The purpose of this paper is to develop and obtain a formula for the gamma function (according to science researchers) for different negative numbers using mathematical inference and Striling’s Asymptotic Formula. Compression between the previous formulae and developed formula for negative numbers such as (-0.5,-1.5) have been conducted, so the results were identical
AbstractThe aim of this paper is to improve the Ramanujan formula for approximation the gamma functi...
textabstractAn algorithm for computing the incomplete gamma function γ∗(a, z) for real values of the...
This paper consists of a discussion of the properties and applications of certain improper integrals...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to s...
The Gamma function Γ (s)(-r) is defined by Γ (s)(-r) = N - lim ε→0 ∫ε ∞ t -r-1, ln s t e -t dt for r...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
In this paper we develop Windschitl’s approximation formula for the gamma function by giving two asy...
An algorithm for computing the incomplete gamma function ?*(a, z) for real values of the parameter a...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
In this paper we analyze the behavior of the Gamma function at its critical points and points of dis...
This paper presents a newly extended gamma function for positive real number and correct the error ...
The real numbers between any two non-negative integers are positive and infinite. This paper analyze...
The object of this paper is to show the relation of the Beta Function to the Gamma Function: i.e. in...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
A new method for computing the gamma cumulative distribution functions and their inverses is present...
AbstractThe aim of this paper is to improve the Ramanujan formula for approximation the gamma functi...
textabstractAn algorithm for computing the incomplete gamma function γ∗(a, z) for real values of the...
This paper consists of a discussion of the properties and applications of certain improper integrals...
The purpose of this paper is to develop and obtain a formula for the gamma function (according to s...
The Gamma function Γ (s)(-r) is defined by Γ (s)(-r) = N - lim ε→0 ∫ε ∞ t -r-1, ln s t e -t dt for r...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
In this paper we develop Windschitl’s approximation formula for the gamma function by giving two asy...
An algorithm for computing the incomplete gamma function ?*(a, z) for real values of the parameter a...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
In this paper we analyze the behavior of the Gamma function at its critical points and points of dis...
This paper presents a newly extended gamma function for positive real number and correct the error ...
The real numbers between any two non-negative integers are positive and infinite. This paper analyze...
The object of this paper is to show the relation of the Beta Function to the Gamma Function: i.e. in...
Several professors of mathematics from the renowned universities in Australia, Canada, Europe, India...
A new method for computing the gamma cumulative distribution functions and their inverses is present...
AbstractThe aim of this paper is to improve the Ramanujan formula for approximation the gamma functi...
textabstractAn algorithm for computing the incomplete gamma function γ∗(a, z) for real values of the...
This paper consists of a discussion of the properties and applications of certain improper integrals...
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