© 2015 – Routledge
This book follows the development of classical mathematics and the relation between work done in the Arab and Islamic worlds and that undertaken by the likes of Descartes and Fermat.
‘Early modern,’ mathematics is a term widely used to refer to the mathematics which developed in the West during the sixteenth and seventeenth century. For many historians and philosophers this is the watershed which marks a radical departure from ‘classical mathematics,’ to more modern mathematics; heralding the arrival of algebra, geometrical algebra, and the mathematics of the continuous. In this book, Roshdi Rashed demonstrates that ‘early modern,’ mathematics is actually far more composite than previously assumed, with each branch having different traceable origins which span the millennium. Going back to the beginning of these parts, the aim of this book is to identify the concepts and practices of key figures in their development, thereby presenting a fuller reality of these mathematics.
This book will be of interest to students and scholars specialising in Islamic science and mathematics, as well as to those with an interest in the more general history of science and mathematics and the transmission of ideas and culture.
This comprehensive history of mathematics from the 8th to the 17th centuries is organized by fields. The most interesting part is "Algebra" because of its unifying role. - M. Bona, University of Florida
Introduction Part I: Algebra and Arithmetic 1 Algebra and its unifying role 2 Algebra and Linguistics 3 The First Classification of Curves 4 Descartes Geometry and the distinction between geometrical and mechanical curves 5 The Ovals of Descartes 6 Descartes and the Infinitely Small 7 Fermat and Algebraic Geometry 8 Euclidean Arithmetic 9 Algorithmic Methods 10 Ibn Qurra and Amicable Numbers 11 Fibonacci and Arabic Mathematics 12 Fibonacci and the Latin Extension of Arabic Mathematics 13 Al-Yazdi 14 Fermat and the Origins of Modern Diophantine Analysis Part II: Geometry 15 The Archemedians and the Problems of Infinity 16 Conics and traditions of the early research projections 17 The Continuous Drawing of Conic Curves and the Classification of Curves 18 The Fifth Postulate of Euclid Part III: The Application of Mathematics – Astronomy and Optics 19 The Celestial Cinematics of Ibn Al-Haytham 20 Mirrors