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CIIM
2015 CIIM
Problem 6
Problem 6
Part of
2015 CIIM
Problems
(1)
CIIM 2015 Problem 6
Source:
8/9/2016
Show that there exists a real
C
>
1
C > 1
C
>
1
that satisfy the following property: if
n
>
1
n > 1
n
>
1
and
a
0
<
a
1
<
⋯
<
a
n
a_0 < a_1 < \cdots < a_n
a
0
<
a
1
<
⋯
<
a
n
are positive integers such that
1
a
0
,
1
a
1
,
…
,
1
a
n
\frac{1}{a_0},\frac{1}{a_1},\dots,\frac{1}{a_n}
a
0
1
,
a
1
1
,
…
,
a
n
1
are in arithmetic progression, then
a
0
>
C
n
.
a_0 > C^n.
a
0
>
C
n
.
CIIM 2015
undergraduate
arithmetic sequence