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Rioplatense Mathematical Olympiad, Level 3
1996 Rioplatense Mathematical Olympiad, Level 3
1996 Rioplatense Mathematical Olympiad, Level 3
Part of
Rioplatense Mathematical Olympiad, Level 3
Subcontests
(6)
2
1
Hide problems
4x4 magic square
A magic square is a table https://cdn.artofproblemsolving.com/attachments/7/9/3b1e2b2f5d2d4c486f57c4ad68b66f7d7e56dd.png in which all the natural numbers from
1
1
1
to
16
16
16
appear and such that:
∙
\bullet
∙
all rows have the same sum
s
s
s
.
∙
\bullet
∙
all columns have the same sum
s
s
s
.
∙
\bullet
∙
both diagonals have the same sum
s
s
s
. It is known that
a
22
=
1
a_{22} = 1
a
22
=
1
and
a
24
=
2
a_{24} = 2
a
24
=
2
. Calculate
a
44
a_{44}
a
44
.
6
1
Hide problems
f(xy) = f(x) + f(y) + kf(m_{xy}) where m_{xy}= gcd (x,y)
Find all integers
k
k
k
for which, there is a function
f
:
N
→
Z
f: N \to Z
f
:
N
→
Z
that satisfies: (i)
f
(
1995
)
=
1996
f(1995) = 1996
f
(
1995
)
=
1996
(ii)
f
(
x
y
)
=
f
(
x
)
+
f
(
y
)
+
k
f
(
m
x
y
)
f(xy) = f(x) + f(y) + kf(m_{xy})
f
(
x
y
)
=
f
(
x
)
+
f
(
y
)
+
k
f
(
m
x
y
)
for all natural numbers
x
,
y
x, y
x
,
y
,where
m
x
y
m_{xy}
m
x
y
denotes the greatest common divisor of the numbers
x
,
y
x, y
x
,
y
.Clarification:
N
=
{
1
,
2
,
3
,
.
.
.
}
N = \{1,2,3,...\}
N
=
{
1
,
2
,
3
,
...
}
and
Z
=
{
.
.
.
−
2
,
−
1
,
0
,
1
,
2
,
.
.
.
}
Z = \{...-2,-1,0,1,2,...\}
Z
=
{
...
−
2
,
−
1
,
0
,
1
,
2
,
...
}
.
5
1
Hide problems
Battleship revisited with 3 colors in n x 4 board
There is a board with
n
n
n
rows and
4
4
4
columns, and white, yellow and light blue chips. Player
A
A
A
places four tokens on the first row of the board and covers them so Player
B
B
B
doesn't know them. How should player
B
B
B
do to fill the minimum number of rows with chips that will ensure that in any of the rows he will have at least three hits?Clarification: A hit by player
B
B
B
occurs when he places a token of the same color and in the same column as
A
A
A
.
3
1
Hide problems
x^2 + y^2 + z^2 if x^2=2 + y , y^2=2 + z , z^2=2 + x
The real numbers
x
,
y
,
z
x, y, z
x
,
y
,
z
, distinct in pairs satisfy
{
x
2
=
2
+
y
y
2
=
2
+
z
z
2
=
2
+
x
.
\begin{cases} x^2=2 + y \\ y^2=2 + z \\ z^2=2 + x.\end{cases}
⎩
⎨
⎧
x
2
=
2
+
y
y
2
=
2
+
z
z
2
=
2
+
x
.
Find the possible values of
x
2
+
y
2
+
z
2
x^2 + y^2 + z^2
x
2
+
y
2
+
z
2
.
1
1
Hide problems
2 circles of family of circles with dictance of centers <=R\sqrt3
Given a family
C
C
C
of circles of the same radius
R
R
R
, which completely covers the plane (that is, every point in the plane belongs to at least one circle of the family), prove that there exist two circles of the family such that the distance between their centers is less than or equal to
R
3
R\sqrt3
R
3
.
4
1
Hide problems
rioplatense locus with circle, diameter, secant
Let
S
S
S
be the circle of center
O
O
O
and radius
R
R
R
, and let
A
,
A
′
A, A'
A
,
A
′
be two diametrically opposite points in
S
S
S
. Let
P
P
P
be the midpoint of
O
A
′
OA'
O
A
′
and
ℓ
\ell
ℓ
a line passing through
P
P
P
, different from
A
A
′
AA '
A
A
′
and from the perpendicular on
A
A
′
AA '
A
A
′
. Let
B
B
B
and
C
C
C
be the intersection points of
ℓ
\ell
ℓ
with
S
S
S
and let
M
M
M
be the midpoint of
B
C
BC
BC
. a) Let
H
H
H
be the foot of the altitude from
A
A
A
in the triangle
A
B
C
ABC
A
BC
. Let
D
D
D
be the intersection point of the line
A
′
M
A'M
A
′
M
with
A
H
AH
A
H
. Determine the locus of point
D
D
D
while
ℓ
\ell
ℓ
varies . b) Line
A
M
AM
A
M
intersects
O
D
OD
O
D
at
I
I
I
. Prove that
2
O
I
=
I
D
2 OI = ID
2
O
I
=
I
D
and determine the locus of point
I
I
I
while
ℓ
\ell
ℓ
varies .