It is pretty easy by Cevas theorem and not messy at all. But I would recomend trying to find a solution with idea, because it is very beautiful

By Trig Ceva on $\triangle{I_AI_BI_C}$, it suffices to show that $\prod_{cyc} \frac{\sin \angle{I_BI_CX_C}}{\sin \angle{I_AI_CX_C}} = 1$. Since $\angle{X_CI_BI_A} = \angle{X_CI_AI_B} = 90^{\circ} - \angle{I_AI_CI_B}$, by Law of Sines on $\triangle{I_BI_CX_C}, \triangle{I_AI_CX_C}$, etc, this is equal to $\prod_{cyc} \frac{\sin \angle{I_CI_BX_C}}{\sin \angle{I_CI_AX_C}}$, which is clearly $1$ since $\angle{I_AI_CX_A} + \angle{I_CI_AX_C} = 180^{\circ} \implies$ their sines are equal. $\square$