- #1
Ed Quanta
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The arithmetic-geometric mean inequality is
a1...an<=[(a1+...+an)/n]^n where all of the a terms (a1,a2,etc) are non-negative real numbers. How do I go about proving this is true for 2^n terms? Thanks.
a1...an<=[(a1+...+an)/n]^n where all of the a terms (a1,a2,etc) are non-negative real numbers. How do I go about proving this is true for 2^n terms? Thanks.