(1)f(x)在(-1,0)上單調(diào)遞減�����,在(0���,+∞)上單調(diào)遞增(2)見解析
【解析】(1)f′(x)=ex-
���,由x=0是f(x)的極值點(diǎn)����,得f′(0)=0�,所以m=1,
于是f(x)=ex-ln(x+1)���,定義域?yàn)?/span>{x|x>-1}�����,
f′(x)=ex-
�,
函數(shù)f′(x)=ex-
在(-1��,+∞)上單遞增����,
且f′(0)=0,
因此當(dāng)x∈(-1,0)時(shí)��,f′(x)<0��;
當(dāng)x∈(0�����,+∞)時(shí),f′(x)>0.
所以f(x)在(-1,0)上單調(diào)遞減��,在(0���,+∞)上單調(diào)遞增.
(2)當(dāng)m≤2���,x∈(-m,+∞)時(shí)���,ln(x+m)≤ln(x+2),故只需證明當(dāng)m=2時(shí)���,f(x)>0���,當(dāng)m=2時(shí),函數(shù)f′(x)=ex-
在(-2�����,+∞)上單調(diào)遞增.
又f′(-1)<0����,f′(0)>0��,故f′(x)=0在(-2����,+∞)上有唯一實(shí)根x0�,且x0∈(-1,0).
當(dāng)x∈(-2,x0)時(shí)����,f′(x)<0;當(dāng)x∈(x0�,+∞)時(shí),f′(x)>0�,從而當(dāng)x=x0時(shí),f(x)取得最小值.
由f′(x0)=0����,得ex0=
,即ln(x0+2)=-x0�����,故f(x)≥f(x0)=
+x0=
>0.綜上�,當(dāng)m≤2時(shí),f(x)>0.
