(b2n?1?22n?1)?bn?1?2n?bn?2n?1 ?n?1nn2(b?2)(b2n?1?bn?1?2n)?(bn?2n?1?22n?1)bn?1?n?1?1. ?22n?1(bn?2n)
21.解:(1)kAB?y'|x?p0?(x)|x?p0?直线AB的方程为y?121p0, 212111p0?p0(x?p0),即y?p0x?p02, 4224?q?11p0p?p02,方程x2?px?q?0的判别式??p2?4q?(p?p0)2, 24两根x1,2?p?|p0?p|p0p?或p?0,
222p?p0?0,?|p???|p0p|?||p|?|0||,又0?|p|?|p0|, 22p0ppppp|?|p|?|0|?|0|,得?|p?0|?||p|?|0||?|0|, 222222p0|. 2??(p,q)?|2(2)由a?4b?0知点M(a,b)在抛物线L的下方,
①当a?0,b?0时,作图可知,若M(a,b)?X,则p1?p2?0,得|p1|?|p2|; 若|p1|?|p2|,显然有点M(a,b)?X; ?M(a,b)?X?|p1|?|p2|. ②当a?0,b?0时,点M(a,b)在第二象限,
作图可知,若M(a,b)?X,则p1?0?p2,且|p1|?|p2|; 若|p1|?|p2|,显然有点M(a,b)?X;
?M(a,b)?X?|p1|?|p2|.
根据曲线的对称性可知,当a?0时,M(a,b)?X?|p1|?|p2|, 综上所述,M(a,b)?X?|p1|?|p2|(*);
由(1)知点M在直线EF上,方程x?ax?b?0的两根x1,2?同理点M在直线E'F'上,方程x?ax?b?0的两根x1,2?22p1p或a?1, 22p2p或a?2, 22 11
若?(a,b)?|p1pppp|,则|1|不比|a?1|、|2|、|a?2|小, 22222
?|p1|?|p2|,又|p1|?|p2|?M(a,b)?X,
??(a,b)?|??(a,b)?|p1p|?M(a,b)?X;又由(1)知,M(a,b)?X??(a,b)?|1|; 22p1|?M(a,b)?X,综合(*)式,得证. 215(x?1)2?得交点(0,?1),(2,1),可知0?p?2, 44(3)联立y?x?1,y?12x0?q112?x0, 过点(p,q)作抛物线L的切线,设切点为(x0,x0),则44x0?p2得x02?2px0?4q?0,解得x0?p?又q?p2?4q,
15(p?1)2?,即p2?4q?4?2p, 44115 ?x0?p?4?2p,设4?2p?t,?x0??t2?t?2??(t?1)2?,
222?max?|x055|max,又x0?,??max?;
242p2?4p?4?p?|p?2|?2,
q?p?1,?x0?p???max?|x0|min?1. 2
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