Re: [分析] 證明x^p/p + y^q/q >= 1/p + 1/q
※ 引述《iddee ()》之銘言:
: 證明 (x^p)/p + (y^q)/q ≧ 1/p + 1/q
: for p,q > 1 and x,y > 0 with xy = 1
應該有別的方法, 但我的第一個想法是用mean-value定理來證
Suppose x>=1, y<=1, then log(x)=-log(y) >=0.
x^p-1 y^q-1
----- + ------ = x^(p')log(x) + y^(q')log(y)
p q
= (x^(p')- y^(q'))log(x) >=0.
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03/22 02:57, , 1F
03/22 02:57, 1F