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2011 An Optimal Double Inequality between Seiffert and Geometric Means
Yu-Ming Chu, Miao-Kun Wang, Zi-Kui Wang
J. Appl. Math. 2011: 1-6 (2011). DOI: 10.1155/2011/261237
Abstract

For α , β ( 0,1 / 2 ) we prove that the double inequality G ( α a + ( 1 - α ) b , α b + ( 1 - α ) a ) < P ( a , b ) < G ( β a + ( 1 - β ) b , β b + ( 1 - β ) a ) holds for all a , b > 0 with a b if and only if α ( 1 - 1 - 4 / π 2 ) / 2 and β ( 3 - 3 ) / 6 . Here, G ( a , b ) and P ( a , b ) denote the geometric and Seiffert means of two positive numbers a and b, respectively.
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Yu-Ming Chu, Miao-Kun Wang, and Zi-Kui Wang "An Optimal Double Inequality between Seiffert and Geometric Means," Journal of Applied Mathematics 2011(none), 1-6, (2011). https://doi.org/10.1155/2011/261237
Published: 2011
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