【答案】(1)見解析(2)
【解析】
(1)先確定f(x)的定義域為(0����,+∞),再求導(dǎo)���,由“f'(x)>0���,f(x)為增函數(shù)f'(x)<0,f(x)在為減函數(shù)”判斷�����,要注意定義域和分類討論.
(2)因為
��,x>0.由(1)可知當(dāng)a≥0時����,f(x)在(0,+∞)上為增函數(shù)�����,f(x)min=f(1)��;當(dāng)0<﹣a≤1時,��;f(x)在(0����,+∞)上也是增函數(shù),f(x)min=f(1)��;當(dāng)1<﹣a<e時�;f(x)在[1,﹣a]上是減函數(shù)��,在(﹣a����,e]上是增函數(shù),f(x)min=f(﹣a)��;當(dāng)﹣a≥e時���,��;f(x)在[1�����,e]上是減函數(shù)����,f(x)min=f(e)�����;最后取并集.
(1)由題意得f(x)的定義域為(0���,+∞)�����,.(0�,+∞)
①當(dāng)a≥0時����,f'(x)>0,故f(x)在上為增函數(shù)���;
②當(dāng)a<0時����,由f'(x)=0得x=﹣a;由f'(x)>0得x>﹣a����;由f'(x)<0得x<﹣a;
∴f(x)在(0���,﹣a]上為減函數(shù)�;在(﹣a�����,+∞)上為增函數(shù).
所以����,當(dāng)a≥0時,f(x)在(0��,+∞)上是增函數(shù)�����;當(dāng)a<0時���,f(x)在(0��,﹣a]上是減函數(shù)�,在(﹣a,+∞)上是增函數(shù).
(2)∵��,x>0.由(1)可知:
①當(dāng)a≥0時�����,f(x)在(0����,+∞)上為增函數(shù)����,f(x)min=f(1)=﹣a=2,得a=﹣2�,矛盾!
②當(dāng)0<﹣a≤1時,即a≥﹣1時�����,f(x)在(0�,+∞)上也是增函數(shù),f(x)min=f(1)=﹣a=2��,∴a=﹣2(舍去).
③當(dāng)1<﹣a<e時,即﹣e<a<﹣1時����,f(x)在[1,﹣a]上是減函數(shù)��,在(﹣a��,e]上是增函數(shù)�,
∴f(x)min=f(﹣a)=ln(﹣a)+1=2,得a=﹣e(舍去).
④當(dāng)﹣a≥e時�����,即a≤﹣e時�,f(x)在[1,e]上是減函數(shù)��,有
�����,
∴a=﹣e.
綜上可知:a=﹣e.
.
判斷
在定義域上的單調(diào)性;
