(2)?h(x)?x2?x?a在(0,1单调递减;(1单调递增 2)2,??)单调递减;(1单调递增 ?f(x)?x2?mlnx也应在(0,12)2,??)2x?m, f'(x)?2x?mx?x2当m?0时,f(x)?x2?mlnx在(0,??)单调递增,不满足条件. 所以当m?0且
21.(本小题满分14分)
x2(1)椭圆C的方程为2?y2?1.
4(2)由题意,可设直线l为:x?my?1.
?3??3?331,,Q1,?取m?0,得R?,直线的方程是y?x?, AR???1?2???263????m21?12即m?2.
直线A2Q的方程是y?3x?3,交点为S14,3. 2???3??3?1,?,Q1,若R?,由对称性可知交点为S24,?3. ???????2??2??若点S在同一条直线上,则直线只能为?:x?4.
②以下证明对于任意的m,直线A1R与直线A2Q的交点S均在直线?:x?4上.事
???x22??y2?1实上,由?4,得?my?1??4y2?4,即?m2?4?y2?2my?3?0,
?x?my?1??2m?3,y1y2?2记R?x1,y1?,Q?x2,y2?,则y1?y2?2. m?4m?4yy6y1设A1R与?交于点S0(4,y0),由0?1,得y0?.
4?2x1?2x1?2y?y22y2,得y0??设A2Q与?交于点S0?(4,y0?),由0?.
4?2x2?2x2?26y?my2?1??2y2?my1?3?4my1y2?6?y1?y2?6y12y2 ?y0?y0????1?x1?2x2?2x?2x?2x?2x?2?1??2??1??2??12m?12m?22m?4m?4?0,∴y?y?,即S与S?重合, ?0000?x1?2??x2?2?这说明,当m变化时,点S恒在定直线?:x?4上.
?3??3?解法二:(Ⅰ)同解法一.(Ⅱ)取m?0,得R??1,2??,Q??1,?2??,直线A1R的方
????333x?,直线A2Q的方程是y?x?3,交点为S14,3. 63211?83?取m?1,得R?,?,Q?0,?1?,直线A1R的方程是y?x?,直线A2Q的方程是
63?55?程是y???第 6 页 共 7 页
1x?1,交点为S2?4,1?.∴若交点S在同一条直线上,则直线只能为?:x?4. 2以下证明对于任意的m,直线A1R与直线A2Q的交点S均在直线?:x?4上. y??x22??y2?1事实上,由?4,得?my?1??4y2?4,即?m2?4?y2?2my?3?0,
?x?my?1??2m?3,y1y2?2记R?x1,y1?,Q?x2,y2?,则y1?y2?2. m?4m?4yyA1R的方程是y?1?x?2?,A2Q的方程是y?2?x?2?,
x1?2x2?2yy消去y,得1?x?2??2?x?2?…………………………………… ①
x1?2x2?2以下用分析法证明x?4时,①式恒成立。
6y12y2要证明①式恒成立,只需证明?,
x1?2x2?2即证3y1?my2?1??y2?my1?3?,即证2my1y2?3?y1?y2?.……………… ②
?6m?6m??0,∴②式恒成立. m2?4m2?4这说明,当m变化时,点S恒在定直线?:x?4上.
?x22??y2?1解法三:(Ⅰ)同解法一.(Ⅱ)由?4,得?my?1??4y2?4,即
?x?my?1?∵2my1y2?3?y1?y2???m2?4?y2?2my?3?0.
记R?x1,y1?,Q?x2,y2?,则y1?y2??2m?3,yy?. 12m2?4m2?4yyA1R的方程是y?1?x?2?,A2Q的方程是y?2?x?2?,
x1?2x2?2y1?y??x?2?,?x1?2yy?由?得1?x?2??2?x?2?,
x2?2?y?y2?x?2?,x1?2?x2?2?y?x?2??y1?x2?2?y?my1?3??y1?my2?1?即x?2?21 ?2?2y2?x1?2??y1?x2?2?y2?my1?3??y1?my2?1??3??2m?2m?2?3?2?y1??y12my1y2?3y2?y1m?4?m?4??2??4 . ?2???2m?3y2?y13?2?y1??y1?m?4?这说明,当m变化时,点S恒在定直线?:x?4上.
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