MathDB

6

Part of 2022 Korea Junior Math Olympiad

Problems(1)

Concyclic with a Tangent Circle

Source: KJMO 2022 P6

10/29/2022
Let ABCABC be a isosceles triangle with AB=AC\overline{AB}=\overline{AC}. Let D(A,C)D(\neq A, C) be a point on the side ACAC, and circle Ω\Omega is tangent to BDBD at point EE, and ACAC at point CC. Denote by F(E)F(\neq E) the intersection of the line AEAE and the circle Ω\Omega, and G(a)G(\neq a) the intersection of the line ACAC and the circumcircle of the triangle ABFABF. Prove that points D,E,F,D, E, F, and GG are concyclic.
geometrycircumcircleConcyclictangent