【答案】(1)
.(2)
【解析】
(1)先對(duì)函數(shù)求導(dǎo)�,結(jié)合極值存在的條件可求t,然后結(jié)合導(dǎo)數(shù)可研究函數(shù)的單調(diào)性,進(jìn)而可求極大值����;
(2)由已知代入可得�,x2+(t﹣2)x﹣tlnx≥0在x>0時(shí)恒成立��,構(gòu)造函數(shù)g(x)=x2+(t﹣2)x﹣tlnx��,結(jié)合導(dǎo)數(shù)及函數(shù)的性質(zhì)可求.
(1)
���,x>0,
由題意可得���,
0��,解可得t=﹣4�����,
∴
���,
易得�,當(dāng)x>2�,0<x<1時(shí),f′(x)>0����,函數(shù)單調(diào)遞增,當(dāng)1<x<2時(shí)����,f′(x)<0,函數(shù)單調(diào)遞減����,
故當(dāng)x=1時(shí)��,函數(shù)取得極大值f(1)=﹣3�����;
(2)由f(x)=x2+(t﹣2)x﹣tlnx+2≥2在x>0時(shí)恒成立可得�����,x2+(t﹣2)x﹣tlnx≥0在x>0時(shí)恒成立,
令g(x)=x2+(t﹣2)x﹣tlnx���,則
���,
(i)當(dāng)t≥0時(shí),g(x)在(0�����,1)上單調(diào)遞減���,在(1���,+∞)上單調(diào)遞增,
所以g(x)min=g(1)=t﹣1≥0��,解可得t≥1�,
(ii)當(dāng)﹣2<t<0時(shí),g(x)在(
)上單調(diào)遞減�,在(0,
),(1�,+∞)上單調(diào)遞增,
此時(shí)g(1)=t﹣1<﹣1不合題意�,舍去;
(iii)當(dāng)t=﹣2時(shí)����,g′(x)
0,即g(x)在(0�,+∞)上單調(diào)遞增,此時(shí)g(1)=﹣3不合題意��;
(iv)當(dāng)t<﹣2時(shí)���,g(x)在(1����,)上單調(diào)遞減�,在(0,1)���,(
)上單調(diào)遞增��,此時(shí)g(1)=t﹣1<﹣3不合題意,
綜上����,t≥1時(shí)����,f(x)≥2恒成立.
.
