【答案】(1)a=b=1;(2)(2,+∞).
【解析】
(1)對(duì)函數(shù)求導(dǎo)��,在切點(diǎn)的導(dǎo)函數(shù)值就是切線的斜率��,求出a��、b的值��;
(2)將原式化簡(jiǎn)��,變?yōu)樾潞瘮?shù)��,對(duì)新函數(shù)求導(dǎo)討論單調(diào)性求出k的取值��;
或是利用參變分離求最值��,求得k的取值.
解:(1)f(x) =a
∴f(1) =a
=
��,f(1)=
=
��,
解得a=b=1
∴f(x)=
+
(2) (方法1)由+< 
+
得��,
<0��,∵x>0∴l(xiāng)nx+(1k)xk+3<0恒成立
設(shè)g(x)=lnx+(1k)xk+3 (x>0)
g(x)=
+1k=
當(dāng)k≤1時(shí),g(x)≥0��,y=g(x)在x(0,+∞)上單調(diào)遞增,不符合題意��,舍去
當(dāng)k>1時(shí)��,y=g(x)在x(0,
)上單調(diào)遞增��,在x(,+∞)上單調(diào)遞減,
∴g(x)≤g()=ln+2k<0
設(shè)h(k)= 2kln(k1),h(k)=1<0,y=h(k)在k(1,+∞)上單調(diào)遞減
∵h(yuǎn)(2)=0∴由h(k)<0解得k>2
綜上所述��,k的取值范圍是(2,+∞).
(方法2)由+< +
得��, <0,∵x>0∴l(xiāng)nx+(1k)xk+3<0恒成立��,
整理得:k>
��,
令g(x)=,則g(x)=
.
令h(x)= -lnx-3, (x>0),h(x)= - 
- <0在x>0時(shí)恒成立
所以��,h(x)單調(diào)遞減��,又h(1)=0,
所以��,x∈(0,1)��,h(x)>0,即g(x) >0, g(x)單調(diào)遞增
x∈(1,+∞)��,h(x)<0, 即g(x) <0��, g(x)單調(diào)遞減
g(x)在x=1處有最大值g(1)= 2
所以k>2,k的取值范圍是(2,+∞)
