2002 Indonesia MO Problems
Contents
[hide]Problem 1
Show that is divisible by
for any integers
.
Problem 2
Five regular dices are thrown, one at each time, then the product of the numbers shown are calculated. Which probability is bigger; the product is
or the product is
?
Problem 3
Find all real solutions from the following system of equations:
Problem 4
Given a triangle with
. On the circumcircle of triangle
there exists point
, which is the midpoint of arc
that contains
. Let
be a point on
such that
is perpendicular to
. Prove that
.
Problem 5
Nine of the following ten numbers: are going to be filled into empty spaces in the
table shown below. After all spaces are filled, the sum of the numbers on each row will be the same. And so with the sum of the numbers on each column, will also be the same. Determine all possible fillings.
Problem 6
Find all prime number such that
and
are also prime.
Problem 7
Let be a rhombus with
, and
is the intersection of diagonals
and
. Let
,
, and
are three points on the rhombus' perimeter. If
is also a rhombus, show that exactly one of
,
, and
is located on the vertices of rhombus
.