Let an acute-angled triangle ABC with AB<AC<BC, inscribed in circle c(O,R). The angle bisector AD meets c(O,R) at K. The circle c1(O1,R1)(which passes from A,D and has its center O1 on OA) meets AB at E and AC at Z. If M,N are the midpoints of ZC and BE respectively, prove that:
a)the lines ZE,DM,KC are concurrent at one point T.
b)the lines ZE,DN,KB are concurrent at one point X.
c)OK is the perpendicular bisector of TX. geometryparallelogramangle bisectorperpendicular bisectorgeometry proposed