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Contests
National and Regional Contests
Spain Contests
Spain Mathematical Olympiad
2004 Spain Mathematical Olympiad
2004 Spain Mathematical Olympiad
Part of
Spain Mathematical Olympiad
Subcontests
(6)
Problem 6
1
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National Spain Olympiad 2004, Problem 6
We put, forming a circumference of a circle,
2004
{2004}
2004
bicolored files: white on one side of the file and black on the other. A movement consists in choosing a file with the black side upwards and flipping three files: the one chosen, the one to its right, and the one to its left. Suppose that initially there was only one file with its black side upwards. Is it possible, repeating the movement previously described, to get all of the files to have their white sides upwards? And if we were to have
2003
{2003}
2003
files, between which exactly one file began with the black side upwards?
Problem 5
1
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National Spain Olympiad 2004, Problem 5
Demonstrate that the condition necessary so that, in triangle
A
B
C
{ABC}
A
BC
, the median from
B
{B}
B
is divided into three equal parts by the inscribed circumference of a circle is:
A
/
5
=
B
/
10
=
C
/
13
{A/5 = B/10 = C/13}
A
/5
=
B
/10
=
C
/13
.
Problem 4
1
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National Spain Olympiad 2004, Problem 4
Does there exist such a power of
2
{2}
2
, that when written in the decimal system its digits are all different than zero and it is possible to reorder the other digits to form another power of
2
{2}
2
? Justify your answer.
Problem 3
1
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National Spain Olympiad 2004, Problem 3
Represent for
Z
\mathbb {Z}
Z
the set of all integers. Find all of the functions
f
:
{f:}
f
:
Z
→
Z
\mathbb{Z} \rightarrow \mathbb{Z}
Z
→
Z
such that for any
x
,
y
{x,y}
x
,
y
integers, they satisfy:
f
(
x
+
f
(
y
)
)
=
f
(
x
)
−
y
.
{f(x + f(y)) = f(x) - y.}
f
(
x
+
f
(
y
))
=
f
(
x
)
−
y
.
Problem 2
1
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National Spain Olympiad 2004, Problem 2
A
B
C
D
{ABCD}
A
BC
D
is a quadrilateral,
P
{P}
P
and
Q
{Q}
Q
are midpoints of the diagonals
B
D
{BD}
B
D
and
A
C
{AC}
A
C
, respectively. The lines parallel to the diagonals originating from
P
{P}
P
and
Q
{Q}
Q
intersect in the point
O
{O}
O
. If we join the four midpoints of the sides,
X
{X}
X
,
Y
{Y}
Y
,
Z
{Z}
Z
, and
T
{T}
T
, to
O
{O}
O
, we form four quadrilaterals:
O
X
B
Y
{OXBY}
OXB
Y
,
O
Y
C
Z
{OYCZ}
O
Y
CZ
,
O
Z
D
T
{OZDT}
OZ
D
T
, and
O
T
A
X
{OTAX}
OT
A
X
. Prove that the four newly formed quadrilaterals have the same areas.
Problem 1
1
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National Spain Olympiad 2004, Problem 1
We have a set of
221
{221}
221
real numbers whose sum is
110721
{110721}
110721
. It is deemed that the numbers form a rectangular table such that every row as well as the first and last columns are arithmetic progressions of more than one element. Prove that the sum of the elements in the four corners is equal to
2004
{2004}
2004
.