DOIAbstract
AbstractIn this article, all of the cases of the inequality[formula]being or not being valid are discussed for all real numbersx,y∈R andx≠0, wherea,b>0 anda≠b. Some recent developments concerning mean values are simply introduced
AbstractIn this article, all of the cases of the inequality[formula]being or not being valid are discussed for all real numbersx,y∈R andx≠0, wherea,b>0 anda≠b. Some recent developments concerning mean values are simply introduced
The extended mean values E(r, s; x, y) play an important role in theory of mean values and theory of...
The extended mean values E(r, s; x, y) play an important role in theory of mean values and theory of...
The inequalities[formula]hold for all real numbersx≠0. The constants 1/(2ζ(3)) and 1/6 are best poss...
AbstractIn this article, all of the cases of the inequality[formula]being or not being valid are dis...
AbstractIn this article, using the properties of the power mean, the author proves the inequalityna1...
Since unambiguous ranking of income distributions according to their degree of inequality is not alw...
AbstractThe aim of this article is to give a simple and elementary proof and extensions of the inequ...
Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction...
AbstractA formula is derived from which one can obtain a family of two-sided inequalities involving ...
Using the papers [1] and [2] the inequality (1) is given and the author indicates the application of...
This thesis presents for functions f:Rn--Rm a more general version of the Mean Value Inequality. The...
In this paper we shall consider some famous means such as arithmetic,\ud harmonic, geometric, root-s...
AbstractSome generalizations and refinements of the well-known Hölder’s inequality are obtained
The arithmetic-geometric mean inequality: √ab ≤ (a+b)/2, for a,b≥ 0Ensino Médio::MatemáticaEducação ...
AbstractIdeas related to matrix versions of the arithmetic-geometric mean inequality are explained
The extended mean values E(r, s; x, y) play an important role in theory of mean values and theory of...
The extended mean values E(r, s; x, y) play an important role in theory of mean values and theory of...
The inequalities[formula]hold for all real numbersx≠0. The constants 1/(2ζ(3)) and 1/6 are best poss...
AbstractIn this article, all of the cases of the inequality[formula]being or not being valid are dis...
AbstractIn this article, using the properties of the power mean, the author proves the inequalityna1...
Since unambiguous ranking of income distributions according to their degree of inequality is not alw...
AbstractThe aim of this article is to give a simple and elementary proof and extensions of the inequ...
Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction...
AbstractA formula is derived from which one can obtain a family of two-sided inequalities involving ...
Using the papers [1] and [2] the inequality (1) is given and the author indicates the application of...
This thesis presents for functions f:Rn--Rm a more general version of the Mean Value Inequality. The...
In this paper we shall consider some famous means such as arithmetic,\ud harmonic, geometric, root-s...
AbstractSome generalizations and refinements of the well-known Hölder’s inequality are obtained
The arithmetic-geometric mean inequality: √ab ≤ (a+b)/2, for a,b≥ 0Ensino Médio::MatemáticaEducação ...
AbstractIdeas related to matrix versions of the arithmetic-geometric mean inequality are explained
The extended mean values E(r, s; x, y) play an important role in theory of mean values and theory of...
The extended mean values E(r, s; x, y) play an important role in theory of mean values and theory of...
The inequalities[formula]hold for all real numbersx≠0. The constants 1/(2ζ(3)) and 1/6 are best poss...
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