CMIMC 2022 Team Problem 4

Let \triangle A B C be equilateral with integer side length. Point X lies on \overline{B C} strictly between B and C such that B X<C X. Let C^{\prime} denote the reflection of C over the midpoint of \overline{A X}. If B C^{\prime}=30, find the sum of all possible side lengths of \triangle A B C.