17.設(shè)a為實(shí)數(shù),函數(shù)f(x)=(x-a)2+|x-a|-a(a-1).
(1)若f(0)≤1,求a的取值范圍��;
(2)討論f(x)的單調(diào)性��;
(3)當(dāng)a>2時(shí)�,討論f(x)+|x|在R上的零點(diǎn)個(gè)數(shù).
分析 (1)根據(jù)f(0)≤1列不等式,對(duì)a進(jìn)行討論解出a的范圍�����,
(2)根據(jù)二次函數(shù)的對(duì)稱軸和開(kāi)口方向判斷單調(diào)區(qū)間���,
(3)設(shè)g(x)=f(x)+|x|���,寫(xiě)出g(x)的解析式,利用二次函數(shù)的性質(zhì)判斷g(x)的單調(diào)性���,根據(jù)零點(diǎn)存在定理判斷即可.
解答 解:(1)∵f(0)≤1
∴f(0)=(0-a)2+|x-a|-a(a-1)=a2+|a|-a(a-1)=|a|+a≤1
∴當(dāng)a≤0時(shí)��,不等式為0≤1恒成立���,滿足條件,
當(dāng)a>0時(shí)�,不等式為a+a≤1�����,
∴0<a≤$\frac{1}{2}$�����,
綜上所述a的取值范圍為(-∞����,$\frac{1}{2}$]���;
(2)當(dāng)x<a時(shí),函數(shù) f(x)=x2-(2a+1)x+2a�,
其對(duì)稱軸為x=$\frac{2a+1}{2}$=a+$\frac{1}{2}$>a,此時(shí)y=f(x)在(-∞�,a)時(shí)是減函數(shù),
當(dāng)x≥a時(shí)�����,f(x)=x2+(1-2a)x����,
其對(duì)稱軸為:x=a-$\frac{1}{2}$<a����,y=f(x)在(a�����,+∞)時(shí)是增函數(shù)���,
綜上所述�,f(x)在(a�,+∞)上單調(diào)遞增,在(-∞�,a)上單調(diào)遞減,
(3)設(shè)g(x)=f(x)+|x|=$\left\{\begin{array}{l}{{x}^{2}+(2-2a)x����,x≥a}\\{{x}^{2}-2ax+2a,0≤x<a}\\{{x}^{2}-(2a+2)x+2a���,x<0}\end{array}\right.$����,
當(dāng)x≥a時(shí)����,其對(duì)稱軸為x=a-1����,
當(dāng)0≤x<a時(shí)�����,其對(duì)稱軸為x=a��,
當(dāng)x<0時(shí)�����,其對(duì)稱軸為x=a+1����,
∴g(x)在(-∞��,0)上單調(diào)遞減�,在(0,a)上單調(diào)遞減���,在(a��,+∞)上單調(diào)遞增����,
∵g(0)=2a>0,g(a)=a2+(2-2a)a=2a-a2=-(a-1)2+1�,
又a>2,
∴g(a)=-(a-1)2+1在(2�,+∞)上單調(diào)遞減,
∴g(a)<g(2)=0�����,
∴f(x)在(0���,a)和(a����,+∞)上各有一個(gè)零點(diǎn)����,
綜上所述a>2時(shí),f(x)+|x|在R上有2個(gè)零點(diǎn).
點(diǎn)評(píng) 本題考查了二次函數(shù)的圖象和性質(zhì)��,以及函數(shù)零點(diǎn)存在定理����,關(guān)鍵是分類討論��,屬于中檔題
