Companion Encyclopedia of the History and Philosophy of the Mathematical Sciences, Том 2I. Grattan-Guinness JHU Press, 2003 - Всего страниц: 1806 The second book of a two-volume encyclopaedia which makes the vast and varied history of mathematics available in a reasonably compact format. The book offers in-depth accounts of the principal areas of activity up to the 1930s and touches on related topics, including ethnomathematics. |
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Стр. 835
... Introduction Part 1 Ancient and non - Western traditions 1.0 Introduction 1.1 Babylonian mathematics Jens Høyrup 1.2 Egyptian mathematics C. S. Roero 1.3 Greek mathematics to AD 300 Alexander Jones 1.4 Greek applied mathematics ...
... Introduction Part 1 Ancient and non - Western traditions 1.0 Introduction 1.1 Babylonian mathematics Jens Høyrup 1.2 Egyptian mathematics C. S. Roero 1.3 Greek mathematics to AD 300 Alexander Jones 1.4 Greek applied mathematics ...
Стр. 837
... Introduction 4.1 The binomial theorem M. Pensivy 489 491 492 4.2 An overview of trigonometry and its functions I. Grattan - Guinness 499 4.3 Infinite series and solutions of ordinary differential equations , 1670-1770 L. Feigenbaum 504 ...
... Introduction 4.1 The binomial theorem M. Pensivy 489 491 492 4.2 An overview of trigonometry and its functions I. Grattan - Guinness 499 4.3 Infinite series and solutions of ordinary differential equations , 1670-1770 L. Feigenbaum 504 ...
Стр. 838
... Introduction 843 845 7.1 Algebraic and analytic geometry J. J. Gray 847 7.2 Curves J. J. Gray 860 7.3 Regular polyhedra Branko Grünbaum 866 7.4 Euclidean and non - Euclidean geometry J. J. Gray 877 7.5 Descriptive geometry Kirsti ...
... Introduction 843 845 7.1 Algebraic and analytic geometry J. J. Gray 847 7.2 Curves J. J. Gray 860 7.3 Regular polyhedra Branko Grünbaum 866 7.4 Euclidean and non - Euclidean geometry J. J. Gray 877 7.5 Descriptive geometry Kirsti ...
Стр. 841
... Introduction 1541 1543 Ethnomathematics M. Ascher and R. Ascher 1545 12.2 Mathematical games Rüdiger Thiele 1555 12.3 Recreational mathematics David Singmaster 1568 12.4 The Golden Number , and division in extreme and mean ratio Roger ...
... Introduction 1541 1543 Ethnomathematics M. Ascher and R. Ascher 1545 12.2 Mathematical games Rüdiger Thiele 1555 12.3 Recreational mathematics David Singmaster 1568 12.4 The Golden Number , and division in extreme and mean ratio Roger ...
Стр. 863
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Содержание
Calculus and mathematical analysis 287 | 845 |
GrattanGuinness | 887 |
VOLUME 1 | 908 |
Preface to the Johns Hopkins Edition xiii | 994 |
GrattanGuinness | 1069 |
Physics and mathematical physics and electrical | 1139 |
T B Romanovskaya | 1261 |
Glenn Shafer | 1293 |
Roger Cooke | 1477 |
1722 | |
Другие издания - Просмотреть все
Companion Encyclopedia of the History and Philosophy of the Mathematical ... Ivor Grattan-Guiness Ограниченный просмотр - 2004 |
Companion Encyclopedia of the History and Philosophy of the Mathematical ... Ivor Grattan-Guiness Ограниченный просмотр - 2004 |
Companion Encyclopedia of the History and Philosophy of the Mathematical ... Ivor Grattan-Guinness Ограниченный просмотр - 2002 |
Часто встречающиеся слова и выражения
algebraic algebraic geometry analysis angles applied astronomer became Bernoulli BIBLIOGRAPHY calculation Cambridge Carl Friedrich Gauss classical complex concept construction coordinates curve Daniel Bernoulli defined derived descriptive geometry determined developed differential equations dimension dynamics early eighteenth century elastic engineering equilibrium error Euclidean geometry Euler example Figure fluid force formula French function German given Grattan-Guinness history of mathematics idea important integral introduced Joseph Louis Lagrange Journal Lagrange Laplace later Leonhard Euler line geometry linear London manifolds mathematicians mechanics methods modern motion Newton nineteenth century non-Euclidean geometry observations optics original parallel postulate Paris philosophy physical Pierre Simon Laplace plane Poincaré polygon polyhedra principle probabilistic probability theory problem projective geometry published quantum Repr Riemann rotation showed solution space squares statistics structure surface symmetry theorem tion topology transformations University Press variables vector velocity York
Ссылки на эту книгу
Proofs and Fundamentals: A First Course in Abstract Mathematics Ethan D. Bloch Недоступно для просмотра - 2000 |
Mathematics in Berlin Heinrich Begehr,Helmut Koch,Jürg Kramer,Norbert Schappacher,Ernst-Jochen Thiele Ограниченный просмотр - 1998 |