MathDB

5

Part of 2008 IMO Shortlist

Problems(4)

IMO ShortList 2008, Combinatorics problem 5

Source: IMO ShortList 2008, Combinatorics problem 5, German TST 2, P3, 2009

7/9/2009
Let S \equal{} \{x_1, x_2, \ldots, x_{k \plus{} l}\} be a (k \plus{} l)-element set of real numbers contained in the interval [0,1] [0, 1]; k k and l l are positive integers. A k k-element subset AS A\subset S is called nice if \left |\frac {1}{k}\sum_{x_i\in A} x_i \minus{} \frac {1}{l}\sum_{x_j\in S\setminus A} x_j\right |\le \frac {k \plus{} l}{2kl} Prove that the number of nice subsets is at least \dfrac{2}{k \plus{} l}\dbinom{k \plus{} l}{k}. Proposed by Andrey Badzyan, Russia
combinatoricsProbabilistic MethodcountingIMO Shortlist
IMO ShortList 2008, Algebra problem 5

Source: IMO ShortList 2008, Algebra problem 5, German TST 1, P3, 2009

7/9/2009
Let a a, b b, c c, d d be positive real numbers such that abcd \equal{} 1 and a \plus{} b \plus{} c \plus{} d > \dfrac{a}{b} \plus{} \dfrac{b}{c} \plus{} \dfrac{c}{d} \plus{} \dfrac{d}{a}. Prove that a \plus{} b \plus{} c \plus{} d < \dfrac{b}{a} \plus{} \dfrac{c}{b} \plus{} \dfrac{d}{c} \plus{} \dfrac{a}{d} Proposed by Pavel Novotný, Slovakia
inequalitiesalgebraIMO Shortlist
IMO Shortlist 2008, Geometry problem 5

Source: IMO Shortlist 2008, Geometry problem 5, German TST 1, P2, 2009

7/9/2009
Let k k and n n be integers with 0\le k\le n \minus{} 2. Consider a set L L of n n lines in the plane such that no two of them are parallel and no three have a common point. Denote by I I the set of intersections of lines in L L. Let O O be a point in the plane not lying on any line of L L. A point XI X\in I is colored red if the open line segment OX OX intersects at most k k lines in L L. Prove that I I contains at least \dfrac{1}{2}(k \plus{} 1)(k \plus{} 2) red points. Proposed by Gerhard Woeginger, Netherlands
geometrypoint setcombinatorial geometrylinesIMO Shortlist
IMO ShortList 2008, Number Theory problem 5

Source: IMO ShortList 2008, Number Theory problem 5, German TST 6, P2, 2009

7/9/2009
For every nN n\in\mathbb{N} let d(n) d(n) denote the number of (positive) divisors of n n. Find all functions f:NN f: \mathbb{N}\to\mathbb{N} with the following properties: [*] d\left(f(x)\right) \equal{} x for all xN x\in\mathbb{N}. [*] f(xy) f(xy) divides (x \minus{} 1)y^{xy \minus{} 1}f(x) for all x x, yN y\in\mathbb{N}. Proposed by Bruno Le Floch, France
functionnumber theorymodular arithmeticdivisorIMO Shortlistfunctional equation