Produktbild: A History of Mathematics

A History of Mathematics 3rd Edition

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Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

14.01.2011

Verlag

John Wiley & Sons Inc

Seitenzahl

736

Maße (L/B/H)

23,2/15,4/5,3 cm

Gewicht

862 g

Auflage

3. Auflage

Sprache

Englisch

ISBN

978-0-470-52548-7

Beschreibung

Rezension

'...an 'engaging' read for the mathematically minded.' (Inside OR, June 2011).

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

14.01.2011

Verlag

John Wiley & Sons Inc

Seitenzahl

736

Maße (L/B/H)

23,2/15,4/5,3 cm

Gewicht

862 g

Auflage

3. Auflage

Sprache

Englisch

ISBN

978-0-470-52548-7

Herstelleradresse

Libri GmbH
Europaallee 1
36244 Bad Hersfeld
DE

Email: GPSR Kontakt

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  • Produktbild: A History of Mathematics
  • Foreword by Isaac Asimov xi

    Preface to the Third Edition xiii

    Preface to the Second Edition xv

    Preface to the First Edition xvii

    1 Traces 1

    Concepts and Relationships 1

    Early Number Bases 3

    Number Language and Counting 5

    Spatial Relationships 6

    2 Ancient Egypt 8

    The Era and the Sources 8

    Numbers and Fractions 10

    Arithmetic Operations 12

    "Heap" Problems 13

    Geometric Problems 14

    Slope Problems 18

    Arithmetic Pragmatism 19

    3 Mesopotamia 21

    The Era and the Sources 21

    Cuneiform Writing 22

    Numbers and Fractions: Sexagesimals 23

    Positional Numeration 23

    Sexagesimal Fractions 25

    Approximations 25

    Tables 26

    Equations 28

    Measurements: Pythagorean Triads 31

     Polygonal Areas 35

    Geometry as Applied Arithmetic 36

    4 Hellenic Traditions 40

    The Era and the Sources 40

    Thales and Pythagoras 42

    Numeration 52

    Arithmetic and Logistic 55

    Fifth-Century Athens 56

    Three Classical Problems 57

    Quadrature of Lunes 58

    Hippias of Elis 61

    Philolaus and Archytas of Tarentum 63

    Incommensurability 65

    Paradoxes of Zeno 67

    Deductive Reasoning 70

    Democritus of Abdera 72

    Mathematics and the Liberal Arts 74

    The Academy 74

    Aristotle 88

    5 Euclid of Alexandria 90

    Alexandria 90

    Lost Works 91

    Extant Works 91

    The Elements 93

    6 Archimedes of Syracuse 109

    The Siege of Syracuse 109

    On the Equilibriums of Planes 110

    On Floating Bodies 111

    The Sand-Reckoner 112

    Measurement of the Circle 113

    On Spirals 113

    Quadrature of the Parabola 115

    On Conoids and Spheroids 116

    On the Sphere and Cylinder 118

    Book of Lemmas 120

    Semiregular Solids and Trigonometry 121

    The Method 122

    7 Apollonius of Perge 127

    Works and Tradition 127

    Lost Works 128

    Cycles and Epicycles 129

    The Conics 130

    8 Crosscurrents 142

    Changing Trends 142

    Eratosthenes 143

    Angles and Chords 144

    Ptolemy's Almagest 149

    Heron of Alexandria 156

    The Decline of Greek Mathematics 159

    Nicomachus of Gerasa 159

    Diophantus of Alexandria 160

    Pappus of Alexandria 164

    The End of Alexandrian Dominance 170

    Proclus of Alexandria 171

    Boethius 171

    Athenian Fragments 172

    Byzantine Mathematicians 173

    9 Ancient and Medieval China 175

    The Oldest Known Texts 175

    The Nine Chapters 176

    Rod Numerals 177

    The Abacus and Decimal Fractions 178

    Values of Pi 180

    Thirteenth-Century Mathematics 182

    10 Ancient and Medieval India 186

    Early Mathematics in India 186

    The Sulbasutras 187

    The Siddhantas 188

    Aryabhata 189

    Numerals 191

    Trigonometry 193

    Multiplication 194

    Long Division 195

    Brahmagupta 197

    Indeterminate Equations 199

    Bhaskara 200

    Madhava and the Keralese School 202

    11 The Islamic Hegemony 203

    Arabic Conquests 203

    The House of Wisdom 205

    Al-Khwarizmi 206

    'Abd Al-Hamid ibn-Turk 212

    Thabit ibn-Qurra 213

    Numerals 214

    Trigonometry 216

    Tenth- and Eleventh-Century Highlights 216

    Omar Khayyam 218

    The Parallel Postulate 220

    Nasir al-Din al-Tusi 220

    Al-Kashi 221

    12 The Latin West 223

    Introduction 223

    Compendia of the Dark Ages 224

    Gerbert 224

    The Century of Translation 226

     Abacists and Algorists 227

    Fibonacci 229

    Jordanus Nemorarius 232

    Campanus of Novara 233

    Learning in the Thirteenth Century 235

    Archimedes Revived 235

    Medieval Kinematics 236

    Thomas Bradwardine 236

    Nicole Oresme 238

    The Latitude of Forms 239

    Infinite Series 241

    Levi ben Gerson 242

    Nicholas of Cusa 243

    The Decline of Medieval Learning 243

    13 The European Renaissance 245

    Overview 245

    Regiomontanus 246

    Nicolas Chuquet's Triparty 249

    Luca Pacioli's Summa 251

    German Algebras and Arithmetics 253

    Cardan's Ars Magna 255

    Rafael Bombelli 260

    Robert Recorde 262

    Trigonometry 263

    Geometry 264

    Renaissance Trends 271

    François Viète 273

    14 Early Modern Problem Solvers 282

    Accessibility of Computation 282

    Decimal Fractions 283

    Notation 285

    Logarithms 286

    Mathematical Instruments 290

    Infinitesimal Methods: Stevin 296

    Johannes Kepler 296

    15 Analysis, Synthesis, the Infinite, and Numbers 300

    Galileo's Two New Sciences 300

    Bonaventura Cavalieri 303

    Evangelista Torricelli 306

    Mersenne's Communicants 308

    René Descartes 309

    Fermat's Loci 320

    Gregory of St. Vincent 325

    The Theory of Numbers 326

    Gilles Persone de Roberval 329

    Girard Desargues and Projective Geometry 330

    Blaise Pascal 332

    Philippe de Lahire 337

    Georg Mohr 338

    Pietro Mengoli 338

    Frans van Schooten 339

    Jan de Witt 340

    Johann Hudde 341

    René François de Sluse 342

    Christiaan Huygens 342

    16 British Techniques and Continental Methods 348

    John Wallis 348

    James Gregory 353

    Nicolaus Mercator and William Brouncker 355

    Barrow's Method of Tangents 356

    Newton 358

    Abraham De Moivre 372

    Roger Cotes 375

    James Stirling 376

    Colin Maclaurin 376

    Textbooks 380

    Rigor and Progress 381

    Leibniz 382

    The Bernoulli Family 390

    Tschirnhaus Transformations 398

    Solid Analytic Geometry 399

    Michel Rolle and Pierre Varignon 400

    The Clairauts 401

    Mathematics in Italy 402

    The Parallel Postulate 403

    Divergent Series 404

    17 Euler 406

    The Life of Euler 406

    Notation 408

    Foundation of Analysis 409

    Logarithms and the Euler Identities 413

    Differential Equations 414

    Probability 416

    The Theory of Numbers 417

    Textbooks 418

    Analytic Geometry 419

    The Parallel Postulate: Lambert 420

    18 Pre- to Postrevolutionary France 423

    Men and Institutions 423

    The Committee on Weights and Measures 424

    D'Alembert 425

    Bézout 427

    Condorcet 429

    Lagrange 430

    Monge 433

    Carnot 438

    Laplace 443

    Legendre 446

    Aspects of Abstraction 449

    Paris in the 1820s 449

    Fourier 450

    Cauchy 452

    Diffusion 460

    19 Gauss 464

    Nineteenth-Century Overview 464

    Gauss: Early Work 465

    Number Theory 466

    Reception of the Disquisitiones Arithmeticae 469

    Astronomy 470

    Gauss's Middle Years 471

    Differential Geometry 472

    Gauss's Later Work 473

    Gauss's Influence 474

    20 Geometry 483

    The School of Monge 483

    Projective Geometry: Poncelet and Chasles 485

    Synthetic Metric Geometry: Steiner 487

    Synthetic Nonmetric Geometry: von Staudt 489

    Analytic Geometry 489

    Non-Euclidean Geometry 494

    Riemannian Geometry 496

    Spaces of Higher Dimensions 498

    Felix Klein 499

    Post-Riemannian Algebraic Geometry 501

    21 Algebra 504

    Introduction 504

    British Algebra and the Operational Calculus of Functions 505

    Boole and the Algebra of Logic 506

    Augustus De Morgan 509

    William Rowan Hamilton 510

    Grassmann and Ausdehnungslehre 512

    Cayley and Sylvester 515

    Linear Associative Algebras 519

    Algebraic Geometry 520

    Algebraic and Arithmetic Integers 520

    Axioms of Arithmetic 522

    22 Analysis 526

    Berlin and Göttingen at Midcentury 526

    Riemann in Göttingen 527

    Mathematical Physics in Germany 528

    Mathematical Physics in English-Speaking Countries 529

    Weierstrass and Students 531

    The Arithmetization of Analysis 533

    Dedekind 536

    Cantor and Kronecker 538

    Analysis in France 543

    23 Twentieth-Century Legacies 548

    Overview 548

    Henri Poincaré 549

    David Hilbert 555

    Integration and Measure 564

    Functional Analysis and General Topology 568

    Algebra 570

    Differential Geometry and Tensor Analysis 572

    Probability 573

    Bounds and Approximations 575

    The 1930s and World War II 577

    Nicolas Bourbaki 578

    Homological Algebra and Category Theory 580

    Algebraic Geometry 581

    Logic and Computing 582

    The Fields Medals 584

    24 Recent Trends 586

    Overview 586

    The Four-Color Conjecture 587

    Classification of Finite Simple Groups 591

     Fermat's Last Theorem 593

    Poincaré's Query 596

    Future Outlook 599

    References 601

    General Bibliography 633

    Index 647