发布时间 : 星期四 文章山西省太原市2018届高三模拟考试(一)数学(理)试卷(含答案)更新完毕开始阅读
所以x0e0?x0?1?x0e0?e0?1,
xx即e0?x0?2?0.令h?x??e?x?2,h??x??e?1?0,所以h?x?单增.又因为
xxxxh?0???1?0,h?1??e?1?0,所以,存在唯一实数x0,使得ex?x0?2?0,且x0??0,1?.所
0以只存在唯一实数a,使①②成立,即存在唯一实数a使得y?f?x?和y?g?x?相切. (2)令f?x??g?x?,即a?x?1???ax?1?e,所以a?x?x??x?1???1, ex?ex?x?2x?1令m?x??x?x,则m??x??,由(1)可知,m?x?在???,x0?上单减,在?x0,???exe单增,且x0??0,1?,故当x?0时,m?x??m?0??1,当x?1时,m?x??m?1??1,
当a?0时,因为要求整数解,所以m?x?在x?Z时,m?x??1,所以am?x??1有无穷多整数解,舍去;
1?m2????11?a当0?a?1时,m?x??,又?1,m?0??m?1??1,所以两个整数解为0,1,即?,
1aa?m??1???a??e2?e2,1?, 所以a?2,即a??22e?1?2e?1?当a?1时,m?x??11,因为?1,m?x?在x?Z内大于或等于1, aa?e2?1a?,1所以m?x??无整数解,舍去,综上,?2e2?1?.
a??22.考点:参数方程极坐标方程和直角坐标方程的互化,直线的参数方程中t的几何意义.
??x?a?2t解:(1)C1的参数方程?,消参得普通方程为x?y?a?1?0,
??y?1?2tC2的极坐标方程为rcos2q?4cosq?r?0两边同乘r得r2cos2q?4rcosq?r2?0即y2?4x;
??x?a??(2)将曲线C1的参数方程标准化为??y?1???12t?2t?1?4a?0,由D??222t2(t为参数,a??R)代入曲线C2:y2?4x得2t21?14a??0,得a?0, 2??2?4?设A,B对应的参数为t1,t2,由题意得t1?2t2即t1?2t2或t1??2t2,
?t1?2t2?1当t1?2t2时,?t1?t2?22,解得a?,
36?tt?2?1?4a??12?t1??2t2?9当t1??2t2时,?t1?t2?22解得a?,
4?tt?2?1?4a??12综上:a?19或. 36423.考点:绝对值不等式
解:(1)当m??1时,f?x??x?1?2x?1, ①x?1时,f?x??3x?2?2,解得1?x?②当
4; 311?x?1时,f?x??x?2,解得?x?1; 2211③当x?时,f?x??2?3x?2,解得0?x?;
22综合①②③可知,原不等式的解集为?x|0?x???4??. 3??3???(2)由题意可知f?x??2x?1在?,2?上恒成立,当x??,2?时,
44?3???f?x??x?m?2x?1?x?m?2x?1?2x?1?2x?1,从而可得x?m?2,即
?2?x?m?2??2?x?m?2?x,且??2?x?max??11?11?,?2?x?min?0,因此m???,0?. 4?4?