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Bulgaria Contests
Bulgaria National Olympiad
2005 Bulgaria National Olympiad
3
3
Part of
2005 Bulgaria National Olympiad
Problems
(1)
Bulguaria 3
Source: BMO Problem 3
5/15/2005
Let
M
=
(
0
,
1
)
∩
Q
M=(0,1)\cap \mathbb Q
M
=
(
0
,
1
)
∩
Q
. Determine, with proof, whether there exists a subset
A
⊂
M
A\subset M
A
⊂
M
with the property that every number in
M
M
M
can be uniquely written as the sum of finitely many distinct elements of
A
A
A
.
algebra proposed
algebra