Wolfram Mathematica (usually callit Mathematica) is a modern technical computin system made bi Wolfram Research.[13][14][15][16]
Quick Facts Developer(s), Ineetial release ...
Wolfram Mathematica |
Developer(s) | Wolfram Research |
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Ineetial release | Juin 23, 1988; 36 years ago (1988-06-23)[1] |
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Written in | Wolfram Language,[2] C/C++, Java[3] |
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Platform | Windows (7, 8, 10), macOS, Linux, Raspbian, online service.[4] All platforms support 64-bit implementations.[5] (list) |
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Available in | English, Cheenese, Japanese |
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Teep | numerical analysis[6], statistics |
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License | Proprietary |
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Website | www.wolfram.com/mathematica/ |
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Quick Facts Paradigm(s), Appeared in ...
Wolfram LanguageParadigm(s) | Multi-paradigm: term-rewriting, functional |
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Appeared in | 1988 |
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Designed bi | Stephen Wolfram |
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Developer | Wolfram Research |
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Stable release | 12.1[7] (Mairch 18, 2020; 4 years ago (2020-03-18)) |
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Major implementations | Mathematica, Wolfram|One, Mathics, Expreduce, MockMMA |
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Influenced bi |
- C
- C++
- FORTRAN
- Prolog
- Smalltalk[8]
- Symbolic Manipulation Program[9]
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Influenced | |
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OS | Cross-platform |
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License | Proprietary (available at no-cost for some platforms)[12] |
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Usual filename extensions | .nb, .m, .wl |
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Wabsteid | www.wolfram.com/language/ |
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Today, Wolfram Mathematica is usit for the followin purposes:
Syne 1988, Wolfram Research has releasit the followin versions o Wolfram Mathematica:[26]
- 1.0 – June 23, 1988[27][28][29][30]
- 1.1 – October 31, 1988
- 1.2 – August 1, 1989[30][31]
- 2.0 – January 15, 1991[30][32]
- 2.1 – June 15, 1992[30]
- 2.2 – June 1, 1993[30][33]
- 3.0 – September 3, 1996[34]
- 4.0 – May 19, 1999[30][35]
- 4.1 – November 2, 2000[30]
- 4.2 – November 1, 2002[30]
- 5.0 – June 12, 2003[30][36]
- 5.1 – October 25, 2004[30][37]
- 5.2 – June 20, 2005[30][38]
- 6.0 – May 1, 2007[39][40]
- 7.0 – November 18, 2008[41]
- 8.0 – November 15, 2010[42]
- 9.0 – November 28, 2012[43]
- 10.0 – July 9, 2014[44]
- 10.1 – March 30, 2015[45]
- 10.2 – July 14, 2015[46]
- 10.3 – October 15, 2015
- 10.4 – March 2, 2016
- 11.0.0 – August 8, 2016[47]
- 11.0.1 – September 28, 2016
- 11.1 – March 16, 2017[48]
- 11.1.1 – April 25, 2017
- 11.2 – September 14, 2017[49]
- 11.3 – March 8, 2018[50]
- 12.0 – April 16, 2019[51]
- 12.1 - March 18, 2020[52]
This system is made wi the Wolfram language (programmin leid namit after Stephen Wolfram).
Cotta, R. M., Leonardo, S. D. B., & Mikhailov, M. D. (2001). Applied Numerical Analysis with Mathematica. Editora E-papers.
Bezanson, Jeff; Karpinski, Stefan; Shah, Viral; Edelman, Alan (14 Februar 2012). "Why We Created Julia". Julia Language. Retrieved 1 December 2016. Cheung, C. K., Keough, G. E., Gross, R. H., & Landraitis, C. (2005). Getting started with Mathematica. Wiley.
Mangano, S. (2010). Mathematica Cookbook: Building Blocks for Science, Engineering, Finance, Music, and More. " O'Reilly Media, Inc.".
Gass, R. (1997). Mathematica for scientists and engineers: using Mathematica to do science. Prentice Hall PTR.
Shaw, W. T., & Tigg, J. (1993). Applied Mathematica: getting started, getting it done. Addison-Wesley Longman Publishing Co., Inc..
Maeder, R. E. (2000). Computer Science with MATHEMATICA®: Theory and Practice for Science, Mathematics, and Engineering. Cambridge University Press.
Abbena, E., Salamon, S., & Gray, A. (2017). Modern differential geometry of curves and surfaces with Mathematica. CRC Press.
Davis, H. T., & Thomson, K. T. (2000). Linear Algebra and Linear Operators in Engineering: With Applications in Mathematica®. Elsevier.
Baumann, G. (2013). Symmetry analysis of differential equations with Mathematica®. Springer Science & Business Media.
Abell, M. L., & Braselton, J. P. (2016). Differential equations with Mathematica. Academic Press.
Gray, A., Mezzino, M., & Pinsky, M. A. (1997). Introduction to ordinary differential equations with Mathematica: an integrated multimedia approach. Springer.
Ross, C. C. (2013). Differential equations: an introduction with Mathematica®. Springer Science & Business Media.
Kythe, P. K., Schäferkotter, M. R., & Puri, P. (2018). Partial differential equations and Mathematica. CRC Press.
Ganzha, V. G. E., & Vorozhtsov, E. V. (1996). Numerical solutions for partial differential equations: problem solving using Mathematica (Vol. 7). CRC Press.