7.求證:f(x)=$\sqrt{{x}^{2}+1}$-x在R上單調(diào)遞減.
分析 根據(jù)單調(diào)性的定義����,證明函數(shù)f(x)在R上是單調(diào)遞減函數(shù)即可.
解答 證明:任取x1、x2∈R�,且x1<x2;
則f(x1)-f(x2)=($\sqrt{{{x}_{1}}^{2}+1}$-x1)-($\sqrt{{{x}_{2}}^{2}+1}$-x2)
=($\sqrt{{{x}_{1}}^{2}+1}$-$\sqrt{{{x}_{2}}^{2}+1}$)+(x2-x1)
=$\frac{{{(x}_{1}}^{2}+1)-{{(x}_{2}}^{2}-1)}{\sqrt{{{x}_{1}}^{2}+1}+\sqrt{{{x}_{2}}^{2}+1}}$+(x2-x1)
=$\frac{{(x}_{1}{+x}_{2}){(x}_{1}{-x}_{2})}{\sqrt{{{x}_{1}}^{2}+1}+\sqrt{{{x}_{2}}^{2}+1}}$+(x2-x1)
=(x2-x1)(1-$\frac{{x}_{1}{+x}_{2}}{\sqrt{{{x}_{1}}^{2}+1}+\sqrt{{{x}_{2}}^{2}+1}}$)�;
∵x1<x2,∴x2-x1>0��,
又x1+x2≤|x1|+|x2|<$\sqrt{{{x}_{1}}^{2}+1}$+$\sqrt{{{x}_{2}}^{2}+1}$��,
∴$\frac{{x}_{1}{+x}_{2}}{\sqrt{{{x}_{1}}^{2}+1}+\sqrt{{{x}_{2}}^{2}+1}}$<1�,
∴1-$\frac{{x}_{1}{+x}_{2}}{\sqrt{{{x}_{1}}^{2}+1}+\sqrt{{{x}_{2}}^{2}+1}}$>0;
∴f(x1)-f(x2)>0����,
即f(x1)>f(x2),
∴f(x)在R上是減函數(shù).
點(diǎn)評(píng) 本題考查了利用單調(diào)性的定義證明函數(shù)單調(diào)性問(wèn)題�,其基本步驟是取值、作差��,判正負(fù)�����,下結(jié)論.
