问题
解答题
在数列{an}中,已知a1=
(1)求数列{an}的通项公式; (2)求证:数列{bn}是等差数列; (3)设数列{cn}满足cn=an+bn,求{cn}的前n项和Sn. |
答案
(1)在数列{an}中,∵a1=
,1 4
=an+1 an
,bn+2=3log1 4
an(n∈N*),1 4
∴数列{an}是首项为
,公比为1 4
的等比数列,1 4
∴an=(
)n,n∈N*.1 4
(2)∵bn+2=3log
an,1 4
∴bn=3log
(1 4
)n-2=3n-2.1 4
∴b1=1,bn+1-bn=3,
∴数列{bn}是首项为b1=1,公差d=3的等差数列.
(3)由(1)知an=(
)n,bn=3n-2,1 4
∴cn=an+bn=(
)n+3n-2,1 4
∴Sn=1+
+4+(1 4
)2+7+(1 4
)3+…+(3n-5)+(1 4
)n-1+(3n-2)+(1 4
)n1 4
=[1+4+7+…+(3n-5)+(3n-2)]+[
+(1 4
)2+(1 4
)3+…+(1 4
)n]1 4
=
+n(1+3n-2) 2
[1-(1 4
)n]1 4 1- 1 4
=
+3n2-n 2
-1 3
•(1 3
)n.1 4