集合训练题

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集合训练题一、题点全面练1.已知集合M={x|x2+x-2=0},N={0,1},则M∪N=( )A.{-2,0,1} B.{1}C.{0} D.∅解析:选A 集合M={x|x2+x-2=0}={x|x=-2或x=1}={-2,1},N={0,1},则M∪N={-2,0,1}.故选A.2.设集合A={x|x2-x-2<0},集合B={x|-1<x≤1},则A∩B=( )A.[-1,1] B.(-1,1]C.(-1,2) D.[1,2)解析:选B ∵A={x|x2-x-2<0}={x|-1<x<2},B={x|-1<x≤1},∴A∩B={x|-1<x≤1}.故选B.3.设集合M={x|x=2k+1,k∈Z},N={x|x=k+2,k∈Z},则( )A.M=N B.M⊆NC.N⊆M D.M∩N=∅解析:选B ∵集合M={x|x=2k+1,k∈Z}={奇数},N={x|x=k+2,k∈Z}={整数},∴M⊆N.故选B.4.设集合U={1,2,3,4,5},A={2,4},B={1,2,3},则图中阴影部分所表示的集合是( )A.{4} B.{2,4}C.{4,5} D.{1,3,4}解析:选A 图中阴影部分表示在集合A中但不在集合B中的元素构成的集合,故图中阴影部分所表示的集合是A∩(∁U B)={4},故选A.5.(2018·湖北天门等三地3月联考)设集合A={1,2,3},B={4,5},M={x|x=a+b,a∈A,b∈B},则M中元素的个数为( )A.3 B.4C.5 D.6解析:选B a∈{1,2,3},b∈{4,5},则M={5,6,7,8},即M中元素的个数为4,故选B.二、专项培优练(一)易错专练——不丢怨枉分1.已知集合M ={x |y =lg(2-x )},N ={y |y =1-x +x -1},则( ) A .M ⊆N B .N ⊆M C .M =ND .N ∈M解析:选B ∵集合M ={x |y =lg(2-x )}=(-∞,2),N ={y |y =1-x +x -1}={0},∴N ⊆M .故选B.2.(2019·皖南八校联考)已知集合A ={(x ,y )|x 2=4y },B ={(x ,y )|y =x },则A ∩B 的真子集个数为( )A .1B .3C .5D .7解析:选B 由⎩⎪⎨⎪⎧x 2=4y ,y =x得⎩⎪⎨⎪⎧x =0,y =0或⎩⎪⎨⎪⎧x =4,y =4,即A ∩B ={(0,0),(4,4)}, ∴A ∩B 的真子集个数为22-1=3.3.已知集合P ={y |y 2-y -2>0},Q ={x |x 2+ax +b ≤0}.若P ∪Q =R ,且P ∩Q =(2,3],则a +b =( )A .-5B .5C .-1D .1解析:选A 因为P ={y |y 2-y -2>0}={y |y >2或y <-1}.由P ∪Q =R 及P ∩Q =(2,3],得Q =[-1,3],所以-a =-1+3,b =-1×3,即a =-2,b =-3,a +b =-5,故选A.4.已知集合M =⎩⎨⎧⎭⎬⎫x ⎪⎪⎪x =k π4+π4,k ∈Z ,集合N =⎩⎨⎧⎭⎬⎫x ⎪⎪⎪x =k π8-π4,k ∈Z ,则( ) A .M ∩N =∅ B .M ⊆N C .N ⊆M D .M ∪N =M解析:选B由题意可知,M =⎩⎨⎧⎭⎬⎫x ⎪⎪⎪x =k +π8-π4,k ∈Z =⎩⎨⎧⎭⎬⎫x ⎪⎪⎪x =2n π8-π4,n ∈Z ,N =⎩⎨⎧⎭⎬⎫x ⎪⎪⎪x =2k π8-π4或x =k -π8-π4,k ∈Z ,所以M ⊆N ,故选B.5.(2018·安庆二模)已知集合A ={1,3,a },B ={1,a 2-a +1},若B ⊆A ,则实数a =( )A .-1B .2C .-1或2D .1或-1或2解析:选C 因为B ⊆A ,所以必有a 2-a +1=3或a 2-a +1=a . ①若a 2-a +1=3,则a 2-a -2=0,解得a =-1或a =2. 当a =-1时,A ={1,3,-1},B ={1,3},满足条件;当a =2时,A ={1,3,2},B ={1,3},满足条件. ②若a 2-a +1=a ,则a 2-2a +1=0,解得a =1,此时集合A ={1,3,1},不满足集合中元素的互异性,所以a =1应舍去. 综上,a =-1或2.故选C.6.(2018·合肥二模)已知A =[1,+∞),B =⎩⎨⎧⎭⎬⎫x ∈R| 12a ≤x ≤2a -1,若A ∩B ≠∅,则实数a 的取值范围是( )A .[1,+∞)B.⎣⎢⎡⎦⎥⎤12,1C .⎣⎢⎡⎭⎪⎫23,+∞ D .(1,+∞)解析:选A 因为A ∩B ≠∅,所以⎩⎪⎨⎪⎧2a -1≥1,2a -1≥12a ,解得a ≥1.(二)难点专练——适情自主选7.已知全集U ={x ∈Z|0<x <8},集合M ={2,3,5},N ={x |x 2-8x +12=0},则集合{1,4,7}为( )A .M ∩(∁U N )B .∁U (M ∩N )C .∁U (M ∪N )D .(∁U M )∩N解析:选C 由已知得U ={1,2,3,4,5,6,7},N ={2,6},M ∩(∁U N )={2,3,5}∩{1,3,4,5,7}={3,5},M ∩N ={2},∁U (M ∩N )={1,3,4,5,6,7},M ∪N ={2,3,5,6},∁U (M ∪N )={1,4,7},(∁U M )∩N ={1,4,6,7}∩{2,6}={6},故选C.8.(2018·日照联考)已知集合M =⎩⎨⎧⎭⎬⎫x| x 216+y 29=1,N =⎩⎨⎧⎭⎬⎫y | x 4+y 3=1,则M ∩N =( )A .∅B .{(4,0),(3,0)}C .[-3,3]D .[-4,4]解析:选D 由题意可得M ={x |-4≤x ≤4},N ={y |y ∈R},所以M ∩N =[-4,4].故选D.9.(2019·河南八市质检)在实数集R 上定义运算*:x *y =x ·(1-y ).若关于x 的不等式x *(x -a )>0的解集是集合{x |-1≤x ≤1}的子集,则实数a 的取值范围是( )A .[0,2]B .[-2,-1)∪(-1,0]C .[0,1)∪(1,2]D .[-2,0]解析:选D 依题意可得x (1-x +a )>0.因为其解集为{x |-1≤x ≤1}的子集,所以当a ≠-1时,0<1+a ≤1或-1≤1+a <0,即-1<a ≤0或-2≤a <-1.当a =-1时,x (1-x+a )>0的解集为空集,符合题意.所以-2≤a ≤0.10.非空数集A 满足:(1)0∉A ;(2)若∀x ∈A ,有1x∈A ,则称A 是“互倒集”.给出以下数集:①{x ∈R|x 2+ax +1=0}; ②{x |x 2-4x +1<0}; ③⎩⎨⎧⎭⎬⎫y ⎪⎪⎪y =ln x x ,x ∈⎣⎢⎡⎭⎪⎫1e ,1∪,e];④⎩⎪⎨⎪⎧⎭⎪⎬⎪⎫y ⎪⎪⎪⎪y =⎩⎪⎨⎪⎧ 2x +25,x ∈[0,,x +1x ,x ∈[1,2]. 其中“互倒集”的个数是( ) A .4 B .3 C .2D .1解析:选C 对于①,当-2<a <2时为空集,所以①不是“互倒集”;对于②,{x |x2-4x +1<0}={x |2-3<x <2+3},所以12+3<1x <12-3,即2-3<1x <2+3,所以②是“互倒集”;对于③,y ′=1-ln x x 2≥0,故函数y =ln x x 是增函数,当x ∈⎣⎢⎡⎭⎪⎫1e ,1时,y ∈[-e,0),当x ∈(1,e]时,y ∈⎝ ⎛⎦⎥⎤0,1e ,所以③不是“互倒集”;对于④,y ∈⎣⎢⎡⎭⎪⎫25,125∪⎣⎢⎡⎦⎥⎤2,52=⎣⎢⎡⎦⎥⎤25,52且1y ∈⎣⎢⎡⎦⎥⎤25,52,所以④是“互倒集”.故选C.11.已知集合A ={x |3≤3x≤27},B ={x |log 2x >1}. (1)分别求A ∩B ,(∁R B )∪A ;(2)已知集合C ={x |1<x <a },若C ⊆A ,求实数a 的取值范围. 解:(1)∵3≤3x≤27,即31≤3x ≤33, ∴1≤x ≤3,∴A ={x |1≤x ≤3}. ∵log 2x >1,即log 2x >log 22, ∴x >2,∴B ={x |x >2}. ∴A ∩B ={x |2<x ≤3}. ∴∁R B ={x |x ≤2}, ∴(∁R B )∪A ={x |x ≤3}.(2)由(1)知A ={x |1≤x ≤3},C ⊆A .当C为空集时,满足C⊆A,a≤1;当C为非空集合时,可得1<a≤3.综上所述,实数a的取值范围是(-∞,3].。