Open AccessDerivation Power Sums of Even Integer Number Formula
Author(s) -
Rafid Fayadh Hamdi
Publication year - 2013
Publication title -
mağallaẗ baġdād li-l-ʿulūm
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.167
H-Index - 6
eISSN - 2411-7986
pISSN - 2078-8665
DOI - 10.21123/bsj.10.2.301-318
Subject(s) - integer (computer science) , mathematics , radical of an integer , power of two , integer programming , sums of powers , discrete mathematics , power (physics) , combinatorics , integer points in convex polyhedra , perfect power , branch and price , arithmetic , mathematical optimization , computer science , prime factor , prime (order theory) , physics , quantum mechanics , programming language
This paper included derivative method for the even r power sums of even integer numbers formula to approach high even (r+2) power sums of even integer numbers formula so on we can approach from derivative odd r power sums of even integer numbers formula to high odd (r+2) power sums of even integer numbers formula this derivative excellence have ability to used by computer programming language or any application like Microsoft Office Excel. Also this research discovered the relationship between r power sums of even integer numbers formula and both formulas for same power sums of odd integer numbers formula and for r power sums of all integer numbers formula in another way.