S2k?1?S2k?2?a2k?1?2?2?2nkk?1?3?2k?1?2,
∴Sn??12?2,n?2k,?2??k?N?. n?1?2?2,n?2k?1,?3?2②证明(反证法):假设存在三项Sm,Sn,Sp(m,n,p?N?,m?n?p)是等差数列,即
2Sn?Sm?Sp成立。
?n,1p?N)因m,n,p均为偶数,设m?2m1,n?2n1,p?2p1,(m1,1,
∴2?2(2∴2n1?m1?1n1?1)?2(2p1?m1m1?1)?2(2p1?1),即 2?2n1?2m1?2p1,
?1?2,而此等式左边为偶数,右边为奇数,这就矛盾。
?a22k2?r(2)∵a2k?a2k1??r?(a,∴a2k?r?22k2??)r,∴?a2k?r?是首项为1?2r,
k?1公比为2的等比数列,∴a2k?r?(1?2r)?2。
又∵a2k?1?2a2k?2(a2k?1?r),∴a2k?1?2r?2(a2k?1?2r),∴?a2k?1?2r?是首项为
1?2r,公比为2的等比数列,∴a2k?1?2r?(1?2r)?2k?1 。
∴
2ka2k?1a2k?2?(1?2r)?2?2k?1k?1kk?1?2r???(1?2r)?2????r????(1?2r)?2?k?2?r???(1?2r)?2??k?1?r????11????, k?2k?11?2r?(1?2r)?2?r(1?2r)?2?r?2n∴?k?12ka2k?1a2k?21?2rn?k?1??11???? k?2k?1?r(1?2r)?2?r??(1?2r)?2??22411??。 ?????1n?11?2r1?2r?2r1?2r1?2r?(1?2r)?2?r(1?2r)?2?r?241?2rn∵r?0,∴
?4。∴?k?12ka2k?1a2k?4。