【答案】(1)y=(﹣2+a)x+2﹣a.(2)見解析(3)見解析
【解析】
(1)求出切點(diǎn)坐標(biāo)��,根據(jù)導(dǎo)函數(shù)求出切線斜率��,即可得到切線方程��;
(2)求出導(dǎo)函數(shù)��,對(duì)g(x)=﹣x2+ax﹣1��,進(jìn)行分類討論即可得到原函數(shù)單調(diào)性��;
(3)結(jié)合(2)將問題轉(zhuǎn)為證明
1��,根據(jù)韋達(dá)定理轉(zhuǎn)化為考慮h(x)=2lnx﹣x
的單調(diào)性比較大小即可得證.
(1)∵f(x)
x+alnx(x>0)
∴f′(x)
(x>0)
∴當(dāng)x=1時(shí)��,f(1)=0��,f′(1)=﹣2+a��,
設(shè)切線方程為y=(﹣2+a)x+b��,代入(1��,0)��,得b=2﹣a��,
∴f(x)在(1��,f(1))處的切線方程為y=(﹣2+a)x+2﹣a.
(2)函數(shù)的定義域?yàn)椋?/span>0��,+∞)��,
函數(shù)的導(dǎo)數(shù)f′(x)��,
設(shè)g(x)=﹣x2+ax﹣1��,注意到g(0)=﹣1��,
①當(dāng)a≤0時(shí)��,g(x)<0恒成立��,即f′(x)<0恒成立,此時(shí)函數(shù)f(x)在(0��,+∞)上是減函數(shù)��;
②當(dāng)a>0時(shí)��,判別式△=a2﹣4��,
(i)當(dāng)0<a≤2時(shí)��,△≤0��,即g(x)≤0��,即f′(x)≤0恒成立��,此時(shí)函數(shù)f(x)在(0��,+∞)上是減函數(shù)��;
(ii)當(dāng)a>2時(shí)��,令f′(x)>0��,得:
x
��;
令f′(x)<0��,得:0<x
或x
��;
∴當(dāng)a>2時(shí)��,f(x)在區(qū)間(
��,
)單調(diào)遞增��,在(0��,)��,(��,+∞)單調(diào)遞減��;
綜上所述��,綜上當(dāng)a≤2時(shí)��,f(x)在(0��,+∞)上是減函數(shù)��,
當(dāng)a>2時(shí),在(0��,)��,(��,+∞)上是減函數(shù)��,
在區(qū)間(��,)上是增函數(shù).
(3)由(2)知a>2��,0<x1<1<x2��,x1x2=1��,
則f(x1)﹣f(x2)
x1+alnx1﹣[
x2+alnx2]
=(x2﹣x1)(1
)+a(lnx1﹣lnx2)
=2(x2﹣x1)+a(lnx1﹣lnx2)��,
則
2
��,
則問題轉(zhuǎn)為證明1即可��,
即證明lnx1﹣lnx2>x1﹣x2��,
則lnx1﹣ln
x1
��,
即lnx1+lnx1>x1��,
即證2lnx1>x1在(0��,1)上恒成立��,
設(shè)h(x)=2lnx﹣x��,(0<x<1)��,其中h(1)=0��,
求導(dǎo)得h′(x)
1
0��,
則h(x)在(0��,1)上單調(diào)遞減��,
∴h(x)>h(1)��,即2lnx﹣x
0��,
故2lnx>x
��,
則
a﹣2成立.
x+alnx.
