题目内容

Sn=
1
2
+
1
6
+
1
12
+…+
1
n(n+1)
, 且 SnSn+1=
3
4
,则n的值为______.
由于
1
n(n+1)
=
1
n
-
1
n+1

Sn=
1
2
+
1
6
+…+
1
n(n+1)
=1-
1
2
+
1
2
-
1
3
+…+
1
n
-
1
n+1

=1-
1
n+1
=
n
n+1

SnSn+1=
n
n+1
n+1
n+2
=
n
n+2
=
3
4

∴n=6
故答案为:6
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相关题目
Sn=
1
2
+
1
6
+
1
12
+…+
1
n(n+1)
,若SnSn+1=
3
4
,则n的值为(  )
A、6B、7C、8D、9
Sn=
1
2
+
1
6
+
1
12
+…+
1
n(n+1)
, 且 SnSn+1=
3
4
,则n的值为
6
6
Sn=
1
2
+
1
6
+
1
12
+…+
1
n(n+1)
(n∈N*),且Sn+1Sn+2=
3
4
,则n的值是
5
5
Sn=
1
2
+
1
6
+
1
12
+…+
1
n2+n
,且SnSn+1 =
3
4
,则n=
6
6
(2006•嘉定区二模)设Sn=
1
2
+
1
6
+
1
12
+…+
1
n(n+1)
,且Sn•Sn+1=
3
4
,则n的值是(  )

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