10.已知函數(shù)f(x)=(x-t)|x|(t∈R).
(Ⅰ)當(dāng)t=2時(shí)��,求函數(shù)f(x)的單調(diào)性��;
(Ⅱ)試討論函數(shù)f(x)的單調(diào)區(qū)間;
(Ⅲ)若?t∈(0��,2)�����,對(duì)于?x∈[-1���,2]����,不等式f(x)>x+a都成立����,求實(shí)數(shù)a的取值范圍.
分析 (Ⅰ)當(dāng)t=2時(shí)��,f(x)=(x-t)|x|=$\left\{\begin{array}{l}{{x}^{2}-2x,}&{(x≥0)}\\{{-x}^{2}+2x��,}&{(x<0)}\end{array}\right.$���,作出其圖象���,利用二次函數(shù)的單調(diào)性可求函數(shù)f(x)的單調(diào)性;
(Ⅱ)分t>0���、t=0���、t<0三類討論,可求得函數(shù)f(x)的單調(diào)區(qū)間����;
(Ⅲ)設(shè)g(x)=f(x)-x=$\left\{\begin{array}{l}{{x}^{2}-(t+1)x,x∈[0����,2]}\\{{-x}^{2}+(t-1)x����,x∈[-1�,0]}\end{array}\right.$,依題意�����,可求得gmin(x)=-t���,只須?t∈(0�,2)��,使得:$\left\{\begin{array}{l}{-\frac{{(t+1)}^{2}}{4}>a}\\{-t>a}\end{array}\right.$成立���,解之即可求得實(shí)數(shù)a的取值范圍.
解答 解:(Ⅰ)當(dāng)t=2時(shí)����,f(x)=(x-t)|x|=$\left\{\begin{array}{l}{{x}^{2}-2x��,}&{(x≥0)}\\{{-x}^{2}+2x����,}&{(x<0)}\end{array}\right.$�,
根據(jù)二次函數(shù)的圖象與性質(zhì)可得:
f(x)在(-∞���,0)上單調(diào)遞增�����,(0,1)上單調(diào)遞減�����,(1����,+∞)上單調(diào)遞增.…(3分)
(Ⅱ)f(x)=$\left\{\begin{array}{l}{{x}^{2}-tx,}&{(x≥0)}\\{{-x}^{2}+tx���,}&{(x<0)}\end{array}\right.$���,…(4分)
當(dāng)t>0時(shí),f(x)的單調(diào)增區(qū)間為[$\frac{t}{2}$����,+∞)�,(-∞��,0]�,單調(diào)減區(qū)間為[0,$\frac{t}{2}$]���,…(6分)
當(dāng)t=0時(shí)����,f(x)的單調(diào)增區(qū)間為R…(8分)
當(dāng)t<0時(shí)�����,f(x)的單調(diào)增區(qū)間為[0����,+∞),(-∞�����,$\frac{t}{2}$]��,單調(diào)減區(qū)間為[$\frac{t}{2}$)…(10分)
(Ⅲ)設(shè)g(x)=f(x)-x=$\left\{\begin{array}{l}{{x}^{2}-(t+1)x,x∈[0���,2]}\\{{-x}^{2}+(t-1)x�����,x∈[-1�����,0]}\end{array}\right.$���,
x∈[0�,2]時(shí),∵$\frac{t+1}{2}$∈(0���,2)����,∴gmin(x)=g($\frac{t+1}{2}$)=-$\frac{{(t+1)}^{2}}{4}$…(11分)
x∈[-1��,0]時(shí)��,∵g(-1)=-t�����,g(0)=0,∴gmin(x)=-t…(12分)
故只須?t∈(0���,2)�,使得:$\left\{\begin{array}{l}{-\frac{{(t+1)}^{2}}{4}>a}\\{-t>a}\end{array}\right.$成立�����,即$\left\{\begin{array}{l}{-\frac{1}{4}≥a}\\{0≥a}\end{array}\right.$.…(14分)
所以a≤-$\frac{1}{4}$…(15分)
點(diǎn)評(píng) 本題考查函數(shù)恒成立問題�����,突出考查二次函數(shù)的單調(diào)性與最值���,考查數(shù)形結(jié)合思想與函數(shù)與方程思想的綜合運(yùn)用���,屬于難題.
