設(shè)a∈R�,函數(shù)f(x)=e-x(a+ax-x2)(e是自然對數(shù)的底數(shù)).
(Ⅰ)若a=1,求曲線y=f(x)在點(diǎn)(-1����,f(-1))處的切線方程;
(Ⅱ)判斷f(x)在R上的單調(diào)性.
解:∵f(x)=e-x(a+ax-x2)
∴f′(x)=-e-x(a+ax-x2)+e-x(a-2x)=e-xx[x-(a+2)]
(Ⅰ)當(dāng)a=1時(shí)f′(x)=e-xx(x-3)����,
則f′(-1)=-e(-1-3)=4e����,f(-1)=e(1-1-12)=-e��,
所以切點(diǎn)坐標(biāo)為(-1��,-e)��,切線斜率k=4e
則切線方程為y+e=4e(x+1)即4ex-y+3e=0�;
(Ⅱ)令f′(x)=0得x=0,x=a+2
∴當(dāng)a+2>0即a>-2時(shí)���,f′(x)>0
∴f(x)在(-∞����,0)���,(a+2�,+∞)單調(diào)遞增���,在(0�,a+2)單調(diào)遞減;
當(dāng)a+2<0即a<-2時(shí)���,f′(x)<0
∴f(x)在(-∞�,a+2)�,(0,+∞)單調(diào)遞增��,在(a+2��,0)單調(diào)遞減��;
當(dāng)a+2=0����,即a=-2時(shí)����,
f′(x)=e-xx2≥0,f(x)在R上單調(diào)遞增.
分析:(Ⅰ)先求出f′(x)����,把a(bǔ)=1代入f′(x)確定其解析式,根據(jù)曲線y=f(x)的切點(diǎn)(-1��,f(-1))得到切線的斜率k=f′(-1),把x=-1代入f(x)中求出f(-1)得到切點(diǎn)的坐標(biāo)�,利用切點(diǎn)坐標(biāo)和斜率寫出切線方程即可;
(Ⅱ)令f′(x)=0解出x的值為0和a+2�����,分a+2大于0���,小于0���,等于0三個(gè)區(qū)間討論f′(x)的正負(fù)時(shí)x的取值范圍即可得到函數(shù)的單調(diào)區(qū)間.
點(diǎn)評:此題是一道綜合題,要求學(xué)生會(huì)根據(jù)導(dǎo)數(shù)求曲線上某點(diǎn)切線的斜率以及會(huì)根據(jù)一點(diǎn)和斜率寫出切線的方程���,會(huì)利用導(dǎo)數(shù)研究函數(shù)的單調(diào)性.
