【答案】(1)見解析���;(2)見解析
【解析】
(1)求函數(shù)的導(dǎo)數(shù)�,結(jié)合函數(shù)單調(diào)性和導(dǎo)數(shù)之間的關(guān)系進(jìn)行判斷即可.
(2)將不等式進(jìn)行轉(zhuǎn)化�,構(gòu)造函數(shù)g(x)=-
x+
,則不等式轉(zhuǎn)化為最值問題進(jìn)行求解即可.
解:(1)
①當(dāng)1>1-m���,即m>0時����,(-∞���,1-m)和(1�,+∞)上f′(x)<0�,f(x)單調(diào)減;(1-m����,1)上f′(x)>0����,f(x)單調(diào)增
②當(dāng)1=1-m�,即m=0時,(-∞�����,+∞)上f′(x)<0���,f(x)單調(diào)減
③當(dāng)1<1-m��,即m<0時���,(-∞,1)和(1-m�,+∞)上f′(x)<0,f(x)單調(diào)減����;(1,1-m)上f′(x)>0��,f(x)單調(diào)增
(2)對任意的x1,x2∈[1�����,1-m]�,4f(x1)+x2<5可轉(zhuǎn)化為
�,
設(shè)g(x)=-x+,則問題等價于x1���,x2∈[1���,1-m],f(x)max<g(x)min
由(1)知����,當(dāng)m∈(-1,0)時�����,f(x)在[1�����,1-m]上單調(diào)遞增,
����,
g(x)在[1,1-m]上單調(diào)遞減�,
,
即證
�����,化簡得4(2-m)<e1-m[5-(1-m)]
令1-m=t��,t∈(1����,2)
設(shè)h(t)=et(5-t)-4(t+1),t∈(1�����,2)�,
h′(t)=et(4-t)-4>2et-4>0,故h(t)在(1��,2)上單調(diào)遞增.
∴h(t)>h(1)=4e-8>0�����,即4(2-m)<e1-m[5-(1-m)]
故,得證.
,m∈R
