题目内容

已知等差数列{an}的首项a1=3,公差d≠0,其前n项和为Sn,且a1,a4,a13成等比数列.
(Ⅰ)求数列{an}的通项公式;
(Ⅱ)证明:
1
S1
+
1
S2
+…
1
Sn
3
4
分析:(Ⅰ)由已知条件列式求出等差数列的公差,然后直接代入等差数列的通项公式求解;
(Ⅱ)求出等差数列的前n项和,然后利用裂项相消法证明
1
S1
+
1
  S2
+…
1
Sn
3
4
解答:解:由a1,a4,a13成等比数列,得a42=a1a13
(a1+3d)2=a1(a1+12d),所以a12+6a1d+9d2=a12+12a1d
9d2=6a1d,a1=
3
2
d
.则d=
2
3
a1=
2
3
×3=2

(Ⅰ)an=a1+(n-1)d=3+2(n-1)=2n+1;
(Ⅱ)Sn=na1+
n(n-1)d
2
=3n+n2-n=n(n+2)

1
Sn
=
1
n(n+2)
=
1
2
(
1
n
-
1
n+2
)

所以
1
S1
+
1
  S2
+…
1
Sn
=
1
2
(1-
1
3
+
1
2
-
1
4
+
1
3
-
1
5
+…+
1
n-1
-
1
n+1
+
1
n
-
1
n+2
)

=
1
2
(1+
1
2
-
1
n+1
-
1
n+2
)=
3
4
-
1
2(n+1)
-
1
2(n+2)
3
4
点评:本题考查了等差数列和等比数列的通项公式,考查了等差数列的前n项和公式,训练了利用裂项相消法求数列的和,考查了利用放缩法证明不等式,是中档题.
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