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x2xx21.【解析】(Ⅰ)f?x??e?ax,g?x??f??x??e?2ax,g??x??e?2a,
当a?0时,g??x??0恒成立,g?x?无极值; 当a?0时,g??x??0,解得x?ln?2a?,
由g??x??0,得x?ln?2a?;由g??x??0,得x?ln?2a?, 所以当x?ln?2a?时,有极小值2a?2aln?2a?.
(Ⅱ)令h?x??e?ax?x?1?x?0?,则h??x??e?1?2ax?x?0?,注意到
x2xh?0??h??0??0,
解法一:h???x??e?2a?x?0?,
x①当a?1x时,由x?0,得h???x??e?2a?0,即h??x?在[0,??)上单调递增, 2所以x?0时,h??x??h??0??0,从而h?x?在[0,??)上单调递增, 所以x?0时,h?x??h?0??0,即f?x??x?1恒成立. ②当a?递减,
所以0?x?ln?2a?时,h??x??h??0??0,从而h?x?在[0,ln(2a))上单调递减, 所以0?x?ln?2a?时,h?x??h?0??0,即f?x??x?1不成立. 综上,a的取值范围为(??,].
解法二:令k?x??e?1?x,则k??x??e?1,由k??x??0,得x?0;k??x??0,得
xx1x时,由h???x??e?2a?0解得0?x?ln?2a?,即h??x?在[0,ln(2a))上单调212x?0,
x∴k?x??k?0??0,即e?1?x恒成立,
故h??x??x?2ax?(1?2a)x, 当a?1时,1?2a?0,于是x?0时,h??x??0,h?x?在[0,??)上单调递增, 2所以h?x??h?0??0,即f?x??x?1成立.
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当a?1x?x时,由e?1?x?x?0?可得e?1?x?x?0?. 2h?(x)?ex?1?2a(e?x?1)?e?x(ex?1)(e?x?2a),
故当x?(0,ln(2a))时,h??x??0,
于是当x?(0,ln(2a))时,h?x?单调递减,h?x??h?0??0, f?x??x?1不成立. 综上,a的取值范围为(??,].
1222.【解析】(Ⅰ)由??x?2?2cos?2消去参数?可得C1普通方程为?x?2??y2?4,
?y?2sin??x2?y2??2∵??4sin?,∴??4?sin?,由?,
y??sin??2得曲线C2的直角坐标方程为x?(y?2)?4;
22(Ⅱ)由(Ⅰ)得曲线C1:(x?2)?y?4,其极坐标方程为??4cos?,
22由题意设A(?1,?),B(?2,?),则|AB|?|?1??2|?4|sin??cos?|
?42|sin(??)?42,
4∴sin(??∴????4)??1,
?k?(k?Z),∵0????,∴??3?. 4?4??223.【解析】(Ⅰ)原不等式为:|2x?3|?|2x?1|?5, 能正确分成以下三类:
373时,原不等式可转化为?4x?2?5,即??x??; 2423131当??x?时,原不等式可转化为4?5恒成立,所以??x?;
2222113当x?时,原不等式可转化为4x?2?5,即?x?.
22473所以原不等式的解集为{x|??x?}.
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3??4x?2,x???2?31?(Ⅱ)由已知函数f(x)??4,??x?,可得函数y?f?x?的最小值为4,
22?1?4x?2,x??2?由f?x??|m?1|的解集非空得:|m?1|?4. 解得m?5或m??3.
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