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Table of Contents: Origins The concept of number Early number bases Number language and the origin of counting Origin of geometry Egypt Early records Hieroglyphic notation Ahmes papyrus Unit fractions Arithmetic operations Algebraic problems Geometric problems A trigonometric ratio Moscow papyrus Mathematical weaknesses Mesopotamia Cuneiform records Positional numeration Sexagesimal fractions Fundamental operations Algebraic problems Quadratic equations Cubic equations Pythagorean triads Polygonal areas Geometry as applied arithmetic Mathematical weaknesses Ionia and the Pythagoreans Greek origins Thales of Miletus Pythagoras of Samos The Pythagorean pentagram Number mysticism Arithmetic and cosmology Figurate numbers Proportions Attic numeration Ionian numeration Arithmetic and logistic The heroic age Centers of activity Anaxagoras as Clazomenae Three famous problems Quadrature of lunes Continued proportions Hippias of Elis Philolaus and Archytas of Tarentum Duplication of the cube Incommensurability The golden section Paradoxes of Zeno Deductive reasoning Geometric algebra Democritus of Abdera The age of Plato and Aristotle The seven liberal arts Socrates Platonic solids Theodorus of Cyrene Platonic arithmetic and geometry Origin of analysis Eudoxus of Cnidus Method of exhaustion Mathematical astronomy Menaechmus Duplication of the cube Dinostratus and the squaring of the circle Autolycus of Pitane Aristotle End of the Hellenic period Euclid of Alexandria Author of the Elements Other works Purpose of the Elements Definitions and postulates Scope of Book I Geometric algebra Books III and IV Theory of proportion Theory of numbers Prime and perfect numbers Incommensurability Solid geometry Apocrypha Influence of the Elements Archimedes of Syracuse The siege of Syracuse Law of the lever The hydrostatic principle The Sand Reckoner Measurement of the circle Angle trisection Area of a parabolic segment Volume of a paraboloidal segment Segment of a sphere On the sphere and cylinder Books of Lemmas Semiregular solids and trigonometry The method Volume of a sphere Recovery of The method Apollonius of Perga Lost works Restoration of lost works The problem of Apollonius Cycles and epicycles The Conics Names of the conic sections The double napped cone Fundamental properties Conjugate diameters Tangents and harmonic division The three- and four-line locus Intersecting conics Maxima and minima, tangents and normals Similar conics Foci of conics Use of coordinates Greek trigonometry and mensuration Early trigonometry Aristarchus of Samos Eratosthenes of Cyrene Hipparchus of Necaea Menelaus of Alexandria Ptolemy's Almagest The 360 degree circle Construction of tables Ptolemaic astronomy Other works by Ptolemy Optics and astrology Heron of Alexandria Principle of least distance Decline of Greek mathematics Revival and decline of Greek mathematics Applied mathematics Diophantus of Alexandria Nicomachus of Gerasa The Arithmetica of Diophantus Diophantine problems The place of Diophantus in algebra Pappus of Alexandria The Collection Theorems of Pappus The Pappus problem The Treasury of Analysis The Pappus-Guldin theorems Proclus of Alexandria Boethius End of the Alexandrian period The Greek Anthology Byzantine mathematicians of the sixth century China and Inda The oldest documents The Nine Chapters Magic squares Rod numerals The abacus and decimal fractions Values of pi Algebra and Horner's method Thirteenth century mathematicians The arithmetic triangle Early mathematics in India The Sulvasutras The Siddhantas Aryabhatta Hindu numerals The symbol for zero Hindu trigonometry Hindu multiplication Long division Brahmagupta Brahmagupta's formula Indeterminate equations Bhaskara The Lilavati Ramanujan The Arabic hegemony Arabic conquests The house of wisdom Al-jabr Quadratic equations The father of algebra Geometric foundation Algebraic problems A problem from Heron Abd al-Hamid ibn-Turk Thabit ibn-Qurra Arabic numerals Arabic trigonometry Abu'l-Wefa and al-Karkhi Al-Biruni and Alhazen Omar Khayyam The parallel postulate Nasir Eddin Al-Kashi Europe in the Middle Ages From Asia to Europe Byzantine mathematics The Dark Ages Alcuin and Gerbert The century of translation The spread of Hindu-Arabic numerals The Liber abaci The Fibonacci sequence A solution of a cubic equation Theory of numbers and geometry Jordanus Nemorarius Campanus of Novara Learning in the thirteenth century Medieval kinematics Thomas Bradwardine Nicole Oresme The latitute fo forms Infinite series Decline of medieval learning The Renaissance Humanism Nicholas of Cusa Regiomontanus Application of algebra to geometry A transitional figure Nicolas Chuquet's Triparty Luca Pacioli's Summa Leonardo da Vinci Germanic algebras Cardan's Ars magna Solution of the cubic equation Ferrari's solution of the quartic equation Irreducible cubics and complex numbers Robert Recorde Nicholas Copernicus Georg Joachim Rheticus Pierre de la Ramee Bombelli's Algebra Johannes Werner Theory of perspective Cartography Prelude to modern mathematics Francois Viete Concept of a parameter The analytic art Relations between roots and coefficients Thomas Harriot and Willian Oughtred Horner's method again Trigonometry and prosthaphaeresis Trigonometric solution of equations John Napier Invention of logarithms Henry Briggs Jobst Burgi Applied mathematics and decimal fractions Algebraic notations Galileo Galilei Values of pi Reconstruction of Apollonius' On tangencies Infinitesimal analysis Johannes Kepler Galileo's Two new sciences Galileo and the infinite Bonaventura Cavalieri The spiral and the parabola The time of Fermat and Descartes Leading mathematicians of the time The Discours de la methode Invention of analytic geometry Arithmetization of geometry Geometric algebra Classification of curves Rectification of curves Identification of conics Normals and tangents Descartes' geometric concepts Fermat's loci Higher dimensional analytic geometry Fermat's differentiations Fermat's integrations Gregory of St. Vincent Theory of numbers Theorems of Fermat Gilles Persone de Roberval Evangelista Torricelli New curves Girard Desargues Projective geometry Blaise Pascal Probability The cycloid A transitional period Philippe de Lahire Georg Mohr Pietro Mengoli Frans van Schooten Jan De Witt Johann Hudde Rene Francois de Sluse The pendulum clock Involutes and evolutes John Wallis On conic sections Arithmetica infinitorum Christopher Wren Wallis' formulas James Gregory Gregory's series Nicolaus Mercator and William Brouncker Barrows' method of tangents Newton and Leibniz Newton's early work The binomial theorem Infinite series The Method of fluxions The Principia Leibniz and the harmonic triangle The differential triangle and infinite series The differential calculus Determinants, notations, and imaginary numbers The algebra of logic The inverse square law Theorems on conics Optics and curves Polar and other coordinates Newton's method and Newton's parallelogram The Arithmetica universalis Later years The Bernoulli era The Bernoulli family The logarithmic spiral Probability and infinite series L'Hospital's rule Exponential calculus Logarithms of negative numbers Petersburg paradox Abraham De Moivre De Moivre's theorem Roger Cotes James Stirling Colin Maclaurin Taylor's series The Analyst controversy Cramer's rule Tschirnhaus transformations Solid analytic geometry Michel Rolle and Pierre Varignon Mathematics in Italy The parallel postulate Divergent series The age of Euler Life of Euler Notation Foundation of analysis Infinite series Convergent and divergent series Life of d"Alembert The Euler identities D'Alembert and limits Differential equations The Clairauts The Riccatis Probability Theory of numbers Textbooks Synthetic geometry Solid analytic geometry Lambert and the parallel postulate Bezout and eliminiation Mathematicians of the French Revolution The age of revolutions Leading mathematicians Publications before 1789 Lagrange and determinants Committee on Weights and Measures Condorcet on education Monge as administrator and teacher Descriptive geometry and analytic geometry Textbooks Lacroix on analytic geometry The organizer of victory Metaphysics of the calculus and geometry Geometrie de position Transversals Legendre's Geometry Elliptic integrals Theory of numbers Theory of functions Calculus of variations Lagrange multipliers Laplace and probability Celestial mechanics and operators Political changes The time of Gauss and Cauchy Nineteenth century overview Gauss: early work Number theory Reception of the Disquisitiones arithmeticae Gauss's contributions to astronomy Gauss's middle years The beginnings of differential geometry Gauss's later work Paris in the 1820s Cauchy Gauss and Cauchy compared Non-Euclidean geometry Abel and Jacobi Galois Diffusion Reforms in England and Prussia Geometry The school of Monge Projective geometry: Poncelet and Chasles Synthetic metric geometry: Steiner Synthetic nonmetric geometry: von Staudt Analytic geometry Riemannian geometry Spaces of higher dimensions Felix Klein Post-Reimannian algebraic geometry Analysis Berlin and Gottingen at mid-century Riemann in Gottingen Mathematical physics in Germany Mathematics physics in the English speaking countries Weierstrass and students The arithmetization of analysis Cantor and Dedekind Analysis in France Algebra Introduction British algebra and the operational calculus of functions Boole and the algebra of logic De Morgan Hamilton Grassman and Ausdehnungslehre Cayley and Sylvester Linear associative algebras Algebraic geometry Algebraic and arithmetic integers Axioms of arithmetic Poincare and Hilbert Turn of the century overview Poincare Mathematical physics and other applications Topology Other fields and legacy Hilbert Invariant theory Hilbert's Zahlbericht The foundations of geometry The Hilbert problems Hilbert and analysis Waring's problem and Hilbert's work after 1909 Aspects of the twentieth century General overview Integration and measure Functional analysis and general topology Algebra Differential geometry and tensor analysis The 1930s and World War II Probability Homological algebra and category theory Bourbaki Logic and computing Future outlook References General bibliography Appendix: Chronological table Index
Record Created: 06/08/2000 Last Modified: 06/08/2004
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2004 ENC. All information in this catalog record was verified and accurate when it was first made available to the public. ENC updates catalog records when resources are featured in special projects or when we learn that the information in the record is out of date.
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