Let \( \triangle ABC \) be a triangle such that \( BC > AC > AB \). A point \( X \) is marked on side \( BC \) such that \( AX = XC \). Let \( Y \) be a point on segment \( AX \) such that \( CY = AB \). Prove that \( \angle CYX = \angle ABC \).
Source: Rioplatense Math Olympiad Level 3, P1 2024
Tags: geometry, rioplatense
Let \( \triangle ABC \) be a triangle such that \( BC > AC > AB \). A point \( X \) is marked on side \( BC \) such that \( AX = XC \). Let \( Y \) be a point on segment \( AX \) such that \( CY = AB \). Prove that \( \angle CYX = \angle ABC \).