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International Contests
IMO Longlists
1979 IMO Longlists
81
81
Part of
1979 IMO Longlists
Problems
(1)
Rectangular parallelepipeds with at least one integer side
Source: ILL 1979 - Problem 81.
6/5/2011
Let
Π
\Pi
Π
be the set of rectangular parallelepipeds that have at least one edge of integer length. If a rectangular parallelepiped
P
0
P_0
P
0
can be decomposed into parallelepipeds
P
1
,
P
2
,
.
.
.
,
P
N
∈
Π
P_1,P_2, . . . ,P_N\in \Pi
P
1
,
P
2
,
...
,
P
N
∈
Π
, prove that
P
0
∈
Π
P_0\in \Pi
P
0
∈
Π
.
geometry unsolved
geometry