摘要
在不等式证明中一个常用的绝对值不等式|a+b|≤|a|+|b|可推得如上两个结论: (Ⅰ)|a+b|【|a|+|b|ab【0, (Ⅱ)|a+b|=|a|+|b|ab≥0。这两个结论对解一些方程和不等式有事半功倍之效。例1 解方程 (x+(2x-1)<sup>1/2</sup>)<sup>1/2</sup>+(x-(2x-1)<sup>1/2</sup>)<sup>1/2</sup>=2<sup>1/2</sup> (第一届国际中学生数学竞赛题) 解:将原方程两边乘以2<sup>1/2</sup>得:(2x-1+2 (2x-1)<sup>1/2</sup>)<sup>1/2</sup>+1+(2x-1-2 (2x-1)<sup>1/2</sup>)<sup>1/2</sup>+1=2令y=(2x-1)<sup>1/2</sup>(y≥0),则原方程可变为: ((y+1)<sup>2</sup>)<sup>1/2</sup>+((y-1)<sup>2</sup>)<sup>1/2</sup>=2即|y+1|+|1-y|=2∵(y+1)+(1-y)=2,根据(Ⅱ)得:(y+1)(1-y)≥0,∴-1≤y≤1。又y≥0,∴0≤y≤1即0≤(2x-1)<sup>1/2</sup>≤1解之得1/2≤x≤1。
