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<p>Foreword by Isaac Asimov xi</p> <p>Preface to the Third Edition xiii</p> <p>Preface to the Second Edition xv</p> <p>Preface to the First Edition xvii</p> <p><b>1 Traces 1</b></p> <p>Concepts and Relationships 1</p> <p>Early Number Bases 3</p> <p>Number Language and Counting 5</p> <p>Spatial Relationships 6</p> <p><b>2 Ancient Egypt 8</b></p> <p>The Era and the Sources 8</p> <p>Numbers and Fractions 10</p> <p>Arithmetic Operations 12</p> <p>“Heap” Problems 13</p> <p>Geometric Problems 14</p> <p>Slope Problems 18</p> <p>Arithmetic Pragmatism 19</p> <p><b>3 Mesopotamia 21</b></p> <p>The Era and the Sources 21</p> <p>Cuneiform Writing 22</p> <p>Numbers and Fractions: Sexagesimals 23</p> <p>Positional Numeration 23</p> <p>Sexagesimal Fractions 25</p> <p>Approximations 25</p> <p>Tables 26</p> <p>Equations 28</p> <p>Measurements: Pythagorean Triads 31</p> <p> Polygonal Areas 35</p> <p>Geometry as Applied Arithmetic 36</p> <p><b>4 Hellenic Traditions 40</b></p> <p>The Era and the Sources 40</p> <p>Thales and Pythagoras 42</p> <p>Numeration 52</p> <p>Arithmetic and Logistic 55</p> <p>Fifth-Century Athens 56</p> <p>Three Classical Problems 57</p> <p>Quadrature of Lunes 58</p> <p>Hippias of Elis 61</p> <p>Philolaus and Archytas of Tarentum 63</p> <p>Incommensurability 65</p> <p>Paradoxes of Zeno 67</p> <p>Deductive Reasoning 70</p> <p>Democritus of Abdera 72</p> <p>Mathematics and the Liberal Arts 74</p> <p>The Academy 74</p> <p>Aristotle 88</p> <p><b>5 Euclid of Alexandria 90</b></p> <p>Alexandria 90</p> <p>Lost Works 91</p> <p>Extant Works 91</p> <p>The Elements 93</p> <p><b>6 Archimedes of Syracuse 109</b></p> <p>The Siege of Syracuse 109</p> <p>On the Equilibriums of Planes 110</p> <p>On Floating Bodies 111</p> <p>The Sand-Reckoner 112</p> <p>Measurement of the Circle 113</p> <p>On Spirals 113</p> <p>Quadrature of the Parabola 115</p> <p>On Conoids and Spheroids 116</p> <p>On the Sphere and Cylinder 118</p> <p>Book of Lemmas 120</p> <p>Semiregular Solids and Trigonometry 121</p> <p>The Method 122</p> <p><b>7 Apollonius of Perge 127</b></p> <p>Works and Tradition 127</p> <p>Lost Works 128</p> <p>Cycles and Epicycles 129</p> <p>The Conics 130</p> <p><b>8 Crosscurrents 142</b></p> <p>Changing Trends 142</p> <p>Eratosthenes 143</p> <p>Angles and Chords 144</p> <p>Ptolemy’s Almagest 149</p> <p>Heron of Alexandria 156</p> <p>The Decline of Greek Mathematics 159</p> <p>Nicomachus of Gerasa 159</p> <p>Diophantus of Alexandria 160</p> <p>Pappus of Alexandria 164</p> <p>The End of Alexandrian Dominance 170</p> <p>Proclus of Alexandria 171</p> <p>Boethius 171</p> <p>Athenian Fragments 172</p> <p>Byzantine Mathematicians 173</p> <p><b>9 Ancient and Medieval China 175</b></p> <p>The Oldest Known Texts 175</p> <p>The Nine Chapters 176</p> <p>Rod Numerals 177</p> <p>The Abacus and Decimal Fractions 178</p> <p>Values of Pi 180</p> <p>Thirteenth-Century Mathematics 182</p> <p><b>10 Ancient and Medieval India 186</b></p> <p>Early Mathematics in India 186</p> <p>The Sulbasutras 187</p> <p>The Siddhantas 188</p> <p>Aryabhata 189</p> <p>Numerals 191</p> <p>Trigonometry 193</p> <p>Multiplication 194</p> <p>Long Division 195</p> <p>Brahmagupta 197</p> <p>Indeterminate Equations 199</p> <p>Bhaskara 200</p> <p>Madhava and the Keralese School 202</p> <p><b>11 The Islamic Hegemony 203</b></p> <p>Arabic Conquests 203</p> <p>The House of Wisdom 205</p> <p>Al-Khwarizmi 206</p> <p>‘Abd Al-Hamid ibn-Turk 212</p> <p>Thabit ibn-Qurra 213</p> <p>Numerals 214</p> <p>Trigonometry 216</p> <p>Tenth- and Eleventh-Century Highlights 216</p> <p>Omar Khayyam 218</p> <p>The Parallel Postulate 220</p> <p>Nasir al-Din al-Tusi 220</p> <p>Al-Kashi 221</p> <p><b>12 The Latin West 223</b></p> <p>Introduction 223</p> <p>Compendia of the Dark Ages 224</p> <p>Gerbert 224</p> <p>The Century of Translation 226</p> <p> Abacists and Algorists 227</p> <p>Fibonacci 229</p> <p>Jordanus Nemorarius 232</p> <p>Campanus of Novara 233</p> <p>Learning in the Thirteenth Century 235</p> <p>Archimedes Revived 235</p> <p>Medieval Kinematics 236</p> <p>Thomas Bradwardine 236</p> <p>Nicole Oresme 238</p> <p>The Latitude of Forms 239</p> <p>Infinite Series 241</p> <p>Levi ben Gerson 242</p> <p>Nicholas of Cusa 243</p> <p>The Decline of Medieval Learning 243</p> <p><b>13 The European Renaissance 245</b></p> <p>Overview 245</p> <p>Regiomontanus 246</p> <p>Nicolas Chuquet’s Triparty 249</p> <p>Luca Pacioli’s Summa 251</p> <p>German Algebras and Arithmetics 253</p> <p>Cardan’s Ars Magna 255</p> <p>Rafael Bombelli 260</p> <p>Robert Recorde 262</p> <p>Trigonometry 263</p> <p>Geometry 264</p> <p>Renaissance Trends 271</p> <p>François Viète 273</p> <p><b>14 Early Modern Problem Solvers 282</b></p> <p>Accessibility of Computation 282</p> <p>Decimal Fractions 283</p> <p>Notation 285</p> <p>Logarithms 286</p> <p>Mathematical Instruments 290</p> <p>Infinitesimal Methods: Stevin 296</p> <p>Johannes Kepler 296</p> <p><b>15 Analysis, Synthesis, the Infinite, and Numbers 300</b></p> <p>Galileo’s Two New Sciences 300</p> <p>Bonaventura Cavalieri 303</p> <p>Evangelista Torricelli 306</p> <p>Mersenne’s Communicants 308</p> <p>René Descartes 309</p> <p>Fermat’s Loci 320</p> <p>Gregory of St. Vincent 325</p> <p>The Theory of Numbers 326</p> <p>Gilles Persone de Roberval 329</p> <p>Girard Desargues and Projective Geometry 330</p> <p>Blaise Pascal 332</p> <p>Philippe de Lahire 337</p> <p>Georg Mohr 338</p> <p>Pietro Mengoli 338</p> <p>Frans van Schooten 339</p> <p>Jan de Witt 340</p> <p>Johann Hudde 341</p> <p>René François de Sluse 342</p> <p>Christiaan Huygens 342</p> <p><b>16 British Techniques and Continental Methods 348</b></p> <p>John Wallis 348</p> <p>James Gregory 353</p> <p>Nicolaus Mercator and William Brouncker 355</p> <p>Barrow’s Method of Tangents 356</p> <p>Newton 358</p> <p>Abraham De Moivre 372</p> <p>Roger Cotes 375</p> <p>James Stirling 376</p> <p>Colin Maclaurin 376</p> <p>Textbooks 380</p> <p>Rigor and Progress 381</p> <p>Leibniz 382</p> <p>The Bernoulli Family 390</p> <p>Tschirnhaus Transformations 398</p> <p>Solid Analytic Geometry 399</p> <p>Michel Rolle and Pierre Varignon 400</p> <p>The Clairauts 401</p> <p>Mathematics in Italy 402</p> <p>The Parallel Postulate 403</p> <p>Divergent Series 404</p> <p><b>17 Euler 406</b></p> <p>The Life of Euler 406</p> <p>Notation 408</p> <p>Foundation of Analysis 409</p> <p>Logarithms and the Euler Identities 413</p> <p>Differential Equations 414</p> <p>Probability 416</p> <p>The Theory of Numbers 417</p> <p>Textbooks 418</p> <p>Analytic Geometry 419</p> <p>The Parallel Postulate: Lambert 420</p> <p><b>18 Pre- to Postrevolutionary France 423</b></p> <p>Men and Institutions 423</p> <p>The Committee on Weights and Measures 424</p> <p>D’Alembert 425</p> <p>Bézout 427</p> <p>Condorcet 429</p> <p>Lagrange 430</p> <p>Monge 433</p> <p>Carnot 438</p> <p>Laplace 443</p> <p>Legendre 446</p> <p>Aspects of Abstraction 449</p> <p>Paris in the 1820s 449</p> <p>Fourier 450</p> <p>Cauchy 452</p> <p>Diffusion 460</p> <p><b>19 Gauss 464</b></p> <p>Nineteenth-Century Overview 464</p> <p>Gauss: Early Work 465</p> <p>Number Theory 466</p> <p>Reception of the Disquisitiones Arithmeticae 469</p> <p>Astronomy 470</p> <p>Gauss’s Middle Years 471</p> <p>Differential Geometry 472</p> <p>Gauss’s Later Work 473</p> <p>Gauss’s Influence 474</p> <p><b>20 Geometry 483</b></p> <p>The School of Monge 483</p> <p>Projective Geometry: Poncelet and Chasles 485</p> <p>Synthetic Metric Geometry: Steiner 487</p> <p>Synthetic Nonmetric Geometry: von Staudt 489</p> <p>Analytic Geometry 489</p> <p>Non-Euclidean Geometry 494</p> <p>Riemannian Geometry 496</p> <p>Spaces of Higher Dimensions 498</p> <p>Felix Klein 499</p> <p>Post-Riemannian Algebraic Geometry 501</p> <p><b>21 Algebra 504</b></p> <p>Introduction 504</p> <p>British Algebra and the Operational Calculus of Functions 505</p> <p>Boole and the Algebra of Logic 506</p> <p>Augustus De Morgan 509</p> <p>William Rowan Hamilton 510</p> <p>Grassmann and Ausdehnungslehre 512</p> <p>Cayley and Sylvester 515</p> <p>Linear Associative Algebras 519</p> <p>Algebraic Geometry 520</p> <p>Algebraic and Arithmetic Integers 520</p> <p>Axioms of Arithmetic 522</p> <p><b>22 Analysis 526</b></p> <p>Berlin and Göttingen at Midcentury 526</p> <p>Riemann in Göttingen 527</p> <p>Mathematical Physics in Germany 528</p> <p>Mathematical Physics in English-Speaking Countries 529</p> <p>Weierstrass and Students 531</p> <p>The Arithmetization of Analysis 533</p> <p>Dedekind 536</p> <p>Cantor and Kronecker 538</p> <p>Analysis in France 543</p> <p><b>23 Twentieth-Century Legacies 548</b></p> <p>Overview 548</p> <p>Henri Poincaré 549</p> <p>David Hilbert 555</p> <p>Integration and Measure 564</p> <p>Functional Analysis and General Topology 568</p> <p>Algebra 570</p> <p>Differential Geometry and Tensor Analysis 572</p> <p>Probability 573</p> <p>Bounds and Approximations 575</p> <p>The 1930s and World War II 577</p> <p>Nicolas Bourbaki 578</p> <p>Homological Algebra and Category Theory 580</p> <p>Algebraic Geometry 581</p> <p>Logic and Computing 582</p> <p>The Fields Medals 584</p> <p><b>24 Recent Trends 586</b></p> <p>Overview 586</p> <p>The Four-Color Conjecture 587</p> <p>Classification of Finite Simple Groups 591</p> <p> Fermat’s Last Theorem 593</p> <p>Poincaré’s Query 596</p> <p>Future Outlook 599</p> <p>References 601</p> <p>General Bibliography 633</p> <p>Index 647 </p>

<p>"... the book is an essential reference that will help you explore the incredible history of mathematics and the men and women who created it." (<i>Zentralblatt MATH</i>, 2016)</p> <p>"... an 'engaging' read for the mathematically minded." (<i>Inside OR</i>, June 2011)</p>

<p><b>UTA C. MERZBACH</b> is Curator Emeritus of Mathematics at the Smithsonian Institution and Director of the LHM Institute. <p>The late <b>CARL B. BOYER</b> was a professor of mathematics at Brooklyn College and the author of several classic works on the history of mathematics.

<p><b>Mathematics</b> <p>"Boyer and Merzbach distill thousands of years of mathematics into this fascinating chronicle. From the Greeks to Gödel, the mathematics is brilliant; the cast of characters is distinguished; the ebb and flow of ideas is everywhere evident. … Without doubt, this is—and will long remain—a classic one- volume history of mathematics and mathematicians who create it."<br> <b>—William Dunham, author of</b> <b><i>Journey Through Genius: The Great Theorems of Mathematics</i></b> <p>"Both readable and scholarly … a fine introduction to the topic."<br> <b>—J. David Bolter, author of</b> <b><i>Turing's Man</i></b> <p>"When we read a book like <i>A History of Mathematics</i>, we get the picture of a mounting structure, ever taller and broader and more beautiful and magnificent and with a foundation, moreover, that is as untainted and as functional now as it was when Thales worked out the first geometrical theorems nearly twenty-six centuries ago."<br> <b> —Isaac Asimov (from the Foreword)</b> <p>For more than forty years, <i>A History of Mathematics</i> has been the reference of choice for those looking to learn about the fascinating history of humankind's relationship with numbers, shapes, and patterns. This revised edition features up-to-date coverage of topics such as Fermat's Last Theorem and the Poincaré conjecture, in addition to recent advances in areas such as finite group theory and computer-aided proofs. <p>Whether you're interested in the age of Plato and Aristotle or Poincaré and Hilbert, whether you want to know more about the Pythagorean theorem or the golden mean, <i>A History of Mathematics</i> is an essential reference that will help you explore the incredible history of mathematics and the men and women who created it.

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