【答案】(1)m+r=0�����;(2)見解析�;(3)1.
【解析】試題分析:(1)由a3=a1,得m+r=0�����,再證m+r=0滿足題意即可��;
(2)依題意�����,a2n+1=a2n+r=2a2n-1+r,則a2n+1+r=2(a2n-1+r)��,當(dāng)m+r≠0時(shí)�����,{a2n+1+r}是等比數(shù)列���,由題意可得p=r���,q=2r,若m+r=0�����,則不存在實(shí)數(shù)p�,q,使得{a2n+1+p}與{a2n+q}是等比數(shù)列���;
(3)當(dāng)m=r=1時(shí)�,由(2)可得a2n-1=2n-1���,a2n=2n+1-2�����,由分組求和得
試題解析:
(1)由題意得a1=m����,a2=2a1=2m�,a3=a2+r=2m+r,
由a3=a1�����,得m+r=0.
當(dāng)m+r=0時(shí)�,因?yàn)?/span>an+1=
(k∈N*),
所以a1=a3=…=m����,a2=a4=…=2m,故對任意的n∈N*����,數(shù)列{an}都滿足an+2=an. 當(dāng)n=2k時(shí),Sn=3(2k+1-k-2)��,再由
的單調(diào)性求最小值即可得λ≤
,當(dāng)n=2k-1時(shí)��,Sn=S2k-a2k=2k+2-3k-4���,再由
的單調(diào)性求最小值即可得λ≤
���,從而得解.
即當(dāng)實(shí)數(shù)m,r滿足m+r=0時(shí)����,符合題意.
(2)存在.依題意,a2n+1=a2n+r=2a2n-1+r��,
則a2n+1+r=2(a2n-1+r)����,
因?yàn)?/span>a1+r=m+r,
所以當(dāng)m+r≠0時(shí)����,{a2n+1+r}是等比數(shù)列,且a2n+1+r=(a1+r)2n=(m+r)2n.
為使{a2n+1+p}是等比數(shù)列�,則p=r.
同理,當(dāng)m+r≠0時(shí)��,a2n+2r=(m+r)2n,{a2n+2r}是等比數(shù)列�,欲使{a2n+q}是等比數(shù)列��,則q=2r.
綜上所述��,
①若m+r=0����,則不存在實(shí)數(shù)p,q��,使得{a2n+1+p}與{a2n+q}是等比數(shù)列���;
②若m+r≠0���,則當(dāng)p,q滿足q=2p=2r時(shí)�����,{a2n+1+p}與{a2n+q}是同一個等比數(shù)列.
(3)當(dāng)m=r=1時(shí)��,由(2)可得a2n-1=2n-1��,a2n=2n+1-2,
當(dāng)n=2k時(shí)�����,an=a2k=2k+1-2���,
Sn=S2k=(21+22+…+2k)+(22+23+…+2k+1)-3k
=3(2k+1-k-2)����,所以
=3
.
令ck=
���,
則ck+1-ck=
-=
<0��,
所以≥
�����,即λ≤.
當(dāng)n=2k-1時(shí)��,an=a2k-1=2k-1��,
Sn=S2k-a2k=3(2k+1-k-2)-(2k+1-2)=2k+2-3k-4���,
所以=4-
�����,同理可得≥1�,即λ≤1.
綜上所述�,實(shí)數(shù)λ的最大值為1.
