又m为常数,且m?0,∴
anan?1?m1?mm?n?2?.
∴数列?an?是首项为1,公比为(2)解:由(1)得,q?f?m??∵bn?f?bn?1??bn?11?bn?11?mm的等比数列. ,b1?2a1?2.
1?m1111,∴??1,即??1?n?2?.
bnbn?1bnbn?1?1?1∴??是首项为,公差为1的等差数列.
2?bn?2112n?1∴,即bn?(n?N*). ???n?1??1?2n?1bn22(3)解:由(2)知bn?8分
22n?13,则
2n?1bn?2?2n1?n所以Tn?.
?22b1?23b2?24b3???2nbn?1?2n?1bn,?
即Tn?2?1?2?3?2?5???223412n?1n??2n?3??2??2n?1?, ①
nn?1则2Tn?2?1?2?3?2?5???2??2n?3??2②-①得Tn?2故Tn?2n?1??2n?1?, ②
n?1??2n?1??2?2?2???234n?1,
??2n?1??2?23?1?2?n?11?2?2n?1??2n?3??6
22.解:(1) 因为直线l:y?3?x?2?在x轴上的截距为2,所以a?2
|?23|?2 直线的方程变为3x?y?23?0,由直线与圆相切得?3?所以椭圆方程为
x223?b
???1?4?y23?1
32(2)设直线AE方程为y?k(x?1)?代入
x2,
32?k)?12?0
24?y23?1得:(3?4k)x?4k(3?2k)x?4(3222 设E(xE,yE),F(xF,yF),因为点A(1,)在椭圆上,
32y??kx??k , EE223?4k又直线AF的斜率与AE的斜率互为相反数,
324(?k)?1232y??kx??k 所以直线EF的斜率为同理可得:xF?,FF223?4ky?yE?k(xE?xF)?2k1kEF?F??
xF?xExF?xE24(3?k)?122所以xE?