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7.3

Part of Geometry Mathley 2011-12

Problems(1)

Geometry Mathley 7.3 tangential wanted and given

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6/7/2020
Let ABCDABCD be a tangential quadrilateral. Let ABAB meet CDCD at E,ADE, AD intersect BCBC at FF. Two arbitrary lines through EE meet AD,BCAD,BC at M,N,P,QM,N, P,Q respectively (M,NADM,N \in AD, P,QBCP,Q \in BC). Another arbitrary pair of lines through FF intersect AB,CDAB,CD at X,Y,Z,TX, Y,Z, T respectively (X,YABX, Y \in AB,Z,TCDZ, T \in CD). Suppose that d1,d2d_1, d_2 are the second tangents from EE to the incircles of triangles FXY,FZT,d3,d4FXY, FZT,d_3, d_4 are the second tangents from FF to the incircles of triangles EMN,EPQEMN,EPQ. Prove that the four lines d1,d2,d3,d4d_1, d_2, d_3, d_4 meet each other at four points and these intersections make a tangential quadrilateral.
Nguyễn Văn Linh
geometrytangentialincircleTangents