De analysi per aequationes numero terminorum infinitas (or On analysis by infinite series, On Analysis by Equations with an infinite number of terms, or On the Analysis by means of equations of an infinite number of terms) is a mathematical work by Sir Isaac Newton.
Composed in 1669, during the mid-part of that year probably, from ideas Newton had acquired during the period 1665âÂÂ1666. Newton wrote
The explication was written to remedy apparent weaknesses in the logarithmic series [infinite series for ] , that had become republished due to Nicolaus Mercator, or through the encouragement of Isaac Barrow in 1669, to ascertain the knowing of the prior authorship of a general method of infinite series. The writing was circulated amongst scholars as a manuscript in 1669, including John Collins a mathematics ' for a group of British and continental mathematicians. His relationship with Newton in the capacity of informant proved instrumental in securing Newton recognition and contact with John Wallis at the Royal Society. Both Cambridge University Press and Royal Society rejected the treatise from publication, being instead published in London in 1711 by William Jones, and again in 1744, as Methodus fluxionum et serierum infinitarum cum eisudem applicatione ad curvarum geometriam in Opuscula mathematica, philosophica et philologica by Marcum-Michaelem Bousquet at that time edited by Johann Castillioneus.
The exponential series, i.e., tending toward infinity, was discovered by Newton and is contained within the Analysis. The treatise contains also the sine series and cosine series and arc series, the logarithmic series and the binomial series.