To solve for \( m \angle MLI \), we can use the fact that \( HJ \) and \( KM \) are parallel lines and that \( m \angle HIL = 61^\circ \).
Since \( HJ \) and \( KM \) are parallel, the angles formed by a transversal (in this case, line \( IL \)) have special relationships:
- \( \angle HIL \) and \( \angle MLI \) are alternate interior angles.
By the Alternate Interior Angles Theorem, if two parallel lines are cut by a transversal, then the alternate interior angles are equal.
Therefore, we have:
\[ m \angle MLI = m \angle HIL \]
Since \( m \angle HIL = 61^\circ \), it follows that:
\[ m \angle MLI = 61^\circ \]
Thus, the measure of angle \( MLI \) is:
\[ \boxed{61^\circ} \]