AM-GM inequality
Revision as of 16:27, 27 November 2021 by Etmetalakret (talk | contribs)
In algebra, the AM-GM inequality, sometimes called the inequality of arithmetic and geometric means, states that the arithmetic mean is greater than or equal to the geometric mean of any list of nonnegative reals; furthermore, equality holds if and only if every real in the list is the same.
In symbols, the inequality states that for any , with equality if and only if .
NOTE: This article is a work-in-progress and meant to replace the Arithmetic mean-geometric mean inequality article, which is of poor quality.
OUTLINE:
- Proofs
- Links to Proofs of AM-GM Inequality
- Generalizations
- Weighted AM-GM
- QM-AM-GM-HM (with or without weights)
- Power Mean (with or without weights)