#CompetitionYearsProblemsYears
1International Mathematical Olympiad1959–2025398
2Middle European Mathematical Olympiad2009–2025160
International Mathematical Olympiad 1965 Problem 2

Consider the system of equations a11x1+a12x2+a13x3=0a_{11}x_1 + a_{12}x_2 + a_{13}x_3 = 0 a21x1+a22x2+a23x3=0a_{21}x_1 + a_{22}x_2 + a_{23}x_3 = 0 a31x1+a32x2+a33x3=0a_{31}x_1 + a_{32}x_2 + a_{33}x_3 = 0

with unknowns x1,x2,x3x_1, x_2, x_3. The coefficients satisfy the conditions:

(a) a11,a22,a33a_{11}, a_{22}, a_{33} are positive numbers;

(b) the remaining coefficients are negative numbers;

(c) in each equation, the sum of the coefficients is positive.

Prove that the given system has only the solution x1=x2=x3=0x_1 = x_2 = x_3 = 0.

International Mathematical Olympiad 1965 Problem 3

Given the tetrahedron ABCDABCD whose edges ABAB and CDCD have lengths aa and bb respectively. The distance between the skew lines ABAB and CDCD is dd, and the angle between them is ω\omega. Tetrahedron ABCDABCD is divided into two solids by plane ε\varepsilon, parallel to lines ABAB and CDCD. The ratio of the distances of ε\varepsilon from ABAB and CDCD is equal to kk. Compute the ratio of the volumes of the two solids obtained.

International Mathematical Olympiad 1965 Problem 5

Consider OAB\triangle OAB with acute angle AOBAOB. Through a point MOM \neq O perpendiculars are drawn to OAOA and OBOB, the feet of which are PP and QQ respectively. The point of intersection of the altitudes of OPQ\triangle OPQ is HH. What is the locus of HH if MM is permitted to range over (a) the side ABAB, (b) the interior of OAB\triangle OAB?

International Mathematical Olympiad 1965 Problem 6

In a plane a set of nn points (n3n \geq 3) is given. Each pair of points is connected by a segment. Let dd be the length of the longest of these segments. We define a diameter of the set to be any connecting segment of length dd. Prove that the number of diameters of the given set is at most nn.