13.設(shè)函數(shù)f(x)=|ax+1|+|x-a|(a>0).
(1)討論函數(shù)f(x)的單調(diào)性����,并寫(xiě)出f(x)的最小值g(a);
(2)對(duì)任意a∈(0�,2],存在實(shí)數(shù)x0��,使得f(x0)≤m��,求實(shí)數(shù)m的取值范圍.
分析 (1)利用零點(diǎn)分段法�����,將函數(shù)化為分段函數(shù)的形式,結(jié)合二次函數(shù)的圖象和性質(zhì)��,可得函數(shù)的單調(diào)性����,即最小值;
(2)對(duì)任意a∈(0��,2]�����,存在實(shí)數(shù)x0�,使得f(x0)≤m�����,則函數(shù)f(x)的最小值≤m�����,結(jié)合(1)中結(jié)論�����,求出f(x)的最小值g(a)的最大值,可得實(shí)數(shù)m的取值范圍.
解答 解:(1)由ax+1=0得:x=-$\frac{1}{a}$����,由x-a=0得,x=a����,
①當(dāng)x<-$\frac{1}{a}$時(shí),f(x)=-ax-1-x+a=-(a+1)x+a-1�,此時(shí)函數(shù)為減函數(shù),
此時(shí)f(x)>f(-$\frac{1}{a}$)=$\frac{1}{a}$+a���,
②當(dāng)-$\frac{1}{a}$≤x≤a時(shí)�,f(x)=ax+1-x+a=(a-1)x+a+1���,
若0<a<1�,此時(shí)函數(shù)為減函數(shù)��,f(x)≥f(a)=a2+1���,
若a=1���,此時(shí)f(x)=2恒成立�����;
若a>1����,此時(shí)函數(shù)為增函數(shù)�,f(x)≥f(-$\frac{1}{a}$)=$\frac{1}{a}$+a,
③當(dāng)x<-$\frac{1}{a}$時(shí)�,f(x)=ax+1+x-a=(a+1)x-a+1,此時(shí)函數(shù)為增函數(shù)����,
此時(shí)f(x)>f(a)=a2+1,
綜上所述:若0<a<1����,函數(shù)在(-∞��,a]上為減函數(shù)�����,在[a��,+∞)上為增函數(shù);
若a=1�,函數(shù)在(-∞,-$\frac{1}{a}$]上為減函數(shù)��,在[a��,+∞)上為增函數(shù)�;
若a>1,函數(shù)在(-∞��,-$\frac{1}{a}$]上為減函數(shù)���,在[-$\frac{1}{a}$�����,+∞)上為增函數(shù)�����;
g(a)=$\left\{\begin{array}{l}{a}^{2}+1����,0<a≤1\\ \frac{1}{a}+a�,a>1\end{array}\right.$
證明:(2)由(1)得:f(x)的最小值g(a)=$\left\{\begin{array}{l}{a}^{2}+1���,0<a≤1\\ \frac{1}{a}+a,1<a≤2\end{array}\right.$����,
若對(duì)任意a∈(0,2]�����,存在實(shí)數(shù)x0����,使得f(x0)≤m,
則g(a)≤m恒成立�,
由g(a)=$\left\{\begin{array}{l}{a}^{2}+1,0<a≤1\\ \frac{1}{a}+a���,1<a≤2\end{array}\right.$得,當(dāng)a=2時(shí)�����,g(a)取最大值$\frac{5}{2}$����,
∴m≥$\frac{5}{2}$
點(diǎn)評(píng) 本題考查的知識(shí)點(diǎn)是分段函數(shù)的應(yīng)用�,二次函數(shù)的圖象和性質(zhì)���,對(duì)勾函數(shù)的圖象和性質(zhì)����,函數(shù)的最值�,難度中檔.
