Exploring 2017 Imo Shortlist G4

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  • International Math Olympiad
  • In this challenge, a snail is crawling in an underground tunnel, which consists of the union of N circles, where each two circles ...
  • Shortlist
  • Shortlist
  • Problem. Let $R$ and $S$ be different points on a circle $\Omega$ such that $RS$ is not a diameter. Let $\ell$ be the tangent line ...

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Shortlist Here is a very instructive problem from the Hello everybody in this lecture I will be solving Here is a nice problem from the

IMO 2017

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