【答案】
(1)解:①∵an+1=|p﹣an|+2an+p��,
∴a2=|1﹣a1|+2a1+1=2﹣2+1=1��,
a3=|1﹣a2|+2a2+1=0+2+1=3,
a4=|1﹣a3|+2a3+1=2+6+1=9��,
②∵a2=1����,an+1=|1﹣an|+2an+1��,
∴當(dāng)n≥2時(shí),an≥1��,
當(dāng)n≥2時(shí)�,an+1=﹣1+an+2an+1=3an,即從第二項(xiàng)起����,數(shù)列{an}是以1為首項(xiàng),以3為公比的等比數(shù)列�,
∴數(shù)列{an}的前n項(xiàng)和Sn=a1+a2+a3+a4+…+an=﹣1+ 
= 
﹣ 
,(n≥2)�����,
顯然當(dāng)n=1時(shí)�,上式也成立��,
∴Sn= ﹣
(2)解:∵an+1﹣an=|p﹣an|+an+p≥p﹣an+an+p=2p>0,
∴an+1>an�����,即{an}單調(diào)遞增.
(i)當(dāng) 
≥1時(shí)��,有a1≥p�,于是an≥a1≥p,
∴an+1=|p﹣an|+2an+p=an﹣p+2an+p=3an����,∴ 
.
若數(shù)列{an}中存在三項(xiàng)ar��,as�����,at(r�,s����,t∈N*����,r<s<t)依次成等差數(shù)列�,則有2as=ar+at,
即2×3s﹣1=3r﹣1+3t﹣1.(*)
∵s≤t﹣1�,∴2×3s﹣1= 
<3t﹣1<3r﹣1+3t﹣1.因此(*)不成立.因此此時(shí)數(shù)列{an}中不存在三項(xiàng)ar,as�,at(r,s�,t∈N*,r<s<t)依次成等差數(shù)列.
(ii)當(dāng) 
時(shí)�,有﹣p<a1<p.此時(shí)a2=|P﹣a1|+2a1+p=p﹣a1+2a1+p=a1+2p>p.
于是當(dāng)n≥2時(shí),an≥a2>p.從而an+1=|p﹣an|+2an+p=an﹣p+2an+p=3an.∴an=3n﹣2a2=3n﹣2(a1+2p)(n≥2).
若數(shù)列{an}中存在三項(xiàng)ar��,as�,at(r,s��,t∈N*���,r<s<t)依次成等差數(shù)列���,則有2as=ar+at,
同(i)可知:r=1.于是有2×3s﹣2(a1+2p)=a1+3t﹣2(a1+2p)��,∵2≤S≤t﹣1,∴ 
=2×3s﹣2﹣3t﹣2= 
﹣ 
<0.∵2×3s﹣2﹣3t﹣2是整數(shù)��,∴ ≤﹣1.于是a1≤﹣a1﹣2p�,即a1≤﹣p.與﹣p<a1<p矛盾.
故此時(shí)數(shù)列{an}中不存在三項(xiàng)ar,as���,at(r���,s�,t∈N*,r<s<t)依次成等差數(shù)列.
(iii)當(dāng) ≤﹣1時(shí)�����,有a1≤﹣p<p.a(chǎn)1+p≤0.
于是a2=|P﹣a1|+2a1+p=p﹣a1+2a1+p=a1+2p.
a3=|p﹣a2|+2a2+p=|a1+p|+2a1+5p.=﹣a1﹣p+2a1+5p=a1+4p.
此時(shí)數(shù)列{an}中存在三項(xiàng)a1����,a2,a3依次成等差數(shù)列.
綜上可得: ≤﹣1
【解析】(1)①an+1=|p﹣an|+2an+p���,可得a2=|1﹣a1|+2a1+1=2﹣2+1=1����,同理可得a3=3,a4=9.②a2=1��,an+1=|1﹣an|+2an+1�,當(dāng)n≥2時(shí),an≥1���,當(dāng)n≥2時(shí)�,an+1=﹣1+an+2an+1=3an ���, 即從第二項(xiàng)起��,數(shù)列{an}是以1為首項(xiàng)�����,以3為公比的等比數(shù)列��,利用等比數(shù)列的求和公式即可得出Sn . (2)an+1﹣an=|p﹣an|+an+p≥p﹣an+an+p=2p>0����,可得an+1>an �, 即{an}單調(diào)遞增.(i)當(dāng) ≥1時(shí),有a1≥p,于是an≥a1≥p����,可得an+1=|p﹣an|+2an+p=an﹣p+2an+p=3an , .利用反證法即可得出不存在.(ii)當(dāng) 時(shí)��,有﹣p<a1<p.此時(shí)a2=|P﹣a1|+2a1+p=p﹣a1+2a1+p=a1+2p>p.于是當(dāng)n≥2時(shí)����,an≥a2>p.從而an+1=|p﹣an|+2an+p=an﹣p+2an+p=3an . an=3n﹣2a2=3n﹣2(a1+2p)(n≥2).假設(shè)存在2as=ar+at , 同(i)可知:r=1.得出矛盾�,因此不存在.(iii)當(dāng) ≤﹣1時(shí),有a1≤﹣p<p.a(chǎn)1+p≤0.于是a2=|P﹣a1|+2a1+p=p﹣a1+2a1+p=a1+2p.a(chǎn)3=a1+4p.即可得出結(jié)論.
【考點(diǎn)精析】本題主要考查了數(shù)列的前n項(xiàng)和和數(shù)列的通項(xiàng)公式的相關(guān)知識(shí)點(diǎn)���,需要掌握數(shù)列{an}的前n項(xiàng)和sn與通項(xiàng)an的關(guān)系
��;如果數(shù)列an的第n項(xiàng)與n之間的關(guān)系可以用一個(gè)公式表示,那么這個(gè)公式就叫這個(gè)數(shù)列的通項(xiàng)公式才能正確解答此題.
