六五文档>基础教育>试卷>吉林省吉林市2023-2024学年高三上学期第二次模拟考试数学答案
吉林省吉林市2023-2024学年高三上学期第二次模拟考试数学答案
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(Ⅱ)由题意,样本空间中共有个样本点,设表示两小区室内温度,用表吉林地区普通高中20232024学年度高三年级第二次模拟考试20x1,x2A,B(x1,x2)示可能的结果.数学试题参考答案C{(21,19),(22,19),(24,19),(21,20),(23,20),(24,20)},n(C)6,一、单项选择题:本大题共8小题,每小题5分,共40分.n(C)63所以,事件C的概率P(C).··················································6分n()201012345678(Ⅲ)(选择A)从供热状况角度选择生活地区居住,应建议选择A小区,理由如下:CDBDABCD①在20天的数据中,A小区室温大于B小区室温的有14天,B小区室温大于A小区室温的7二、多项选择题:本大题共4小题,共20分.全部选对的得5分,部分选对的得2分,有选错的得0有5天,由此可以估计,每天A小区室温大于B小区室温的概率为P,B小区室温大110分.1于A小区室温的概率为P,P远远小于P;24219101112②随机抽取的20天中,A小区室温平均数为TA22.05C,B小区室温平均数为BDACABDACDTB20.7C,TATB;三、填空题:本大题共4小题,每小题5分,共20分.其中第15题的第一个空填对得2分,第二③在随机抽取的20天中,B小区供热等级达到“舒适”的天数为9天,远小于A小区供热等级个空填对得3分.达到“舒适”的天数;9小区室温中位数为,小区室温中位数为,分④AZA22.5CBZB20CZAZB1013.1014.4(选择B)从供热状况角度选择生活地区居住,应建议选择B小区,理由如下:28222在天的数据中,小区中存在供热不达标的情况,而小区供热等级全部达标①20AB.15.3;4016.eea1或1aee②随机抽取的天中,小区室温平均数为,小区室温平均数为222220ATA22.05CB(注:16题或写成{a|eea1或1aee},或写成(ee,1)(1,ee))TB20.7C,在TA,TB全部达标的情况下,A小区室温方差大于B小区室温方差,B小四、解答题2区室温波动较小,说明B小区供热更加稳定.(A小区室温方差为sA7.84,B小区室温方17.【解析】差为s24.01,以上数值仅作参考,不要求计算方差具体值).·····························10分(Ⅰ)A小区当年随机抽取的20天数据中,供热等级达到“舒适”的有15天,所以可以估计A小B153赋分说明:区一天中供热等级达到“舒适”的概率为,··················································2分204①只做判断没能说明理由的不给分;那么,在当年的供热期内,3②给出一个正确理由的给3分,给出两个及以上正确理由的给4分;A小区供热等级达到“舒适”的天数约为172129天········································3分4③除以上理由外,其它符合统计概率知识的判断依据都可酌情给分.高三年级第二次模拟考试数学试题参考答案第1页(共5页)18.【解析】nABx3y0,x3y,则nAB,nAC,(Ⅰ)证明:nACx3z0,x3z,取BC中点G,连接AG,EG,取z1,则x3,y1,n(3,1,1)是平面ABC的一个法向量,CC11为中点,,,EB1CGE//BB1GEBB1332AEn13(1)16GEcosAE,n22,在三棱柱中,,|AE||n|105ABCA1B1C1AA1//BB1,AA1BB152AFA1为中点,,FAA1GE//AF,GEAFAAB6B1设直线AE与平面ABC所成角为,则sin|cosAE,n|,四边形AGEF为平行四边形,EF//GA,5又平面,平面平面分GAABCEFABCEF//ABC.··································56即直线AE与平面ABC所成角的正弦值为.··················································12分(Ⅱ)解:5在平行四边形ABBA中,ABAA,ABB,19.【解析】11113(Ⅰ)sin2Bsin2CsinBsinCsin2A平行四边形ABB1A1为菱形,zCC1由正弦定理可得b2c2bca2b2c2a2bc连接AB1,则ΔAA1B1为正三角形,E222为中点,,bcabc1FAA1B1FAA1由余弦定理得cosA2bc2bc2同理可证,xAFA1CFAA1A(0,)A······················································································5分BB13又,,B1FACACAA1Ay3设ΔABC外接圆半径为R,则R3,由正弦定理得a2RsinA233B1F平面AA1C1C2····················································································································6分以F为原点,FA,FB,FC所在直线分别为x轴,y轴,z轴,建立如图所示空间直角坐1注意:求角未写范围扣1分.标系Fxyz,(Ⅱ)由(Ⅰ)知a3,A,由余弦定理a2b2c22bccosA333F(0,0,0),A(1,0,0),B(2,3,0),B(0,3,0),C(0,0,3),E(0,,),得9b2c22bccos9(bc)23bc12233(bc)2333bc(bc)29AB(1,3,0),AC(1,0,3),AE(1,,),··································8分422(bc)236bca3bc6.设n(x,y,z)是平面ABC的法向量,当且仅当bc3时取等号··············································································8分高三年级第二次模拟考试数学试题参考答案第2页(共5页)3mbc令Tm2024,得m4048······································································8分112又由等面积法可知bcsinA(abc)rr222abc②当n4k1,(kN*)时,3(bc)292(bc)93Tn103(0507)(09011)0(n2)0nbc,r23(bc3)····························10分3bc36n122223320bc33,0(bc3)n3个6243m1r的取值范围为(0,]···············································································12分令T2024,得m4047································································9分2m220.【解析】③当n4k2,(kN*)时,(Ⅰ)a24··········································································································1分Tn10(3050)(7090)(n2)0(n1)0a39··········································································································2分n2nnn(Ⅱ)由,1(2)(2)(2)1an12ancos2sin2222n2个nn4可得acos2a2sinn12n2m(n1)nn令,得舍去分即()(*)分Tm2024m4048··························································10an1sin2an2sin2ansin,nN·····················42222又因为asin20④当n4k3,(kN*)时,12n所以{asin}是首项为2,公比为2的等比数列············································5分Tn1(0305)(0709)(0(n2)0n)n2nn所以n,即n,*·········································6分n1n1ansin2an2sinnN1(2)(2)(2)12222n1nn*个(Ⅲ)n(a2)nsin,(nN)·····································································7分4n2①当n4k,(kN*)时,m1令T2024,得m4049舍去······················································11分m2T(1030)(5070)(n3)0(n1)0n综上:m4048或4047··············································································12分21.【解析】n22221n(Ⅰ)由题可知S2cbbc2····························································1分个ΔPF1F242高三年级第二次模拟考试数学试题参考答案第3页(共5页)36k2t216t2216在椭圆上cosFPFcos2OPF2cosOPF1cosOPFMC2222112223233(23k)2(23k)b6即24t2(23k2)6(23k2)223k204t223k2在RtOPF中,cosOPF·····························································2分22a34t223k2t2,符合0a2b2c2································································································3分6kt3k4t1x,y·································
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