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China Northern MO
2022 China Northern MO
3
3
Part of
2022 China Northern MO
Problems
(1)
a_{n+1}=a_n+ \frac{n^2}{a_n}, b_n =a_n-n
Source: China Northern MO 2022 p3 CNMO
4/6/2024
Let
{
a
n
}
\{a_n\}
{
a
n
}
be a sequence of positive terms such that
a
n
+
1
=
a
n
+
n
2
a
n
a_{n+1}=a_n+ \frac{n^2}{a_n}
a
n
+
1
=
a
n
+
a
n
n
2
. Let
b
n
=
a
n
−
n
b_n =a_n-n
b
n
=
a
n
−
n
. (1) Are there infinitely many
n
n
n
such that
b
n
≥
0
b_n \ge 0
b
n
≥
0
? (2) Prove that there is a positive number
M
M
M
such that
∑
n
=
3
∞
b
n
n
+
1
<
M
\sum^{\infty}_{n=3} \frac{b_n}{n+1}<M
∑
n
=
3
∞
n
+
1
b
n
<
M
.
algebra
inequalities
recurrence relation