发布时间 : 星期一 文章(衡水金卷)2018年普通高等学校招生全国统一考试模拟数学试题二 文更新完毕开始阅读03e9b8a8ec630b1c59eef8c75fbfc77da26997d9
哈哈哈哈哈哈哈哈你好好啊所以PA??x1?1,y1?,PB??x2?1,y2?, 所以PA?PB??x1?1,y1???x2?1,y2? ?x1x2??x1?x2??1?y1y2
??my1?1??my2?1???my1?1?my2?1??1?4
?m2y1y2?2m?y1?y2? ??4m2?8m2?4m2?2.
21.解:(1)当a??1时,f?x??lnx?x2?x,f??x??1x?2x?1,所以f?1??ln1?1?1?0,f??1??1?2?1?2. 所以曲线f?x?在x?1处的切线方程为y?2?x?1?, 即2x?y?2?0.
(2)由题得,f??x??12x2?ax?1x?2x?a?x?x?0?.
因为x1,x2是导函数f??x?的两个零点, 所以x1,x2是方程ax2?ax?1?0的两根, 故x1?x2??a2?0,x11x2?2. 令g?x??2x2?ax?1, 因为a????,?3?,
所以g??1?a?3?2???2?0,g?1??3?a?0, 所以x?1?1???0,2??,x2??1,???,
且ax221??2x1?1,ax2??2x2?1, 所以f?x1??f?x2??lnx1x??x22?ax2?x11?x2??1?ax2????x21?x2?ln,2x2又因为x111x2?2,所以x1?2x,
2所以f?x??f?x1212??x21?4x2?ln?2x2?,x1??1,???,
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哈哈哈哈哈哈哈哈你好好啊令t?2x22??2,???,h?t??f?x1??f?x2??t12?2t?lnt. 111?t?1?2因为h??t??2?2t2?t?2t2?0, 所以h?t?在区间?2,???内单调递增, 所以h?t??h?2??34?ln2, 即f?x1??f?x2??34?ln2. 22.解:(1)由题知,将曲线C1的参数方程消去参数t, 可得曲线C1的普通方程为2x?y?1?0. 由??22cos????4?????,
得?2?2??cos???sin??.
将?2?x2?y2,?cos??x,?sin??y代入上式, 得x2?y2?2x?2y, 即?x?1?2??y?1?2?2.
故曲线C222的直角坐标方程为?x?1???y?1??2. (2)由(1)知,圆C2的圆心为?1,1?,半径R?2, 因为圆心到直线C2?1?11的距离d?22?12?255?2, 所以曲线C1,C2相交,
2所以相交弦长为2R2?d2?2?2?2???25???230. ?5???523.解:(1)当x??2时,不等式转化为??2x?1???x?2??0,解得x??2;当?2?x?12时,不等式转化为??2x?1???x?2??0,解得?2?x??13; 当x?12 时,不等式转化为?2x?1???x?2??0,解得x?3. 10
哈哈哈哈哈哈哈哈你好好啊综上所述,不等式f?x??0的解集为?xx??13或x?3?.
????x?3,x??2,(2)由(1)得,f?x?????3x?1,?2?x?1,?2
??1?x?3,x?2,作出其函数图象如图所示:
令y?x?m,
若对任意的x??m,???,都有f?x??x?m成立,
即函数f?x?的图象在直线y?x?m的下方或在直线y?x?m上. 当m??2时,?m?3?0,无解; 当?2?m?12时,?3m?1?0,解得?113?m?2; 当m?12时,m?3?0,解得12?m?3. 综上可知,当?13?m?3时满足条件,
故实数m的取值范围是????1?3,3??.
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