Sharp Power Mean Bounds for Sándor Mean

Publication Date

2015-01-15

Country of Publication

Egypt

No. of Pages

Main Subjects

Mathematics

Abstract EN

We prove that the double inequality Mp(a,b)0 with a≠b if and only if p≤1/3 and q≥log 2/(1+log 2)=0.4093…, where X(a,b) and Mr(a,b) are the Sándor and rth power means of a and b, respectively.

American Psychological Association (APA)

Chu, Yu-Ming& Yang, Zhen-Hang& Wu, Li-Min. 2015. Sharp Power Mean Bounds for Sándor Mean. Abstract and Applied Analysis،Vol. 2015, no. 2015, pp.1-5.
https://search.emarefa.net/detail/BIM-1051993

Modern Language Association (MLA)

Chu, Yu-Ming…[et al.]. Sharp Power Mean Bounds for Sándor Mean. Abstract and Applied Analysis No. 2015 (2015), pp.1-5.
https://search.emarefa.net/detail/BIM-1051993

American Medical Association (AMA)

Chu, Yu-Ming& Yang, Zhen-Hang& Wu, Li-Min. Sharp Power Mean Bounds for Sándor Mean. Abstract and Applied Analysis. 2015. Vol. 2015, no. 2015, pp.1-5.
https://search.emarefa.net/detail/BIM-1051993

Data Type

Journal Articles

Language

English

Notes

Includes bibliographical references

Record ID

BIM-1051993

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