Add to ORKGAn unfinished posthumous work, first published in the Latin original in v. 1 of the Opera omnia (Londini, J. Nichols, 1779-85) under title: Artis analyticae specimina, vel Geometria analytica. Another translation, without Colson\u27s commentary, appeared London, 1737 as A treatise on the method of fluxions and infinite series. The commentary consists of annotations on the introduction, and on the first and second problems
The purpose of this work is to first, explore exactly what an infinite series is, and second, to exp...
SUMMARY. — In his Quadratura arithmetica circuli ellipseos et hyperbolae cujus corollarium est trigo...
Paper to appear in A. Janiak and E. Schliesser (ed. by), Interpreting Newton, Cambridge Univ. Press,...
The commentary consists of annotations on the introduction, and on the first and second problems."A ...
With an unnumbered errata (advertisement on verso); a contents leaf numbered 143-144; and a division...
An updated volume on fluxions which follows the author\u27s 1937 piece A Treatise on Fluxions
When the rigorous foundation of calculus was developed, it marked an epochal change in the approach ...
When the rigorous foundation of calculus was developed, it marked an epochal change in the approach ...
In La Géométrie, Descartes proposed a “balance” between geometric constructions and symbolic manipul...
AbstractIn this paper I show how in 1743 A.-C. Clairaut applied an iterative method to calculate the...
It is well known that over the 18th century the calculus moved away from its geometric origins; Eule...
In this thesis one has looked for to find reasons on why the students face so many problems just whe...
AbstractIn the early calculus mathematicians used convergent series to represent geometrical quantit...
In calculus books infinite series usually are studied after derivatives and integrals, mainly in Tay...
In his introduction to Théorie des fonctions analytiques, Lagrange analyses the metaphysics of infin...
The purpose of this work is to first, explore exactly what an infinite series is, and second, to exp...
SUMMARY. — In his Quadratura arithmetica circuli ellipseos et hyperbolae cujus corollarium est trigo...
Paper to appear in A. Janiak and E. Schliesser (ed. by), Interpreting Newton, Cambridge Univ. Press,...
The commentary consists of annotations on the introduction, and on the first and second problems."A ...
With an unnumbered errata (advertisement on verso); a contents leaf numbered 143-144; and a division...
An updated volume on fluxions which follows the author\u27s 1937 piece A Treatise on Fluxions
When the rigorous foundation of calculus was developed, it marked an epochal change in the approach ...
When the rigorous foundation of calculus was developed, it marked an epochal change in the approach ...
In La Géométrie, Descartes proposed a “balance” between geometric constructions and symbolic manipul...
AbstractIn this paper I show how in 1743 A.-C. Clairaut applied an iterative method to calculate the...
It is well known that over the 18th century the calculus moved away from its geometric origins; Eule...
In this thesis one has looked for to find reasons on why the students face so many problems just whe...
AbstractIn the early calculus mathematicians used convergent series to represent geometrical quantit...
In calculus books infinite series usually are studied after derivatives and integrals, mainly in Tay...
In his introduction to Théorie des fonctions analytiques, Lagrange analyses the metaphysics of infin...
The purpose of this work is to first, explore exactly what an infinite series is, and second, to exp...
SUMMARY. — In his Quadratura arithmetica circuli ellipseos et hyperbolae cujus corollarium est trigo...
Paper to appear in A. Janiak and E. Schliesser (ed. by), Interpreting Newton, Cambridge Univ. Press,...