【答案】(1)見解析����;(2)(-
,2]
【解析】
(1)將a代入,求出函數(shù)的導數(shù)���,分別解f′(x)〈0和f′(x)〉0�����,求出函數(shù)的單調(diào)區(qū)間即可���;
(2)由原不等式移項為右側(cè)為0的形式�����,構造新的函數(shù)����,通過求導對a討論�,研究其增減性及最值,逐步得解.
(1)當a=2時�����,f(x)=(x2+2x+1)e-x
f′(x)=-(x+1)(x-1)e-x
由f′(x)〈0得x<-1或x>1;由f′(x)〉0得-1<x<1;
所以f(x)的單調(diào)遞增區(qū)間為(-1,1),
f(x)的單調(diào)遞減區(qū)間為(-�,-1)���,(1�,+)
(2)f(x)≤x+1
ax2+ax+1≤(x+1)ex
(x+1)ex-ax2-ax-1≥0
令g(x)=(x+1)ex-ax2-ax-1,則g′(x)=(x+2)ex-ax-a���,
令F(x)=g′(x)=(x+2)ex-ax-a,則F′(x)=(x+3)ex-a����,
令t(x)=F′(x)=(x+3)ex-a,則t′(x)=(x+4) ex,
當x≥0時�,t′(x)>0恒成立,從而t(x)在[0,+)上單調(diào)遞增,
此時t(0)=3-a,
F(0)=2-a,g(0)=0
當a≤2時��,t(x)≥t(0)=3-a>0,即F′(x)>0所以F(x)在[0,+)上單調(diào)遞增
所以F(x)≥F(0)=2-a≥0,即g′(x)≥0�����,從而g(x)在[0,+)上單調(diào)遞增
所以g(x)≥g(0)=0
即(x+1)ex-ax2-ax-1≥0恒成立,
所以當a≤2時合題意����;
②當2<a≤3時,t(x)在[0,+)上單調(diào)遞增,且t(x)≥t(0)=3-a≥0即F′(x)≥0
∴F(x)=g′(x)在[0,+)上單調(diào)遞增,又F(0)=g′(0)=2-a<0��,
∴必存在x1(0,+),使得x
(0,x1)時�,
g(x)在(0,x1)上單調(diào)遞減,
∴g(x)<g(0)=0���,
這與g(x)≥0在x≥0時恒成立矛盾����,從而當2<a≤3時不合題意;
③當a>3時�����,t(x)在[0,+)上單調(diào)遞增且t(0)=3-a<0����,
必存在x2(0,+),使得x(0,x2)時,t(x)<0����,即F′(x)<0,從而F(x)=g′(x)在[0,+)上單調(diào)遞減,
∴F(x)<F(0)=g′(0)=2-a<0,
從而g(x)在(0,x1)上單調(diào)遞減 ��,
g(x)<g(0)=0����,這與g(x)≥0在x≥0時恒成立矛盾,從而a>3時不合題意���;
綜上:a的取值范圍是(-,2]
