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令0<x1<x2
f(x2)-f(x1) = (x2^2 - 1/x2) - (x1^2 - 1/x1)
= (x2^2-x1^2) - (1/x2 - 1/x1)
= (x2+x1)(x2-x1) - (x1-x2)/(x1x2)
= (x2+x1)(x2-x1) + (x2-x1)/(x1x2)
= (x2-x1) { (x2+x1)+1/(x1x2)}
∵0<x1<x2,∴x2-x1>0
∵0<x1<x2,∴ (x2+x1)+1/(x1x2)>0
∴f(x2)-f(x1) = (x2-x1) { (x2+x1)+1/(x1x2)} >0
∴f(x2)>f(x1) ,f(x)在(0,+∞)上是增函数
f(x2)-f(x1) = (x2^2 - 1/x2) - (x1^2 - 1/x1)
= (x2^2-x1^2) - (1/x2 - 1/x1)
= (x2+x1)(x2-x1) - (x1-x2)/(x1x2)
= (x2+x1)(x2-x1) + (x2-x1)/(x1x2)
= (x2-x1) { (x2+x1)+1/(x1x2)}
∵0<x1<x2,∴x2-x1>0
∵0<x1<x2,∴ (x2+x1)+1/(x1x2)>0
∴f(x2)-f(x1) = (x2-x1) { (x2+x1)+1/(x1x2)} >0
∴f(x2)>f(x1) ,f(x)在(0,+∞)上是增函数
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