1997 JBMO Problems
Problem 1
Show that given any 9 points inside a square of side length 1 we can always find 3 that form a triangle with area less than
Bulgaria
Problem 2
Let . Compute the following expression in terms of : [i]Ciprus[/i]
Problem 3
Let be a triangle and let be the incenter. Let , be the midpoints of the sides and respectively. The lines and meet at and respectively. Prove that .
[i]Greece[/i]
Problem 4
Determine the triangle with sides and circumradius for which .
[i]Romania[/i]
Problem 5
Let , , , be positive integers such that Show that at least two of the numbers are even