7.解不等式:
(1)|x2-5x+10|>x2-8�����;
(2)|x2-4|≤x+2�����;
(3)|x+1|<$\frac{1}{x-1}$���;
(4)|x+2|-|x-3|<4���;
(5)|x+3|-|2x-1|<$\frac{x}{2}$+1.
分析 (1)根據(jù)x2-5x+10>0�,可得不等式即 x2-5x+10>x2-8�,由此求得它的解集.
(2)把要求得不等式去掉絕對(duì)值,化為與之等價(jià)的3個(gè)不等式組���,求得每個(gè)不等式組的解集��,再取并集��,即得所求.
(3)不等式等價(jià)于 $\left\{\begin{array}{l}{x>1}\\{x+1<\frac{1}{x-1}}\end{array}\right.$�����,由此求得它的解集.
(4)由條件利用絕對(duì)值的意義求得它的解集.
(5)把要求得不等式去掉絕對(duì)值��,化為與之等價(jià)的3個(gè)不等式組��,求得每個(gè)不等式組的解集����,再取并集,即得所求.
解答 解:(1)∵x2-5x+10=${(x-\frac{5}{2})}^{2}$+$\frac{15}{4}$>0����,故|x2-5x+10|>x2-8,
即 x2-5x+10>x2-8�,求得它的解集為{x|x<$\frac{18}{5}$}.
(2)|x2-4|≤x+2等價(jià)于$\left\{\begin{array}{l}{x+2≥0}\\{-x-2{≤x}^{2}-4≤x+2}\end{array}\right.$,即$\left\{\begin{array}{l}{x≥-2}\\{{x}^{2}-4≥-x-2}\\{{x}^{2}-4≤x+2}\end{array}\right.$�����,即 $\left\{\begin{array}{l}{x≥-2}\\{x≤-2或x≥1}\\{-2≤x≤3}\end{array}\right.$����,
求得它的解集為{x|x=-2或1≤x≤3 }.
(3)∵|x+1|<$\frac{1}{x-1}$�����,∴x-1>0��,即x>1�,∴$\left\{\begin{array}{l}{x>1}\\{x+1<\frac{1}{x-1}}\end{array}\right.$���,
求得它的解集為{x|1<x<$\sqrt{2}$ }.
(4)由于|x+2|-|x-3|表示數(shù)軸上的x對(duì)應(yīng)點(diǎn)到-2對(duì)應(yīng)點(diǎn)的距離減去它到3對(duì)應(yīng)點(diǎn)的距離�����,
而2.5對(duì)應(yīng)點(diǎn)-2對(duì)應(yīng)點(diǎn)的距離減去它到3對(duì)應(yīng)點(diǎn)的距離正好等于4����,
故|x+2|-|x-3|<4的解集為{x|x>2.5}.
(5)|x+3|-|2x-1|<$\frac{x}{2}$+1等價(jià)于$\left\{\begin{array}{l}{x<-3}\\{-x-3-(1-2x)<\frac{x}{2}+1}\end{array}\right.$①�����,或$\left\{\begin{array}{l}{-3≤x<\frac{1}{2}}\\{x+3-(1-2x)<\frac{x}{2}+1}\end{array}\right.$②�,
或$\left\{\begin{array}{l}{x≥\frac{1}{2}}\\{x+3-(2x-1)<\frac{x}{2}+1}\end{array}\right.$.
解①求得x<-3��,解②求得-3≤x<-$\frac{2}{5}$�����,解③求得x>2.
綜上可得,不等式的解集為{x|x<-$\frac{2}{5}$��,或x>2}.
點(diǎn)評(píng) 本題主要考查絕對(duì)值的意義���,絕對(duì)值不等式的解法����,體現(xiàn)了等價(jià)轉(zhuǎn)化�、分類(lèi)討論的數(shù)學(xué)思想,屬于中檔題.
