【答案】(I)b=2
(II)當(dāng)a>0時(shí)���,函數(shù)f(x)的單調(diào)遞增區(qū)間為(1���,+∞)���,單調(diào)遞減區(qū)間為(0,1)����;
當(dāng)a<0時(shí),函數(shù)f(x)的單調(diào)遞增區(qū)間為(0����,1),單調(diào)遞減區(qū)間為(1��,+∞)��;
(III)見解析
【解析】
試題(I)把x=e代入函數(shù)f(x)=﹣ax+b+axlnx����,解方程即可求得實(shí)數(shù)b的值�;
(II)求導(dǎo)��,并判斷導(dǎo)數(shù)的符號(hào)���,確定函數(shù)的單調(diào)區(qū)間��;
(III)假設(shè)存在實(shí)數(shù)m和M(m<M)���,使得對(duì)每一個(gè)t∈[m,M]����,直線y=t與曲線y=f(x)(x∈[
,e])都有公共點(diǎn)��,轉(zhuǎn)化為利用導(dǎo)數(shù)求函數(shù)y=f(x)在區(qū)間[��,e]上的值域.
解:(I)由f(e)=2��,代入f(x)=﹣ax+b+axlnx�����,
得b=2�;
(II)由(I)可得f(x)=﹣ax+2+axlnx�����,函數(shù)f(x)的定義域?yàn)椋?/span>0��,+∞)�����,
從而f′(x)=alnx,
∵a≠0���,故
①當(dāng)a>0時(shí)�����,由f′(x)>0得x>1�����,由f′(x)<0得0<x<1�;
②當(dāng)a<0時(shí)��,由f′(x)>0得0<x<1���,由f′(x)<0得x>1����;
綜上,當(dāng)a>0時(shí)����,函數(shù)f(x)的單調(diào)遞增區(qū)間為(1,+∞)�����,單調(diào)遞減區(qū)間為(0�,1);
當(dāng)a<0時(shí)��,函數(shù)f(x)的單調(diào)遞增區(qū)間為(0����,1),單調(diào)遞減區(qū)間為(1����,+∞);
(III)當(dāng)a=1時(shí)�����,f(x)=﹣x+2+xlnx,f′(x)=lnx��,
由(II)可得�,當(dāng)x∈(,e)�����,f(x)����,f′(x)變化情況如下表:
又f()=2﹣
<2���,
所以y=f(x)在[��,e]上的值域?yàn)?/span>[1�����,2]�,
據(jù)此可得��,若
,則對(duì)每一個(gè)t∈[m�����,M]�,直線y=t與曲線y=f(x)(x∈[,e])都有公共點(diǎn)�;
并且對(duì)每一個(gè)t∈(﹣∞,m)∪(M����,+∞),直線y=t與曲線y=f(x)(x∈[�,e])都沒有公共點(diǎn);
綜上當(dāng)a=1時(shí)����,存在最小實(shí)數(shù)m=1和最大的實(shí)數(shù)M=2(m<M),使得對(duì)每一個(gè)t∈[m�,M],直線y=t與曲線y=f(x)(x∈[��,e])都有公共點(diǎn).
