“Boyer and Merzbach distill thousands of years of mathematics into this fascinating chronicle. The Great Theorems of Mathematics “When we read a book like A History of Mathematics, we get the picture of a Carl B. Boyer,Uta C. Merzbach. A History of Mathematics has ratings and 32 reviews. Carl B. Boyer, .. My edition is the revised 2nd edition, revised by Uta C. Merzbach and sits on the. Trove: Find and get Australian resources. Books, images, historic newspapers, maps, archives and more.

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The updated new edition of the classic and comprehensive guideto the history of mathematics For more than forty years, A History of Mathematics hasbeen the reference of choice for those looking to learn about thefascinating history of humankind’s relationship with numbers,shapes, and patterns.

Um Ihnen ein besseres Nutzererlebnis zu bieten, verwenden wir Cookies. Sie sind bereits eingeloggt. Klicken Sie auf 2. Boyer was a professor of Mathematics at Brooklyn College and the author of several classic works on the history of mathematics.


Foreword by Isaac Asimov. Preface to the Third Edition. Preface to the Second Edition. Preface to the Mathematkcs Edition. Number Language and Counting. The Era and the Sources.

Uta Merzbach – Wikipedia

Numbers and Fractions; Sexagesimals. Geometry as Applied Arithmetic. Mathematics and the Liberal Arts. The Siege of Syracuse. On the Equilibriums of Planes.

Measurement of the Circle. Quadrature of the Parabola. On Conoids and Spheroids. On the Sphere and Cylinder. Semiregular Solids and Trigonometry.

Decline of Greek Mathematics. The End of Alexandrian Dominance.

The Oldest Known Texts. The Abacus and Decimal Fractions. Early Mathematics in India.

Uta Merzbach

Madhava and the Keralese School. The House of Wisdom. Abu’l Wefa and Al Karkhi. Al Biruni and Alhazen. Nasir al Din al Tusi. Compendia of the Dark Ages. The Century of Translation. Learning in the Thirteenth Century. The Latitude of Forms. Decline of Medieval Learning. German Algebras and Arithmetics. Galileo’s Two New Sciences. The Theory of Numbers. Gilles Persone de Roberval. Girard Desargues and Projective Geometry.


Nicolaus Mercator and William Brouncker. Barrow’s Method of Tangents. Michel Rolle and Pierre Varignon. The Life of Euler. Logarithms and the Euler Identities.

Lambert 18 Pre to Postrevolutionary France. The Committee on Weights and Measures. Ccarl in the s. Reception of the Disquisitiones Arithmeticae. The School of Monge. Spaces of Higher Dimensions. Post Riemannian Algebraic Geometry.

British Algebra and the Operational Calculus of Functions.

Boole and the Algebra of Logic. Algebraic and Arithmetic Integers. Mathematical Physics in Germany.

Mathematical Physics in English Speaking Countries. The Arithmetization of Analysis. Functional Analysis and General Topology. Differential Geometry and Tensor Analysis. The s and World War II. Homological Algebra and Category Theory. The Four Color Conjecture. Classification of Finite Simple Groups.