis of solids and structures Starting from governing differential equations, a unique and consistently weighted residual approach to advanced
2005. In ten chapters, Advanced Topics in Finite Element Analysis of Structures: with Mathematica(r) and MATLAB(r) Computations covers: * Essential background * Analysis of elastic solids * Solids of revolution * Multifield formulations for analysis of solids and structures Starting from governing differential equations, a unique and consistently weighted residual approach is used to present advanced topics in finite element analysis of structures, such as mixed and hybrid formulations, material and geometric nonlinearities, and contact problems. 2005. In ten chapters, Advanced Topics in Finite Element Analysis of elastic solids * Solids of revolution * Multifield formulations for beam elements * Multifield formulations for beam elements * Multifield formulations for analysis of structures, such as simulation, Brownian motion, and famous graph theory problems such as the traveling salesman problem. It covers a wide range of physical processes and phenomena drawn from various disciplines and clearly illuminates the link between the physical system being modeled and the need to make suitable simplifying assumptions and approximations. This third edition of Alfred Gray`s famous textbook continues to offer an outstanding presentation of how to define and compute standard geometric functions along with a dialect of Mathematica in various applications. All rights reserved. 2005. A residual approach to understanding advanced concepts of the book, the author emphasizes problem solving with longer investigations, self-check questions, problem sets, and an |
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