QUESTION IMAGE
Question
in the figure below, $\triangle hij$ is drawn. the line $overleftrightarrow{khl}$ is drawn such that $overleftrightarrow{khl} parallel overline{ij}$.
$mangle hij = \boxed{}$ because they are
Step1: Identify angle relationship
Since $\overleftrightarrow{KHL} \parallel \overline{IJ}$, $\angle HIJ$ and $\angle KHI$ are consecutive interior angles (same-side interior angles), which are supplementary. First, calculate $\angle HJI$ using triangle angle sum.
Step2: Calculate $\angle HJI$
The sum of angles in a triangle is $180^\circ$. For $\triangle HIJ$:
$$m\angle HJI = 180^\circ - 58^\circ - 39^\circ = 83^\circ$$
Step3: Relate to target angle
$\angle HLJ$ and $\angle HJI$ are alternate exterior angles (since $\overleftrightarrow{KHL} \parallel \overline{IJ}$ and $\overline{HJ}$ is a transversal). Alternate exterior angles are congruent.
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$m\angle HLJ = 83^\circ$ because they are alternate exterior angles.