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Problems
Contests
National and Regional Contests
Germany Contests
German National Olympiad
2010 German National Olympiad
2010 German National Olympiad
Part of
German National Olympiad
Subcontests
(6)
1
1
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Chords of the same length
Given two circles
k
k
k
and
l
l
l
which intersect at two points. One of their common tangents touches
k
k
k
at point
K
K
K
, while the other common tangent touches
l
l
l
at
L
.
L.
L
.
Let
A
A
A
and
B
B
B
be the intersections of the line
K
L
KL
K
L
with the circles
k
k
k
and
l
l
l
, respectively. Prove that
A
K
‾
=
B
L
‾
.
\overline{AK} = \overline{BL}.
A
K
=
B
L
.
3
1
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An (almost) infinite problem statement
An infinite fairytale is a book with pages numbered
1
,
2
,
3
,
…
1,2,3,\ldots
1
,
2
,
3
,
…
where all natural numbers appear. An author wants to write an infinite fairytale such that a new dwarf is introduced on each page. Afterward, the page contains several discussions between groups of at least two of the already introduced dwarfs. The publisher wants to make the book more exciting and thus requests the following condition: Every infinite set of dwarfs contains a group of at least two dwarfs, who formed a discussion group at some point as well as a group of the same size for which this is not true. Can the author fulfill this condition?
5
1
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Polynomials written on a board
The polynomial
x
8
+
x
7
x^8 +x^7
x
8
+
x
7
is written on a blackboard. In a move, Peter can erase the polynomial
P
(
x
)
P(x)
P
(
x
)
and write down
(
x
+
1
)
P
(
x
)
(x+1)P(x)
(
x
+
1
)
P
(
x
)
or its derivative
P
′
(
x
)
.
P'(x).
P
′
(
x
)
.
After a while, the linear polynomial
a
x
+
b
ax+b
a
x
+
b
with
a
≠
0
a\ne 0
a
=
0
is written on the board. Prove that
a
−
b
a-b
a
−
b
is divisible by
49.
49.
49.
6
1
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Coplanar points on a sphere
Let
A
,
B
,
C
,
D
,
E
,
F
,
G
A,B,C,D,E,F,G
A
,
B
,
C
,
D
,
E
,
F
,
G
and
H
H
H
be eight pairwise distinct points on the surface of a sphere. The quadruples
(
A
,
B
,
C
,
D
)
,
(
A
,
B
,
F
,
E
)
,
(
B
,
C
,
G
,
F
)
,
(
C
,
D
,
H
,
G
)
(A,B,C,D), (A,B,F,E),(B,C,G,F),(C,D,H,G)
(
A
,
B
,
C
,
D
)
,
(
A
,
B
,
F
,
E
)
,
(
B
,
C
,
G
,
F
)
,
(
C
,
D
,
H
,
G
)
and
(
D
,
A
,
E
,
H
)
(D,A,E,H)
(
D
,
A
,
E
,
H
)
of points are coplanar. Prove that the quadruple
(
E
,
F
,
G
,
H
)
(E,F,G,H)
(
E
,
F
,
G
,
H
)
is coplanar aswell.
4
1
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Solve the equation
Find all positive integer solutions for the equation
(
3
x
+
1
)
(
3
y
+
1
)
(
3
z
+
1
)
=
34
x
y
z
(3x+1)(3y+1)(3z+1)=34xyz
(
3
x
+
1
)
(
3
y
+
1
)
(
3
z
+
1
)
=
34
x
yz
Thx
2
1
Hide problems
cyclic with pairwise distinct a,b,c. Strange equality cases
Let
a
,
b
,
c
a,b,c
a
,
b
,
c
be pairwise distinct real numbers. Show that
(
2
a
−
b
a
−
b
)
2
+
(
2
b
−
c
b
−
c
)
2
+
(
2
c
−
a
c
−
a
)
2
≥
5.
(\frac{2a-b}{a-b})^2+(\frac{2b-c}{b-c})^2+(\frac{2c-a}{c-a})^2 \ge 5.
(
a
−
b
2
a
−
b
)
2
+
(
b
−
c
2
b
−
c
)
2
+
(
c
−
a
2
c
−
a
)
2
≥
5.