Determine all finite sets of at least three points in the plane which satisfy the following condition:
for any two distinct points and in , the perpendicular bisector of the line segment is an axis of symmetry for .
| # | Competition | Years | Problems | Years |
|---|---|---|---|---|
| 1 | International Mathematical Olympiad | 1959–2025 | 398 | |
| 2 | Middle European Mathematical Olympiad | 2009–2025 | 160 |
Determine all finite sets of at least three points in the plane which satisfy the following condition:
for any two distinct points and in , the perpendicular bisector of the line segment is an axis of symmetry for .
Let be a fixed integer, with .
(a) Determine the least constant such that the inequality
holds for all real numbers .
(b) For this constant , determine when equality holds.
Consider an square board, where is a fixed even positive integer. The board is divided into unit squares. We say that two different squares on the board are adjacent if they have a common side.
unit squares on the board are marked in such a way that every square (marked or unmarked) on the board is adjacent to at least one marked square.
Determine the smallest possible value of .
Determine all pairs of positive integers such that
is a prime,
not exceeded , and
is divisible by .
Two circles and are contained inside the circle , and are tangent to at the distinct points and , respectively. passes through the center of . The line passing through the two points of intersection of and meets at and . The lines and meet at and , respectively.
Prove that is tangent to .
Determine all functions such that
for all real numbers .