Mathematical Expeditions: Chronicles by the ExplorersSpringer Science & Business Media, 1 Δεκ 2013 - 278 σελίδες This book contains the stories of five mathematical journeys into new realms, told through the writings of the explorers themselves. Some were guided by mere curiosity and the thrill of adventure, while others had more practical motives. In each case the outcome was a vast expansion of the known mathematical world and the realization that still greater vistas remained to be explored. The authors tell these stories by guiding the reader through the very words of the mathematicians at the heart of these events, and thereby provide insight into the art of approaching mathematical problems. The book can be used in a variety of ways. The five chapters are completely independent, each with varying levels of mathematical sophistication. The book will be enticing to students, to instructors, and to the intellectually curious reader. By working through some of the original sources and supplemental exercises, which discuss and solve - or attempt to solve - a great problem, this book helps the reader discover the roots of modern problems, ideas, and concepts, even whole subjects. Students will also see the obstacles that earlier thinkers had to clear in order to make their respective contributions to five central themes in the evolution of mathematics. |
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Αποτελέσματα 1 - 5 από τα 17.
Σελίδα 15
... geometry in 1823. Subsequent research led him down the exact same path as Gauss and Bolyai had followed . His new ... hyperbolic geometry , as it is now known , fell in large part to Lobachevsky , who was the first to publish his account ...
... geometry in 1823. Subsequent research led him down the exact same path as Gauss and Bolyai had followed . His new ... hyperbolic geometry , as it is now known , fell in large part to Lobachevsky , who was the first to publish his account ...
Σελίδα 16
... geometry is just the Euclidean one . The same is true for a surface that can be deformed , without stretching , into ... hyperbolic geometry and the HAA [ 18 , pp . 130 ff . ] [ 78 , Ch . 12 ] . As Riemann's ideas became accepted , so ...
... geometry is just the Euclidean one . The same is true for a surface that can be deformed , without stretching , into ... hyperbolic geometry and the HAA [ 18 , pp . 130 ff . ] [ 78 , Ch . 12 ] . As Riemann's ideas became accepted , so ...
Σελίδα 17
... hyperbolic geometry , a sort of faithful projection of the hyperbolic plane onto part of a Euclidean plane , in such a way that parallels , triangles , etc. in hyperbolic geometry corresponded to some type of figure in Eu- clidean ...
... hyperbolic geometry , a sort of faithful projection of the hyperbolic plane onto part of a Euclidean plane , in such a way that parallels , triangles , etc. in hyperbolic geometry corresponded to some type of figure in Eu- clidean ...
Σελίδα 31
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Σελίδα 32
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Περιεχόμενα
1 | |
Taming the Infinite | 54 |
3 | 69 |
Calculating Areas and Volumes | 89 |
1 | 95 |
4 | 123 |
5 | 129 |
7 | 150 |
Fermats Last Theorem | 156 |
The Search for an Elusive Formula | 204 |
References | 259 |
Credits | 269 |
Άλλες εκδόσεις - Προβολή όλων
Mathematical Expeditions: Chronicles by the Explorers Reinhard Laubenbacher,David Pengelley Περιορισμένη προεπισκόπηση - 2000 |
Mathematical Expeditions Reinhard Laubenbacher,David Pengelley Δεν υπάρχει διαθέσιμη προεπισκόπηση - 2014 |
Mathematical Expeditions: Chronicles by the Explorers Reinhard Laubenbacher,David Pengelley Δεν υπάρχει διαθέσιμη προεπισκόπηση - 1998 |
Συχνά εμφανιζόμενοι όροι και φράσεις
aggregate algebraic analysis angle sum Archimedes arithmetic Axiom Axiom of Choice called Cantor Cardano cardinal number Cauchy Cauchy's Cavalieri's century coefficients complex numbers Continuum Hypothesis cube curve definition divisor elements equal equations of degree equivalent Euclid Euclid's Euclid's Elements Euclidean Euclidean geometry Euler Exercise exponent factors Fermat equation Fermat's Last Theorem FIGURE finite follows formula functions Fundamental Theorem Galois Gauss Germain given Greek hyperbolic geometry Hypothesis indivisibles infinite sets infinitesimal Lagrange Legendre Leibniz Lemma Lobachevsky mathematicians mathematics method natural numbers non-Euclidean non-Euclidean geometry number theory one-to-one correspondence parabola parallel postulate perpendicular PHOTO Poincaré polynomial prime numbers problem proof proposed equation Proposition prove Pythagorean triples Quadrature rational numbers real numbers reduced equation relatively prime result right angles roots segment set theory sides solution solve square straight line tangent triangle FDC values variable Zermelo's