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§1.2集合的运算考情考向分析集合的交、并、补运算及两集合间的包含关系是考查的重点,在集合的运算中经常与不等式、函数相结合,解题时常用到数轴和韦恩(Venn)图.考查学生的数形结合思想和计算推理能力.题型主要为填空题,低档难度.集合的基本运算运算自然语言符号语言Venn图由所有属于集合A且属于集合BA∩B={x|x∈A且x∈B}交集的元素组成的集合由所有属于集合A或属于集合BA∪B={x|x∈A或x∈B}并集的元素组成的集合设A⊆U,由全集U中不属于集合∁U A={x|x∈U且x∉A}补集A的所有元素组成的集合由运算A∩B=A可以得到集合A,B具有什么关系?提示A∩B=A⇔A⊆B⇔A∪B=B.题组一思考辨析1.判断下列结论是否正确(请在括号中打“√”或“×”)(1)对于任意非空集合A,B,都有(A∩B)(A∪B).( ×)(2)若A∩B=A∩C,则B=C.( ×)(3)对于任意集合A,都有∅A.( ×)(4)对于任意集合A,B,∁S(A∪B)=(∁S A)∩(∁S B).( √)题组二教材改编2.[P14习题T11]若全集U={1,2,3,4,5},集合A={1,2,3},B={2,3,4},则∁U(A∩B)=________.答案{1,4,5}3.[P10习题T4]已知集合A={0,2,4,6},∁U A={-1,1,-3,3},∁U B={-1,0,2},则集合B=________.答案{1,4,6,-3,3}解析 ∵∁U A ={-1,1,-3,3},∴U ={-1,1,0,2,4,6,-3,3}. 又∁U B ={-1,0,2},∴B ={1,4,6,-3,3}.4.[P14习题T10]设集合A ={4,5,7,9},B ={3,4,7,8,9},全集U =A ∪B ,则集合∁U (A ∩B )中的元素共有________个. 答案 3解析 ∵全集U =A ∪B ={3,4,5,7,8,9},A ∩B ={4,7,9}, ∴∁U (A ∩B )={3,5,8},∴共有3个元素. 题组三 易错自纠5.设集合A ={-1,1,3},B ={a +2,a 2+4},若A ∩B ={3},则实数a =________. 答案 1解析 显然a 2+4≠3,由a +2=3得a =1,符合题意.6.已知集合A ={x |x 2-4x +3<0},B ={x |2<x <4},则(∁R A )∪B =______________. 答案 {x |x ≤1或x >2}解析 由已知可得集合A ={x |1<x <3}, 又因为B ={x |2<x <4},∁R A ={x |x ≤1或x ≥3}, 所以(∁R A )∪B ={x |x ≤1或x >2}.7.已知集合A ={(x ,y )|x 2+y 2=1},B ={(x ,y )|y =x },则A ∩B 中元素的个数为________. 答案 2解析 集合A 表示以(0,0)为圆心,1为半径的单位圆上的点,集合B 表示直线y =x 上的点,圆x 2+y 2=1与直线y =x 相交于两点⎝ ⎛⎭⎪⎫22,22,⎝ ⎛⎭⎪⎫-22,-22,则A ∩B 中有两个元素. 题型一 集合的运算1.已知集合A ={1,4},B ={x |1≤x ≤3},则A ∩B =________. 答案 {1}解析 依题意,根据集合交集的定义与运算, 可得A ∩B ={1}.2.设全集为R ,集合A ={x |x 2-9<0},B ={x |-1<x ≤5},则A ∩(∁R B )=________. 答案 {x |-3<x ≤-1}解析 由题意知,A ={x |x 2-9<0}={x |-3<x <3}. 因为B ={x |-1<x ≤5}, 所以∁R B ={x |x ≤-1或x >5}.所以A ∩(∁R B )={x |-3<x <3}∩{x |x ≤-1或x >5}={x |-3<x ≤-1}.3.已知M ={y |y =x 2,x ∈R },N ={y |x 2+y 2=1,x ∈R ,y ∈R },则M ∩N =________. 答案 [0,1]解析 由题意得M =[0,+∞),由x 2+y 2=1,得到-1≤y ≤1,即N =[-1,1],则M ∩N =[0,1].4.已知集合A ={x |x 2-5x -6<0},B ={x |2x<1},则图中阴影部分表示的集合是________. 答案 {x |0≤x <6}解析 由x 2-5x -6<0,解得-1<x <6, 所以A ={x |-1<x <6}.由2x<1,解得x <0,所以B ={x |x <0}. 又图中阴影部分表示的集合为(∁U B )∩A ,因为∁U B ={x |x ≥0},所以(∁U B )∩A ={x |0≤x <6}.思维升华在进行集合的运算时,若集合中的元素是离散的,可用Venn 图表示;若集合中的元素是连续的,可用数轴表示集合,要特别注意端点的取舍. 题型二 利用集合的运算求参数例1 (1)设集合A ={-1,0,1},B =⎩⎨⎧⎭⎬⎫a -1,a +1a ,A ∩B ={0},则实数a 的值为________.答案 1解析 0∈⎩⎨⎧⎭⎬⎫a -1,a +1a ,由a +1a≠0,则a -1=0,则实数a 的值为1.经检验,当a =1时满足题意.(2)已知集合A ={x |x <a },B ={x |x 2-3x +2<0},若A ∩B =B ,则实数a 的取值范围是________. 答案 [2,+∞)解析 集合B ={x |x 2-3x +2<0}={x |1<x <2}, 由A ∩B =B 可得B ⊆A ,作出数轴如图. 可知a ≥2.(3)设集合A ={0,-4},B ={x |x 2+2(a +1)x +a 2-1=0,x ∈R }.若A ∩B =B ,则实数a 的取值范围是______. 答案 (-∞,-1]∪{1} 解析 因为A ∩B =B ,所以B ⊆A ,因为A ={0,-4},所以B ⊆A 分以下三种情况:①当B =A 时,B ={0,-4},由此可知,0和-4是方程x 2+2(a +1)x +a 2-1=0的两个根, 由根与系数的关系,得⎩⎪⎨⎪⎧Δ=4(a +1)2-4(a 2-1)>0,-2(a +1)=-4,a 2-1=0,解得a =1;②当B ≠∅且B A 时,B ={0}或B ={-4}, 并且Δ=4(a +1)2-4(a 2-1)=0, 解得a =-1,此时B ={0}满足题意; ③当B =∅时,Δ=4(a +1)2-4(a 2-1)<0, 解得a <-1.综上所述,所求实数a 的取值范围是(-∞,-1]∪{1}.思维升华利用集合的运算求参数值或范围,要根据集合中元素的关系,灵活使用数轴工具,找出参数适合的条件,求参数的值要检验元素的互异性,求参数的取值范围要对端点的情况单独考虑.跟踪训练1(1)集合A ={1,3},B ={a 2+2,3},若A ∪B ={1,2,3},则实数a 的值为________. 答案 0解析 ∵A ={1,3},B ={a 2+2,3},且A ∪B ={1,2,3}, ∴a 2+2=2,a 2=0,a =0,即实数a 的值为0.(2)已知集合A ={x |x 2-x -12≤0},B ={x |2m -1<x <m +1},且A ∩B =B ,则实数m 的取值范围为________. 答案 [-1,+∞)解析 由x 2-x -12≤0,得(x +3)(x -4)≤0, 即-3≤x ≤4,所以A ={x |-3≤x ≤4}. 又A ∩B =B ,所以B ⊆A .①当B =∅时,有m +1≤2m -1,解得m ≥2; ②当B ≠∅时,有⎩⎪⎨⎪⎧-3≤2m -1,m +1≤4,2m -1<m +1,解得-1≤m <2.综上,m 的取值范围为[-1,+∞).题型三 集合的新定义问题例2(1)(2018·江苏洪泽中学月考)对于任意两集合A ,B ,定义A -B ={x |x ∈A 且x ∉B },A *B =(A -B )∪(B -A ),记A ={y |y ≥0},B ={x |-3≤x ≤3},则A *B =______________. 答案 [-3,0)∪(3,+∞)解析 由题意知,A -B ={x |x >3},B -A ={x |-3≤x <0},A *B =(A -B )∪(B -A )=[-3,0)∪(3,+∞).(2)设数集M =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫x ⎪⎪⎪m ≤x ≤m +34,N =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫x ⎪⎪⎪n -13≤x ≤n,且M ,N 都是集合U ={x |0≤x ≤1}的子集,定义b -a 为集合{x |a ≤x ≤b }的“长度”,则集合M ∩N 的长度的最小值为________. 答案112解析 在数轴上表示出集合M 与N (图略),可知当m =0且n =1或n -13=0且m +34=1时,M ∩N 的“长度”最小.当m =0且n =1时,M ∩N =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫x ⎪⎪⎪23≤x ≤34, 长度为34-23=112;当n =13且m =14时,M ∩N =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫x ⎪⎪⎪14≤x ≤13, 长度为13-14=112.综上,M ∩N 的长度的最小值为112.思维升华解决以集合为背景的新定义问题,要抓住两点:(1)紧扣新定义.首先分析新定义的特点,把新定义所叙述的问题的本质弄清楚,应用到具体的解题过程之中.(2)用好集合的性质.解题时要善于从试题中发现可以使用集合性质的一些因素.跟踪训练2(1)已知集合A ={x ∈N |x 2-2x -3≤0},B ={1,3},定义集合A ,B 之间的运算“*”:A *B ={x |x =x 1+x 2,x 1∈A ,x 2∈B },则A *B 中的所有元素数字之和为________. 答案 21解析 由x 2-2x -3≤0,x ∈N ,得(x +1)(x -3)≤0,x ∈N ,得A ={0,1,2,3}.因为A *B ={x |x =x 1+x 2,x 1∈A ,x 2∈B },所以A *B 中的元素有:0+1=1,0+3=3,1+1=2,1+3=4,2+1=3(舍去),2+3=5,3+1=4(舍去),3+3=6,所以A *B ={1,2,3,4,5,6},所以A *B中的所有元素数字之和为21.(2)用C (A )表示非空集合A 中元素的个数,定义A *B =⎩⎪⎨⎪⎧C (A )-C (B ),C (A )≥C (B ),C (B )-C (A ),C (A )<C (B ).若A ={1,2},B ={x |(x 2+ax )(x 2+ax +2)=0},且A *B =1,设实数a 的所有可能取值组成的集合是S ,则C (S )=________. 答案 3解析 因为C (A )=2,A *B =1,所以C (B )=1或C (B )=3.由x 2+ax =0,得x 1=0,x 2=-a .关于x 的方程x 2+ax +2=0,当Δ=0,即a =±22时,易知C (B )=3,符合题意;当Δ>0,即a <-22或a >22时,易知0,-a 均不是方程x 2+ax +2=0的根,故C (B )=4,不符合题意;当Δ<0,即-22<a <22时,方程x 2+ax +2=0无实数解,当a =0时,B ={0},C (B )=1,符合题意,当-22<a <0或0<a <22时,C (B )=2,不符合题意.综上,S ={0,-22,22},故C (S )=3.1.已知集合A ={1,a },B ={2,3,4},A ∩B ={3},则A ∪B =________. 答案 {1,2,3,4}解析 由集合A ={1,a },B ={2,3,4},A ∩B ={3},则a =3,故A ∪B ={1,2,3,4}. 2.已知全集为R ,集合A ={x |2x≥4},B ={x |x 2-3x ≥0},则A ∩(∁R B )=________. 答案 [2,3)解析 A ={x |2x≥4}={x |x ≥2},B ={x |x 2-3x ≥0}={x |x ≤0或x ≥3},∁R B =(0,3), 则A ∩(∁R B )=[2,3).3.设全集U ={x |x ∈N *,x ≤9},∁U (A ∪B )={1,3},A ∩(∁U B )={2,4},则B =________. 答案 {5,6,7,8,9}解析 因为全集U ={1,2,3,4,5,6,7,8,9},∁U (A ∪B )={1,3}, 所以A ∪B ={2,4,5,6,7,8,9},由A ∩(∁U B )={2,4}知,{2,4}⊆A ,{2,4}⊆∁U B . 所以B ={5,6,7,8,9}.4.已知集合A ={x |-2<x <4},B ={x |y =lg(x -2)},则A ∩(∁R B )=________. 答案 (-2,2]解析 由题意得B ={x |y =lg(x -2)}=(2,+∞),∴∁R B =(-∞,2],∴A ∩(∁R B )=(-2,2].5.(2018·苏州调研)已知集合A ={1,2a},B ={-1,1,4},且A ⊆B ,则正整数a =________. 答案 2解析 ∵A ={1,2a},B ={-1,1,4},且A ⊆B , ∴2a =4=22,a =2.6.设集合A ={1,2,4},B ={x |x 2-4x +m =0}.若A ∩B ={1},则B =________. 答案 {1,3}解析 ∵A ∩B ={1},∴1∈B . ∴1-4+m =0,即m =3. ∴B ={x |x 2-4x +3=0}={1,3}.7.已知全集U ={x ∈N |x 2-5x -6<0},集合A ={x ∈N |-2<x ≤2},B ={1,2,3,5},则(∁U A )∩B =________. 答案 {3,5}解析 由题意知,U ={0,1,2,3,4,5},A ={0,1,2},则(∁U A )∩B ={3,5}.8.设集合A ={-1,1,2},B ={a +1,a 2-2},若A ∩B ={-1,2},则a 的值为________. 答案 -2或1解析 ∵集合A ={-1,1,2},B ={a +1,a 2-2},A ∩B ={-1,2},∴⎩⎪⎨⎪⎧a +1=-1,a 2-2=2或⎩⎪⎨⎪⎧a +1=2,a 2-2=-1,解得a =-2或a =1.经检验,a =-2和a =1均满足题意.9.已知集合P ={x |y =-x 2+x +2,x ∈N },Q ={x |ln x <1},则P ∩Q =________. 答案 {1,2}解析 由-x 2+x +2≥0,得-1≤x ≤2,因为x ∈N ,所以P ={0,1,2}.因为ln x <1,所以0<x <e ,所以Q =(0,e),则P ∩Q ={1,2}.10.若全集U =R ,集合A ={x |x 2-x -2≥0},B ={x |log 3(2-x )≤1},则A ∩(∁U B )=________________. 答案 {x |x <-1或x ≥2}解析 集合A ={x |x 2-x -2≥0}={x |x ≤-1或x ≥2}, ∵log 3(2-x )≤1=log 33,∴0<2-x ≤3, ∴-1≤x <2,∴B ={x |-1≤x <2},∴∁U B ={x |x <-1或x ≥2}, ∴A ∩(∁U B )={x |x <-1或x ≥2}.11.设A ,B 是非空集合,定义A ×B ={x |x ∈A ∪B ,且x ∉A ∩B }.若A ={x |y =x 2-3x },B ={y |y =3x},则A ×B =________. 答案 (-∞,3)解析 集合A 即为函数y =x 2-3x 的定义域,由x 2-3x ≥0⇒x ≤0或x ≥3,故集合A =(-∞,0]∪[3,+∞),集合B 即为函数y =3x的值域,故B =(0,+∞),从而有A ∪B =R ,A ∩B =[3,+∞),由定义知A ×B =(-∞,3).12.设集合A ={x |a ≤x ≤a +3},B ={x |x <-1或x >5},若A ∪(∁R B )=∁R B ,则a 的取值范围是________. 答案 [-1,2]解析 由补集的定义知∁R B ={x |-1≤x ≤5}, ∵A ∪(∁R B )=∁R B ,∴A ⊆∁R B .由图得⎩⎪⎨⎪⎧a ≥-1,a +3≤5,解得-1≤a ≤2.13.已知集合A ={x ∈R ||x +2|<3},集合B ={x ∈R |(x -m )(x -2)<0},且A ∩B =(-1,n ),则m =______,n =________. 答案 -1 1解析 A ={x ∈R ||x +2|<3}={x ∈R |-5<x <1}, 由A ∩B =(-1,n ),可知m =-1,则B ={x |-1<x <2},画出数轴,可得m =-1,n =1.14.已知集合A ={x |y =x -1},B =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫x ⎪⎪⎪12a ≤x ≤2a -1.若A ∩B =∅,则实数a 的取值范围是________. 答案 (-∞,1)解析 由题意知,A =[1,+∞), 当B =∅,即12a >2a -1时,a <23.符合题意.当B ≠∅时,令⎩⎪⎨⎪⎧12a ≤2a -1,2a -1<1,解得23≤a <1.综上,实数a 的取值范围是(-∞,1).15.已知集合A =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫(x ,y )⎪⎪⎪x 24+y 22=1,B ={(x ,y )|y =kx +m ,k ∈R ,m ∈R },若对任意实数k ,A ∩B ≠∅,则实数m 的取值范围是____________. 答案 [-2,2]解析 由已知,无论k 取何值,椭圆x 24+y 22=1和直线y =kx +m 均有交点,故点(0,m )在椭圆x 24+y 22=1上或在其内部,∴m 2≤2,∴-2≤m ≤ 2. 16.已知A =⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫x ⎪⎪⎪y =log 36-xx -2,B ={x |x 2-2x +1-a 2≤0}(a >0),若A ∪B =B ,则实数a的取值范围是______. 答案 [5,+∞)解析 由6-xx -2>0可得(x -2)(x -6)<0,∴2<x <6,∴A =(2,6).又x 2-2x +1-a 2≤0可化为[x -(1-a )][x -(1+a )]≤0. 又a >0,∴B =[1-a,1+a ]. 由A ∪B =B ,得A ⊆B ,∴⎩⎪⎨⎪⎧2≥1-a ,6≤1+a ,∴a ≥5.∴实数a 的取值范围是[5,+∞).。
