An alternative and united proof of a double inequality bounding the arithmetic-geometric mean
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Qi, Feng and Sofo, Anthony (2009) An alternative and united proof of a double inequality bounding the arithmetic-geometric mean. U.P.B. Sci. Bull., Series A, 71 (3). pp. 69-76. ISSN 1223-7027
Abstract
In the paper, we provide an alternative and united proof of a double in-equality for bounding the arithmetic-geometric mean. Moreover we prove that the bounding constants of the double inequality are the best possible.
| Item type | Article |
| URI | https://vuir.vu.edu.au/id/eprint/4539 |
| Official URL | http://www.scientificbulletin.upb.ro/rev_docs/arhi... |
| Subjects | Historical > Faculty/School/Research Centre/Department > School of Engineering and Science Historical > FOR Classification > 0102 Applied Mathematics Historical > SEO Classification > 970101 Expanding Knowledge in the Mathematical Sciences |
| Keywords | ResPubID17622, alternative and united proof, double inequality, arithmetic-geometric mean, complete elliptic integral of the first kind, generalized logarithmic mean |
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