International audienceThough Wallis's Arithmetica infinitorum was one of Newton's major sources of inspiration during the first years of his mathematical education, indivisibles were not a central feature of his mathematical production. To judge from his reading notes, he firstly studied Wallis's treatise at the beginning of 1664 ([13], I, 1, 3, § § 1-2, pp. 89-95), and came back to it one year later ([13], I, 1, 3, § 3, pp. 96-121). In the former occasion, he confined himself to the first part of the treatise, and possibly accompanied his reading with that of the De sectionibus conicis and the De angulo contactus, also contained in Wallis's Operum Mathematicarum Pars Altera ([16] and [17]). At the beginning, his attention was retained by s...
Currently in Brazil students learn the concepts of Differential and Integral Calculus for the first ...
AbstractIn this paper Newton’s persistent attempts to construct a unitary view of mathematics are ex...
AbstractDe Morgan, in an article published in 1852, advanced the thesis that Newton “renounces and a...
Though Wallis’s Arithmetica infinitorum was one of Newton’s major sources of inspiration during the ...
International audienceThough Wallis's Arithmetica infinitorum was one of Newton's major sources of i...
International audienceThe present chapter is devoted, first, to discuss in detail the structure and ...
International audienceIt has long been thought that Leibniz’s conceptions of infinitesimals were a l...
Sir Isaac Newton (1642-1727), an English mathematician, has been at the same time a key figure in th...
Newton composed several mathematical tracts which remained in manuscript form for decades. He chose ...
Encore jeune (il est né en 1642), Isaac Newton élabore entre 1664 et 1666 la théorie des fluxions, t...
The notion of indivisibles and atoms arose in ancient Greece. The continuum—that is, the collection ...
The aim of this paper is twofold: (1) to show the principal aspects of the way in which Newton conc...
John Wallis (1616-1703) , an English mathematician who has been given partial credit for the develop...
In the Preface to the Principia (1687) Newton famously states that geometry is founded on mechanical...
Sir Isaac Newton revolutionized physics and astronomy in his Principia. How did he do it? Would his ...
Currently in Brazil students learn the concepts of Differential and Integral Calculus for the first ...
AbstractIn this paper Newton’s persistent attempts to construct a unitary view of mathematics are ex...
AbstractDe Morgan, in an article published in 1852, advanced the thesis that Newton “renounces and a...
Though Wallis’s Arithmetica infinitorum was one of Newton’s major sources of inspiration during the ...
International audienceThough Wallis's Arithmetica infinitorum was one of Newton's major sources of i...
International audienceThe present chapter is devoted, first, to discuss in detail the structure and ...
International audienceIt has long been thought that Leibniz’s conceptions of infinitesimals were a l...
Sir Isaac Newton (1642-1727), an English mathematician, has been at the same time a key figure in th...
Newton composed several mathematical tracts which remained in manuscript form for decades. He chose ...
Encore jeune (il est né en 1642), Isaac Newton élabore entre 1664 et 1666 la théorie des fluxions, t...
The notion of indivisibles and atoms arose in ancient Greece. The continuum—that is, the collection ...
The aim of this paper is twofold: (1) to show the principal aspects of the way in which Newton conc...
John Wallis (1616-1703) , an English mathematician who has been given partial credit for the develop...
In the Preface to the Principia (1687) Newton famously states that geometry is founded on mechanical...
Sir Isaac Newton revolutionized physics and astronomy in his Principia. How did he do it? Would his ...
Currently in Brazil students learn the concepts of Differential and Integral Calculus for the first ...
AbstractIn this paper Newton’s persistent attempts to construct a unitary view of mathematics are ex...
AbstractDe Morgan, in an article published in 1852, advanced the thesis that Newton “renounces and a...