Mathematics and Its History
ISBN: 9781441960528 | 144196052X
Edition: 3rdFormat: Hardcover
Publisher: Textstream
Pub. Date: 7/1/2010
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This third edition includes new chapters on simple groups and combinatorics, and new sections on several topics, including the Poincar conjecture. The book has also been enriched by added exercises. Book jacket.
From a review of the second edition:"This book covers many interesting topics not usually covered in a present day undergraduate course, as well as certain basic topics such as the development of the calculus and the solution of polynomial equations. The fact that the topics are introduced in their historic... MORE
From a review of the second edition:"This book covers many interesting topics not usually covered in a present day undergraduate course, as well as certain basic topics such as the development of the calculus and the solution of polynomial equations. The fact that the topics are introduced in their historic... MORE
| Preface to the Third Edition | p. vii |
| Preface to the Second Edition | p. ix |
| Preface to the First Edition | p. xi |
| The Theorem of Pythagoras | p. 1 |
| Arithmetic and Geometry | p. 2 |
| Pythagorean Triples | p. 4 |
| Rational Points on the Circle | p. 6 |
| Right-Angled Triangles | p. 9 |
| Irrational Numbers | p. 11 |
| The Definition of Distance | ... MOREp. 13 |
| Biographical Notes: Pythagoras | p. 15 |
| Greek Geometry | p. 17 |
| The Deductive Method | p. 18 |
| The Regular Polyhedra | p. 20 |
| Ruler and Compass Constructions | p. 25 |
| Conic Sections | p. 28 |
| Higher-Degree Curves | p. 31 |
| Biographical Notes: Euclid | p. 35 |
| Greek Number Theory | p. 37 |
| The Role of Number Theory | p. 38 |
| Polygonal, Prime, and Perfect Numbers | p. 38 |
| The Euclidean Algorithm | p. 41 |
| Pell's Equation | p. 44 |
| The Chord and Tangent Methods | p. 48 |
| Biographical Notes: Diophantus | p. 50 |
| Infinity in Greek Mathematics | p. 53 |
| Fear of Infinity | p. 54 |
| Eudoxus's Theory of Proportions | p. 56 |
| The Method of Exhaustion | p. 58 |
| The Area of a Parabolic Segment | p. 63 |
| Biographical Notes: Archimedes | p. 66 |
| Number Theory in Asia | p. 69 |
| The Euclidean Algorithm | p. 70 |
| The Chinese Remainder Theorem | p. 71 |
| Linear Diophantine Equations | p. 74 |
| Pell's Equation in Brahmagupta | p. 75 |
| Pell's Equation in Bhâskara II | p. 78 |
| Rational Triangles | p. 81 |
| Biographical Notes: Brahmagupta and Bhâskara | p. 84 |
| Polynomial Equations | p. 87 |
| Algebra | p. 88 |
| Linear Equations and Elimination | p. 89 |
| Quadratic Equations | p. 92 |
| Quadratic Irrationals | p. 95 |
| The Solution of the Cubic | p. 97 |
| Angle Division | p. 99 |
| Higher-Degree Equations | p. 101 |
| Biographical Notes: Tartaglia, Cardano, and Viète | p. 103 |
| Analytic Geometry | p. 109 |
| Steps Toward Analytic Geometry | p. 110 |
| Fermat and Descartes | p. 111 |
| Algebraic Curves | p. 112 |
| Newton's Classification of Cubics | p. 115 |
| Construction of Equations, Bézout's Theorem | p. 118 |
| The Arithmetization of Geometry | p. 120 |
| Biographical Notes: Descartes | p. 122 |
| Projective Geometry | p. 127 |
| Perspective | p. 128 |
| Anamorphosis | p. 131 |
| Desargues's Projective Geometry | p. 132 |
| The Projective View of Curves | p. 136 |
| The Projective Plane | p. 141 |
| The Projective Line | p. 144 |
| Homogeneous Coordinates | p. 147 |
| Pascal's Theorem | p. 150 |
| Biographical Notes: Desargues and Pascal | p. 153 |
| Calculus | p. 157 |
| What Is Calculus? | p. 158 |
| Early Results on Areas and Volumes | p. 159 |
| Maxima, Minima, and Tangents | p. 162 |
| The Arithmetica Infinitorum of Wallis | p. 164 |
| Newton's Calculus of Series | p. 167 |
| The Calculus of Leibniz | p. 170 |
| Biographical Notes: Wallis, Newton, and Leibniz | p. 172 |
| Infinite Series | p. 181 |
| Early Results | p. 182 |
| Power Series | p. 185 |
| An Interpolation on Interpolation | p. 188 |
| Summation of Series | p. 189 |
| Fractional Power Series | p. 191 |
| Generating Functions | p. 192 |
| The Zeta Function | p. 195 |
| Biographical Notes: Gregory and Euler | p. 197 |
| The Number Theory Revival | p. 203 |
| Between Diophantus and Fermat | p. 204 |
| Fermat's Little Theorem | p. 207 |
| Fermat's Last Theorem | p. 210 |
| Rational Right-Angled Triangles | p. 211 |
| Rational Points on Cubics of Genus 0 | p. 215 |
| Rational Points on Cubics of Genus 1 | p. 218 |
| Biographical Notes: Fermat | p. 222 |
| Elliptic Functions | p. 225 |
| Elliptic and Circular Functions | p. 226 |
| Parameterization of Cubic Curves | p. 226 |
| Elliptic Integrals | p. 228 |
| Doubling the Arc of the Lemniscate | p. 230 |
| General Addition Theorems | p. 232 |
| Elliptic Functions | p. 234 |
| A Postscript on the Lemniscate | p. 236 |
| Biographical Notes: Abel and Jacobi | p. 237 |
| Mechanics | p. 243 |
| Mechanics Before Calculus | p. 244 |
| The Fundamental Theorem of Motion | p. 246 |
| Kepler's Laws and the Inverse Square Law | p. 249 |
| Celestial Mechanics | p. 253 |
| Mechanical Curves | p. 255 |
| The Vibrating String | p. 261 |
| Hydrodynamics | p. 265 |
| Biographical Notes: The Bernoullis | p. 267 |
| Complex Numbers in Algebra | p. 275 |
| Impossible Numbers | p. 276 |
| Quadratic Equations | p. 276 |
| Cubic Equations | p. 277 |
| Wallis's Attempt at Geometric Representation | p. 279 |
| Angle Division | p. 281 |
| The Fundamental Theorem of Algebra | p. 285 |
| The Proofs of d' Alembert and Gauss | p. 287 |
| Biographical Notes: d' Alembert | p. 291 |
| Complex Numbers and Curves | p. 295 |
| Roots and Intersections | p. 296 |
| The Complex Projective Line | p. 298 |
| Branch Points | p. 301 |
| Topology of Complex Projective Curves | p. 304 |
| Biographical Notes: Riemann | p. 308 |
| Complex Numbers and Functions | p. 313 |
| Complex Functions | p. 314 |
| Conformal Mapping | p. 318 |
| Cauchy's Theorem | p. 319 |
| Double Periodicity of Elliptic Functions | p. 322 |
| Elliptic Curves | p. 325 |
| Uniformization | p. 329 |
| Biographical Notes: Lagrange and Cauchy | p. 331 |
| Differential Geometry | p. 335 |
| Transcendental Curves | p. 336 |
| Curvature of Plane Curves | p. 340 |
| Curvature of Surfaces | p. 343 |
| Surfaces of Constant Curvature | p. 344 |
| Geodesies | p. 346 |
| The Gauss-Bonnet Theorem | p. 348 |
| Biographical Notes: Harriot and Gauss | p. 352 |
| Non-Euclidean Geometry | p. 359 |
| The Parallel Axiom | p. 360 |
| Spherical Geometry | p. 363 |
| Geometry of Bolyai and Lobachevsky | p. 365 |
| Beltrami's Projective Model | p. 366 |
| Beltrami's Conformal Models | p. 369 |
| The Complex Interpretations | p. 374 |
| Biographical Notes: Bolyai and Lobachevsky | p. 378 |
| Group Theory | p. 383 |
| The Group Concept | p. 384 |
| Subgroups and Quotients | p. 387 |
| Permutations and Theory of Equations | p. 389 |
| Permutation Groups | p. 393 |
| Polyhedral Groups | p. 395 |
| Groups and Geometries | p. 398 |
| Combinatorial Group Theory | p. 401 |
| Finite Simple Groups | p. 404 |
| Biographical Notes: Galois | p. 409 |
| Hypercomplex Numbers | p. 415 |
| Complex Numbers in Hindsight | p. 416 |
| The Arithmetic of Pairs | p. 417 |
| Properties of + and x | p. 419 |
| Arithmetic of Triples and Quadruples | p. 421 |
| Quaternions, Geometry, and Physics | p. 424 |
| Octonions | p. 428 |
| Why C, H, and O Are Special | p. 430 |
| Biographical Notes: Hamilton | p. 433 |
| Algebraic Number Theory | p. 439 |
| Algebraic Numbers | p. 440 |
| Gaussian Integers | p. 442 |
| Algebraic Integers | p. 445 |
| Ideals | p. 448 |
| Ideal Factorization | p. 452 |
| Sums of Squares Revisited | p. 454 |
| Rings and Fields | p. 457 |
| Biographical Notes: Dedekind, Hilbert, and Noether | p. 459 |
| Topology | p. 467 |
| Geometry and Topology | p. 468 |
| Polyhedron Formulas of Descartes and Euler | p. 469 |
| The Classification of Surfaces | p. 471 |
| Descartes and Gauss-Bonnet | p. 474 |
| Euler Characteristic and Curvature | p. 477 |
| Surfaces and Planes | p. 479 |
| The Fundamental Group | p. 484 |
| The Poincaré Conjecture | p. 486 |
| Biographical Notes: Poincaré | p. 492 |
| Simple Groups | p. 495 |
| Finite Simple Groups and Finite Fields | p. 496 |
| The Mathieu Groups | p. 498 |
| Continuous Groups | p. 501 |
| Simplicity of SO(3) | p. 505 |
| Simple Lie Groups and Lie Algebras | p. 509 |
| Finite Simple Groups Revisited | p. 513 |
| The Monster | p. 515 |
| Biographical Notes: Lie, Killing, and Cartan | p. 518 |
| Sets, Logic, and Computation | p. 525 |
| Sets | p. 526 |
| Ordinals | p. 528 |
| Measure | p. 531 |
| Axiom of Choice and Large Cardinals | p. 534 |
| The Diagonal Argument | p. 536 |
| Computability | p. 538 |
| Logic and Gödel's Theorem | p. 541 |
| Provability and Truth | p. 546 |
| Biographical Notes: Gödel | p. 549 |
| Combinatorics | p. 553 |
| What Is Combinatorics? | p. 554 |
| The Pigeonhole Principle | p. 557 |
| Analysis and Combinatorics | p. 560 |
| Graph Theory | p. 563 |
| Nonplanar Graphs | p. 567 |
| The Konig Infinity Lemma | p. 571 |
| Ramsey Theory | p. 575 |
| Hard Theorems of Combinatorics | p. 580 |
| Biographical Notes: Erdos | p. 584 |
| Bibliography | p. 589 |
| Index | p. 629 |
| Table of Contents provided by Ingram. All Rights Reserved. |
John Stillwell is Professor of Mathematics at the University of San Francisco. He is the author of several highly regarded books published by Springer, including The Four Pillars of Geometry (2005), Elements of Number Theory (2003), Numbers and Geometry (1998) and Elements of Algebra (1994).
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