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Why prove it again?[electronic resource] :alternative proofs in mathematical practice /

紀錄類型:	書目-語言資料,印刷品 : Monograph/item
杜威分類號:	511.3
書名/作者:	Why prove it again? : alternative proofs in mathematical practice // by John W. Dawson, Jr.
作者:	Dawson, John W.
出版者:	Cham : : Springer International Publishing :, 2015.
面頁冊數:	xi, 204 p. : : ill., digital ;; 24 cm.
Contained By:	Springer eBooks
標題:	Proof theory.
標題:	Mathematics.
標題:	History of Mathematical Sciences.
標題:	Geometry.
標題:	Algebra.
標題:	Analysis.
標題:	Topology.
ISBN:	9783319173689 (electronic bk.)
ISBN:	9783319173672 (paper)
內容註:	Proofs in Mathematical Practice -- Motives for Finding Alternative Proofs -- Sums of Integers -- Quadratic Surds -- The Pythagorean Theorem -- The Fundamental Theorem of Arithmetic -- The Infinitude of the Primes -- The Fundamental Theorem of Algebra -- Desargues's Theorem -- The Prime Number Theorem -- The Irreducibility of the Cyclotomic Polynomials -- The Compactness of First-Order Languages -- Other Case Studies.
摘要、提要註:	This monograph considers several well-known mathematical theorems and asks the question, "Why prove it again?" while examining alternative proofs. It explores the different rationales mathematicians may have for pursuing and presenting new proofs of previously established results, as well as how they judge whether two proofs of a given result are different. While a number of books have examined alternative proofs of individual theorems, this is the first that presents comparative case studies of other methods for a variety of different theorems. The author begins by laying out the criteria for distinguishing among proofs and enumerates reasons why new proofs have, for so long, played a prominent role in mathematical practice. He then outlines various purposes that alternative proofs may serve. Each chapter that follows provides a detailed case study of alternative proofs for particular theorems, including the Pythagorean Theorem, the Fundamental Theorem of Arithmetic, Desargues' Theorem, the Prime Number Theorem, and the proof of the irreducibility of cyclotomic polynomials. Why Prove It Again? will appeal to a broad range of readers, including historians and philosophers of mathematics, students, and practicing mathematicians. Additionally, teachers will find it to be a useful source of alternative methods of presenting material to their students.
電子資源:	http://dx.doi.org/10.1007/978-3-319-17368-9

Why prove it again?[electronic resource] :alternative proofs in mathematical practice /
Dawson, John W.

Why prove it again?alternative proofs in mathematical practice /[electronic resource] :by John W. Dawson, Jr. - Cham :Springer International Publishing :2015. - xi, 204 p. :ill., digital ;24 cm.

Proofs in Mathematical Practice -- Motives for Finding Alternative Proofs -- Sums of Integers -- Quadratic Surds -- The Pythagorean Theorem -- The Fundamental Theorem of Arithmetic -- The Infinitude of the Primes -- The Fundamental Theorem of Algebra -- Desargues's Theorem -- The Prime Number Theorem -- The Irreducibility of the Cyclotomic Polynomials -- The Compactness of First-Order Languages -- Other Case Studies.

This monograph considers several well-known mathematical theorems and asks the question, "Why prove it again?" while examining alternative proofs. It explores the different rationales mathematicians may have for pursuing and presenting new proofs of previously established results, as well as how they judge whether two proofs of a given result are different. While a number of books have examined alternative proofs of individual theorems, this is the first that presents comparative case studies of other methods for a variety of different theorems. The author begins by laying out the criteria for distinguishing among proofs and enumerates reasons why new proofs have, for so long, played a prominent role in mathematical practice. He then outlines various purposes that alternative proofs may serve. Each chapter that follows provides a detailed case study of alternative proofs for particular theorems, including the Pythagorean Theorem, the Fundamental Theorem of Arithmetic, Desargues' Theorem, the Prime Number Theorem, and the proof of the irreducibility of cyclotomic polynomials. Why Prove It Again? will appeal to a broad range of readers, including historians and philosophers of mathematics, students, and practicing mathematicians. Additionally, teachers will find it to be a useful source of alternative methods of presenting material to their students.

ISBN: 9783319173689 (electronic bk.)

Standard No.: 10.1007/978-3-319-17368-9doiSubjects--Topical Terms:

433980
Proof theory.

LC Class. No.: QA9.54

Dewey Class. No.: 511.3

Why prove it again?[electronic resource] :alternative proofs in mathematical practice /
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520 $a This monograph considers several well-known mathematical theorems and asks the question, "Why prove it again?" while examining alternative proofs. It explores the different rationales mathematicians may have for pursuing and presenting new proofs of previously established results, as well as how they judge whether two proofs of a given result are different. While a number of books have examined alternative proofs of individual theorems, this is the first that presents comparative case studies of other methods for a variety of different theorems. The author begins by laying out the criteria for distinguishing among proofs and enumerates reasons why new proofs have, for so long, played a prominent role in mathematical practice. He then outlines various purposes that alternative proofs may serve. Each chapter that follows provides a detailed case study of alternative proofs for particular theorems, including the Pythagorean Theorem, the Fundamental Theorem of Arithmetic, Desargues' Theorem, the Prime Number Theorem, and the proof of the irreducibility of cyclotomic polynomials. Why Prove It Again? will appeal to a broad range of readers, including historians and philosophers of mathematics, students, and practicing mathematicians. Additionally, teachers will find it to be a useful source of alternative methods of presenting material to their students.
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