MathDB
Problems
Contests
National and Regional Contests
Spain Contests
Spain Mathematical Olympiad
2021 Spain Mathematical Olympiad
2021 Spain Mathematical Olympiad
Part of
Spain Mathematical Olympiad
Subcontests
(6)
6
1
Hide problems
AE and DI are parallel
Let
A
B
C
ABC
A
BC
be a triangle with
A
B
≠
A
C
AB \neq AC
A
B
=
A
C
, let
I
I
I
be its incenter,
γ
\gamma
γ
its inscribed circle and
D
D
D
the midpoint of
B
C
BC
BC
. The tangent to
γ
\gamma
γ
from
D
D
D
different to
B
C
BC
BC
touches
γ
\gamma
γ
in
E
E
E
. Prove that
A
E
AE
A
E
and
D
I
DI
D
I
are parallel.
5
1
Hide problems
Counting number of ways to choose same number of lights
We have
2
n
2n
2
n
lights in two rows, numbered from
1
1
1
to
n
n
n
in each row. Some (or none) of the lights are on and the others are off, we call that a "state". Two states are distinct if there is a light which is on in one of them and off in the other. We say that a state is good if there is the same number of lights turned on in the first row and in the second row. Prove that the total number of good states divided by the total number of states is:
3
⋅
5
⋅
7
⋯
(
2
n
−
1
)
2
n
n
!
\frac{3 \cdot 5 \cdot 7 \cdots (2n-1)}{2^n n!}
2
n
n
!
3
⋅
5
⋅
7
⋯
(
2
n
−
1
)
4
1
Hide problems
min/max of abcd with a+b+c+d=0 and a^2+b^2+c^2+d^2=12
Let
a
,
b
,
c
,
d
a,b,c,d
a
,
b
,
c
,
d
real numbers such that:
a
+
b
+
c
+
d
=
0
and
a
2
+
b
2
+
c
2
+
d
2
=
12
a+b+c+d=0 \text{ and } a^2+b^2+c^2+d^2 = 12
a
+
b
+
c
+
d
=
0
and
a
2
+
b
2
+
c
2
+
d
2
=
12
Find the minimum and maximum possible values for
a
b
c
d
abcd
ab
c
d
, and determine for which values of
a
,
b
,
c
,
d
a,b,c,d
a
,
b
,
c
,
d
the minimum and maximum are attained.
3
1
Hide problems
2021 chips of each of 2021 colors
We have
2021
2021
2021
colors and
2021
2021
2021
chips of each color. We place the
202
1
2
2021^2
202
1
2
chips in a row. We say that a chip
F
F
F
is bad if there is an odd number of chips that have a different color to
F
F
F
both to the left and to the right of
F
F
F
.(a) Determine the minimum possible number of bad chips.(b) If we impose the additional condition that each chip must have at least one adjacent chip of the same color, determine the minimum possible number of bad chips.
2
1
Hide problems
Find n with 2021 solutions to x^2-y^2=n
Given a positive integer
n
n
n
, we define
λ
(
n
)
\lambda (n)
λ
(
n
)
as the number of positive integer solutions of
x
2
−
y
2
=
n
x^2-y^2=n
x
2
−
y
2
=
n
. We say that
n
n
n
is olympic if
λ
(
n
)
=
2021
\lambda (n) = 2021
λ
(
n
)
=
2021
. Which is the smallest olympic positive integer? Which is the smallest olympic positive odd integer?
1
1
Hide problems
Simple 3D Geo
Vertices
A
,
B
,
C
A, B, C
A
,
B
,
C
of a equilateral triangle of side
1
1
1
are in the surface of a sphere with radius
1
1
1
and center
O
O
O
. Let
D
D
D
be the orthogonal projection of
A
A
A
on the plane
α
\alpha
α
determined by points
B
,
C
,
O
B, C, O
B
,
C
,
O
. Let
N
N
N
be one of the intersections of the line perpendicular to
α
\alpha
α
passing through
O
O
O
with the sphere. Find the angle
∠
D
N
O
\angle DNO
∠
D
NO
.