Q点轨迹方程C为:y2?4x 4分 (2)设P(-1,y0),当y0?0时,kPA??y0?y?,PA中点坐标是?0,0?,PA中垂线方程:2?2?y0222,联立抛物线方程y2?4x得y?2y0y?y0?0,有??0 y?x?y02说明直线l与曲线C始终相切。
当y0?0时时,Q(0,0),l是y轴,与曲线C相切。 8分
x2y220.解:(1)因为椭圆E: 2?2?1(a,b>0)过M(2,2) ,N(6,1)两点,
ab2?4?11??1?222???a2?8x2y2?ab?a8??1所以?解得?所以?2椭圆E的方程为 84 4分?b?4?6?1?1?1?1222??4?ab?b(2)设A?x1y1? B?x2y2?,由题意得:d?41?k2?26,k?5 2分 3?y?5x?41624?22x?x??5,xx?联立?x2,有 化简得11x?165x?24?0y12121111??1?4?8x1x2?y1y2?x1x2???5x?4??15x2?4?6x1x2?45(x1?x2)?16=
?320144??16?0 ?OA?OB 2分 1111c25121.()1?2?,?a?2b,设?AOF??BOF??,则tan??,故tan?AOB?tan2?a42????AB4????????????2tan?4 ??,即?????,令OA?3m(m?0),则AB?4m,OB?5m21?tan?3OA3????????????????????????满足OA?OB?2AB,?OA,AB,OB依次成等差数列 6
x2(2)已知c=5,?a?4,b=1,双曲线方程为?y2?14设直线AB的斜率为k,则k=tan?BFO=tan?AFO=cot?=2222?lABx2:y?2(x?5),代入?y2?1得15x2?325x?84?042 6分
(325)2?4?15?844?弦CD的长度CD?1?k?153251144设O到CD距离为d,则d=?2,?S?OCD?CD?d???2?22335??51522. 解(1)由已知得椭圆C的左顶点A(-2,0),上顶点D(0,1),得a?2,b?1
x2?y2?1 2分 故椭圆方程:4(2)直线AS的斜率k显然存在,且大于0,故设直线AS:y?k(x?2),得M(1016k,) 33?y?k(x?2)?由?x2得1?4k2x2?16k2x?16k2?4?0 2分 2?y?1??4??16k2?42?8k2设S(x1,y1),则(?2)x1?,得x1?,221?4k1?4k
4k2?8k24k从而y1?,即S(,)2221?4k1?4k1?4k1(x?2) B(2,0),直线BS:y??4k1?y??(x?2)?16k1?101?4k,,得N,?MN?????1033k?33k??x?3?k?0,MN?16k116k1818??2??,当且仅当k?时,线段MN长度最小值是 33k33k343(3)k?142?64? ,直线BS的方程为:x?y?2?0.S?,??BS?45?55?12,则点T1,T2到BS的距离等于, 2分 54椭圆上有两点使三角形面积为
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设直线T1T2:x?y?t?0,由t?22?235,得t1??或t2?? 422?x22?y?1?3当t1??,联立?4得5x2?12x?5?0,检验??44?0.适合
2?x?y?32??x22??y?15t1??,联立?4得5x2?20x?21?0,检验???20?0.舍去
2?x?y?52?3综上所述,直线T1T2在y轴上的截距是 4分
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