【答案】
(1)證明:∵數(shù)列{an}滿足:a1=t�,a2=s且an+an+1=an+b對(duì)于n∈N*恒成立����,
∴an+1=an+b﹣an�,
an+2=a(n+1)+b﹣an+1=(an+a+b)﹣(an+b)+an=a+an���,
∴an+2﹣an=a,
∴數(shù)列{an}是“弱等差數(shù)列”.
∵a1=t����,a2=s�,an+2﹣an=a,
∴{an}中奇數(shù)項(xiàng)是以t為首項(xiàng)�,以a為公差的等差數(shù)列,偶數(shù)列是以s為首項(xiàng)����,以a為公差的等差數(shù)列�����,
∴an= 
(2)解:∵當(dāng)t=1��,s=3時(shí)�����,數(shù)列{an}是等差數(shù)列����,
∴a1=1,a2=3���,3+a3=2a+b�����,
∴a3=2a+b﹣3�����,2a+b﹣3+a4=3a+b�,∴a4=a+3,
∴ 
��,解得a=4����,b=0,
∴數(shù)列{an}是首項(xiàng)為2��,公差為2的等差數(shù)列,
∴Sn=2n+ 
=n2+n
(3)解:∵s>t����,且數(shù)列{an}是單調(diào)遞增數(shù)列���,
∴a2k+1﹣a2k=(t+ka)﹣[s+(k﹣1)a]=t﹣s+a>0��,
∴a>s﹣t.
∴a的取值范圍是(s﹣t��,+∞)
【解析】(1)由已知得an+2=a(n+1)+b﹣an+1=(an+a+b)﹣(an+b)+an=a+an �, 由此能證明數(shù)列{an}是“弱等差數(shù)列”.由a1=t�,a2=s,an+2﹣an=a���,得到{an}中奇數(shù)項(xiàng)是以t為首項(xiàng)��,以a為公差的等差數(shù)列�����,偶數(shù)列是以s為首項(xiàng)���,以a為公差的等差數(shù)列��,由此能求出數(shù)列{an}的通項(xiàng)公式.(2)由遞推公式求出a1=1�,a2=3�,a3=2a+b﹣3,a4=a+3�,由此利用等差數(shù)列性質(zhì)能求出a=4,b=0���,從而得到數(shù)列{an}是首項(xiàng)為2���,公差為2的等差數(shù)列,由此能求了Sn . (3)由已知得a2k+1﹣a2k=(t+ka)﹣[s+(k﹣1)a]=t﹣s+a>0��,由經(jīng)能求出a的取值范圍.
【考點(diǎn)精析】解答此題的關(guān)鍵在于理解數(shù)列的前n項(xiàng)和的相關(guān)知識(shí)���,掌握數(shù)列{an}的前n項(xiàng)和sn與通項(xiàng)an的關(guān)系
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