题目内容
数列{an}的前n项和为Sn,且a1=1,an+1=
Sn,n∈N*,则a2+a3=
;an=
.
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分析:数列{an}中,a1=1,an+1=
Sn,n∈N*,分别今n=1,2,3,分别求出a2=
,a3=
×
,a4=
×(
)2,由此猜想an=
×(
)n-2,n≥2.再用数学归纳法证明,由此能求出结果.
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解答:解:∵数列{an}中,a1=1,an+1=
Sn,n∈N*,
∴a2=
a1=
,
a3=
(1+
)=
×
,
a4=
(1+
+
)=
×(
)2,
由此猜想an=
×(
)n-2,n≥2.
用数学归纳法证明:
①当n=2时,a2=
×(
)2-2=
,成立;
②假设n=k时,成立,即ak=
×(
)k-2,
则当n=k+1时,
ak+1=
[1+
+
×
+…+
×(
)k-2]
=
[1+
(1+
+…+(
)k-2]
=
[1+
×
]
=
×(
)k-1,也成立.
故an=
.
∴a2+a3=
+
×
=
,an=
.
故答案为:
,
.
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∴a2=
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| 1 |
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a3=
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a4=
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由此猜想an=
| 1 |
| 3 |
| 4 |
| 3 |
用数学归纳法证明:
①当n=2时,a2=
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| 3 |
| 1 |
| 3 |
②假设n=k时,成立,即ak=
| 1 |
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| 3 |
则当n=k+1时,
ak+1=
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| 1 |
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| 3 |
| 1 |
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=
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=
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1×(1-(
| ||
1-
|
=
| 1 |
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故an=
|
∴a2+a3=
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| 3 |
| 1 |
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| 4 |
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|
故答案为:
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点评:本题考查数列的通项公式的求法,解题时要认真审题,注意递推公式的合理运用,合理地运算数学归纳法进行解题.
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