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Balkan MO 2017 P2,

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May 4, 2017
geometrybarycentric coordinatesBalkansymmedianBalkan Mathematics Olympiad

Problem Statement

Consider an acute-angled triangle ABCABC with AB<ACAB<AC and let ω\omega be its circumscribed circle. Let tBt_B and tCt_C be the tangents to the circle ω\omega at points BB and CC, respectively, and let LL be their intersection. The straight line passing through the point BB and parallel to ACAC intersects tCt_C in point DD. The straight line passing through the point CC and parallel to ABAB intersects tBt_B in point EE. The circumcircle of the triangle BDCBDC intersects ACAC in TT, where TT is located between AA and CC. The circumcircle of the triangle BECBEC intersects the line ABAB (or its extension) in SS, where BB is located between SS and AA. Prove that STST, ALAL, and BCBC are concurrent.
Vangelis Psychas and Silouanos Brazitikos\text{Vangelis Psychas and Silouanos Brazitikos}
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