①?n∈N*,an≠0;
②点Pn(an,Sn)在函数f(x)=
的图象上;(I)求数列{an}的通项an及前n项和Sn;
(II)求证:0≤|Pn+1Pn+2|-|PnPn+1|<1.在线课程(I)解:由题意
,当n≥2时an=Sn-Sn-1=
,整理,得(an+an-1)(an-an-1-1)=0,
又?n∈N*,an≠0,所以an+an-1=0或an-an-1-1=0,
当an+an-1=0时,a1=1,
,得
,
;当an-an-1-1=0时,a1=1,an-an-1=1,
得an=n,
.(II)证明:当an+an-1=0时,
,|Pn+1Pn+2|=|PnPn+1|=
,所以|Pn+1Pn+2|-|PnPn+1|=0,当an-an-1-1=0时,
,|Pn+1Pn+2|=
,|PnPn+1|=
,|Pn+1Pn+2|-|PnPn+1|=
-
=

=
,因为
>n+2,
>n+1,所以0<
<1,综上0≤|Pn+1Pn+2|-|PnPn+1|<1.
分析:(I)由题意
,当n≥2时an=Sn-Sn-1,由此可得两递推式,分情况可判断数列{an}为等比数列或等差数列,从而可求得通项an,进而求得Sn;(II)分情况讨论:当当an+an-1=0时,
,计算可得|Pn+1Pn+2|=|PnPn+1|=
,从而易得|Pn+1Pn+2|-|PnPn+1|的值;当an-an-1-1=0时,
,利用两点间距离公式可求得|Pn+1Pn+2|,|PnPn+1|,对|Pn+1Pn+2|-|PnPn+1|化简后,再放缩即可证明结论;点评:本题考查数列与函数的综合,考查分类讨论思想,解决本题的关键是利用an与Sn的关系先求得an.