#CompetitionYearsProblemsYears
1International Mathematical Olympiad1959–2025398
2Middle European Mathematical Olympiad2009–2025160
International Mathematical Olympiad 1963 Problem 4

Find all solutions x1,x2,x3,x4,x5x_1, x_2, x_3, x_4, x_5 of the system x5+x2=yx1x1+x3=yx2x2+x4=yx3x3+x5=yx4x4+x1=yx5,\begin{aligned} x_5 + x_2 &= yx_1\\ x_1 + x_3 &= yx_2\\ x_2 + x_4 &= yx_3\\ x_3 + x_5 &= yx_4\\ x_4 + x_1 &= yx_5, \end{aligned} where yy is a parameter.

International Mathematical Olympiad 1963 Problem 6

Five students, A,B,C,D,EA, B, C, D, E, took part in a contest. One prediction was that the contestants would finish in the order ABCDEABCDE. This prediction was very poor. In fact no contestant finished in the position predicted, and no two contestants predicted to finish consecutively actually did so. A second prediction had the contestants finishing in the order DAECBDAECB. This prediction was better. Exactly two of the contestants finished in the places predicted, and two disjoint pairs of students predicted to finish consecutively actually did so. Determine the order in which the contestants finished.