1976 IMO Problems
Problems of the 18th IMO 1976 in Austria.
Contents
Day 1
Problem 1
In a convex quadrilateral (in the plane) with the area of the sum of two opposite sides and a diagonal is . Determine all the possible values that the other diagonal can have.
Problem 2
Let and for Prove that for any positive integer n the roots of the equation are all real and distinct.
Problem 3
A box whose shape is a parallelepiped can be completely filled with cubes of side If we put in it the maximum possible number of cubes, each of volume , with the sides parallel to those of the box, then exactly percent from the volume of the box is occupied. Determine the possible dimensions of the box.
Day 2
Problem 4
Determine the greatest number, who is the product of some positive integers, and the sum of these numbers is