【答案】
(1)解:f′(x)=f′(1)e2x﹣2+2x﹣2f(0)�����,所以f′(1)=f′(1)+2﹣2f(0)���,即f(0)=1.又 
,
所以f′(1)=2e2���,所以f(x)=e2x+x2﹣2x.
(2)解:∵f(x)=e2x﹣2x+x2����,
∴ 
���,
∴g′(x)=ex﹣a.
①當(dāng)a≤0時(shí)����,g′(x)>0�,函數(shù)f(x)在R上單調(diào)遞增;
②當(dāng)a>0時(shí)�,由g′(x)=ex﹣a=0得x=lna,
∴x∈(﹣∞��,lna)時(shí)����,g′(x)<0,g(x)單調(diào)遞減����;x∈(lna,+∞)時(shí)�,g′(x)>0,g(x)單調(diào)遞增.
綜上���,當(dāng)a≤0時(shí)���,函數(shù)g(x)的單調(diào)遞增區(qū)間為(∞,∞)�;
當(dāng)a>0時(shí),函數(shù)g(x)的單調(diào)遞增區(qū)間為(lna�,+∞),單調(diào)遞減區(qū)間為(﹣∞����,lna)
(3)解:解:設(shè) 
,∵ 
�����,∴p(x)在x∈[1,+∞)上為減函數(shù)�����,又p(e)=0��,∴當(dāng)1≤x≤e時(shí)��,p(x)≥0�,當(dāng)x>e時(shí),p(x)<0.∵ 
�, 
,∴q′(x)在x∈[1��,+∞)上為增函數(shù)��,又q′(1)=0�,∴x∈[1,+∞)時(shí)��,q'(x)≥0���,∴q(x)在x∈[1����,+∞)上為增函數(shù),∴q(x)≥q(1)=a+1>0.
① 當(dāng)1≤x≤e時(shí)�, 
,
設(shè) 
����,則 
����,∴m(x)在x∈[1,+∞)上為減函數(shù)�����,
∴m(x)≤m(1)=e﹣1﹣a����,
∵a≥2,∴m(x)<0�����,∴|p(x)|<|q(x)|�����,∴ 
比ex﹣1+a更靠近lnx.
②當(dāng)x>e時(shí), 
�,
設(shè)n(x)=2lnx﹣ex﹣1﹣a,則 
��, 
�����,∴n′(x)在x>e時(shí)為減函數(shù)���,
∴ 
���,∴n(x)在x>e時(shí)為減函數(shù),∴n(x)<n(e)=2﹣a﹣ee﹣1<0�����,
∴|p(x)|<|q(x)|���,∴ 比ex﹣1+a更靠近lnx.
綜上:在a≥2�,x≥1時(shí)�, 比ex﹣1+a更靠近lnx
【解析】(1)求出函數(shù)的導(dǎo)數(shù),利用賦值法,求出f′(1)=f′(1)+2﹣2f(0)��,得到f(0)=1.然后求解f′(1)�����,即可求出函數(shù)的解析式.(2)求出函數(shù)的導(dǎo)數(shù)g′(x)=ex+a����,結(jié)合a≥0,a<0�����,分求解函數(shù)的單調(diào)區(qū)間即可.(3)構(gòu)造 ��,通過函數(shù)的導(dǎo)數(shù)���,判斷函數(shù)的單調(diào)性,結(jié)合當(dāng)1≤x≤e時(shí)��,當(dāng)1≤x≤e時(shí)�����,推出|p(x)|<|q(x)|,說明 比ex﹣1+a更靠近lnx.當(dāng)x>e時(shí)���,通過作差���,構(gòu)造新函數(shù),利用二次求導(dǎo)��,判斷函數(shù)的單調(diào)性����,證明 比ex﹣1+a更靠近lnx.
