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＜電子ブック＞
Two Millennia of Mathematics : From Archimedes to Gauss / by George M. Phillips
(CMS Books in Mathematics, Ouvrages de mathématiques de la SMC. ISSN:21974152)

版	1st ed. 2000.
出版者	(New York, NY : Springer New York : Imprint: Springer)
出版年	2000
本文言語	英語
大きさ	XII, 223 p : online resource
著者標目	*Phillips, George M author SpringerLink (Online service)
件　名	LCSH:Mathematics LCSH:History FREE:History of Mathematical Sciences
一般注記	1 From Archimedes to Gauss -- 1.1 Archimedes and Pi -- 1.2 Variations on a Theme -- 1.3 Playing a Mean Game -- 1.4 Gauss and the AGM -- 2 Logarithms -- 2.1 Exponential Functions -- 2.2 Logarithmic Functions -- 2.3 Napier and Briggs -- 2.4 The Logarithm as an Area -- 2.5 Further Historical Notes -- 3 Interpolation -- 3.1 The Interpolating Polynomial -- 3.2 Newton’s Divided Differences -- 3.3 Finite Differences -- 3.4 Other Differences -- 3.5 Multivariate Interpolation -- 3.6 The Neville-Aitken Algorithm -- 3.7 Historical Notes -- 4 Continued Fractions -- 4.1 The Euclidean Algorithm -- 4.2 Linear Recurrence Relations -- 4.3 Fibonacci Numbers -- 4.4 Continued Fractions -- 4.5 Historical Notes -- 5 More Number Theory -- 5.1 The Prime Numbers -- 5.2 Congruences -- 5.3 Quadratic Residues -- 5.4 Diophantine Equations -- 5.5 Algebraic Integers -- 5.6 The equation x3 + y3 = z3 -- 5.7 Euler and Sums of Cubes -- References This book is intended for those who love mathematics, including under­ graduate students of mathematics, more experienced students, and the vast number of amateurs, in the literal sense of those who do something for the love of it. I hope it will also be a useful source of material for those who teach mathematics. It is a collection of loosely connected topics in areas of mathematics that particularly interest me, ranging over the two millennia from the work of Archimedes, who died in the year 212 Be, to the Werke of Gauss, who was born in 1777, although there are some references outside this period. In view of its title, I must emphasize that this book is certainly not pretending to be a comprehensive history of the mathematics of this period, or even a complete account of the topics discussed. However, every chapter is written with the history of its topic in mind. It is fascinating, for example, to follow how both Napier and Briggs constructed their log­ arithms before many of the most relevant mathematical ideas had been discovered. Do I really mean "discovered"? There is an old question, "Is mathematics created or discovered?" Sometimes it seems a shame not to use the word "create" in praise of the first mathematician to write down some outstanding result. Yet the inner harmony that sings out from the best of mathematics seems to demand the word "discover HTTP:URL=https://doi.org/10.1007/978-1-4612-1180-8

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