题目内容
【题目】在数列{an}中,a1=2,a2=4,且当n≥2时,an2=an-1an+1,
;
(1)求数列{an}的通项公式an;
(2)若bn=(2n-1)an,求数列{bn}的前n项和Sn.
【答案】(1)an=2n; (2)Sn=6+(2n-3)×2n+1.
【解析】
(1)由当n≥2时,an2=an-1an+1可判断数列{an}为等比数列,再结合a1=2,a2=4即可求解;
(2)由(1)得bn=(2n-1)2n,再采用错位相减法即可求得;
(1)∵当n≥2时,an2=an-1an+1,∴数列{an}是等比数列,
又∵a1=2,a2=4,∴公比a=
=2,
∴数列{an}是首项、公比均为2的等比数列,∴其通项公式an=2n;
(2)由(1)可知bn=(2n-1)an=(2n-1)2n,
则Sn=1×2+3×22+5×23+…+(2n-1)×2n,
2Sn=1×22+3×23+…+(2n-3)×2n+(2n-1)×2n+1,
两式相减,得:-Sn=2+2×22+2×23+…+2×2n-(2n-1)×2n+1
=2+2×
-(2n-1)×2n+1=-6-(2n-3)×2n+1,
∴Sn=6+(2n-3)×2n+1.
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