In this paper we give an historical synopsis of various Taylor remainders and their di erent proofs (without being exhaustive). We overview the formulas and the proofs given by such names as Bernoulli, Taylor, MacLaurin, Lagrange, Lacroix, Cauchy, Schlomilch, Roche Cox, Turquan, Bourget, Koenig, Darboux, Amigues, Teixeira, Peano, Blumenthal, Wolfe and Gon calves. We end the paper with a new Taylor remainder which generalizes the well-known Lagrange remainder
In this note we point out an estimate for the remainder in the generalised Taylor formula which impr...
When Lagrange wrote his masterpiece Mecanique Analytique, the foundations of analysis were not compl...
AbstractThis paper presents methods for the validated computation of bounds for Taylor coefficients ...
In this paper we give an historical synopsis of various Taylor remainders and theirdierent proofs (w...
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
In the present work we study the history of power series of the elementary transcendental functions,...
Forthcoming on Archive for History of Exact SciencesInternational audienceWe reconstruct essential f...
Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite tim...
In this paper, we derive a variant of the Taylor theorem to obtain a new minimized remainder. For a ...
New estimates of the remainder in Taylor\u27s formula are given. © 2001 Academic Press
In this note we derive a new Taylor remainder, which extends the well known Lagrange remainder as we...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
We present a variant of the classical integration by parts to introduce a new type of Taylor series ...
This paper outlines the biography and achievements of Joseph Louis Lagrange (1736–1813) and includes...
International audienceemainder problems have a long tradition and were widely disseminated in books ...
In this note we point out an estimate for the remainder in the generalised Taylor formula which impr...
When Lagrange wrote his masterpiece Mecanique Analytique, the foundations of analysis were not compl...
AbstractThis paper presents methods for the validated computation of bounds for Taylor coefficients ...
In this paper we give an historical synopsis of various Taylor remainders and theirdierent proofs (w...
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
In the present work we study the history of power series of the elementary transcendental functions,...
Forthcoming on Archive for History of Exact SciencesInternational audienceWe reconstruct essential f...
Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite tim...
In this paper, we derive a variant of the Taylor theorem to obtain a new minimized remainder. For a ...
New estimates of the remainder in Taylor\u27s formula are given. © 2001 Academic Press
In this note we derive a new Taylor remainder, which extends the well known Lagrange remainder as we...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
We present a variant of the classical integration by parts to introduce a new type of Taylor series ...
This paper outlines the biography and achievements of Joseph Louis Lagrange (1736–1813) and includes...
International audienceemainder problems have a long tradition and were widely disseminated in books ...
In this note we point out an estimate for the remainder in the generalised Taylor formula which impr...
When Lagrange wrote his masterpiece Mecanique Analytique, the foundations of analysis were not compl...
AbstractThis paper presents methods for the validated computation of bounds for Taylor coefficients ...