2010-2019北京高考数学真题分类汇编专题一集合1.(2019全国Ⅰ文2)已知集合,则 A . B . C . D .2.(2019全国Ⅱ文1)已知集合,,则A ∩B =A .(–1,+∞)B .(–∞,2)C .(–1,2)D .3.(2019全国Ⅲ文1)已知集合,则 A . B . C . D .4.(2019北京文1)已知集合A ={x |–1<x <2},B ={x |x >1},则A ∪B =(A )(–1,1) (B )(1,2) (C )(–1,+∞) (D )(1,+∞)5.(2019天津文1)设集合, , ,则 (A ){2} (B ){2,3} (C ){-1,2,3} (D ){1,2,3,4}6.(2019江苏1)已知集合,,则.7.(2019浙江1)已知全集,集合,,则=A .B .{}0,1C .D .2010-2018年一、选择题1.(2018全国卷Ⅰ)已知集合{0,2}=A ,{21012}=--,,,,B ,则A B = A .{0,2} B .{1,2} C .{0}D .{21012}--,,,, 2.(2018浙江)已知全集{1,2,3,4,5}U =,{1,3}A =,则A .∅B .{1,3}C .{2,4,5}D .{1,2,3,4,5}{}{}{}1,2,3,4,5,6,72,3,4,52,3,6,7U A B ===,,U BA ={}1,6{}1,7{}6,7{}1,6,7={|1}A x x >-{|2}B x x =<∅2{1,0,1,2}{1}A B x x =-=≤,AB ={}1,0,1-{}0,1{}1,1-{}0,1,2{}1,1,2,3,5A =-{}2,3,4B ={|13}C x R x =∈<()AC B ={1,0,1,6}A =-{|0,}B x x x =>∈R A B ={}1,0,1,2,3U =-{}0,1,2A ={}1,0,1B =-U A B {}1-{}1,2,3-{}1,0,1,3-=U A3.(2018全国卷Ⅱ)已知集合{}1,3,5,7A =,{}2,3,4,5B =,则AB = A .{3} B .{5}C .{3,5}D .{}1,2,3,4,5,74.(2018北京)已知集合{|||2}A x x =<,{2,0,1,2}B =-,则A B =A .{0,1}B .{–1,0,1}C .{–2,0,1,2}D .{–1,0,1,2}5.(2018全国卷Ⅲ)已知集合{|10}A x x =-≥,{0,1,2}B =,则AB = A .{0} B .{1}C .{1,2}D .{0,1,2}6.(2018天津)设集合{1,2,3,4}A =,{1,0,2,3}B =-,{|12}C x x =∈-<R ≤,则()A B C =A .{1,1}-B .{0,1}C .{1,0,1}-D .{2,3,4}7.(2017新课标Ⅰ)已知集合{|2}A x x =<,{320}B x =->,则A .3{|}2AB x x =< B .A B =∅C .3{|}2A B x x =< D .A B =R8.(2017新课标Ⅱ)设集合{1,2,3}A =,{2,3,4}B =则A B =A .{1,2,3,4}B .{1,2,3}C .{2,3,4}D .{1,3,4}9.(2017新课标Ⅲ)已知集合{1,2,3,4}A =,{2,4,6,8}B =,则A B 中元素的个数为A .1B .2C .3D .410.(2017天津)设集合{1,2,6}A =,{2,4}B =,{1,2,3,4}C =,则()A B C =A .{2}B .{1,2,4}C .{1,2,4,6}D .{1,2,3,4,6}11.(2017山东)设集合{}11M x x =-<,{}2N x x =<,则M N =A .()1,1-B .()1,2-C .()0,2D .()1,212.(2017北京)已知U =R ,集合{|22}A x x x =<->或,则U A =A .(2,2)-B .(,2)(2,)-∞-+∞C .[2,2]-D .(,2][2,)-∞-+∞13.(2017浙江)已知集合{|11}P x x =-<<,{|02}Q x x =<<,那么P Q =A .(1,2)-B .(0,1)C .(1,0)-D .(1,2)14.(2016全国I 卷)设集合{1,3,5,7}A =,{|25}B x x =≤≤,则=A BA .{1,3}B .{3,5}C .{5,7}D .{1,7}15.(2016全国Ⅱ卷)已知集合,则 A . B . C . D . 16.(2016全国Ⅲ)设集合{0,2,4,6,8,10},{4,8}A B ==,则A B =A .{48},B .{026},,C .{02610},,,D .{0246810},,,,,17.(2015新课标2)已知集合,,则A B =A .B .C .D . 18.(2015新课标1)已知集合{32,},{6,8,10,12,14}A x x n n N B ==+∈=,则集合A B 中的元素个数为 A .5 B .4 C .3 D .219.(2015北京)若集合{|52}A x x =-<<,{|33}B x x =-<<,则A B =A .{|32}x x -<<B .{|52}x x -<<C .{|33}x x -<<D .{|53}x x -<< 20.(2015天津)已知全集{1,2,3,4,5,6}U =,集合{}2,3,5A =,集合{1,3,4,6}B =,则集合U AB = A .{3} B .{2,5}C .{1,4,6}D .{2,3,5}21.(2015陕西)设集合2{|}M x x x ==,{|lg 0}N x x =≤,则M N = A .[0,1] B .(0,1] C .[0,1) D .(-∞,1]22.(2015山东)已知集合{}24A x x =<<,{}(1)(3)0B x x x =--<,则AB = A .()1,3 B .()1,4C .()2,3D .()2,423.(2015福建)若集合,,则等于A .B .C .D . {123}A =,,,2{|9}B x x =<A B ={210123}--,,,,,{21012}--,,,,{123},,{12},}21|{<<-=x x A }30|{<<=x x B )3,1(-)0,1(-)2,0()3,2({}22M x x =-≤<{}0,1,2N =M N {}0{}1{}0,1,2{}0,124.(2015广东)若集合{}1,1M =-,{}2,1,0N =-,则M N =A .{}0,1-B .{}1C .{}0D .{}1,1-25.(2015湖北)已知集合22{(,)|1,,}A x y x y x y Z =+∈≤,{(,)|||2,B x y x =≤ ||2,,}y x y Z ∈≤,定义集合12121122{(,)|(,),(,)}A B x x y y x y A x y B ⊕=++∈∈,则A B ⊕中元素的个数为A .77B .49C .45D .3026.(2014新课标)已知集合A ={x |2230x x --≥},B ={x |-2≤x <2},则A B = A .[-2, -1] B .[-1,1] C .[-1,2) D .[1,2)27.(2014新课标)设集合M ={0,1,2},N ={}2|320x x x -+≤,则M N = A .{1} B .{2} C .{0,1} D .{1,2}28.(2014新课标)已知集合A ={-2,0,2},B ={x |2x -x -20=},则A B =A .∅B .{}2C .{}0D .{}2-29.(2014山东)设集合},]2,0[,2{},21{∈==<-=x y y B x x A x 则=B AA . [0,2]B .(1,3)C . [1,3)D . (1,4)30.(2014山东)设集合2{|20},{|14}A x x x B x x =-<=≤≤,则AB =A .(0,2]B .(1,2)C .[1,2)D .(1,4) 31.(2014广东)已知集合,,则 A . B . C . D .32.(2014福建)若集合{|24}P x x =<≤,{|3}Q x x =≥,则P Q 等于A .}{34x x ≤<B .}{34x x <<C .}{23x x ≤<D .}{23x x ≤≤33.(2014浙江)设全集,集合,则U A =A .B .C .D .{1,0,1}M =-{0,1,2}N =MN ={0,1}{1,0,2}-{1,0,1,2}-{1,0,1}-{}2|≥∈=x N x U {}5|2≥∈=x N x A ∅}2{}5{}5,2{34.(2014北京)已知集合2{|20},{0,1,2}A x x x B =-==,则AB = A .{0} B .{0,1}C .{0,2}D .{0,1,2}35.(2014湖南)已知集合{|2},{|13}A x x B x x =>=<<,则A B =A .{|2}x x >B .{|1}x x >C .{|23}x x <<D .{|13}x x <<36.(2014陕西)已知集合2{|0},{|1,}M x x N x x x R =≥=<∈,则MN = A .[0,1] B .[0,1) C .(0,1] D .(0,1)37.(2014江西)设全集为R ,集合2{|90},{|15}A x x B x x =-<=-<≤,则()R A B =A .(3,0)-B .(3,1)--C .(3,1]--D .(3,3)-38.(2014辽宁)已知全集,{|0},{|1}U R A x x B x x ==≤=≥,则集合()U A B =A .{|0}x x ≥B .{|1}x x ≤C .{|01}x x ≤≤D .{|01}x x <<39.(2014四川)已知集合2{|20}A x x x =--≤,集合B 为整数集,则AB = A .{1,0,1,2}- B .{2,1,0,1}--C .{0,1}D .{1,0}-40.(2014湖北)已知全集{1,2,3,4,5,6,7}U =,集合{1,3,5,6}A =,则UA = A .{1,3,5,6}B .{2,3,7}C .{2,4,7}D .{2,5,7} 41.(2014湖北)设U 为全集,B A ,是集合,则“存在集合C 使得A C ⊆,U B C ⊆”是“∅=B A ”的 A .充分而不必要条件 B .必要而不充分条件C .充要条件D .既不充分也不必要条件42.(2013新课标1)已知集合A ={x |x 2-2x >0},B ={x |-5<x <5},则A .A ∩B =∅ B .A ∪B =RC .B ⊆AD .A ⊆B 43.(2013新课标1)已知集合,,则A .{}14,B .{}23,C .{}916,D .{}12, {1,2,3,4}A =2{|,}B x x n n A ==∈AB =44.(2013新课标2)已知集合,,则=A .B .C .D . 45.(2013新课标2)已知集合,,则 A . B . C . D .46.(2013山东)已知集合均为全集的子集,且,,则 A .{3} B .{4}C .{3,4}D . 47.(2013山东)已知集合A ={0,1,2},则集合B =中元素的个数是A .1B .3C .5D .948.(2013安徽)已知,则A .B .C .D .49.(2013辽宁)已知集合 A . B . C . D . 50.(2013北京)已知集合,,则A .B .C .D .51.(2013广东)设集合,,则A .B .C .D . 52.(2013广东)设整数,集合,令集合{(,,)|,,S x y z x y z X =∈,且三条件,,x y z y z x z x y <<<<<<恰有一个成立},若和都在中,则下列选项正确的是(){}2|14,M x x x R =-<∈{}1,0,1,2,3N =-M N {}0,1,2{}1,0,1,2-{}1,0,2,3-{}0,1,2,3{|31}M x x =-<<{3,2,1,0,1}N =---MN ={2,1,0,1}--{3,2,1,0}---{2,1,0}--{3,2,1}---B A 、}4,3,2,1{=U (){4}U A B ={1,2}B =U AB =∅{}|,x y x A y A -∈∈{}{}|10,2,1,0,1A x x B =+>=--()RC A B ⋂={}2,1--{}2-{}1,0,1-{}0,1{}{}4|0log 1,|2A x x B x x AB =<<=≤=,则()01,(]02,()1,2(]12,{}1,0,1A =-{}|11B x x =-≤<A B ={}0{}1,0-{}0,1{}1,0,1-2{|20,}S x x x x R =+=∈2{|20,}T x x x x R =-=∈S T ={0}{0,2}{2,0}-{2,0,2}-4n ≥{}1,2,3,,X n =(),,x y z (),,z w x SA .,B .,C .,D .,53.(2013陕西)设全集为R , 函数M , 则为A . [-1,1]B . (-1,1)C .D .54.(2013江西)若集合{}2|10A x R ax ax =∈++=中只有一个元素,则a =A .4B .2C .0D .0或4 55.(2013湖北)已知全集为,集合,,则A .B .{}|24x x ≤≤C .D . 56.(2012广东)设集合;则A .B .C .D .57.(2012浙江)设全集{}1,2,3,4,5,6U =,设集合{}1,2,3,4P =,{}3,4,5Q =,则U P Q ⋂= A .{}1,2,3,4,6 B .{}1,2,3,4,5 C .{}1,2,5 D .{}1,258.(2012福建)已知集合{1,2,3,4}M =,{2,2}N =-,下列结论成立的是A .N M ⊆B .M N M =C .MN N = D .{2}M N = 59.(2012新课标)已知集合2{|20}A x x x =--<,{|11}B x x =-<<,则A .AB B .B AC .A B =D .A B =∅60.(2012安徽)设集合A ={|3213x x --},集合B 为函数)1lg(-=x y 的定义域,则A ⋂B=A .(1,2)B .[1,2]C .[ 1,2)D .(1,2 ]61.(2012江西)若集合{1,1}A =-,{0,2}B =,则集合{|,,}z z x y x A y B =+∈∈中的元素的个数为A .5B .4C .3D .2(),,y z w S ∈(),,x y w S ∉(),,y z w S ∈(),,x y w S ∈(),,y z w S ∉(),,x y w S ∈(),,y z w S ∉(),,x y w S ∉()f x =C M R ,1][1,)(∞-⋃+∞-,1)(1,)(∞-⋃+∞-R 112x A x ⎧⎫⎪⎪⎛⎫=≤⎨⎬ ⎪⎝⎭⎪⎪⎩⎭{}2|680B x x x =-+≤R A C B ={}|0x x ≤{}|024x x x ≤<>或{}|024x x x <≤≥或{1,2,3,4,5,6},{1,3,5}U M ==U C M ={,,}246{1,3,5}{,,}124U62.(2011浙江)若{|1},{|1}P x x Q x x =<=>-,则A .P Q ⊆B .Q P ⊆C .R C P Q ⊆D .R Q C P ⊆63.(2011新课标)已知集合M ={0,1,2,3,4},N ={1,3,5},P M N =⋂,则P 的子集共有A .2个B .4个C .6个D .8个64.(2011北京)已知集合P =2{|1}x x ≤,{}M a =.若P M P =,则a 的取值范围是A .(-∞, -1]B .[1, +∞)C .[-1,1]D .(-∞,-1][1,+∞) 65.(2011江西)若全集{1,2,3,4,5,6},{2,3},{1,4}U M N ===,则集合{5,6}等于A .M N ⋃B .M N ⋂C .()()n n C M C N ⋃D .()()n n C M C N ⋂66.(2011湖南)设全集{1,2,3,4,5}U M N =⋃=,{2,4}U M C N ⋂=,则N =A .{1,2,3}B .{1,3,5}C .{1,4,5}D .{2,3,4}67.(2011广东)已知集合A ={(,)|,x y x y 为实数,且221}x y +=,B ={(,)|,x y x y 为实数且1}x y +=,则A ⋂B 的元素个数为A .4B .3C .2D .168.(2011福建)若集合M ={-1,0,1},N ={0,1,2},则M ∩N 等于A .{0,1}B .{-1,0,1}C .{0,1,2}D .{-1,0,1,2}69.(2011陕西)设集合{}22||cos sin |,M y y x x x R ==-∈,1{|||N x x i =-<}i x R ∈为虚数单位,,则M N ⋂为A .(0,1)B .(0,1]C .[0,1)D .[0,1]70.(2011辽宁)已知M ,N 为集合I 的非空真子集,且M ,N 不相等,若N I M =∅,则=N MA .MB .NC .ID .∅ 71.(2010湖南)已知集合{}1,2,3M =,{}2,3,4N =,则A .M N ⊆B .N M ⊆C .{}2,3M N =D .{}1,4M N =72.(2010陕西)集合A ={}|12x x -≤≤,B ={}|1x x <,则()R A B ⋂=A .{}|1x x >B .{}|1x x ≥C .{}|12x x <≤D .{}|12x x ≤≤73.(2010浙江)设P ={x ︱x <4},Q ={x ︱2x <4},则A .P Q ⊆B .Q P ⊆C .R P Q ⊆D .R Q P ⊆74.(2010安徽)若集合121log 2A x x ⎧⎫⎪⎪=≥⎨⎬⎪⎪⎩⎭,则A =RA .2(,0],2⎛⎫-∞+∞ ⎪ ⎪⎝⎭ B .,2⎛⎫+∞ ⎪ ⎪⎝⎭C .2(,0][,)2-∞+∞ D .[,)2+∞ 75.(2010辽宁)已知,A B 均为集合U ={1,3,5,7,9}的子集,且{3}AB =,{9}U B A =,则A = A .{1,3} B .{3,7,9}C .{3,5,9}D .{3,9}二、填空题76.(2018江苏)已知集合{0,1,2,8}A =,{1,1,6,8}B =-,那么A B =.77.(2017江苏)已知集合{1,2}A =,2{,3B a a =+},若{1}AB =,则实数a 的 值为____.78.(2015江苏)已知集合{}123A =,,,{}245B =,,,则集合A B 中元素的个数为.79.(2015湖南)已知集合U ={}1,2,3,4,A ={}1,3,B ={}1,3,4,则A (U B )=.80.(2014江苏)已知集合A ={},,则.81.(2014重庆)设全集{|110}U n N n =∈≤≤,{1,2,3,5,8}A =,{1,3,5,7,9}B =,则()U A B ⋂=.82.(2014福建)若集合},4,3,2,1{},,,{=d c b a 且下列四个关系:①1=a ;②1≠b ;③2=c ;④4≠d 有且只有一个是正确的,则符合条件的有序数组),,,(d c b a 的个数是_________.4,3,1,2--}3,2,1{-=B =B A83.(2013湖南)已知集合,则()U A B =.84.(2010湖南)若规定{}1210,,...,E a a a =的子集{}12,,...,n i i i a a a 为E 的第k 个子集,其中k =12111222n i i i ---++⋅⋅⋅+,则(1){}1,3,a a 是E 的第____个子集;(2)E 的第211个子集是_______.85.(2010江苏)设集合{1,1,3}A =-,2{2,4}B a a =++,{3}A B =,则实数a =__.{2,3,6,8},{2,3},{2,6,8}U A B ===2010-2019北京高考真题分类汇编专题一集合参考答案1.解析因为{}1234567234{}}23{567U A B ===,,,,,,,,,,,,,,,所以C 17{}6U A =,,, 则{67?}UB A =,. 故选C .2.解析 (1,)A =-+∞,(,2)B =-∞,(1,2)A B =-.故选C.3.解析 因为{}1,0,1,2A =-,2{|1}{|11}B x x x x ==-,所以{}1,0,1AB =-.故选A .4.解析由数轴可知,{}1AB x x =>.故选C.5.解析 设集合{}1,1,2,3,5A =-,{}13C x x =∈<R , 则{}1,2A C =.又{}2,3,4B =, 所以{}{}{}{}1,22,3,41,2,3,4A C B ==.故选D.6.解析因为{}1,0,1,6A =-,{}|0,B x x x =>∈R , 所以{}{}{}1,0,1,6|0,1,6A B x x x =->∈=R .7.解析{1,3}UA =-,{1}UAB =-.故选A .2010-20181.A 【解析】由题意{0,2}A B =,故选A .2.C 【解析】因为{1,2,3,4,5}U =,{1,3}A =,所以{2,4,5}.故选C .3.C 【解析】因为{}1,3,5,7A =,{}2,3,4,5B =,所以{3,5}AB =,故选C .4.A 【解析】{|||2}(2,2)A x x =<=-,{2,0,1,2}B =-,∴{0,1}A B =,故选A .5.C 【解析】由题意知,{|10}A x x =-≥,则{1,2}A B =.故选C .6.C 【解析】由题意{1,0,1,2,3,4}AB =-,∴(){1,0,1}A BC =-,故选C .7.A 【解析】∵3{|}2B x x =<,∴3{|}2AB x x =<, 选A .8.A 【解析】由并集的概念可知,{1,2,3,4}A B =,选A . 9.B 【解析】由集合交集的定义{2,4}AB =,选B .=UA10.B 【解析】∵{1,2,4,6}A B =,(){1,2,4}A B C =,选B .11.C 【解析】{|02}M x x =<<,所以{|02}M N x x =<<,选C .12.C 【解析】{|22}UA x x =-≤≤,选C .13.A 【解析】由题意可知{|12}P Q x x =-<<,选A .14.B 【解析】由题意得,{1,3,5,7}A =,{|25}B x x=,则{3,5}A B =.选B .15.D 【解析】易知{|33}B x x =-<<,又{1,2,3}A =,所以{1,2}A B =故选D .16.C 【解析】由补集的概念,得{0,2,6,10}AB =,故选C .17.A 【解析】∵(1,2)A =-,(0,3)B =,∴(1,3)A B =-.18.D 【解析】集合{|32,}A x x n n N ==+∈,当0n =时,322n +=,当1n =时,325n +=,当2n =时,328n +=,当3n =时,3211n +=,当4n =时, 3214n +=,∵{6,8,10,12,14}B =,∴A B 中元素的个数为2,选D .19.A 【解析】{|32}A B x x =-<<. 20.B 【解析】{2,5}UB =,∴UAB {2,5}.21.A 【解析】∵{0,1}M =,{|01}N x x ≤=<,∴M N =[0,1].22.C 【解析】因为{|13}B x x ,所以(2,3)A B =,故选C . 23.D 【解析】∵{0,1}M N .24.B 【解析】{1}MN =.25.C 【解析】由题意知,,,所以由新定义集合可知, 或.当时,, ,所以此时中元素的个数有:个;当时,,,这种情形下和第一种情况下除的值取或外均相同,即此时有,22{(,)1,,}{(1,0),(1,0),(0,1),(0,1)}A x y x y x y =+≤∈=--Z {(,)||2,||2,,}B x y x y x y =≤≤∈Z A B ⊕111,0x y =±=110,1x y ==±111,0x y =±=123,2,1,0,1,2,3x x +=---122,1,0,1,2y y +=--A B ⊕7535⨯=110,1x y ==±122,1,0,1,2x x +=--123,2,1,0,1,2,3y y +=---12y y +3-35210⨯=由分类计数原理知,中元素的个数为个,故应选C . 26.A 【解析】{}|13A x x x =-≤或≥,故A B =[-2,-1].27.D 【解析】{}|12N x x =≤≤,∴M N ={1,2}.28.B 【解析】∵{}1,2B =-,∴AB ={}2.29.C 【解析】|1|213x x -<⇒-<<,∴(1,3)A =-,[1,4]B =.∴[1,3)A B =.30.C 【解析】∵(0,2)A =,[1,4]B =,所以AB =[1,2).31.C 【解析】{}{}{}1,0,10,1,21,0,1,2M N ⋃=-⋃=-,选C . 32.A 【解析】PQ =}{34x x ≤<.33.B 【解析】由题意知{|2}U x N x =∈≥,{|A x N x =∈,所以UA={|2x N x ∈<≤,选B .34.C 【解析】∵{}{}2|200,2A x x x =-==.∴AB =={}0,2.35.C 【解析】A B ={|23}x x <<.36.B 【解析】∵21x <,∴11x -<<,∴M N ={}|01x x <≤,故选B .37.C 【解析】{}|3,3A x x =-<,{}|15RB x x x =->≤或,∴()R AB ={}|31x x --≤≤.38.D 【解析】由已知得,{=0AB x x ≤或}1x ≥,故()UA B ={|01}x x <<.39.A 【解析】{|12}A x x =-≤≤,Z B =,故A B ={1,0,1,2}-.40.C 【解析】{}2,4,7UA =.41.C 【解析】“存在集合C 使得,UA CBC ⊆⊆”⇔“∅=B A ”,选C .42.B 【解析】A =(-,0)∪(2,+),∴A B =R ,故选B .43.A 【解析】{}1,4,9,16B =,∴{}1,4AB =.A B ⊕351045+=∞∞44.A 【解析】∵,∴.45.C 【解析】因为,,所以,选C .46.A 【解析】由题意{}1,2,3AB =,且,所以A 中必有3,没有4,{}3,4UB =,故{}3.47.C 【解析】0,0,1,2,0,1,2x y x y ==-=--;1,0,1,2,1,0,1x y x y ==-=-;2,0,1,2,2,1,0x y x y ==-=.∴B 中的元素为2,1,0,1,2--共5个.48.A 【解析】A :,{|1}RA x x =-≤,(){1,2}R A B =--,所以答案选A49.D 【解析】由集合A ,;所以(1,2]A B =.50.B 【解析】集合B 中含-1,0,故{}1,0AB =-.51.A 【解析】∵{}2,0S =-,{}0,2T =,∴{}0.52.B 【解析】特殊值法,不妨令,,则,,故选B .如果利用直接法:因为,,所以…①,…②,…③三个式子中恰有一个成立;…④,…⑤,…⑥三个式子中恰有一个成立.配对后只有四种情况:第一种:①⑤成立,此时,于是,;第二种:①⑥成立, 此时,于是,;第三种:②④成立, 此时,于是,;第四种:③④成立, 此时,于是,. 综合上述四种情况,可得,. 53.D 【解析】()f x 的定义域为M =[-1,1],故RM =,选D(1,3)M =-{}0,1,2MN ={31}M x x =-<<{3,2,1,0,1}N =---MN {2,1,0}=--{1,2}B =UA B =1->x 14x <<ST =2,3,4x y z ===1w =()(),,3,4,1y z w S =∈()(),,2,3,1x y w S =∈(),,x y z S ∈(),,z w x S ∈x y z <<y z x <<z x y <<z w x <<w x z <<x z w <<w x y z <<<(),,y z w S ∈(),,x y w S ∈x y z w <<<(),,y z w S ∈(),,x y w S ∈y z w x <<<(),,y z w S ∈(),,x y w S ∈z w x y <<<(),,y z w S ∈(),,x y w S ∈(),,y z w S ∈(),,x y w S ∈(,1)(1,)-∞-⋃+∞54.A 【解析】当0a =时,10=不合,当0a ≠时,0∆=,则4a =. 55.C 【解析】,,∴[0,2)(4,)RA B =+∞.56.A 【解析】UM =.57.D 【解析】{}3,4,5Q =,U Q ={}1,2,6,UPQ ={}1,2.58.D 【解析】由M ={1,2,3,4},N ={-2,2},可知-2∈N ,但是-2∉M ,则N ⊄M ,故A 错误.∵MN ={1,2,3,4,-2}≠M ,故B 错误.M ∩N ={2}≠N ,故C 错误,D 正确.故选D . 59.B 【解析】A =(-1,2),故B ⊂≠A ,故选B .60.D 【解析】{3213}[1,2]A x x =-≤-≤=-,(1,)(1,2]B AB =+∞⇒=.61.C 【解析】根据题意容易看出x y +只能取-1,1,3等3个数值.故共有3个元素. 62.D 【解析】{|1}P x x =< ∴{|1}RP x x =≥,又∵{|1}Q x x =>,∴RQ P ⊆,故选D .63.B 【解析】{1,3}P M N ==,故P 的子集有4个.64.C 【解析】因为PM P =,所以M P ⊆,即a P ∈,得21a ≤,解得11a -≤≤,所以a 的取值范围是[1,1]-.65.D 【解析】因为{1,2,3,4}M N =,所以()()U UM N =()UM N ={5,6}.66.B 【解析】因为UM N ⊂,所以()()()U UU U N NM N M ===[()]UU N M ={1,3,5}.67.C 【解析】由2211x y x y ⎧+=⎨+=⎩消去y ,得20x x -=,解得0x =或1x =,这时1y =或0y =,即{(0,1),(1,0)}A B =,有2个元素.68.A 【解析】集合{1,0,1}{0,1,2}={0,1}MN =-.69.C 【解析】对于集合M ,函数|cos 2|y x =,其值域为[0,1],所以[0,1]M =,根据复数模的计算方法得不等<21x <,所以(1,1)N =-,[)0,A =+∞[]2,4B ={,,}246∴∴则[0,1]M N =.70.A 【解析】根据题意可知,N 是M 的真子集,所以M N M =.71.C 【解析】{}{}{}1,2,32,3,42,3M N ==故选C.72.D 【解析】{}{}|1,|12RRB x x A B x x ==≥≤≤73.B 【解析】{}22<<x x Q -=,可知B 正确,74.A 【解析】不等式121log 2x,得12112201log log ()2x >⎧⎪⎨⎪⎩,得22x , 所以R A =2(,0],2⎛⎫-∞+∞ ⎪ ⎪⎝⎭.75.D 【解析】因为{3}AB =,所以3∈A ,又因为{9}UB A =,所以9∈A ,所以选D .本题也可以用Venn图的方法帮助理解.76.{1,8}【解析】由集合的交运算可得AB ={1,8}.77.1【解析】由题意1B ∈,显然1a =,此时234a +=,满足题意,故1a =. 78.5【解析】{1,2,3}{2,4,5}{1,2,3,4,5}A B ==,5个元素. 79.{1,2,3}【解析】{2}UB ,A(UB )={1,2,3}.80.{}1,3-【解析】{}1,3-.81.{}7,9【解析】{}1,2,3,4,5,6,7,8,9,10U =,{}4,6,7,9,10UA =,{}()7,9U A B =.82.6【解析】因为①正确,②也正确,所以只有①正确是不可能的;若只有②正确,①③④都不正确,则符合条件的有序数组为(2,3,1,4),(3,2,1,4);若只有③正确,①②④都不正确,则符合条件的有序数组为(3,1,2,4);若只有④正确,①②③都不正确,则符合条件的有序数组为(2,1,4,3),(3,1,4,2),(4,1,3,2).综上符合条件的有序数组的个数是6.83.{}6,8【解析】()UA B ={6,8}{2,6,8}{6,8}=.=B A84.【解析】(1)5 根据k 的定义,可知1131225k --=+=;(2)12578{,,,,}a a a a a 此时211k =,是个奇数,所以可以判断所求集中必含元素1a ,又892,2均大于211,故所求子集不含910,a a ,然后根据2j(j =1,2,⋅⋅⋅7)的值易推导出所求子集为12578{,,,,}a a a a a . 85.1【解析】考查集合的运算推理.3∈B ,23a +=,1a =.。