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National and Regional Contests
Turkey Contests
Turkey Team Selection Test
2017 Turkey Team Selection Test
2017 Turkey Team Selection Test
Part of
Turkey Team Selection Test
Subcontests
(9)
8
1
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Turkey TST 2017 P8
In a triangle
A
B
C
ABC
A
BC
the bisectors through vertices
B
B
B
and
C
C
C
meet the sides
[
A
C
]
\left [ AC \right ]
[
A
C
]
and
[
A
B
]
\left [ AB \right ]
[
A
B
]
at
D
D
D
and
E
E
E
respectively. Let
I
c
I_{c}
I
c
be the center of the excircle which is tangent to the side
[
A
B
]
\left [ AB \right ]
[
A
B
]
and
F
F
F
the midpoint of
[
B
I
c
]
\left [ BI_{c} \right ]
[
B
I
c
]
. If
∣
C
F
∣
2
=
∣
C
E
∣
2
+
∣
D
F
∣
2
\left | CF \right |^2=\left | CE \right |^2+\left | DF \right |^2
∣
CF
∣
2
=
∣
CE
∣
2
+
∣
D
F
∣
2
, show that
A
B
C
ABC
A
BC
is an equilateral triangle.
5
1
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Turkey TST 2017 P5
For all positive real numbers
a
,
b
,
c
a,b,c
a
,
b
,
c
with
a
+
b
+
c
=
3
a+b+c=3
a
+
b
+
c
=
3
, show that
a
3
b
+
b
3
c
+
c
3
a
+
9
≥
4
(
a
b
+
b
c
+
c
a
)
.
a^3b+b^3c+c^3a+9\geq 4(ab+bc+ca).
a
3
b
+
b
3
c
+
c
3
a
+
9
≥
4
(
ab
+
b
c
+
c
a
)
.
9
1
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Turkey TST 2017 P9
Let
S
S
S
be a set of finite number of points in the plane any 3 of which are not linear and any 4 of which are not concyclic. A coloring of all the points in
S
S
S
to red and white is called discrete coloring if there exists a circle which encloses all red points and excludes all white points. Determine the number of discrete colorings for each set
S
S
S
.
1
1
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Turkey TST Number Theory
m
,
n
m, n
m
,
n
are positive integers and
p
p
p
is a prime number. Find all triples
(
m
,
n
,
p
)
(m, n, p)
(
m
,
n
,
p
)
satisfying
(
m
3
+
n
)
(
n
3
+
m
)
=
p
3
(m^3+n)(n^3+m)=p^3
(
m
3
+
n
)
(
n
3
+
m
)
=
p
3
4
1
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Combinatorics problem from Turkey TST
Each two of
n
n
n
students, who attended an activity, have different ages. It is given that each student shook hands with at least one student, who did not shake hands with anyone younger than the other. Find all possible values of
n
n
n
.
2
1
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Combinatorics problem from Turkey TST
There are two-way flights between some of the
2017
2017
2017
cities in a country, such that given two cities, it is possible to reach one from the other. No matter how the flights are appointed, one can define
k
k
k
cities as "special city", so that there is a direct flight from each city to at least one "special city". Find the minimum value of
k
k
k
.
6
1
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Turkey TST Number Theory Problem
Prove that no pair of different positive integers
(
m
,
n
)
(m, n)
(
m
,
n
)
exist, such that
4
m
2
n
2
−
1
(
m
2
−
n
2
)
2
\frac{4m^{2}n^{2}-1}{(m^{2}-n^2)^{2}}
(
m
2
−
n
2
)
2
4
m
2
n
2
−
1
is an integer.
7
1
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Turkey TST Functional Equality
Let
a
a
a
be a real number. Find the number of functions
f
:
R
→
R
f:\mathbb{R}\rightarrow \mathbb{R}
f
:
R
→
R
depending on
a
a
a
, such that
f
(
x
y
+
f
(
y
)
)
=
f
(
x
)
y
+
a
f(xy+f(y))=f(x)y+a
f
(
x
y
+
f
(
y
))
=
f
(
x
)
y
+
a
holds for every
x
,
y
∈
R
x, y\in \mathbb{R}
x
,
y
∈
R
.
3
1
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Geometry
At the
A
B
C
ABC
A
BC
triangle the midpoints of
B
C
,
A
C
,
A
B
BC, AC, AB
BC
,
A
C
,
A
B
are respectively
D
,
E
,
F
D, E, F
D
,
E
,
F
and the triangle tangent to the incircle at
G
G
G
,
H
H
H
and
I
I
I
in the same order.The midpoint of
A
D
AD
A
D
is
J
J
J
.
B
J
BJ
B
J
and
A
G
AG
A
G
intersect at point
K
K
K
. The
C
−
C-
C
−
centered circle passing through
A
A
A
cuts the
[
C
B
[CB
[
CB
ray at point
X
X
X
. The line passing through
K
K
K
and parallel to the
B
C
BC
BC
and
A
X
AX
A
X
meet at
U
U
U
.
I
U
IU
I
U
and
B
C
BC
BC
intersect at the
P
P
P
point. There is
Y
Y
Y
point chosen at incircle.
P
Y
PY
P
Y
is tangent to incircle at point
Y
Y
Y
. Prove that
D
,
E
,
F
,
Y
D, E, F, Y
D
,
E
,
F
,
Y
are cyclic.