题目内容
已知数列{an}满足a1=1,an+1=
,记bn=a2n,n∈N*.
(1)求a2,a3;
(2)求数列{bn}的通项公式;
(3)求S2n+1.
|
(1)求a2,a3;
(2)求数列{bn}的通项公式;
(3)求S2n+1.
(1)当n=2时,a2=
a1+1=
+1=
;
当n=3时,a3=a2-2×2=
-4=-
.
(2)当n≥2时,bn=a2n=a(2n-1)+1=
a2n-1+(2n-1)
=
[a2n-2-2(2n-2)]+(2n-1)=
a2(n-1)+1=
bn-1+1
∴bn-2=
(bn-1-2),又b1-2=a2-2=-
,
∴bn-2=-
•(
)n-1=-(
)n,即bn=2-(
)n.
(3)∵a2n+1=a2n-4n=bn-4n
∴S2n+1=a1+a2+…+a2n+a2n+1
=(a2+a4+…+a2n)+(a1+a3+a5+…+a2n+1)
=(b1+b2+…+bn)+[a1+(b1-4×1)+(b2-4×2)+…+(bn-4×n)]
=a1+2(b1+b2+…+bn)-4×(1+2+…+n)
=1+2(2n-
)-4×
=(
)n-1-2n2+2n-1.
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当n=3时,a3=a2-2×2=
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(2)当n≥2时,bn=a2n=a(2n-1)+1=
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=
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∴bn-2=
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∴bn-2=-
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(3)∵a2n+1=a2n-4n=bn-4n
∴S2n+1=a1+a2+…+a2n+a2n+1
=(a2+a4+…+a2n)+(a1+a3+a5+…+a2n+1)
=(b1+b2+…+bn)+[a1+(b1-4×1)+(b2-4×2)+…+(bn-4×n)]
=a1+2(b1+b2+…+bn)-4×(1+2+…+n)
=1+2(2n-
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1-
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| n(n+1) |
| 2 |
=(
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