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Learning and Teaching Mathematics using Simulations : Plus 2000 Examples from Physics (2011)

Röss, Dieter

Berlin : Walter de Gruyter

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UID:

almahu_9947359992902882

Format: Online-Ressource (257 p.)

Edition: Online-Ausg. 2012 Electronic reproduction; Available via World Wide Web

ISBN: 9783110250053

Series Statement: De Gruyter textbook

Content: This is aunique, comprehensive and documented collection of simulations in mathematics and physics: More than 2000 simulations, offered on our webpage for comfortable use online. The book, written by an experienced teacher and practitioner, contains a complete introduction to mathematics and the documentation to the simulations. This is a great way to learn mathematics and physics. Suitable for courses in Mathetmatics for Engineering and Sciences. For questions about the simulations please contact service@degruyter.com

Note: Description based upon print version of record , Complex sequence with nonlinear creation law: FractalsFunctions and their infinitesimal properties; Definition of functions; Difference quotient and differential quotient; Derivatives of a few fundamental functions; Powers and polynomials; Exponential function; Trigonometric functions; Rules for the differentiation of combined functions; Derivatives of further fundamental functions; Series expansion: the Taylor series; Coefficients of the Taylor series; Approximation formulas for simple functions; Derivation of formulas and errors bounds for numericaldifferentiation. , Interactive visualization of Taylor expansionsGraphical presentation of functions; Functions of one to three variables; Functions of four variables: World line in the theory of relativity; General properties of functions y=f(x); Exotic functions; The limiting process for obtaining the differential quotient; Derivatives and differential equations; Phase space diagrams; Antiderivatives; Definition of the antiderivative via its differential equation; Definite integral and initial value; Integral as limit of a sum; The definition of the Riemann integral; Lebesgue integral. , Introduction; Goal and structure of the digital book; Directories; Usage and technical conventions; Example of a simulation: The Möbius band; Physics and mathematics; Mathematics as the "Language of physics''; Physics and calculus; Numbers; Natural numbers; Whole numbers; Rational numbers; Irrational numbers; Algebraic numbers; Transcendental numbers; and the quadrature of the circle, according to Archimedes; Real numbers; Complex numbers; Representation as a pair of real numbers; Normal representation with the "imaginary unit i''; Complex plane; Representation in polar coordinates. , Parameter representation of surfaces: x=fx(p,q). , Rules for the analytical integrationNumerical integration methods; Error estimates for numerical integration; Series expansion (2): the Fourier series; Taylor series and Fourier series; Determination of the Fourier coefficients; Visualizing the calculation of coefficients and spectrum; Examples of Fourier expansions; Complex Fourier series; Numerical solution of equations and iterative methods; Visualization of functions in the space of real numbers; Standard functions y=f(x); Some functions y=f(x) that are important in physics; Standard functions of two variables z=f(x,y); Waves in space. , Simulation of complex addition and subtractionSimulation of complex multiplication and division; Extension of arithmetic; Sequences of numbers and series; Sequences and series; Sequence and series of the natural numbers; Geometric series; Limits; Fibonacci sequence; Complex sequences and series; Complex geometric sequence and series; Complex exponential sequence and exponential series; Influence of limited accuracy of measurements and nonlinearity; Numbers in mathematics and physics; Real sequence with nonlinear creation law: Logistic sequence.

Additional Edition: ISBN 9783110250077

Language: English

Keywords: Electronic books ; Lehrbuch ; Beispielsammlung

DOI: 10.1515/9783110250077

URL: http://www.degruyter.com/doi/book/10.1515/9783110250077

URL: Cover

URL: Volltext (lizenzpflichtig)

URL: lizenzpflichtig

URL: Cover

URL: Inhaltstext

URL: Cover

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Learning and Teaching Mathematics using Simulations : Plus 2000 Examples from Physics (2011)

Röss, Dieter.

Berlin ;Boston :De Gruyter,

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UID:

edocfu_9958353810902883

Format: 1 online resource (255p.)

ISBN: 9783110250077

Series Statement: De Gruyter Textbook

Content: Mathematics is the language of physics and technology. Yet in the age of computers, mathematic skill is not based on mastery of arithmetic. Rather, it depends on understanding relationships in time and space, and expressing them with precise and clear formulas. In this regard, one cannot rely on the rote memorization of rules and formulas - insight and intuitive understanding are crucial. But how can this understanding be achieved in higher mathematics, which depends on abstract concepts such as complex numbers, real and complex infinite series, infinitesimal calculus, 2, 3, and 4 dimensional functions, conformal maps, vectors, and linear and nonlinear ordinary and partial differential equations? The author takes a highly practical approach to facilitating the insight essential for true learning in mathematics. Students can work directly with the simulation programs, can visualize relationships, and creatively interact with the calculation procedures. Proceeding in textbook fashion, the work makes use of a broad palette of multimedia tools, and features numerous interactive calculation programs for mathematical experimentation. Students merely have to select one of the many predefined examples and set the relevant parameters - and in a flash the results are graphically displayed in 2 or 3 dimensions. In addition, the specific functions used can be changed or even newly formulated according to user preferences. For example, a procedure developed for a fourth degree power function for the numerical calculation of zero points can be adapted for use with another function. Each simulation is accompanied by a detailed description, instructions for use, and numerous suggestions for experimentation. The mathematical simulations are based on the Easy Java Simulation (EJS) programming tool. All of the files developed with EJS are completely open and transparent. The user can even draw on the examples as building blocks for the development his or her own calculation procedures. The appendix contains a short introduction to EJS. The work is enriched by a comprehensive collection of cosmological simulations as well as models from the Open Source Physics project, organized by subject area. Intended as a systematic collection of methods and materials for upper-secondary school teachers and as a course for students of physics and mathematics, the work facilitates hands-on and experiment-driven learning in higher mathematics.

Note: Frontmatter -- , Preface -- , Contents -- , Guide to simulation technique -- , 1 Introduction -- , 2 Physics and mathematics -- , 3 Numbers -- , 4 Sequences of numbers and series -- , 5 Functions and their infinitesimal properties -- , 6 Visualization of functions in the space of real numbers -- , 7 Visualization of functions in the space of complex numbers -- , 8 Vectors -- , 9 Ordinary differential equations -- , 10 Partial differential equations -- , 11 Appendix. Collection of physics simulations -- , 12 Conclusion , In English.

Language: English

DOI: 10.1515/9783110250077

URL: https://doi.org/10.1515/9783110250077

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FU Berlin

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Learning and teaching mathematics using simulations : plus 2000 examples from physics (2011)

Röß, Dieter 1932-

Berlin [u.a.] :de Gruyter,

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UID:

edocfu_BV042348136

Format: 1 Online-Ressource (XVII, 238 S.).

ISBN: 978-3-11-025007-7

Series Statement: De Gruyter textbook

Uniform Title: Mathematik mit Simulationen lehren und lernen

Note: Description based upon print version of record. - This is aunique, comprehensive and documented collection of simulations in mathematics and physics: More than 2000 simulations, offered on our webpage for comfortable use online. The book, written by an experienced teacher and practitioner, contains a complete introduction to mathematics and the documentation to the simulations. This is a great way to learn mathematics and physics. Suitable for courses in Mathetmatics for Engineering and Sciences. For questions about the simulations please contact service@degruyter.com

Additional Edition: Erscheint auch als Druck-Ausgabe ISBN 978-3-11-025005-3

Language: English

Keywords: Analysis ; Computersimulation ; Java ; Lehrbuch ; Computersimulation ; Java ; Physik ; Beispielsammlung

DOI: 10.1515/9783110250077

URL: Volltext (URL des Erstveröffentlichers)

Author information: Röß, Dieter 1932-

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Learning and teaching mathematics using simulations : plus 2000 examples from physics (2011)

Röss, Dieter, 1932-

Berlin ; : De Gruyter,

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UID:

edocfu_9959239242402883

Format: 1 online resource (257 p.)

Edition: 1st ed.

ISBN: 1-283-39992-X , 9786613399922 , 3-11-025007-1

Series Statement: De Gruyter textbook

Uniform Title: Mathematik mit Simulationen lehren und lernen.

Content: Mathematics course with 60 Java-based interactive mathematic simulations by the author Comprehensive and systematically organized collection of 2,000 Java-based physics simulations All simulations are runnable, and can be accessed both on- and offline Visualization of mathematic relationships Facilitates an experiment-based understanding of problems, including suggestions for your own mathematical experiments Calculation procedures can be adjusted in a variety of ways Introduction to simulation techniques with the EJS (Easy Java Simulation) tool Visual interface for simple and transparent modeling and programming Building block library for programming one's own simulations Quick access to simulations from links embedded in the digital text Mathematics is the language of physics and technology. Yet in the age of computers, mathematic skill is not based on mastery of arithmetic. Rather, it depends on understanding relationships in time and space, and expressing them with precise and clear formulas. In this regard, one cannot rely on the rote memorization of rules and formulas - insight and intuitive understanding are crucial. But how can this understanding be achieved in higher mathematics, which depends on abstract concepts such as complex numbers, real and complex infinite series, infinitesimal calculus, 2, 3, and 4 dimensional functions, conformal maps, vectors, and linear and nonlinear ordinary and partial differential equations? The author takes a highly practical approach to facilitating the insight essential for true learning in mathematics. Students can work directly with the simulation programs, can visualize relationships, and creatively interact with the calculation procedures. Proceeding in textbook fashion, the work makes use of a broad palette of multimedia tools, and features numerous interactive calculation programs for mathematical experimentation. Students merely have to select one of the many predefined examples and set the relevant parameters - and in a flash the results are graphically displayed in 2 or 3 dimensions. In addition, the specific functions used can be changed or even newly formulated according to user preferences. For example, a procedure developed for a fourth degree power function for the numerical calculation of zero points can be adapted for use with another function. Each simulation is accompanied by a detailed description, instructions for use, and numerous suggestions for experimentation. The mathematical simulations are based on the Easy Java Simulation (EJS) programming tool. All of the files developed with EJS are completely open and transparent. The user can even draw on the examples as building blocks for the development his or her own calculation procedures. The appendix contains a short introduction to EJS. The work is enriched by a comprehensive collection of cosmological simulations as well as models from the Open Source Physics project, organized by subject area. Intended as a systematic collection of methods and materials for upper-secondary school teachers and as a course for students of physics and mathematics, the work facilitates hands-on and experiment-driven learning in higher mathematics. The print version contains the electronic text and simulations for offline use. For questions concerning download or online access to the simulations, please contact service@degruyter.com.

Note: Description based upon print version of record. , Front matter -- , Preface -- , Contents -- , Guide to simulation technique -- , 1 Introduction -- , 2 Physics and mathematics -- , 3 Numbers -- , 4 Sequences of numbers and series -- , 5 Functions and their infinitesimal properties -- , 6 Visualization of functions in the space of real numbers -- , 7 Visualization of functions in the space of complex numbers -- , 8 Vectors -- , 9 Ordinary differential equations -- , 10 Partial differential equations -- , 11 Appendix. Collection of physics simulations -- , 12 Conclusion , English

Additional Edition: ISBN 3-11-025005-5

Language: English

DOI: 10.1515/9783110250077

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FU Berlin

Online Resource

Learning and Teaching Mathematics using Simulations : Plus 2000 Examples from Physics (2011)

Röss, Dieter,

Berlin ; : De Gruyter,

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Details

UID:

almahu_9949462115702882

Format: 1 online resource (238 p.)

ISBN: 9783110250077 , 9783110238570

Series Statement: De Gruyter Textbook

In: DGBA Backlist Complete English Language 2000-2014 PART1, De Gruyter, 9783110238570

In: DGBA Backlist Mathematics 2000-2014 (EN), De Gruyter, 9783110238471

In: DGBA Mathematics - 2000 - 2014, De Gruyter, 9783110637205

In: E-BOOK GESAMTPAKET / COMPLETE PACKAGE 2011, De Gruyter, 9783110261189

In: E-BOOK PACKAGE ENGLISH LANGUAGES TITLES 2011, De Gruyter, 9783110261233

In: E-BOOK PAKET SCIENCE TECHNOLOGY AND MEDICINE 2011, De Gruyter, 9783110261202

Additional Edition: ISBN 9783110250053

Language: English

DOI: 10.1515/9783110250077

URL: https://doi.org/10.1515/9783110250077

URL: https://www.degruyter.com/isbn/9783110250077

URL: Cover

URL: https://doi.org/10.1515/9783110250077

URL: https://www.degruyter.com/isbn/9783110250077

URL: Cover

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HU Berlin

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