【答案】
(1)解:當(dāng)x=1時��,y=e�����,即f(1)=ae=e���,解得a=1���,
∵f′(x)=ex(x2+2x)+ 
�����,
∴f′(1)=e(1+2)+b=3e﹣1��,解得b=﹣1�,
(2)證明:由(1)得f′(x)=ex(x2+2x)﹣ 
,
令h(x)=ex(x2+2x)﹣ �,
∴h′(x)=ex(x2+4x+2)+ 
,
∴h(x)為增函數(shù)�,
∵f( 
)= 
﹣4< 
﹣4<2﹣4<0,f(1)=3e﹣1>0���,
∴存在唯一的x1∈( �,1),使得f′(x)=0�����,
即 
(x12+2x1)﹣ 
=0���,
亦即2lnx1+ln(x1+2)+x1=0��,
且f(x)在(0,x1)為減函數(shù)�,在(x1����,+∞)為增函數(shù)��,
∴f(x)min=f(x1)= x12+lnx1= 
﹣lnx1= 
﹣lnx1���,
∵g′(x)=﹣ 
ln(x﹣2)+( 
﹣1) 
+ 
= 
���,
令φ(x)=﹣2ln(x﹣2)﹣x+2﹣lnx�����,則φ(x)在(2���,+∞)上為減函數(shù)�,
∵φ(3)=﹣3+2﹣ln3=﹣1﹣ln3<0,φ(2+ 
)=4﹣(2+ )+2﹣ln(2+ )>4﹣(2+1)+2﹣1>0����,
∴存在唯一的x2∈(2+ �����,3),使得φ(x2)=0���,
即φ(x2)=﹣2ln(x2﹣2)﹣x2+2﹣lnx2=0
亦即lnx2+2ln(x2+2)+x2﹣2=0��,
且g(x)在(2��,x2)為增函數(shù)�����,在(x2�����,+∞)為減函數(shù)��,
∴g(x)max=g(x2)=( 
﹣1)ln(x2﹣2)+ 
+1
=( ﹣1)ln(x2﹣2)+ 
+1�����,
= 
[(2﹣x2)ln(x2﹣2)﹣2ln(x2﹣2)﹣x2+1]+1
= [﹣x2ln(x2﹣2)﹣x2+1]+1
= ﹣ln(x2﹣2)����,
∵2lnx1+ln(x1+2)+x1=2ln[(x1+2)﹣2]+ln(x1+2)+(x1+2)﹣2=0
∴x1+2=x2,
∴g(x)max= ﹣ln(x2﹣2)= ﹣lnx1=f(x)min�;
問題得以證明.
【解析】(1)求導(dǎo),由題意可得f'(1)=1��,代入即可求得a����,b的值;(2)分別利用導(dǎo)數(shù)求出函數(shù)f(x)��,g(x)的最值,再比較判斷��,即可證明.
