题目内容

lim
n→∞
[n(1-
1
3
)(1-
1
4
)(1-
1
5
)…(1-
1
n+2
)]等于______.
lim
n→∞
[n(1-
1
3
)(1-
1
4
)(1-
1
5
)…(1-
1
n+2
)]
=
lim
n→∞
(n×
2
3
×
3
4
×…×
n+1
n+2
)
=
lim
n→∞
2n
n+2

=2.
故答案为:2.
练习册系列答案
相关题目
lim
n→∞
[n•(1-
1
2
)(1-
1
3
)…(1-
1
n+1
)]n=
1
e
1
e
lim
n→∞
[n(1-
1
3
)(1-
1
4
)(1-
1
5
)…(1-
1
n+2
)]等于
2
2
(2009•卢湾区一模)计算:
lim
n→∞
(n+1)(1-3n)
(2-n)(n2+n+1)
=
0
0
已知数列{an}中a1=
3
5
an=2-
1
an-1
(n≥2,n∈N+),数列{bn},满足bn=
1
an-1
(n∈N+
(1)求证数列{bn}是等差数列;
(2)求数列{an}中的最大项与最小项,并说明理由;
(3)记Sn=b1+b2+…+bn,求
lim
n→∞
(n-1)bn
Sn+1

违法和不良信息举报电话:027-86699610 举报邮箱:58377363@163.com

精英家教网