题目内容
2.在数列{an},{bn}中,已知a1=2,b1=4,且-an,bn,an+1成等差数列,-bn,an,bn+1也成等差数列.(Ⅰ)求证:数列{an+bn}和{an-bn}都是等比数列,并求数列{an}的通项公式;
(Ⅱ)若cn=(an-3n)log3[an-(-1)n],求数列{cn}的前n项和Tn.
分析 (I)-an,bn,an+1成等差数列,-bn,an,bn+1也成等差数列.可得bn=$\frac{{a}_{n+1}-{a}_{n}}{2}$,an=$\frac{{b}_{n+1}-{b}_{n}}{2}$,an+bn=$\frac{1}{2}$[(an+1+bn+1)-(an+bn)],即an+1+bn+1=3(an+bn),即可证明数列{an+bn}是首项、公比均为3的等比数列.同理可得:数列{bn-an}是首项为1、公比均为-1的等比数列.可得an=$\frac{({b}_{n}+{a}_{n})-({b}_{n}-{a}_{n})}{2}$.
(II)cn=(2an-3n)log3[2an-(-1)n]=(-1)n•n,利用“错位相减法”与等比数列的求和公式即可得出.
解答 (I)证明:∵-an,bn,an+1成等差数列,-bn,an,bn+1也成等差数列.
∴bn=$\frac{{a}_{n+1}-{a}_{n}}{2}$,an=$\frac{{b}_{n+1}-{b}_{n}}{2}$,
∴an+bn=$\frac{1}{2}$[(an+1+bn+1)-(an+bn)],即an+1+bn+1=3(an+bn),
又∵a1+b1=1+2=3,∴数列{an+bn}是首项、公比均为3的等比数列;
同理可得:-an+bn=$\frac{1}{2}$[(an+1-bn+1)+(-an+bn)],即an+1-bn+1=-(an-bn),
又∵-a1+b1=-1+2=1,
∴数列{bn-an}是首项为1、公比均为-1的等比数列,
∴bn-an=(-1)n+1,
又∵bn+an=3n,
∴an=$\frac{({b}_{n}+{a}_{n})-({b}_{n}-{a}_{n})}{2}$=$\frac{1}{2}$[3n-(-1)n+1];
(II)解:∵cn=(2an-3n)log3[2an-(-1)n]
=[3n-(-1)n+1-3n]log3[3n-(-1)n+1-(-1)n]
=(-1)n•n,
∴Tn=-1+2-3+4-…+(-1)n•n,
-Tn=1-2+3-4+…+(-1)n•(n-1)+(-1)n+1•n,
两式相减得:2Tn=-1+1-1+1-…-1-(-1)n+1•n,
∴Tn=$\frac{1}{2}${$\frac{-[1-(-1)^{n}]}{1-(-1)}$+(-1)n•n}.
点评 本题考查了“错位相减法”、等差数列与等比数列的通项公式与求和公式,考查了推理能力与计算能力,属于难题.
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