Solve the system of equations: where and are constants. Give the conditions that and must satisfy so that (the solutions of the system) are distinct positive numbers.
International Competitions 1961
| # | Competition | Years | Problems | Years |
|---|---|---|---|---|
| 1 | International Mathematical Olympiad | 1959–2025 | 398 | |
| 2 | Middle European Mathematical Olympiad | 2009–2025 | 160 |
Let be the sides of a triangle, and its area. Prove: . In what case does equality hold?
Solve the equation , where is a natural number.
Consider triangle and a point within the triangle. Lines intersect the opposite sides in points respectively. Prove that, of the numbers at least one is and at least one is .
Construct triangle if , and , where is the midpoint of segment and . Prove that a solution exists if and only if In what case does the equality hold?
Consider a plane and three non-collinear points on the same side of ; suppose the plane determined by these three points is not parallel to . In plane take three arbitrary points . Let be the midpoints of segments ; let be the centroid of triangle . (We will not consider positions of the points such that the points do not form a triangle.) What is the locus of point as range independently over the plane ?