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1、2011高考数学解答题专题训练之数列2011高考数学解答题专题训练 之数列 aaaS,,6,10S1、记等差数列的前n项和为,已知. n244na(?)求数列的通项公式; nn*bba,2T(N)n,(?)令,求数列的前n项和. nnnn解:(?)设等差数列的公差为d,由, aaS,,6,10a,244n246ad,,1ad,,23a,1,11可得 ,即, 解得, ,43,,d,1410ad,,235ad,,11,2an,?,故所求等差数列的通项公式为 aaandnn,,,,,11(1),,nnn1nnban,22(?)依题意, nn231nn,,,,,122232(1)22nnTbbb,,?
2、 nn122341nn,2T,122232(1)22,,,,nn, n2311nnn,,,,,Tn(22222)2? nn212,,n1,2n 12,n,1,(1)22n n,1Tn,,(1)22?. nSapnn,4an2、设数列的前n项和为,且,其中p是不为零的常数( Sn,an(1)证明:数列是等比数列; ,*1bbanNnnn,,,,()bnb1,2(2)当p=3时,若数列满足,求数列的通项公式( bn,,* ,(1)证:因为S=4a p(nN),则S= 4a p(nNn2),所以当n2时,,nnn 1 n 1 4aSSaa,44,整理得 aa,nnnnn,11nn,13pn,1aaa
3、,4 由S=4a p,令,得,解得( a,nn1113p4 所以是首项为,公比为的等比数列( a,n334n,1(2)解:因为a=1,则, a,()1n34n,1babn,,,(1,2,) 由,得 , bb,()nnn,1nn,13,当n2时,由累加得 b,b,(b,b),(b,b),?,(b,b) n12132nn,14n,1,1()4n,13 ,, ,,23()143,13当n = 1时,上式也成立( n,14, 因此数列的通项公式为 bnb,31,n3,*3、已知数列满足:aaa,,2,且aa,1,2,( anN,nnn,1212nbaa,(?)设,证明:数列是等比数列; b,nnn,1
4、n(?)求的通项公式( a,naaa,,2解:(?),即 nnn,121aaaaaaaa,22 ,nnnnnnnn,21121121baa,1即,又, bb,121nn,121故数列是首项为1,公比为的等比数列( b,n2n,11,(?)根据(?)知, b,n,2,n,2n,301111,aa,即; aaaa,aa,32,nn,1,nn,12,212222,n,1把上面个式子相加得: n,11,1,nn,23,1112, aa,,,,,,,1n1,1222,,12n,1521,即 a,n,332,Sna4、已知数列的各项均为正数,前项和为,且 nnaa(1),nn Sn,.N,n2a (1)求
5、证:数列是等差数列; n1bTbbbT,,求,. (2)设 nnnn12S2naa(1),nnSnn,1,N当时解:(1) n,22,2Saa,,aa(1),,nnn2211Sa,?,1,,,22()aSSaaaa ,11111nnnnnnn,222Saa,,,nnn,111,,,,,()(1)0,0aaaaaa, nnnnnn,111a?,aan1,2(),所以数列是等差数列 nn,1nnn(1)11,(2)由(1)得 anSb,所以nnn22(1)Snn,n111?,,,,Tbbb nn12,,nn1223(1)11111,,,,,12231nn,1 ,1n,1n,n,11a,a,aa5、
6、已知等比数列中,分别是某等差数列的第5项、第3项、第2项,且a,234n12公比 q,1.a(1)求数列的通项公式; n2n,5时,aS,1.bbb,loga,S(2)已知数列满足是数列的前n项和,求证:当 nnnnnnn12aaaa,2()解:(1)由已知得,从而得 233422q,3q,1,0 11n解得(舍去),所以 q,或q,1a,().4221(1)nn,n2log()2(1),.(2)? b,n,S,nn,aS,n1nnnn222n2,n(n,1)(n,5.)?所证不等式等价于: 用数学归纳法证明如下: ?当n=5时,因为左边=32,右边=30,所以不等式成 立; k2,k(k,1
7、), ?假设时不等式成立,即则 n,k(k,5)k,12,(k,1)(k,2).两边同乘以2得 这说明当n=k+1时也不等式成立。 nn,5时2,n(n,1)由?知,当成立。 n,5时,aS,1 因此,当成立。 nn,aS,6、在数列中,为其前n项和,若点a,SSn,1在直线x+y=0上, a,1nnnnn,11,a(1) 求数列的通项公式; nn2TT(2) 设,其前n项和为,求 b,nnnSn,a,SS解:(1)点在直线x+y=0上, ?nnn,1?a,SS,0, nnn,1n,2a,S,S,nnn1?当时,,?S,S,SS,0,nn1nn1,11?,1,1 ?,S,SSnnn1n,111
8、?,1d,1,为等差数列,首项,,公差,SSan11,11,?,,n,1d,n,SSn111当时,naSS, 2,nnn,1nn,11,1n, ?,a;n,11,2n,nn,1,n2n?b,n,2,?b,(2), nnSn?T,b,b,b,?,bn123n23n,2,2,2,3,2,n,2,234nn,1?2T,2,2,2,3,2,?,n,1,2,n,2,n,23nn,1 ?T,2T,2,2,2,?,2,n,2,nnn2,1,2,n,1?,T,n,2,n1,2n,1,?T,1,n,2,2n,aba,2bS7、已知数列满足,21,1aaaba,,,,设数列的前n项和为,令nnn1nnnnn,1n
9、TSS, ( nnn2b(?)求数列的通项公式; n,TTnN,()(?)求证:( nn1,解:(?)由得 得整理得 从而有 ,1是首项为1,公差为1的等差数列, ?,bn,11 ?,?,nb,nbnn11(?)证明: S, ,1,.,nn2nSn8、设数列a的前项和为,已知babS,21 ,,nnnnn,1b,2an,2(?)证明:当时,是等比数列; ,n(?)求a的通项公式. ,nn解:由题意知a,2,且; babS,21,1nnn,1 babS,21,nn,11n两式相减得 ,即 baaba,21,11nnnnaba,,2 ? ,1nn nb,2aa,,22(?)当时,由?知于是 ,1nn,nnnanan,,,,,,,122212,1nn n,1,22an,n n,1n,1a,1210,所以是首项为1,公比为2的等比数列。 又an,2,1nn,1nn,11b,2an,22(?)当时,由(?)知,即 an,,12,nnb,2 当时,由?得 11nnn,11 aba,,,222nn,1,bb221b,nn ,ba22,ba,nn,b22,b, 21,b,11,nnn,1因此 aba,b,22nn,1,2,bbb22,,从而21n,a,1nnn,1,2222,,bbn,,,2,b,
