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Problems
Contests
National and Regional Contests
Sweden Contests
Swedish Mathematical Competition
2009 Swedish Mathematical Competition
2009 Swedish Mathematical Competition
Part of
Swedish Mathematical Competition
Subcontests
(6)
6
1
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reverse any 5 coins in a row from a total of 289 coins in a 17x17 grid
On a table lie
289
289
289
coins that form a square array
17
×
17
17 \times 17
17
×
17
. All coins are facing with the crown up. In one move, it is possible to reverse any five coins lying in a row: vertical, horizontal or diagonal. Is it possible that after a number of such moves, all the coins to be arranged with tails up?
3
1
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probabiblity 1/4 when extracting 2 balls from a urn of yellow and greens
An urn contain a number of yellow and green balls. You extract two balls from the urn (without adding them back) and calculate the probability of both balls being green. Can you choose the number of yellow and green balls such that this probability to be
1
4
\frac{1}{4}
4
1
?
4
1
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x + x^3 = 5y^2 diophantine
Determine all integers solutions of the equation
x
+
x
3
=
5
y
2
x + x^3 = 5y^2
x
+
x
3
=
5
y
2
.
2
1
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(1+x^2) (1+x^3) (1+x^5)=8x^5
Find all real solutions of the equation
(
1
+
x
2
)
(
1
+
x
3
)
(
1
+
x
5
)
=
8
x
5
\left(1+x^2\right)\left(1+x^3\right)\left(1+x^5\right)=8x^5
(
1
+
x
2
)
(
1
+
x
3
)
(
1
+
x
5
)
=
8
x
5
1
1
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5 square carpets in a square hall, can they fit in without overlaps?
Five square carpets have been bought for a square hall with a side of
6
6
6
m , two with the side
2
2
2
m, one with the side
2.1
2.1
2.1
m and two with the side
2.5
2.5
2.5
m. Is it possible to place the five carpets so that they do not overlap in any way each other? The edges of the carpets do not have to be parallel to the cradles in the hall.
5
1
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distance OE= \sqrt{2- d^2}, semicircle related
A semicircular arc and a diameter
A
B
AB
A
B
with a length of
2
2
2
are given. Let
O
O
O
be the midpoint of the diameter. On the radius perpendicular to the diameter, we select a point
P
P
P
at the distance
d
d
d
from the midpoint of the diameter
O
O
O
,
0
<
d
<
1
0 <d <1
0
<
d
<
1
. A line through
A
A
A
and
P
P
P
intersects the semicircle at point
C
C
C
. Through point
P
P
P
we draw another line at right angle against
A
C
AC
A
C
that intersects the semicircle at point
D
D
D
. Through point
C
C
C
we draw a line
l
1
l_1
l
1
, parallel to
P
D
PD
P
D
and then a line
l
2
l_2
l
2
, through
D
D
D
parallel to
P
C
PC
PC
. The lines
l
1
l_1
l
1
and
l
2
l_2
l
2
intersect at point
E
E
E
. Show that the distance between
O
O
O
and
E
E
E
is equal to
2
−
d
2
\sqrt{2- d^2}
2
−
d
2