MathDB

2009 Tuymaada Olympiad

Part of Tuymaada Olympiad

Subcontests

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P(x) is a quadratic trinomial

P(x) P(x) is a quadratic trinomial. What maximum number of terms equal to the sum of the two preceding terms can occur in the sequence P(1) P(1), P(2) P(2), P(3) P(3), ? \dots? Proposed by A. Golovanov

Perpendicular to bases drawn through P meets line BQ at K

M M is the midpoint of base BC BC in a trapezoid ABCD ABCD. A point P P is chosen on the base AD AD. The line PM PM meets the line CD CD at a point Q Q such that C C lies between Q Q and D D. The perpendicular to the bases drawn through P P meets the line BQ BQ at K K. Prove that \angle QBC \equal{} \angle KDA. Proposed by S. Berlov

A necklace consists of 100 blue and several red beads

A necklace consists of 100 blue and several red beads. It is known that every segment of the necklace containing 8 blue beads contain also at least 5 red beads. What minimum number of red beads can be in the necklace? Proposed by A. Golovanov
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Naoki and Richard in turn put chips in free squares

All squares of a 20×20 20\times 20 table are empty. Misha* and Sasha** in turn put chips in free squares (Misha* begins). The player after whose move there are four chips on the intersection of two rows and two columns wins. Which of the players has a winning strategy? Proposed by A. Golovanov US Name Conversions: Misha*: Naoki Sasha**: Richard

Fractional part of the product of every two of them is 0.5

Three real numbers are given. Fractional part of the product of every two of them is 12 1\over 2. Prove that these numbers are irrational. Proposed by A. Golovanov

Magician asked a spectator to think of a three-digit number

A magician asked a spectator to think of a three-digit number abc \overline{abc} and then to tell him the sum of numbers acb \overline{acb}, bac \overline{bac}, bca \overline{bca}, cab \overline{cab}, and cba \overline{cba}. He claims that when he knows this sum he can determine the original number. Is that so?