函数f(x)=[log2(x)-1]/[log2(x)+1],若f(x1)+f(2x2)=1(其中x1、x2均大于2),则f(x1x2)的最小值为
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函数化为f(x)=1-2/(1+log2(x))
1-f(X)=1/(1+log2(x))
1-f(x1)=1/(1+log2(x1)).(1)
f(x1)+f(2x2)=1
1-f(X1)=f(2*x2).(2)
(1)(2):
1/(1+log2(X1))=[1-log2(2x2)]/[1+log2(2x2)]
1+log2(2x2)=log2(x1)*log2(2x2)-log2(X1)+log2(2x2)-1
得log2(X1)*log2(x2)=2.(3)
因为f(x1*x2)=1-2/[1+log2(x1*x2)]
求f(x1*x2)min,只需log2(x1*x2)min.
log2(x1*x2)=log2(x1)+log2(x2)
>=2log2(X1)*log2(x2)
(x1>2,x2>2.log2(x1)>1,log2(x2)>1)log2(x1*x2)min=2*2=4
f(x1*x2)min=[log2(x)-1]/[log2(x)+1]=4-1/4+1=3/5