题目内容
6.已知数列{an}满足an+1=$\left\{\begin{array}{l}{2{a}_{n},n为偶数}\\{{a}_{n}+1,n为奇数}\end{array}\right.$,a1=1,若bn=a2n-1+2(bn≠0)(1)求a4,并证明数列{bn}是等比数列;
(2)令cn=n•a2n-1,求数列{cn}的前n项和Tn.
分析 (1)由数列{an}满足an+1=$\left\{\begin{array}{l}{2{a}_{n},n为偶数}\\{{a}_{n}+1,n为奇数}\end{array}\right.$,a1=1,分别令n=1,2,3,即可得出a4.由bn=a2n-1+2(bn≠0),可得bn+1=a2n+1+2,化为bn+1=2bn,即可证明.
(2)由(1)知:bn=3•2n-1,可得a2n-1=3•2n-1-2,且cn=n•a2n-1=3n•2n-1-2n,利用“错位相减法”、等差数列与等比数列的前n项和公式即可得出.
解答 解:(1)∵数列{an}满足an+1=$\left\{\begin{array}{l}{2{a}_{n},n为偶数}\\{{a}_{n}+1,n为奇数}\end{array}\right.$,a1=1,∴a2=a1+1=2,a3=2a2=4,a4=a3+1=5.
∵bn=a2n-1+2(bn≠0),
∴bn+1=a2n+1+2=2a2n+2=2(a2n-1+1)+2=2(bn-2+1)+2,化为bn+1=2bn,
∴数列{bn}是等比数列,首项为b1=a1+2=3,公比为2;
(2)由(1)知:bn=3•2n-1,∴a2n-1=3•2n-1-2
且cn=n•a2n-1=3n•2n-1-2n,
令Sn=1+2•21+…+n•2n-1,①
2Sn=2+2•22+…+n•2n,②
①-②得:-Sn=1+2+22+…+2n-1-n•2n=(1-n)•2n-1,
∴Sn=(n-1)•2n+1.
故Tn=3Sn-$2×\frac{n(n+1)}{2}$=3(n-1)×2n-n2-n.
点评 本题考查了递推式的应用、“错位相减法”、等差数列与等比数列的通项公式及其前n项和公式,考查了推理能力与计算能力,属于中档题.
