MathDB

8

Part of 2009 IMO Shortlist

Problems(2)

IMO Shortlist 2009 - Problem C8

Source:

7/5/2010
For any integer n2n\geq 2, we compute the integer h(n)h(n) by applying the following procedure to its decimal representation. Let rr be the rightmost digit of nn. [*]If r=0r=0, then the decimal representation of h(n)h(n) results from the decimal representation of nn by removing this rightmost digit 00. [*]If 1r91\leq r \leq 9 we split the decimal representation of nn into a maximal right part RR that solely consists of digits not less than rr and into a left part LL that either is empty or ends with a digit strictly smaller than rr. Then the decimal representation of h(n)h(n) consists of the decimal representation of LL, followed by two copies of the decimal representation of R1R-1. For instance, for the number 17,151,345,54317,151,345,543, we will have L=17,151L=17,151, R=345,543R=345,543 and h(n)=17,151,345,542,345,542h(n)=17,151,345,542,345,542. Prove that, starting with an arbitrary integer n2n\geq 2, iterated application of hh produces the integer 11 after finitely many steps.
Proposed by Gerhard Woeginger, Austria
inductioncombinatoricsIMO Shortlistinvariantgame
IMO Shortlist 2009 - Problem G8

Source:

7/5/2010
Let ABCDABCD be a circumscribed quadrilateral. Let gg be a line through AA which meets the segment BCBC in MM and the line CDCD in NN. Denote by I1I_1, I2I_2 and I3I_3 the incenters of ABM\triangle ABM, MNC\triangle MNC and NDA\triangle NDA, respectively. Prove that the orthocenter of I1I2I3\triangle I_1I_2I_3 lies on gg.
Proposed by Nikolay Beluhov, Bulgaria
geometryincentercircumcircletrigonometryinradiusIMO Shortlist