全国名校高考数学复习优质培优专题,优质学案汇编(附详解)
1?2∴当x??当x???,e?时,f'?x??0,f?x?单调递增,?e,e??时,f'?x??0,f?x??e?单调递减.
∴f?x?max?f?e??2,∴1?f?e??2,∴0?a?e.
eae2
e?故实数a的取值范围是??0,?.故选A.
?2?1,?时,5.已知函数f?x??x2ex,当x???1不等式f?x??m恒成立,则实数m的取值范围是( )
1?,??A.? ???e?1?B.??,???
?e?C.?e,??? D.?e,???
【答案】D
【解析】若m?f?x?恒成立,则m?f?x?max,f'?x??2xex?x2ex?x?x?2?ex, 所以f?x?在??1,0?单调递减,在?0,1?单调递增.f??1??1,f?1??e,所以
em?e.
故选D.
6.当x???2,1?时,不等式ax3?x2?4x?3?0恒成立,则实数a的取值范围是( ) A.??5,?3? 【答案】C
x2?4x?3【解析】x???2,0?时,恒成立不等式等价于a?,
x3?x2?4x?3??a???, 3x??min9??6,?B.???
?8?C.??6,?2? D.??4,?3?
全国名校高考数学复习优质培优专题,优质学案汇编(附详解)
设
x2?4x?3,f?x??x3'?f?x??x3?2x?4??3x2?x2?4x?3?x6?x?9??x?1??x2?8x?9???x4x4,
x???2,0?,?f?x?在??2,?1?单调递减,在??1,0?单调递增,?f?x?min?f??1???2,
当x?0时,可知无论a为何值,不等式均成立,
?x2?4x?3?x2?4x?3当x??0,1?时,恒成立不等式等价于a?,?a???, 3xx3??max同理设
?x?9??x?1?x2?4x?3'?fx??,,?f?x?在?0,1?单调递增, ??f?x??x4x3?f?x?max?f?1???6,?a??6,综上所述:a???6,?2?.故选
C.
7.函数
exf?x???1?x2,若存在x0??0,2?使得m?f?x0??0成立,则实数m的
范围是( )
12?A.???e,???
?5?B.??1,??? C.?1,???
1?D.???e,???
?2?
【答案】A
【解析】若存在x0??0,2?使得m?f?x0??0成立,则在x0??0,2?内f?x?min?m即可,
exf?x???1?x2,f??x???ex?1?x2??ex?2x?1?x?22??ex?x?1?2?1?x?522?0,
11故f?x?在?0,2?上单调递减f?x?min? f?2???e2,?m??e2,故选A.
58.设函数f?x??lnx?ax,若存在x0??0,???,使f?x0??0,则a的取值范围是( )
1?A.???,1?
?e?1?B.????,?
?e?C.??1,???
1?D.???,???
?e?全国名校高考数学复习优质培优专题,优质学案汇编(附详解)
【答案】D
【解析】f?x?的定义域是?0,???,f??x??1?a?1?ax,
xx当a?0时,f??x??0,则f?x?在?0,???上单调递增,且f?1??a?0, 故存在x0??0,???,使f?x0??0;
当a?0时,令f??x??0,解得0?x??1,令f??x??0,解得x??1,
aa1???1??f?x?在?0,??上单调递增,在??,???上单调递减,
a???a?1?1??1??f?x?max?f????ln????1?0,解得a??.
e?a??a?1?综上,a的取值范围是???,???.故选D.
?e?9.若对于任意实数x?0,函数f?x??ex?ax恒大于零,则实数a的取值范围是( ) A.???,e? 【答案】D
【解析】当x?0时,f?x??ex?ax?0恒成立,?若x?0,a为任意实数,
f?x??ex?ax?0恒成立,
B.???,?e? C.?e,??? D.??e,???
若x?0时,f?x??ex?ax?0恒成立,
ex即当x?0时,a??xex恒成立,设g?x???xxexx?ex?1?x?e,则g??x???2?xx2,
当x??0,1?时,g??x??0,则g?x?在?0,1?上单调递增, 当x??1,???时,g??x??0,则g?x?在?1,???上单调递减,
?当x?1时,g?x?取得最大值为?e.
全国名校高考数学复习优质培优专题,优质学案汇编(附详解)
则要使x?0时,f?x??ex?ax?0恒成立,a的取值范围是??e,???,故选D. 10.已知函数f?x??a?x?a??x?a?3?,g?x??2x?2,若对任意x?R,总有
f?x??0或g?x??0成立,则实数a的取值范围是( )
A.???,?4? 【答案】B
B.??4,0? C.??4,0? D.??4,???
【解析】由g?x??2x?2?0,得x?1,故对x?1时,g?x??0不成立, 从而对任意x?1,f?x??0恒成立,
因为a??x?a???x?a?3??0,对任意x?1恒成立,
?a?0 ,计算得出?4?a?0.故选如图所示,则必有??a?1??a?3?1?B.
11.已知函数
fxfxex当x2?x1时,不等式?1???2??0f?x???ax,x??0,???,
x2x1x恒成立,则实数a的取值范围为( ) A.???,e?
【答案】D
fxfxxfx?xfx【解析】不等式?1???2??0,即1?1?2?2??0,
x2x1x1x2B.???,e?
e???,C.???
?2?e???,D.???
?2?结合x2?x1?0可得x1f?x1??x2f?x2??0恒成立,即x2f?x2??x1f?x1?恒成立,
全国名校高考数学复习优质培优专题,优质学案汇编(附详解)
构造函数g?x??xf?x??ex?ax2,由题意可知函数g?x?在定义域内单调递增,
ex故g'?x??e?2ax?0恒成立,即a?恒成立,
2xex?x?1?ex令h?x???x?0?,则h'?x??,
2x22xx当0?x?1时,h'?x??0,h?x?单调递减;当x?1时,h'?x??0,h?x?单调递增;
e1e则h?x?的最小值为h?1???,据此可得实数a的取值范围为
2?12e?????,?.本题选择2??D选项.
12.设函数f?x??ex?3x?1??ax?a,其中a?1,若有且只有一个整数x0使得f?x0??0,则a的取值范围是( )
23?A.??,?
?e4?23?B.??,?
?e4?2?C.??,1?
?e?2?D.??,1?
?e?【答案】C
【解析】设g?x??ex?3x?1?,h?x??ax?a,则g??x??ex?3x+2?,
2?∴当x?????,??时,g'?x??0,g?x?单调递减;
?3?2??,???时,g??x??0,g?x?单调递增, 当x????3?2?2?2?∴当x??时,g?x?取得最小值g?????3e3.
3?3?如下图所示.