(1)見(jiàn)解析(2)t=2(3)
∪[e,+∞)
【解析】審題引導(dǎo):本題考查函數(shù)與導(dǎo)數(shù)的綜合性質(zhì)�,函數(shù)模型并不復(fù)雜,(1)(2)兩問(wèn)是很常規(guī)的��,考查利用導(dǎo)數(shù)證明單調(diào)性����,考查函數(shù)與方程的零點(diǎn)問(wèn)題.第(3)問(wèn)要將“若存在x1�、x2∈[-1���,1]��,使得|f(x1)-f(x2)|≥e-1”轉(zhuǎn)化成|f(x)max-f(x)min|=f(x)max-f(x)min≥e-1成立���,最后仍然是求值域問(wèn)題,但在求值域過(guò)程中���,問(wèn)題設(shè)計(jì)比較巧妙�,因?yàn)樵谶^(guò)程中還要構(gòu)造函數(shù)研究單調(diào)性來(lái)確定導(dǎo)函數(shù)的正負(fù).
規(guī)范解答:(1)證明:f′(x)=axlna+2x-lna=2x+(ax-1)·lna.(2分)
由于a>1����,故當(dāng)x∈(0,+∞)時(shí)����,lna>0,ax-1>0����,所以f′(x)>0.
故函數(shù)f(x)在(0��,+∞)上單調(diào)遞增.(4分)
(2)【解析】
當(dāng)a>0�����,a≠1時(shí)�,因?yàn)?/span>f′(0)=0��,且f′(x)在R上單調(diào)遞增,故f′(x)=0有唯一解x=0.(6分)所以x、f′(x)��、f(x)的變化情況如下表所示:
x | (-∞���,0) | 0 | (0����,+∞) |
f′(x) | - | 0 | + |
f(x) | ? | 極小值 | ? |
又函數(shù)y=|f(x)-t|-1有三個(gè)零點(diǎn)��,所以方程f(x)=t±1有三個(gè)根�,而t+1>t-1,所以t-1=f(x)min=f(0)=1����,解得t=2.(10分)
(3)【解析】
因?yàn)榇嬖?/span>x1�����、x2∈[-1�����,1]����,使得|f(x1)-f(x2)|≥e-1����,所以當(dāng)x∈[-1,1]時(shí)���,|f(x)max-f(x)min|=f(x)max-f(x)min≥e-1.(12分)
由(2)知�,f(x)在[-1��,0]上遞減��,在[0�,1]上遞增,所以當(dāng)x∈[-1�,1]時(shí)�,f(x)min=f(0)=1�,f(x)max=max{f(-1),f(1)}.
而f(1)-f(-1)=(a+1-lna)-
=a-
-2lna����,
記g(t)=t-
-2lnt(t>0),因?yàn)?/span>g′(t)=1+
-
=
≥0(當(dāng)且僅當(dāng)t=1時(shí)取等號(hào))�,
所以g(t)=t-
-2lnt在t∈(0,+∞)上單調(diào)遞增���,而g(1)=0���,
所以當(dāng)t>1時(shí),g(t)>0����;當(dāng)0<t<1時(shí)����,g(t)<0,
也就是當(dāng)a>1時(shí)�,f(1)>f(-1);當(dāng)0<a<1時(shí)���,f(1)<f(-1).(14分)
①當(dāng)a>1時(shí)��,由f(1)-f(0)≥e-1?a-lna≥e-1?a≥e��,
②當(dāng)0<a<1時(shí)���,由f(-1)-f(0)≥e-1?
+lna≥e-1?0<a≤
����,
綜上知���,所求a的取值范圍為∪[e��,+∞).(16分)
