Optimal inequalities between Neuman-Sándor, centroidal and harmonic means
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Publication:2879460
DOI10.7153/JMI-07-56zbMath1296.26106OpenAlexW2320297089MaRDI QIDQ2879460
Publication date: 2 September 2014
Published in: Journal of Mathematical Inequalities (Search for Journal in Brave)
Full work available at URL: http://files.ele-math.com/articles/jmi-07-56.pdf
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Optimal bounds for the sine and hyperbolic tangent means by arithmetic and centroidal means in exponential type ⋮ Monotonicity properties and bounds involving the complete elliptic integrals of the first kind ⋮ Improved bounds of Mitrinović-Adamović-type inequalities by using two-parameter functions ⋮ Sharp bounds for Sándor-Yang means in terms of quadratic mean ⋮ Optimal bounds for the sine and hyperbolic tangent means. IV ⋮ Optimal bounds of exponential type for arithmetic mean by Seiffert-like mean and centroidal mean ⋮ New inequalities of Mitrinović-Adamović type ⋮ Optimal inequalities for a Toader-type mean by quadratic and contraharmonic means ⋮ Sharp power mean bounds for two Sándor-Yang means ⋮ Proofs of conjectures of Elezović; and Vukšić concerning the inequalities for means
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