MathDB

1

Part of 2002 Turkey MO (2nd round)

Problems(2)

Stable Configuration

Source: Turkey National Olympiad 2002 - D1 - P1

3/11/2011
Let (a1,a2,,an)(a_1, a_2,\ldots , a_n) be a permutation of 1,2,,n,1, 2, \ldots , n, where n  \geq 2. For each k=1,,nk = 1, \ldots , n, we know that aka_k apples are placed at the point kk on the real axis. Children named A,B,CA,B,C are assigned respective points xA,xB,xC{1,,n}.x_A, x_B, x_C \in \{1, \ldots , n\}. For each k,k, the children whose points are closest to k k divide aka_k apples equally among themselves. We call (xA,xB,xC)(x_A, x_B, x_C) a stable configuration if no child’s total share can be increased by assigning a new point to this child and not changing the points of the other two. Determine the values of nn for which a stable configuration exists for some distribution (a1,,an)(a_1, \ldots, a_n) of the apples.
combinatorics unsolvedcombinatorics
On the equation y^2 ≡ x^3 - x (mod p)

Source: Turkey National Olympiad 2002 - D2 - P1

3/11/2011
Find all prime numbers pp for which the number of ordered pairs of integers (x,y)(x, y) with 0x,y<p0\leq x, y < p satisfying the condition y^2 \equiv  x^3 - x \pmod p is exactly p.p.
modular arithmeticquadraticsnumber theoryprime numbersnumber theory unsolved