(理)已知數(shù)列{an}的各項(xiàng)均為正數(shù),Sn為其前n項(xiàng)和,對(duì)于任意n∈N*,滿足關(guān)系Sn=2an-2.

(1)求數(shù)列{an}的通項(xiàng)公式;

(2)設(shè)數(shù)列{bn}的前n項(xiàng)和為T(mén)n,且bn=,求證:對(duì)任意正整數(shù)n,總有Tn<2;

(3)在正數(shù)數(shù)列{cn}中,設(shè)(cn)n+1=an+1(n∈N*),求數(shù)列{lncn}中的最大項(xiàng).

(文)已知數(shù)列{xn}滿足xn+1-xn=()n,n∈N*,且x1=1.設(shè)an=xn,且T2n=a1+2a2+3a3+…+ (2n-1)a2n-1+2na2n.

(1)求xn的表達(dá)式;

(2)求T2n;

(3)若Qn=1(n∈N*),試比較9T2n與Qn的大小,并說(shuō)明理由.

(理)(1)解:∵Sn=2an-2(n∈N*),                                               ①

∴Sn-1=2an-1-2(n≥2,n∈N*).                                               ② 

①-②,得an=2an-2an-1(n≥2,n∈N*).

∵an≠0,∴=2(n≥2,n∈N*),

即數(shù)列{an}是等比數(shù)列.                                                      

∵a1=S1,

∴a1=2a1-2,即a1=2.

∴an=2n(n∈N*).                                                          

(2)證明:∵對(duì)任意正整數(shù)n,總有bn=,                         

∴Tn=

=1+1<2.                                 

(3)解:由(cn)n+1=an+1(n∈N*),知lncn=.

令f(x)=,則f′(x)=.

∵在區(qū)間(0,e)上,f′(x)>0,在區(qū)間(e,+∞)上,f′(x)<0,

∴在區(qū)間(e,+∞)上f(x)為單調(diào)遞減函數(shù).                                         

∴n≥2且n∈N*時(shí),{lncn}是遞減數(shù)列.

又lnc1<lnc2,∴數(shù)列{lncn}中的最大項(xiàng)為lnc2=ln3.                             

(文)解:(1)∵xn+1-xn=()n,

∴xn=x1+(x2-x1)+(x3-x2)+…+(xn-xn-1)

=1+()+()2+…+()n-1

=

=.                                                          

當(dāng)n=1時(shí)上式也成立,

∴xn=(n∈N*).                                                

(2)an=.

∵T2n=a1+2a2+3a3+…+(2n-1)a2n-1+2na2n

=()2+2()3+3()4+…+(2n-1)()2n+2n()2n+1,                        ①

T2n=()3+2()4+3()5+…+(2n-1)()2n+1+2n()2n+2.              ②

①-②,得T2n=()2+()3+…+()2n+1-2n()2n+2.                       

T2n=-2n()2n+2

=.

∴T2n=.                             

(3)由(2)可得9T2n=.

又Qn=,

當(dāng)n=1時(shí),22n=4,(2n+1)2=9,∴9T2n<Qn;                                        

當(dāng)n=2時(shí),22n=16,(2n+1)2=25,∴9T2n<Qn;                                      

當(dāng)n≥3時(shí),22n=[(1+1)n2=()2>(2n+1)2,

∴9T2n>Qn.

綜上所述,當(dāng)n=1,2時(shí),9T2n<Qn;當(dāng)n≥3時(shí),9T2n>Qn.


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