【答案】(1)b=-1(2)見解析(3)(-∞����,
)
【解析】分析:(1)設(shè)切點(diǎn)為(t,et)���,由導(dǎo)數(shù)的幾何意義�����,可得et=1����,且et=t-b�����,即可得到b=-1��;
(2)求出T(x)的導(dǎo)數(shù)�����,討論當(dāng)a≥0時(shí)���,當(dāng)a<0時(shí)�,由導(dǎo)數(shù)大于0,可得增區(qū)間���;
(3)求出h(x)的分段函數(shù)����,討論x的范圍�,求得單調(diào)區(qū)間,對(duì)b討論�����,求得h(x)的最值����,由存在性思想��,即可得到b的范圍.
詳解:
(1)設(shè)切點(diǎn)為(t�,et),因?yàn)楹瘮?shù)f(x)的圖象與函數(shù)g(x)的圖象相切�,
所以et=1,且et=t-b���,
解得b=-1.
(2)T(x)=ex+a(x-b)�,T′(x)=ex+a.
當(dāng)a≥0時(shí),T′(x)>0恒成立.
當(dāng)a<0時(shí)��,由T′(x)>0��,得x>ln(-a).
所以�����,當(dāng)a≥0時(shí)���,函數(shù)T(x)的單調(diào)增區(qū)間為(-∞�����,+∞)�;
當(dāng)a<0時(shí)�,函數(shù)T(x)的單調(diào)增區(qū)間為(ln(-a),+∞).
(3) h(x)=|g(x)|·f(x)=
當(dāng)x>b時(shí)���,h′(x)=(x-b+1) ex>0����,所以h(x)在(b,+∞)上為增函數(shù)���;
當(dāng)x<b時(shí)����,h′(x)=-(x-b+1) ex���,
因?yàn)?/span>b-1<x<b時(shí)�����,h′(x)=-(x-b+1) ex<0�����,所以h(x)在(b-1���,b)上是減函數(shù)���;
因?yàn)?/span>x<b-1時(shí), h′(x)=-(x-b+1) ex>0,所以h(x)在(-∞����,b-1)上是增函數(shù).
當(dāng)b≤0時(shí)�,h(x)在(0���,1)上為增函數(shù).
所以h(x)max=h(1)=(1-b)e���,h(x)min=h(0)=-b.
由h(x)max-h(x)min>1,得b<1���,所以b≤0.
②當(dāng)0<b<
時(shí)�����,
因?yàn)?/span>b<x<1時(shí)���, h′(x)=(x-b+1) ex>0,所以h(x)在(b���,1)上是增函數(shù)��,
因?yàn)?/span>0<x<b時(shí)����, h′(x)=-(x-b+1) ex<0,所以h(x)在(0�����,b)上是減函數(shù).
所以h(x)max=h(1)=(1-b)e�,h(x)min=h(b)=0.
由h(x) max-h(x) min>1,得b<
.
因?yàn)?/span>0<b<
��,所以0<b<.
③當(dāng)≤b<1時(shí)�,
同理可得,h(x)在(0���,b)上是減函數(shù)�����,在(b�����,1)上是增函數(shù).
所以h(x)max=h(0)=b���,h(x)min=h(b)=0.
因?yàn)?/span>b<1�����,所以h(x)max-h(x)min>1不成立.
綜上,b的取值范圍為(-∞�,
).
