数学-广东省深圳市普通高中2017-2018学年下学期高二5月月考试题(2)

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广东省深圳市普通高中2017-2018学年下学期高二5月月考试题(2)第I 卷 (择题 共60分)一、选择题(本大题共12小题,每小题5分,共60分,在每小题给出的四个选项中,只有一项是符合要求的)1、集合A={}0,1,2,B={}|12x x -<<,则A B=( ) A.{}0 B.{}1 C.{}0,1 D.{}0,1,22、i 是虚数单位,则11ii-+ = ( ) A.i B.i - C.1 D.1-3、命题“所有能被2整除的整数都是偶数”的否定是( )A.所有不能被2整除的整数都是偶数B.所有能被2整除的整数都不是偶数C.存在一个不能被2整除的整数是偶数D.存在一个能被2整除的整数不是偶数 4、某商品销售量y (件)与销售价格x (元/件)负相关,则可能作为其回归方程是( ) A. B.C.D.5、函数()f x 的图象在点x =5处的切线方程是8y x =-+,则(5)'(5)f f +等于( ) A.1 B.2 C.0 D.36、设2log 3a =,4log 3b =,12c =,则( ) A.a c b << B.c a b << C.b c a << D.c b a <<7、已知某程序框图如图所示,则执行该程序后输出的结果是( )^10200y x =-+^10200y x =+^10200y x =--^10200y x =-A.2B.1C.1-D.128、定义在R 上的函数()f x 满足(3)()f x f x -=,3()'()2x f x ->0,若1x <2x 且1x +2x >3,则有( )A.1()f x >2()f xB.1()f x <2()f xC.1()f x =2()f xD.不确定9、已知定义在R 上的奇函数()f x ,满足(4)f x -=-()f x ,且在区间[]0,2上是增函数,则 ( )A.(25)f -<(11)f <(80)fB.(80)f <(11)f <(25)f -C.(11)f <(80)f <(25)f -D.(25)f -<(80)f <(11)f 10、定义一种运算:a ⊗b =,,a a b b a b≥⎧⎨<⎩,已知函数()f x =2(3)xx ⊗-,那么函数()f x 的大致图象是( )11、观察,,,由归纳推理可得:若定义在上的函数满足,记为的导函数,则=( )AB C D12、已知函数()xf x y e=,满足'()f x >()f x ,则(1)f 与(0)ef 的大小关系是( ) A.(1)f <(0)ef B.(1)f >(0)ef C.(1)f = (0)ef D.不能确定第Ⅱ卷 非选择题(共90分)二、填空题(本大题共4小题,每小题4分,满分16分,把正确答案写在答题纸的相应位置上)13、已知函数()f x 121x=+a -为奇函数,则a =2'()2x x =4'3()4x x ='(cos )sin x x =-R ()f x ()()f x f x -=()g x ()f x ()g x -()f x ()f x -()g x ()g x -14、已知函数()f x x x a a -=+(0a >且1)a ≠,且(1)3f =,则(0)(1)(2)f f f ++的值是15、设直线12y x b =+是曲线ln (0)y x x =>的一条切线,则实数b 的值为 16、已知函数()f x =|1|2,213,22x x x x -⎧≤⎪⎨-+>⎪⎩,若互不相等的实数a 、b 、c 满足()()()f a f b f c ==,则a b c ++ 的取值范围是三、解答题(本大题共6小题,共74分,解答应写出必要的文字说明、证明过程或演算步骤)17、(本小题满分12分)已知函数()f x 2m x x =-,且7(4)2f =- (1)求m 的值(2)判断()f x 在(0,)+∞上的单调性,并利用定义给出证明19、(本小题满分12分)设p :实数x 满足22430x ax a -+<,其中0a >,命题q :实数x 满足2260280x x x x ⎧--≤⎨+->⎩(1)若1a =,且p q ∧为真,求实数x 的取值范围 (2)若p ⌝是q ⌝的充分不必要条件,求实数a 的取值范围20、(本小题满分12分)已知曲线32y x x =-上一点(1,1)M --,求:(1)点M 处的切线方程;(2)点M 处的切线与x 轴、y 轴所围成的平面图形的面积。

21、(本小题满分12分)已知c x bx ax x f +-+=2)(23在2-=x 时有极大值6,在1=x 时有极小值求c b a ,,的值;并求)(x f 在区间[-3,3]上的最大值和最小值.22、(本小题满分14分)设函数()f x ln (1),x p x p R =--∈ (1)求函数()f x 的单调区间(2)设函数()g x =x ()f x 2(21)(1)p x x x +--≥,求证:当12p ≤-时,有()0g x ≤成立参考答案三、三、解答题17、解:(1)7(4)2f =-27442m ∴-=- 1m ∴= .....................................4分(2)()f x 2x x=-在(0,)+∞上单调递减.....................................5分 证明如下:任取120x x <<,则1()f x 2()f x -=121222()()x x x x ---=21122()(1)x x x x -+.....................................8分 ∵120x x << ∴211220,10x x x x ->+> ∴1()f x 2()f x ->0,即12()()f x f x >∴()f x 在(0,)+∞上单调递减.....................................12分18:解:(1)由6101x -≥+得A={}|15x x -<≤.....................................2分 当3m =时,B= {}|13x x -<< .....................................4分 则{|1,R C B x x =≤-或}3x ≥ .....................................5分 ∴R A C B ={}|35x x ≤≤ .....................................7分 (2) ∵A={}|15x x -<≤,{}|14A B x x =-<<∴有24240m -+⨯+=,解得8m =.....................................10分此时B={}|24x x -<<,符合题意,所以8m =.....................................12分19、解:(1)当a =1时,p :13x <<.....................................2分 q :23x <≤.....................................4分 ∵p q ∧为真 ∴x 满足2313x x <≤⎧⎨<<⎩,即23x <<.....................................6分(2)由p ⌝是q ⌝的充分不必要条件知,q 是p 的充分不必要条件.....................................8分由p 知,即A={}|3,0x a x a a <<>由q 知,B={}|23x x <≤.....................................10分 ∴B ⊂A所以,2a ≤且33a <即实数a 的取值范围是12a <≤.....................................12分21、解:,223)(2-+='bx ax x f .....................................2分由条件知.38,21,31.6448)2(,0223)1(,02412)2(===⎪⎩⎪⎨⎧=+++-=-=-+='=--=-'c b a c b a f b a f b a f 解得.....................................6分,2)(,3822131)(223-+='+-+=x x x f x x x x fx-3 (-3,-2) -2 (-2,1) 1 (1,3) 3 )(x f '+ 0 - 0+)(x f614 ↗6↘23↗6110 .....................................10分由上表知,在区间[-3,3]上,当3=x 时,,6110max =f1=x 时,.23min =f .....................................12分.....................................7分(2)证明:由函数()g x =x ()f x 2(21)p x x +--=2ln (1)x x p x +-得'()g x =ln 21x px ++ .....................................9分 由(1)知,当p =1时,()f x ≤(1)0f =即不等式ln 1x x ≤-成立 .....................................11分 所以当12p ≤-时,'()g x =ln 21x px ++≤(1)12x px -++ =(12)p x +≤0 即()g x 在[1,)+∞上单调递减,从而()g x ≤(1)0g =满足题意 .....................................14分。