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广西来宾市2020届高三4月教学质量诊断性联合考试 数学(文)试题(PDF版)
高三·数学(文科) 第 1页(共 6页) 广西 2020 年 4 月份高三教学质量诊断性联合考试 数学(文科) 参考答案及评分标准 一、选择题(本大题共 12 小题,每小题 5 分,共 60 分) 1. A 【解答】由中不等式变形,得,解得,∴. ∵,∴.故选. 2. C 【解答】,所以虚部为.故选. 3. C 【解答】如果一次随机取出个球,用列举法可求得全是黄球的概率是,那么至少有个红球 的概率为.故选 C. 4. A 【解答】:根据指数函数的性质可知,对任意,总有成立,即为真命题; :“”是“”的充分不必要条件,即为真命题,则为真命题.故选 A. 5. A 【解答】∵,∴,,∴,把代入,得.故选. 6. D 【解答】∵数列是各项不为的等差数列,由,得,,,∴,解得或(舍去).则.又数列是 等比数列,则.故选. 7. A 【解答】∵,∴曲线上任意一点处的切线的斜率的取值范围是,∴切线的倾斜角的取值范 围是.故选. 8. A 【解答】根据程序框图知,该程序运行后是输出当时,令,解得;当时,,满足题意;当 时,令,解得,不满足题意.综上,若输出的,那么输入的为或 0. 9. B 【解答】如图,分别过点,在平面内作,,连接,,由题易证,均为直角三角形.设正方形 的边长为, 则 , ,∴. 连接,由于是正方形的中心,∴点在上, ∴直线都在平面内,是相交直线.故选. 10. C 【解答】作出 表示的平面区域为如图所示的及其内部, 其中,,, 而的几何意义是可行域内的点到直线 的距离的倍,观察图形并结合计算可知, 点到直线的距离最大. 所以当时,取得最大值.故选. 11. C 【解答】由题意可得=,设右焦点为, 由==知,=,=, 高三·数学(文科) 第 2页(共 6页) 所以=. 由=知,=,即. 在中,由勾股定理,得. 由椭圆定义,得===,从而=,得=, 于是 ==,所以椭圆的方程为.故选. 12. B 【解答】, 易知在上为增函数,且的解为. ∴化为, ∴ 解得或.故选. 二、填空题(本大题共 4 小题,每小题 5 分,共 20 分) 13. (或) 【解答】∵,,,设向量与的夹角为,则,解得,∴.故答案为:. 14. 【解答】由,得, 两式相减,得,即,,∴是公比为的等比数列, 由,得, 所以,故答案为:. 15. 【解答】点,关于直线对称,可得直线为的垂直平分线, 的中点为,的斜率为,所以直线的斜率为, 可得直线的方程为,令,可得, 由题意可得,即有, 由,可得=, 解得=或(舍去).故答案为:. 16. 【解答】由题意,知正四棱锥如图所示,则. 高三·数学(文科) 第 3页(共 6页) 三、解答题(共 70 分) 17. 解:在 中,由正弦定理, 代入,得. ·································································· 1 分 又因为,得, ············································· 2 分 得, ···················································································· 3 分 . ···················································································· 4 分 由余弦定理,得 ···························································· 5 分 . ······························································· 6 分 由可得, ···························································· 7 分 由,得,即, ······················································ 8 分 则, ····································································· 9 分 , ·····································································10 分 故 ········································································11 分 . ····················································································12 分 18. 解:由直方图,得. ···········3 分 ∴. ·····························································································6 分 由直方图可知,新生上学所需时间在[60,100]的频率为, ···········9 分 高三·数学(文科) 第 4页(共 6页) ∴估计全校新生上学所需时间在[60,100]的概率为 0.12. ∴, ··················································································11 分 故估计 800 名新生中有 96 名学生可以申请住宿. ···············································12 分 19. 证明: 在中,因为, 所以为的中点. ················································· 2 分 又因为是的中点,所以. ························· 4 分 又平面,平面, 所以平面. ················································· 6 分 在中,因为,所以. ······· 7 分 又因为,所以. ·································· 8 分 又因为, 所以,即. ························· 9 分 又因为平面,平面, 所以平面. ··················································11 分 又因为平面, 所以平面平面. ·········································12 分 20. 解:若直线与的图象相切,设切点为, , ································································································ 1 分 ∴ ········································································ 2 分 且, ········································································ 3 分 解得, ················································································· 4 分 . ················································································· 5 分 令, ······················································ 6 分 不等式对任意的 恒成立,等价于在上恒成立. ∴, ························································· 7 分 设. 若,则,在上单调递增,又,∴不成 立. ··············································································································· 8 分 若,的图象开口朝下,对称轴为. ①当,即时, , 高三·数学(文科) 第 5页(共 6页) ∴在上, ,∴,又,∴恒成立. ········· 9 分 ②当,即时, , ∴在 上,存在,使 , ∴时,,即; 时,,即. ······················································10 分 ∴,∴不满足恒成立. ·································11 分 综上可知,. ·······················································································12 分 21. 解:设,. 联立 消去,得, ········································································ 1 分 ∴. ·························································································· 2 分 显然直线过抛物线的焦点, ∴. ··········································································· 3 分 设线段的中点坐标为, 则, ······························································· 4 分 则以为直径的圆的方程为. ···································· 5 分 由得, 易得直线,直线, ····················· 6 分 联立 由①,得, 由②,同理可得, 由,得,得, ········· 7 分 联立 得,则,,∴, ,即. ······································· 8 分 ∴, ·········································· 9 分 点到直线的距离, ··················10 分 ∴. ··················· 11 分 显然,当时,的面积最小,最小值为. ········································ 12 分 22. 解:曲线的直角坐标方程为, 即, ················································································· 1 分 故曲线的极坐标方程为, ··················································· 2 分 高三·数学(文科) 第 6页(共 6页) 即. ·························································································· 3 分 因为曲线的极坐标方程为, 即, ····································································· 4 分 故曲线的直角坐标方程为, 即. ····································································· 5 分 直线的极坐标方程化为直角坐标方程,得 , ································· 6 分 由 得 或 ··················································· 7 分 则. ·············································································· 8 分 由 得 或 则. ··············· 9 分 故. ·······························································10 分 23. 解: ························································· 2 分 当时,结合,得; ······················································ 3 分 当时,结合,得; ···································· 4 分 当时,结合,得. 综上,不等式的解集为. ······································· 5 分 ··················································· 6 分. ······························································· 7 分 有解, 等价于, ············································· 8 分 , ············································· 9 分 所以,解得. ·······························································10 分查看更多