MathDB

Let

ABC

be a triangle with incenter

I

. The points

D

and

E

lie on the segments

CA

and

BC

respectively, such that

CD = CE

. Let

F

be a point on the segment

CD

. Prove that the quadrilateral

ABEF

is circumscribable if and only if the quadrilateral

DIEF

is cyclic.
Proposed by Dorlir Ahmeti, Albania

Problem Statement