Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite time consuming. The graphs of these functions are important when studying their characteristics. James Gregory, a Scottish mathematician in the 17th century, made an important discovery about these functions. Using calculus, he wrote a series of terms to approximate very closely the graph of the curve. His main focus was with the function ln x ; he was able to calculate any positive value of x using a polynomial series. Brook Taylor, an English mathematician, generalized the Maclaurin series, devised by Colin Maclaurin. However, Gregory had actually known about them long before Taylor came into the picture. Taylor invented the method for expandi...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
O objetivo deste trabalho ́e mostrar aos alunos e professores do Ensino Médio como as funções não al...
The study of polynomials is an important foundational idea in elementary algebra and introductory ca...
Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite tim...
Choose the maximum degree of the Taylor polynomial to use to approximate a variety of functions and ...
Taylor series is a topic briefly covered in most university calculus sequences. In many cases it co...
Taylor’s theorem and Taylor’s series constitute one of the more important tools used by mathematicia...
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
Taylor polynomial, SeriesAs you increase the number of terms, the Taylor polynomial for the functio...
Scope and Method of Study: This study is composed of a short familiarization with ordinary Taylor se...
The study of Maclaurin and Taylor polynomials entails the comprehension of various new mathematical ...
Presents a program that will graph the first 20 Maclaurin polynomials (Taylor polynomials about x=0)...
Mathematics educators are realizing the impact that technology is having on the way mathematical fun...
Firstly introduces the notion of approximating a function via a polynomial before defining the Taylo...
In this paper we give an historical synopsis of various Taylor remainders and their di erent proofs ...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
O objetivo deste trabalho ́e mostrar aos alunos e professores do Ensino Médio como as funções não al...
The study of polynomials is an important foundational idea in elementary algebra and introductory ca...
Before the age of calculators, studying functions such as sin x, cos x , ex , and ln x was quite tim...
Choose the maximum degree of the Taylor polynomial to use to approximate a variety of functions and ...
Taylor series is a topic briefly covered in most university calculus sequences. In many cases it co...
Taylor’s theorem and Taylor’s series constitute one of the more important tools used by mathematicia...
Functions are one of the most used aspects of mathematics. It lets us calculate, represent and appro...
Taylor polynomial, SeriesAs you increase the number of terms, the Taylor polynomial for the functio...
Scope and Method of Study: This study is composed of a short familiarization with ordinary Taylor se...
The study of Maclaurin and Taylor polynomials entails the comprehension of various new mathematical ...
Presents a program that will graph the first 20 Maclaurin polynomials (Taylor polynomials about x=0)...
Mathematics educators are realizing the impact that technology is having on the way mathematical fun...
Firstly introduces the notion of approximating a function via a polynomial before defining the Taylo...
In this paper we give an historical synopsis of various Taylor remainders and their di erent proofs ...
AbstractThe general form of Taylor's theorem for a function f:K→K, where K is the real line or the c...
O objetivo deste trabalho ́e mostrar aos alunos e professores do Ensino Médio como as funções não al...
The study of polynomials is an important foundational idea in elementary algebra and introductory ca...