【答案】(Ⅰ)見(jiàn)解析���;(Ⅱ)見(jiàn)解析.
【解析】試題分析: (Ⅰ)求出函數(shù)f(x)的導(dǎo)數(shù)�,通過(guò)討論a的范圍求出函數(shù)的單調(diào)區(qū)間即可�;
(Ⅱ)法一:?jiǎn)栴}轉(zhuǎn)化為證明ex﹣lnx﹣1>0,設(shè)g(x)=ex﹣lnx﹣1(x>0)�����,問(wèn)題轉(zhuǎn)化為證明x>0��,g(x)>0�,根據(jù)函數(shù)的單調(diào)性證明即可;
法二:?jiǎn)栴}轉(zhuǎn)化為證明x﹣1≥lnx(x>0)���,令h(x)=x﹣1﹣lnx(x>0)���,根據(jù)函數(shù)的單調(diào)性證明即可.
試題解析:
(Ⅰ)當(dāng)b=1時(shí)��,f(x)=
ax2-(1+a2)x+aln x�,
f′(x)=ax-(1+a2)+
=
.
討論:1°當(dāng)a≤0時(shí)����,x-a>0,
>0����,ax-1<0f′(x)<0,
此時(shí)函數(shù)f(x)的單調(diào)遞減區(qū)間為(0����,+∞)��,無(wú)單調(diào)遞增區(qū)間.
2°當(dāng)a>0時(shí)�����,令f′(x)=0x=
或a�����,
①當(dāng)=a(a>0),即a=1時(shí)����, 此時(shí)f′(x)=
≥0(x>0),
此時(shí)函數(shù)f(x)單調(diào)遞增區(qū)間為(0�����,+∞)�����,無(wú)單調(diào)遞減區(qū)間���;
②當(dāng)0<<a ���,即a>1時(shí),此時(shí)在
和(a��,+∞)上函數(shù)f′(x)>0�����,
在
上函數(shù)f′(x)<0,此時(shí)函數(shù)f(x)單調(diào)遞增區(qū)間為和(a����,+∞);
單調(diào)遞減區(qū)間為���;
③當(dāng)0<a<�����,即0<a<1時(shí)�����,此時(shí)函數(shù)f(x)單調(diào)遞增區(qū)間為(0�,a)和
����;
單調(diào)遞減區(qū)間為
(Ⅱ)證明:(法一)當(dāng)a=-1�,b=0時(shí),f(x)+ex>-x2-x+1���,
只需證明:ex-ln x-1>0���,設(shè)g(x)=ex-ln x-1(x>0)��,
問(wèn)題轉(zhuǎn)化為證明x>0����,g(x)>0.
令g′(x)=ex-�, g″(x)=ex+
>0,
∴g′(x)=ex-為(0����,+∞)上的增函數(shù),且g′
=
-2<0���,g′(1)=e-1>0����,
∴存在惟一的x0∈
���,使得g′(x0)=0�,ex0=
�����,
∴g(x)在(0,x0)上遞減���,在(x0���,+∞)上遞增.
∴g(x)min=g(x0)=ex0-ln x0-1=+x0-1≥2-1=1,
∴g(x)min>0∴不等式得證.
(法二)先證:x-1≥ln x(x>0)
令h(x)=x-1-ln x(x>0)�,∴h′(x)=1-=
=0x=1,
∴h(x)在(0����,1)上單調(diào)遞減,在(1�����,+∞)上單調(diào)遞增.
∴h(x)min=h(1)=0��,∴h(x)≥h(1)x-1≥ln x.
∴1+ln x≤1+x-1=xln(1+x)≤x����,
∴eln(1+x)≤ex,1
∴ex≥x+1>x≥1+ln x��,∴ex>1+ln x���,
故ex-ln x-1>0��,證畢.
