To use angle-side-angle congruence the included side must be congruent. We are given \angle{A}\cong\angle{D} and \angle{B}\cong \angle{E} so we need to identify the side included by \angle{A} and \angle{B} and the side included by \angle{D} and \angle{E}.

\overline{AB} \cong \overline{DE}

To use angle-angle-side congruence any side, except the included side, can be congruent. We previously identified the included sides as \overline{AB} and \overline{DE}. What are the other corresponding sides in the diagram?

\overline{BC} \cong \overline{EF} or \overline{AC} \cong \overline{DF}

Consider all of the information given in the diagram. We are given that \overline{BX}\cong \overline{CX} and that \overline{AB} \parallel \overline{CD}. We also know that \angle{AXB}\cong \angle{DXC}. Since \overline{AB} \parallel \overline{CD}, we can conclude that \angle{ABX}\cong \angle{DCX}.

Label the additional information on the diagram to decide the applicable congruency theorem.

Angle-Side-Angle (ASA) congruency theorem.

The parallel lines in the diagram would also allow us to conclude that \angle{BAX}\cong \angle{CDX} which would make the triangles congruent by angle-angle-side instead.

We determined in part (a) that the triangles are congruent by angle-side-angle and identified the additional information to justify it. Now we just need to list the specific statements and reasons that justify the angle, the side, and the angle for the theorem.

\angle{AXB}\cong \angle{DXC} by the vertical angles theorem.

\overline{BX} \cong \overline{CX} was given.

\angle{ABX}\cong \angle{DCX} by the alternate interior angles theorem.