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K is circumcenter of triangle SVG, incenters, circumcenters, cyclic related

Source: 2012 Balkan Shortlist G4 BMO

April 3, 2020
geometryincentercircumcircleCyclicCircumcentercircles

Problem Statement

Let MM be the point of intersection of the diagonals of a cyclic quadrilateral ABCDABCD. Let I1I_1 and I2I_2 are the incenters of triangles AMDAMD and BMCBMC, respectively, and let LL be the point of intersection of the lines DI1DI_1 and CI2CI_2. The foot of the perpendicular from the midpoint TT of I1I2I_1I_2 to CLCL is NN, and FF is the midpoint of TNTN. Let GG and JJ be the points of intersection of the line LFLF with I1NI_1N and I1I2I_1I_2, respectively. Let O1O_1 be the circumcenter of triangle LI1JLI_1J, and let Γ1\Gamma_1 and Γ2\Gamma_2 be the circles with diameters O1LO_1L and O1JO_1J, respectively. Let VV and SS be the second points of intersection of I1O1I_1O_1 with Γ1\Gamma_1 and Γ2\Gamma_2, respectively. If KK is point where the circles Γ1\Gamma_1 and Γ2\Gamma_2 meet again, prove that KK is the circumcenter of the triangle SVGSVG.
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