Companion Encyclopedia of the History and Philosophy of the Mathematical SciencesIvor Grattan-Guinness Routledge, 11 сент. 2002 г. - Всего страниц: 1840 * Examines the history and philosophy of the mathematical sciences in a cultural context, tracing their evolution from ancient times up to the twentieth century * 176 articles contributed by authors of 18 nationalities * Chronological table of main events in the development of mathematics * Fully integrated index of people, events and topics * Annotated bibliographies of both classic and contemporary sources * Unique coverage of Ancient and non-Western traditions of mathematics |
Результаты поиска по книге
Результаты 1 – 5 из 78
Стр.
Ivor Grattan-Guinness. First publishedin 1994 Reprinted in1994 by Routledge 2ParkSquare, MiltonPark, Abingdon, Oxon ... Grattan Guinness,I. QA21.E57 1992 510′.9–dc20 92–13707 CIP ISBN 0–415–03785–9 (set) 0415–09238–8(Vol. 1) 0415–09239–6 ...
Ivor Grattan-Guinness. First publishedin 1994 Reprinted in1994 by Routledge 2ParkSquare, MiltonPark, Abingdon, Oxon ... Grattan Guinness,I. QA21.E57 1992 510′.9–dc20 92–13707 CIP ISBN 0–415–03785–9 (set) 0415–09238–8(Vol. 1) 0415–09239–6 ...
Стр.
... Grattan Guinness 4.3 Infinite seriesand solutions ofordinary differential equations, 1670–1770 L.Feigenbaum 4.4 Special functions I. GrattanGuinness 4.5 Elliptic integrals and functions Roger Cooke 4.6 Abelian integrals Roger Cooke 4.7 ...
... Grattan Guinness 4.3 Infinite seriesand solutions ofordinary differential equations, 1670–1770 L.Feigenbaum 4.4 Special functions I. GrattanGuinness 4.5 Elliptic integrals and functions Roger Cooke 4.6 Abelian integrals Roger Cooke 4.7 ...
Стр.
Ivor Grattan-Guinness. Nicolas D. Goodman 5.10 Algorithms and algorithmic thinking through the ages Peter Schreiber ... Grattan Guinness 7.6 Projective geometry J.J.Gray 7.7 Line geometry David E. Rowe 7.8 Thephilosophy of geometry to ...
Ivor Grattan-Guinness. Nicolas D. Goodman 5.10 Algorithms and algorithmic thinking through the ages Peter Schreiber ... Grattan Guinness 7.6 Projective geometry J.J.Gray 7.7 Line geometry David E. Rowe 7.8 Thephilosophy of geometry to ...
Стр.
Извините, доступ к содержанию этой страницы ограничен..
Извините, доступ к содержанию этой страницы ограничен..
Стр.
Извините, доступ к содержанию этой страницы ограничен..
Извините, доступ к содержанию этой страницы ограничен..
Содержание
David A King | |
technology and machines Eberhard Knobloch | |
mathematics A G Molland | |
Part 3Calculus and mathematical analysis | |
J Lützen | |
of trigonometry and its functions I Grattan | |
3 Infinite seriesand solutions ofordinary | |
Detection and approximationI | |
6 Projective geometry J J Gray 7 7 Line | |
Dauben | |
G Fraser | |
18Astronomical navigation Derek Howse | |
Physics and mathematical physics and electrical | |
optics N Kipnis | |
Tensors | |
13Relativity C W Kilmister 9 14Statistical mechanics StephenG | |
Logics set theories and the foundations | |
logic from Boole to Schröder 18401900 | |
R Garciadiego | |
Goodman | |
Russ | |
from Cardano to Galois 1540 | |
VOLUME 2 | |
and analytic geometry J J Gray | |
nonEuclidean geometry J J Gray | |
17 Crystallography E Scholz | |
Part 10Probability and statistics and the social sciences | |
Hunger Parshall and David E Rowe | |
mathematics H Wussing | |
Ascher and R Ascher | |
ratioRoger HerzFischler 12 5 Numerology and gematria I GrattanGuinness | |
to mathematics | |
sources Albert C Lewis | |
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 ..., Том 2 I. Grattan-Guinness Ограниченный просмотр - 2003 |
Часто встречающиеся слова и выражения
algebra algorithm analysis analytic andthe Arabic Archimedes arithmetic asthe astronomy axiomatization axioms Babylonian mathematics Bernoulli Bibliography bythe calculations Cambridge Cantor Cauchy Chinese mathematics coefficients complex numbers computation concept continuous functions convergence curve d’Alembert David Hilbert Dedekind defined derived determined differential equations elliptic elliptic functions Euclid Euler example expressed finite firstorder formula Fourier Fourier series fractions fromthe functions fundamental Gauss geometry Gödel GrattanGuinness Greek Greek mathematics Hilbert History historyof important infinite inhis integral inthe introduced Joseph Louis Lagrange Lagrange Leibniz Leonhard Euler linear logarithms logic mathematical logic mathematicians mathematics matrix medieval method modern multiplication Newton nomogram notation numbers ofthe onthe operations philosophical polynomial problem properties propositions published quintic equation real numbers representation Riemann roots Sciences set theory socalled solution solving suchas symbols thatthe thefirst theorem theoryof tobe tothe tradition transformation translation treatise trigonometric University Press values variables Weierstrass withthe