已知函數(shù)f(x)=aln(1+ex)-(a+1)x,(其中a>0),點(diǎn)A(x1,f(x1)),B(x2,f(x2)),C(x3,f(x3))從左到右依次是函數(shù)y=f(x)圖象上三點(diǎn),且2x2=x1+x3.
(Ⅰ)證明:函數(shù)f(x)在(-∞,+∞)上是減函數(shù);
(Ⅱ)求證:△ABC是鈍角三角形;
(Ⅲ)試問△ABC能否是等腰三角形?若能,求△ABC面積的最大值;若不能,請說明理由.
【答案】
分析:(Ⅰ)∵f(x)=aln(1+e
x)-(a+1)x,欲證函數(shù)f(x)在(-∞,+∞)上是單調(diào)減函數(shù),只須證明其導(dǎo)數(shù)f′(x)<0即可;
(Ⅱ)先設(shè)A(x
1,f(x
1)),B(x
2,f(x
2)),C(x
3,f(x
3))且x
1<x
2<x
3,欲證:△ABC是鈍角三角形,只須證明其中一個內(nèi)角為鈍角即可,結(jié)合向量的坐標(biāo)運(yùn)算,只須證明:
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即得;
(Ⅲ)假設(shè)△ABC為等腰三角形,則只能是
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,再利用平面內(nèi)兩點(diǎn)的距離公式將點(diǎn)的坐標(biāo)代入計(jì)算,如出現(xiàn)矛盾,則△ABC不可能為等腰三角形,如不矛盾,則△ABC能是等腰三角形.
解答:解:(Ⅰ)∵f(x)=aln(1+e
x)-(a+1)x,∴
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恒成立,
所以函數(shù)f(x)在(-∞,+∞)上是單調(diào)減函數(shù).(3分)
(Ⅱ)證明:據(jù)題意A(x
1,f(x
1)),B(x
2,f(x
2)),C(x
3,f(x
3))且x
1<x
2<x
3,
由(Ⅰ)知f(x
1)>f(x
2)>f(x
3),x
2=
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(4分)
可得A(x
1,f(x
1)),B(x
2,f(x
2)),C(x
3,f(x
3))三點(diǎn)不共線
(反證法:否則
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,得x
1=x
3)
∴
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∴
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(6分)
∵x
1-x
2<0,x
3-x
2>0,f(x
1)-f(x
2)>0,f(x
3)-f(x
2)<0,∴
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,∴
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即△ABC是鈍角三角形(8分)
(Ⅲ)假設(shè)△ABC為等腰三角形,則只能是
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即:(x
1-x
2)
2+[f(x
1)-f(x
2)]
2=(x
3-x
2)
2+[f(x
3)-f(x
2)]
2∵x
2-x
1=x
3-x
2∴[f(x
1)-f(x
2)]
2=[f(x
3)-f(x
2)]
2即2f(x
2)=f(x
1)+f(x
3)
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①(11分)
而事實(shí)上,
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②
由于
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,故(2)式等號不成立.這與(1)式矛盾.
所以△ABC不可能為等腰三角形.(13分)
點(diǎn)評:本小題主要考查利用導(dǎo)數(shù)研究函數(shù)的單調(diào)性、數(shù)量積表示兩個向量的夾角、兩點(diǎn)間距離公式的應(yīng)用等基礎(chǔ)知識,考查運(yùn)算求解能力,考查數(shù)形結(jié)合思想、化歸與轉(zhuǎn)化思想.