【答案】(1)見解析.
(2) 
.
【解析】分析:(1)先求f′(0)與f′(1)��,看兩值是否異號����,然后證明f′(x)在[0,1]上單調(diào)性��,即可證明函數(shù)f(x)在區(qū)間[0�,1]上存在唯一的極值點;
(2)由題意得到ex-
��,x2-ax-1≥0�,構(gòu)造g(x)=ex-x2-ax-1,分類討論求出g(x)的最值�����,即可得到a的范圍.
詳解:(1)f ′(x)=ex+4x-3,
∵f ′(0)=e0-3=-2<0,f ′(1)=e+1>0,
∴f ′(0)·f ′(1)<0.
令h(x)=f ′(x)=ex+4x-3,則h′(x)=ex+4>0,
∴f ′(x)在區(qū)間[0,1]上單調(diào)遞增,
∴f ′(x)在區(qū)間[0,1]上存在唯一零點,
∴f(x)在區(qū)間[0,1]上存在唯一的極小值點.
(2)由f(x)≥
x2+(a-3)x+1,得ex+2x2-3x≥x2+(a-3)x+1,即ax≤ex-
x2-1,
∵x≥,∴a≤
令g(x)=,則g′(x)=
令φ(x)=ex(x-1)-x2+1,則φ′(x)=x(ex-1).∵x≥,∴φ′(x)>0.
∴φ(x)在[,+∞)上單調(diào)遞增.∴φ(x)≥φ()=
-
>0.
因此g′(x)>0,故g(x)在[,+∞)上單調(diào)遞增,
則g(x)≥g()=
=2-
,∴a的取值范圍是a≤2-.
時,若關(guān)于x的不等式f (x)≥
x2+(a-3)x+1恒成立,試求實數(shù)a的取值范圍.
