1?4?42. ?????????????????则A?,??,B(0,1),?AB?(6分)
333??(Ⅱ)设A(x1,y1),B(x2,y2).
?????????????????OA?OB,?OA?OB=0,即x1x2?y1y2?0,
?x2y2?1,??由?a2b2消去y得(a2?b2)x2?2a2x?a2(1?b2)?0, ?y??x?1,?由?=(?2a2)2?4a2(a2?b2)(1?b2)?0,整理得a2?b2?1, a2(1?b2)2a2又x1?x2?2,x1x2?2,
a?b2a?b2?y1y2?(?x1?1)(?x2?1)?x1x2?(x1+x2)+1, 由x1x2?y1y2?0得2x1x2?(x1?x2)?1?0, 2a2(1?b2)2a2??2?1?0,
a2?b2a?b2 整理得:a2?b2?2a2b2?0,?b2?a2?c2?a2?a2e2,代入上式得 2a2?1?11?12,?a?1??2?1?e21?e2??, ?1211?≤e≤,?≤e2≤, 22421341?≤1?e2≤,?≤≤2, 2431?e271?≤1?≤3, 31?e273 ?≤a2≤,适合条件a2?b2?1,62由此得42642≤a≤,?≤2a≤6, 623故长轴长的最大值为6. ??????????????????????(12分) 22.(本小题满分10分)【选修4—1:几何证明选讲】
(Ⅰ)证明:? AE?21AB,?BE?AB.33 1AC,?AD?BE. 3?在正△ABC中,AD? - 11 -
又?AB?BC,?BAD??CBE,
?△BAD≌△CBE, ??ADB??BEC,
即?ADF??AEF?π,
所以A,E,F,D四点共圆. ???????????????????(5分) (Ⅱ)解:如图5,取AE的中点G,连结GD, 则AG?GE?1AE. 2?AE?2AB, 3图5
12?AG?GE?AB?.
33?AD?12AC?,?DAE?60?, 33?△AGD为正三角形,
2?GD?AG?AD?,3 2即GA?GE?GD?,
3所以点G是△AED外接圆的圆心,且圆G的半径为
2. 32. 3由于A,E,F,D四点共圆,即A,E,F,D四点共圆G,其半径为
???????????????????????????(10分)
23.(本小题满分10分)【选修4—4:坐标系与参数方程】
π??解:(Ⅰ)由点M的极坐标为?42,?,得点M的直角坐标为(4,4),
4??所以直线OM的直角坐标方程为y?x. ??????????????(4分)
??x?1?2cos?,(Ⅱ)由曲线C的参数方程?(?为参数),
??y?2sin?化成普通方程为:(x?1)?y?2, 圆心为A(1,0),半径为r?222.
由于点M在曲线C外,故点M到曲线C上的点的距离最小值为
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????????????????????????(10分) |MA|?r?5?2.
24.(本小题满分10分)【选修4—5:不等式选讲】 解:(Ⅰ)原不等式等价于
331??1??x?,??≤x≤,?x??,或? 或?2222???(2x?1)?(2x?3)≤6??(2x?1)?(2x?3)≤6???(2x?1)?(2x?3)≤6,解之得
3131?x≤2或?≤x≤或?1≤x??, 2222即不等式的解集为{x|?1≤x≤2}. ??????????????????(5分) (Ⅱ)?f(x)?2x?1?2x?3≥(2x?1)?(2x?3)?4,
?a?1?4,解此不等式得a??3或a?5. ??????????????(10分)
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