MathDB

2

Part of 2014 IMAC Arhimede

Problems(1)

concurrent starting with an inscribed ABCD and tangents from a point on AC

Source: 2014 IMAC Arhimede P2

5/2/2019
A convex quadrilateral ABCDABCD is inscribed into a circle ω\omega . Suppose that there is a point XX on the segment ACAC such that the XBXB and XDXD tangents to the circle ω\omega . Tangent of ω\omega at CC, intersect XDXD at QQ. Let EE (EAE\ne A) be the intersection of the line AQAQ with ω\omega . Prove that AD,BEAD, BE, and CQCQ are concurrent.
geometryconcurrentconcurrencytangential quadrilateralTangents