Add to ORKGCalculates the MacLaurin series for a composite function e^{sinx}. Highlights the fact that this series must be a polynomial
The two-parameter method of approximating the sum of a power series in terms of its first three term...
We find an explicit formula for the coefficients of the generalized Maclaurin series for $\sin_p$ p...
This paper completely settles a conjecture of Schinzel (formulated already by Erdos in a special cas...
Calculates the MacLaurin series for the trigonometric function sine x. Comments on the pattern of th...
Calculates the MacLaurin series for the exponential function. Also discusses the MacLaurin series fo...
Taylor polynomial, SeriesAs you increase the number of terms, the Taylor polynomial for the functio...
Firstly introduces the notion of approximating a function via a polynomial before defining the Taylo...
This work introduces a new functional series for expanding an analytic function in terms of an arbit...
A MacMahon symmetric function is a formal power series in a finite number of alphabets that is invar...
Deals with the details of calculating Fourier series coefficients for a function
Presents a program that will graph the first 20 Maclaurin polynomials (Taylor polynomials about x=0)...
In this recording we look at a second example of how to write a composite hyperbolic function as an ...
In this paper we introduce a expansion method for solution of car-leman’s equation, in this method w...
We find an explicit formula for the coefficients $\alpha_n$, $n \in \mathbb{N}$, of the generalized ...
A practicable analytic solution is obtained for any sector by means of Fourier series with singular ...
The two-parameter method of approximating the sum of a power series in terms of its first three term...
We find an explicit formula for the coefficients of the generalized Maclaurin series for $\sin_p$ p...
This paper completely settles a conjecture of Schinzel (formulated already by Erdos in a special cas...
Calculates the MacLaurin series for the trigonometric function sine x. Comments on the pattern of th...
Calculates the MacLaurin series for the exponential function. Also discusses the MacLaurin series fo...
Taylor polynomial, SeriesAs you increase the number of terms, the Taylor polynomial for the functio...
Firstly introduces the notion of approximating a function via a polynomial before defining the Taylo...
This work introduces a new functional series for expanding an analytic function in terms of an arbit...
A MacMahon symmetric function is a formal power series in a finite number of alphabets that is invar...
Deals with the details of calculating Fourier series coefficients for a function
Presents a program that will graph the first 20 Maclaurin polynomials (Taylor polynomials about x=0)...
In this recording we look at a second example of how to write a composite hyperbolic function as an ...
In this paper we introduce a expansion method for solution of car-leman’s equation, in this method w...
We find an explicit formula for the coefficients $\alpha_n$, $n \in \mathbb{N}$, of the generalized ...
A practicable analytic solution is obtained for any sector by means of Fourier series with singular ...
The two-parameter method of approximating the sum of a power series in terms of its first three term...
We find an explicit formula for the coefficients of the generalized Maclaurin series for $\sin_p$ p...
This paper completely settles a conjecture of Schinzel (formulated already by Erdos in a special cas...