【答案】
(1)解:當(dāng)a=1時,f(x)= 
﹣aln(1+x)= 
,
f′(x)= 
(x>﹣1)��,
當(dāng)x∈(﹣1��,0)時,f′(x)>0��,f(x)為增函數(shù),當(dāng)x∈(0��,+∞)時,f′(x)<0,f(x)為增函數(shù).
∴f(x)max=f(0)=0��;
(2)解:令h(x)=f(x)+1,
當(dāng)a<0��,對任意實(shí)數(shù)x1,x2∈[0��,2]��,f(x1)+1≥g(x2)恒成立,
即當(dāng)a<0��,對任意實(shí)數(shù)x1��,x2∈[0,2]��,h(x1)≥g(x2)恒成立,
等價于當(dāng)a<0時��,對任意的x1,x2∈[0��,2]��,hmin(x)≥gmax(x)成立,
當(dāng)a<0時��,由h(x)= ﹣aln(1+x)+1,得h′(x)= 
= 
(x>﹣1)��,
當(dāng)x∈(﹣1��,1﹣a)時,h′(x)>0��,h(x)為增函數(shù),當(dāng)x∈(1﹣a��,+∞)時��,h′(x)<0��,h(x)為減函數(shù)��,
若1﹣a<2��,即﹣1<a<0,h(x)在(0��,1﹣a)上為增函數(shù),在(1﹣a��,2)上為減函數(shù),
h(x)的最小值為min{h(0)��,h(2)}=min{1, 
}=1��,
若1﹣a≥2,即a≤﹣1��,h(x)在(0,2)上為增函數(shù)��,函數(shù)f(x)在[0��,2]上的最小值為f(0)=1��,
∴f(x)的最小值為f(0)=1��,
g(x)的導(dǎo)數(shù)g′(x)=2xemx+x2emxm=(mx2+2x)emx��,
當(dāng)m=0時��,g(x)=x2,x∈[0��,2]時��,gmax(x)=g(2)=4,顯然不滿足gmax(x)≤1��,
當(dāng)m≠0時,令g′(x)=0得��, 
��,①當(dāng)﹣ 
≥2��,即﹣1≤m≤0時,在[0��,2]上g′(x)≥0��,∴g(x)在[0,2]單調(diào)遞增��,∴ 
��,只需4e2m≤1��,得m≤﹣ln2,則﹣1≤m≤﹣ln2��;②當(dāng)0<﹣ <2��,即m<﹣1時��,在[0��,﹣ ]��,g′(x)≥0��,g(x)單調(diào)遞增��,在[﹣ ��,2]��,g′(x)<0��,g(x)單調(diào)遞減��,∴g(x)max=g(﹣ )= 
��,只需≤ 1��,得m≤﹣ 
��,則m<﹣1;③當(dāng)﹣ <0��,即m>0時��,顯然在[0��,2]上g′(x)≥0��,g(x)單調(diào)遞增��,g(x)max=g(2)=4e2m��,4e2m≤1不成立.綜上所述��,m的取值范圍是(﹣∞��,﹣ln2].
【解析】(1)把a(bǔ)=1代入函數(shù)解析式��,直接利用導(dǎo)數(shù)求得函數(shù)的最值;(2)構(gòu)造函數(shù)h(x)=f(x)+1��,對任意的x1 ��, x2∈[0��,2]��,f(x1)+1≥g(x2)恒成立��,等價于當(dāng)a<0時,對任意的x1 ��, x2∈[0��,2],hmin(x)≥gmax(x)成立��,分類求得f(x)在[0��,2]上的最小值��,再求g(x)的導(dǎo)數(shù)��,對m討論��,結(jié)合單調(diào)性��,求得最大值��,解不等式即可得到實(shí)數(shù)m的取值范圍.
【考點(diǎn)精析】通過靈活運(yùn)用函數(shù)的最值及其幾何意義��,掌握利用二次函數(shù)的性質(zhì)(配方法)求函數(shù)的最大(��。┲��;利用圖象求函數(shù)的最大(��。┲��;利用函數(shù)單調(diào)性的判斷函數(shù)的最大(��。┲导纯梢越獯鸫祟}.
