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江西省八所重点中学2022届高三文科数学4月联考试卷(PDF版附答案)

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\n\n江西省八所重点中学2022届高三联考文科数学答案故2022年2月20日该电商平台的预售人数146.8万人························12一、选择题18.解:(1)当n2时,由ann1a1a2a题号123456789101112得aaaa··················································1nn12-1答案BADCACDABCCD二、填空题an1两式作差得aaa,即2(n2)··························2n1nnan13.114.7215.316.52三、解答题a2又1a117.解:(1)由表中数据可得xy3,61·····································2所以数列{}a是从第二项开始公比为2的等比数列····························45n2所以(xxi)10·······················································3i11,n1故a····················································5nn22,n2552又(yyi)460,(xiixy)(y)66i1i1(2)当n1时,S1··················································6nn(xxy)(y)013nn21ii当n2时,Sn122222···························766i1所以r0.970.75······················5nn1046n1时,亦满足上式···············································822(xiix)(yy)n1ii11所以S2··························································9nn1所以该电商平台的第x天与到该电商平台参与预售的人数y(单位:万人)具有较高的线性相关即bSlogS2n1········································10nn2n程度即可用线性回归模型拟合人数y与天数x之间的关系.···························6Tnnb1b2b3bn012n1(xiixy)(y)(2222)(012n1)ˆ66(2)由表中数据可得bi16.6························8nn12(nn1)210·························12()xxi122i12nnn22则aˆybxˆ616.6341.2············································92所以yxˆ6.641.2·······················································10令x16,可得yˆ6.61641.2146.8(万人)····························111\n19.解:(1)取EF的中点G,连接DGCG,所以fx()在[1,2]上为增函数,四边形ADEF和BCEF都是菱形,DEFCEF6011221122E42mm即fx()f(2),fx()f(1)·······························8max2minDGEF·································1Gee又BC2DC(4em)2fx()fx()的最大值为gm()fx()fx()·················912maxmin2eDGCG3································2F4[()fxfx()]恒成立················································10212又CDAB6ABe4(4em)2,22222ee即有DGCGCD,DGCG··········································32即m····························································11又CGEFG,CGEF,平面BCEF4eDG平面BCEF·······················································52又DG平面AFED又m0m0,4e平面AFED平面BCEF···············································6(2)连接DFDB,2由(1)知DG平面BCEF,同理CG平面AFED·······················7故m的取值范围0,···················································124e1且S2323,S233····························9菱形BCEFADF211c22212221221.解:(1)e,ca,baca.·············2VV=V=VV=SDGSCGDBCEFDABFDBCEFBADF菱形BCEFADFa2223311椭圆的中心O到直线xy2b0的距离为52,2333333·················································12|2|b22252,b5.b25,a2b50.322xy22mx2(m1)x4(mx2)(x2)20.解:(1)fx()(m0)··············1椭圆C的方程为1.································4xx5025ee(2)由(1)可知F(5,0),由题可知直线AB的方程为yx2(5),与椭圆C22令fx()0,解得x或x2,且2································2mmyx2(5)222的方程联立xy22,消去y得xx8100当x(,]时,fx()0,当x(,2)时,fx()0,1mm5025当x[2,)时,fx()0··················································4设Axy(,11),Bxy(,22),则有x1x28,xx1210.··························6设Qxy(,),由OQOAOB得(x,y)(x,y)(x,y)(xx,yy),2211221212即fx()的单调增区间为(,2),单调减区间为(,],[2,)··············5mmxx1x2····························································7yyy(2)由(1)知,当mx0,[1,2]时,fx()0恒成立·························6122\n22又点Q在椭圆上,∴xy2502即(xx)222(yy)50①xt212122整理得故直线l的参数方程为(t为参数),22(x22y2)2(x22y2)2(xx2yy)50②·········8yt2112212122点A,B在椭圆上,222222∴xy250,xy250yx1122把直线l的参数方程代入1,xx2yyxx4(x5)(x5)5xx20(xx)10010③48121212121212得到:2······································································10tt+12280············································7将②③代入①可得所以tt=122,tt8········································822121250502050222又211tt(tt)4tt28832121212故+5······10|MA||MB|tttt8221212即2050505010053xx3,1,当且仅当时取“”823.解:(1)fx()x5,1x2·······························25∴的最大值为.···················································123xx3,28x112xx221x22不等式fx()6等价于或或x2(tt)tt23x36x563x3622.解:(1)曲线C1的参数方程为(t为参数),整理得2,1ytt222解得1x3yt2t∴不等式的解集为[1,3]············································522yx两式相减得曲线C的直角坐标方程为:1·························3148(2)由(1)知:当x1时,f(x)6;当1x2时,3f(x)6;当x2时,f(x)3.xcos曲线C的极坐标方程为sin()220,根据ysin,可得曲线C直角坐标方故函数f(x)的值域为[3,),即f(x)的最小值是3····················72242222xy∵不等式fx()2a5a对一切实数x恒成立,程为:xy40····················································521∴2aa53,解得:3a2(2)由于点M(2,2)满足直线l的方程,1故实数a的取值范围是3,·······································1023

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所属: 高中 - 数学
发布时间:2022-07-18 17:04:37 页数:5
价格:¥3 大小:1.58 MB
文章作者:随遇而安

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