#CompetitionYearsProblemsYears
1International Mathematical Olympiad1959–2025398
2Middle European Mathematical Olympiad2009–2025160
International Mathematical Olympiad 1981 Problem 4

(a) For which values of n>2n > 2 is there a set of nn consecutive positive integers such that the largest number in the set is a divisor of the least common multiple of the remaining n1n - 1 numbers?

(b) For which values of n>2n > 2 is there exactly one set having the stated property?

International Mathematical Olympiad 1981 Problem 6

The function f(x,y)f(x, y) satisfies

(1) f(0,y)=y+1f(0, y) = y + 1,

(2) f(x+1,0)=f(x,1)f(x + 1, 0) = f(x, 1),

(3) f(x+1,y+1)=f(x,f(x+1,y))f(x + 1, y + 1) = f(x, f(x + 1, y)),

for all non-negative integers x,yx, y. Determine f(4,1981)f(4, 1981).