最新高考文科数学导数全国卷(-2018年)
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导数高考题专练1、(2012课标全国Ⅰ,文21)(本小题满分12分)设函数f(x)= e x-ax-2(Ⅰ)求f(x)的单调区间(Ⅱ)若a=1,k为整数,且当x>0时,(x-k) f´(x)+x+1>0,求k的最大值2、(2013课标全国Ⅰ,文20)(本小题满分12分)已知函数f(x)=e x(ax+b)-x2-4x,曲线y=f(x)在点(0,f(0))处的切线方程为y=4x+4.(1)求a ,b 的值;(2)讨论f (x )的单调性,并求f (x )的极大值.3、(2015课标全国Ⅰ,文21).(本小题满分12分)设函数.2()ln xf x ea x =-(Ⅰ)讨论的导函数零点的个数;()f x '()f x(Ⅱ)证明:当时,。
0a >2()2lnf x a a a≥+4、(2016课标全国Ⅰ,文21)(本小题满分12分)已知函数.2)1(2)(-+-=x a e x x f x )((I)讨论的单调性;)(x f (II)若有两个零点,求的取值范围.)(x f5、((2016全国新课标二,20)(本小题满分12分)已知函数()(1)ln (1)f x x x a x =+--.(I )当4a =时,求曲线()y f x =在()1,(1)f 处的切线方程; (II)若当()1,x ∈+∞时,()0f x >,求a 的取值范围.6(2016山东文科。
20)(本小题满分13分)设f (x )=x ln x –ax 2+(2a –1)x ,a ∈R .(Ⅰ)令g (x )=f'(x ),求g (x )的单调区间;(Ⅱ)已知f (x )在x =1处取得极大值.求实数a 的取值范围.2017.(12分)已知函数a e 2x +(a ﹣2) e x ﹣x .)f x ((1)讨论的单调性;()f x (2)若有两个零点,求a 的取值范围.()f x2018全国卷)(12分)已知函数()1ln f x x a x x=-+.⑴讨论()f x 的单调性;⑵若()f x 存在两个极值点1x ,2x ,证明:()()12122f x f x a x x -<--.导数高考题专练(答案)12解:(1)f ′(x )=e x (ax +a +b )-2x -4.由已知得f (0)=4,f ′(0)=4.故b =4,a +b =8.从而a =4,b =4.(2)由(1)知,f (x )=4e x (x +1)-x 2-4x ,f ′(x )=4e x (x +2)-2x -4=4(x +2)·.1e 2x ⎛⎫- ⎪⎝⎭令f ′(x )=0得,x =-ln 2或x =-2.从而当x ∈(-∞,-2)∪(-ln 2,+∞)时,f ′(x )>0;当x ∈(-2,-ln 2)时,f ′(x )<0.故f (x )在(-∞,-2),(-ln 2,+∞)上单调递增,在(-2,-ln 2)上单调递减.当x =-2时,函数f (x )取得极大值,极大值为f (-2)=4(1-e -2).34 (I )()()()()()'12112.x x f x x e a x x e a =-+-=-+(i)设0a ≥,则当(),1x ∈-∞时,()'0f x <;当()1,x ∈+∞时,()'0f x >.所以在(),1-∞单调递减,在()1,+∞单调递增. (ii)设0a <,由()'0f x =得x=1或x=ln(-2a).①若2e a =-,则()()()'1xf x x e e =--,所以()f x 在(),-∞+∞单调递增.②若2ea >-,则ln(-2a)<1,故当()()(),ln 21,x a ∈-∞-+∞ 时,()'0f x >;当()()ln 2,1x a ∈-时,()'0f x <,所以()f x 在()()(),ln 2,1,a -∞-+∞单调递增,在()()ln 2,1a -单调递减.③若2ea <-,则()21ln a ->,故当()()(),1ln 2,x a ∈-∞-+∞ 时,()'0f x >,当()()1,ln 2x a ∈-时,()'0f x <,所以()f x 在()()(),1,ln 2,a -∞-+∞单调递增,在()()1,ln 2a -单调递减.(II)(i)设0a >,则由(I)知,()f x 在(),1-∞单调递减,在()1,+∞单调递增.又()()12f e f a =-=,,取b 满足b <0且ln 22b a<,则()()()23321022a f b b a b a b b ⎛⎫>-+-=->⎪⎝⎭,所以()f x 有两个零点.(ii)设a =0,则()()2xf x x e =-所以()f x 有一个零点.(iii)设a <0,若2ea ≥-,则由(I)知,()f x 在()1,+∞单调递增.又当1x ≤时,()f x <0,故()f x 不存在两个零点;若2ea <-,则由(I)知,()f x 在()()1,ln 2a -单调递减,在()()ln 2,a -+∞单调递增.又当1x ≤时()f x <0,故()f x 不存在两个零点.综上,a 的取值范围为()0,+∞.5试题解析:(I )的定义域为.当时,()f x (0,)+∞4=a ,曲线1()(1)ln 4(1),()ln 3'=+--=+-f x x x x f x x x(1)2,(1)0.'=-=f f 在处的切线方程为()=y f x (1,(1))f 220.x y +-=(II )当时,等价于(1,)∈+∞x ()0>f x (1)ln 0.1-->+a x x x 令,则(1)()ln 1-=-+a x g x x x ,222122(1)1(),(1)0(1)(1)+-+'=-==++a x a x g x g x x x x (i )当,时,,故在2≤a (1,)∈+∞x 222(1)1210+-+≥-+>x a x x x ()0,()'>g x g x 上单调递增,因此;(1,)∈+∞x ()0>g x (ii )当时,令得2>a ()0'=g x ,1211=-=-+x a x a 由和得,故当时,,在单调递减,21>x 121=x x 11<x 2(1,)∈x x ()0'<g x ()g x 2(1,)∈x x 因此.()0<g x 综上,的取值范围是a (],2.-∞6试题分析:(Ⅰ)求导数()'ln 22,f x x ax a =-+可得,()()ln 22,0,g x x ax a x =-+∈+∞从而,()112'2axg x a x x-=-=讨论当时,当时的两种情况即得.0a ≤0a >(Ⅱ)由(Ⅰ)知,.分以下情况讨论:①当时,②当时,③当()'10f =0a ≤102a <<时,④当时,综合即得.12a =12a >试题解析:(Ⅰ)由()'ln 22,f x x ax a =-+可得,()()ln 22,0,g x x ax a x =-+∈+∞则,()112'2axg x a x x-=-=当时,0a ≤ 时,,函数单调递增;()0,x ∈+∞()'0g x >()g x 当时,0a > 时,,函数单调递增,10,2x a ⎛⎫∈ ⎪⎝⎭()'0g x >()g x 时,,函数单调递减.1,2x a ⎛⎫∈+∞⎪⎝⎭()'0g x <()g x 所以当时,函数单调递增区间为;0a ≤()g x ()0,+∞当时,函数单调递增区间为,单调递减区间为. 0a >()g x 10,2a ⎛⎫ ⎪⎝⎭1,2a ⎛⎫+∞ ⎪⎝⎭(Ⅱ)由(Ⅰ)知,.()'10f =①当时,,单调递减.0a ≤()'0f x <()f x 所以当时,,单调递减.()0,1x ∈()'0f x <()f x当时,,单调递增.()1,x ∈+∞()'0f x >()f x 所以在x=1处取得极小值,不合题意.()f x ②当时,,由(Ⅰ)知在内单调递增,102a <<112a >()'f x 10,2a ⎛⎫⎪⎝⎭可得当当时,,时,,()0,1x ∈()'0f x <11,2x a ⎛⎫∈ ⎪⎝⎭()'0f x >所以在(0,1)内单调递减,在内单调递增,()f x 11,2a ⎛⎫⎪⎝⎭所以在x=1处取得极小值,不合题意.()f x ③当时,即时,在(0,1)内单调递增,在 内单调递减,12a =112a=()'f x ()1,+∞所以当时,, 单调递减,不合题意.()0,x ∈+∞()'0f x ≤()f x ④当时,即 ,当时,,单调递增,12a >1012a <<1,12x a ⎛⎫∈ ⎪⎝⎭()'0f x >()f x 当时,,单调递减,()1,x ∈+∞()'0f x <()f x 所以f(x)在x=1处取得极大值,合题意.综上可知,实数a 的取值范围为.12a >2017.解:(1)函数的定义域为()f x 22(,),()2(2)()xx x x f x eae a e a e a '-∞+∞=--=+-①若,则,在单调递增0a =2()xf x e =(,)-∞+∞②若,则由得0a >()0f x '=ln x a=2018.解:(1)f (x )的定义域为,f ′(x )=a e x –.(0)+∞,1x 由题设知,f ′(2)=0,所以a =.212e 从而f (x )=,f ′(x )=.21e ln 12e x x --211e 2e x x -当0<x <2时,f ′(x )<0;当x >2时,f ′(x )>0.所以f (x )在(0,2)单调递减,在(2,+∞)单调递增.(2)当a ≥时,f (x )≥.1e e ln 1e xx --设g (x )=,则e ln 1e x x --e 1()e x g x x '=-当0<x <1时,g′(x )<0;当x >1时,g′(x )>0.所以x =1是g (x )的最小值点.故当x >0时,g (x )≥g (1)=0.因此,当时,.1e a ≥()0f x ≥。