2019秋高三文数参考答案及评分细则
一、选择题:本大题共12小题,每小题5分,共60分.
1.答案:C,注意是求z的共轭复数.
2.答案:D,集合,故
3.答案:B,列举后容易知道,基本事件总数有10种,恰有2件检测过该成分含量的事件共有3种,所以所求概率为
4.答案:B,
5.答案:D,如下图,所围成的图形的面积,
6.答案:B,易知即
7.答案:C,①l不变,有l∥α且l⊥βα⊥β;②m不变,有m∥α且α⊥βm⊥β;③n不变,有α∥β且n⊥αn⊥β;分析知①,③正确.
8.答案:A,
9.答案:C,由对数运算的性质知,,所以l=n,又为增函数,时,,所以m>l,所以有
10答案:C,(1)错,(2)(3)(4)对
11.答案:A,假设C为钝角,则,,显然充分性不成立,又由可知,即,此时有,即A为钝角或B为钝角,从而△ABC为钝角三角形,必要性成立
12.答案:D,由知,令,则所以有
,即的图像关于直线对称.当时,;当时,。作出的图像可知,当时,有两个零点.
二、填空题(本大题共4小题,每小题5分,共20分)
13.答案:
14答案:
15. 答案:,
解析:由题意有:
故最小正周期为,最小值为.
16. 答案:
解析:设每天生产A药品x吨,B药品y吨,利润,则有作出可行域知,z在点处取得最大值.
三、解答题:本大题共6小题,共70
分。解答应写出必要的文字说明。证明过程或者演算步骤。第17-21题为必考题,每个试题考生必须作答,第22,23题为选考题,考生根据要求作答。
(一)必考题:共60分
17.解:(I)由直方图可知,用户所用流量在区间内的频率依次是0.1,0.15,0.2,0.25,0.15,········································································································3分
所以该月所用流量不超过3GB的用户占85%,所用流量不超过2GB的用户占45%,故k至少定为3;
·····································································································································6分
(II)由所用流量的频率分布图及题意,用户该月的人均流量费用估计为:
2×1×0.1+2×1.5×0.15+2×2×0.2+2×2.5×0.25+3×2×0.15+(3×2+0.5×4)×0.05+(3×2+1×4)×0.05+(3×2+1.5×4)×0.05=5.1元······················································································12分
18.解:(I)设等差数列的公差为d,因为,所以
又,所以d=2,即,································ ··································3分
设正项等比数列的公比为q,因为即,由,知,所以·················································································································6分
(II)······················································································8分
设,则
····································································································································12分
19. 解:(I)证明:如图,由直三棱柱知,··············································2分
又M为BC的中点知AM⊥BC,又,所以·······································4分
又AMÌ平面AMN,所以平面AMN⊥平面B1BCC1·······································································6分
(II)如图:设AB的中点为D,连接A1D,CD.因为△ABC是正三角形,所以CD⊥AB.由直三棱柱知CD⊥AA1.所以CD⊥平面A1ABB1,所以∠CA1D为直线A1C与平面A1ABB1所成的角.即∠CA1D=30°,···8分
所以A1C=2CD=2×=,所以A1D=6,在Rt△AA1D中,AA1=,NC=·······························································································10分
三棱锥的体积即为三棱锥的体积,所以V=···································································12分
20.解:(I)由,,知,··································2分
由kOM=知······································································································4分
所以,,所以e=.·································································6分
(II)证明:由N是AC的中点知,点N,所以,···············································8分
又,所以·····················································10分
由(I)知,即,所以=0,
即MN⊥AB. ····················································································································12分
21.解:(I)易知切线的斜率为2,即,又,所以a=1; ················· ·············4分
(II)设,
当时,.又所以存在,使得.······················································································································6分
又
··························································································8分
所以当时,
,
当[2,)时,即时,为增函数,所以时,方程在内存在唯一的根. ···············································································································12分
(二)选考题:共10分.请考生在第22,23题中任选一题作答,如果多做,则按所做的第一题计分.
22.解: (I)由知所以所以⊙C的直角坐标方程为··········································································································5分
(II)由(I)知⊙C的标准方程为,即圆心,设P点坐标为,则,所以当t=0时,|PC|有最小值,此时P点坐标为(6,0).·····························································································································10分
23.解:(I)由知,所以即;······························5分
(II)依题意知:
····························································8分
当且仅当即时等号成立,
所以所求式子的最大值为.··························································································10分
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