题目内容
已知数列{an}满足an+2+an=2an+1(n∈N+),且a3+a5=14,a4+a6=18
(1)求数列{an}的通项公式an;
(2)令bn=an(
)n,求数列{bn}的前n项和Sn.
(1)求数列{an}的通项公式an;
(2)令bn=an(
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| 2 |
(1)∵数列{an}满足an+2+an=2an+1(n∈N+),
∴数列{an}是等差数列,
∵a3+a5=14,a4+a6=18,
∴
,
解得a1=1,d=2,
∴an=2n-1.
(2)∵an=2n-1,
∴bn=an(
)n=(2n-1)•(
)n,
∴数列{bn}的前n项和
Sn=1×
+3×(
)2+5×(
)3+…+(2n-1)×(
)n,①
∴
Sn=1×(
)2+3×(
)3+5×(
)4+…+(2n-1)×(
)n+1,②
①-②,得
Sn=
+2×(
)2+2×(
)3+2×(
)4+…+2×(
)n-(2n-1)×(
)n+1
=
+2×[(
)2+(
)3+(
)4+…+(
)n]-(2n-1)×(
)n+1
=
+2×
-(2n-1)×(
)n+1
=
+1-(
)n-1-(2n-1)×(
)n+1,
∴Sn=3-(
)n-2-(2n-1)(
)n.
∴数列{an}是等差数列,
∵a3+a5=14,a4+a6=18,
∴
|
解得a1=1,d=2,
∴an=2n-1.
(2)∵an=2n-1,
∴bn=an(
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∴数列{bn}的前n项和
Sn=1×
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∴
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①-②,得
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=
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=
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| ||||
1-
|
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=
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∴Sn=3-(
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