49th Polish Mathematical Olympiad Problems 1998

49th Polish Mathematical Olympiad Problems 1998

A1.  Find all solutions in positive integers to a + b + c = xyz, x + y + z = abc.

A2.  Fn is the Fibonacci sequence F₀ = F₁ = 1, F_n+2 = F_n+1 + F_n. Find all pairs m > k ≥ 0 such that the sequence x₀, x₁, x₂, ... defined by x₀ = F_k/F_m and x_n+1 = (2x_n - 1)/(1 - x_n) for x_n ≠ 1, or 1 if x_n = 1, contains the number 1.

A3.  PABCDE is a pyramid with ABCDE a convex pentagon. A plane meets the edges PA, PB, PC, PD, PE in points A', B', C', D', E' distinct from A, B, C, D, E and P. For each of the quadrilaterals ABB'A', BCC'B, CDD'C', DEE'D', EAA'E' take the intersection of the diagonals. Show that the five intersections are coplanar.

B1.  Define the sequence a₁, a₂, a₃, ... by a₁ = 1, a_n = a_n-1 + a_[n/2]. Does the sequence contain infinitely many multiples of 7?

B2.  The points D, E on the side AB of the triangle ABC are such that (AD/DB)(AE/EB) = (AC/CB)². Show that ∠ACD = ∠BCE.

B3.  S is a board containing all unit squares in the xy plane whose vertices have integer coordinates and which lie entirely inside the circle x² + y² = 1998². +1 is written in each square of S. An allowed move is to change the sign of every square in S in a given row, column or diagonal. Can we end up with all -1s by a sequence of allowed moves?