Question

look at this diagram: diagram of lines km, np parallel, transversal jq with points k, l, m on km; n, o, p on np; j, l, o, q on transversal. if \\( \overleftrightarrow{km} \\) and \\( \overleftrightarrow{np} \\) are parallel lines and \\( m\angle klj = 130^\circ \\), what is \\( m\angle nol \\)?

Explanation:

Step1: Identify the relationship between angles

Since \( KM \parallel NP \) and \( JQ \) is a transversal, \( \angle KLJ \) and \( \angle NOL \) are same - side interior angles? Wait, no. Wait, \( \angle KLJ \) and \( \angle MLO \) are vertical angles? No, actually, \( \angle KLJ \) and \( \angle NOL \): Let's see, \( KM \parallel NP \), and \( JQ \) is a transversal. \( \angle KLJ \) and \( \angle NOL \) are actually alternate - interior angles? Wait, no, \( \angle KLJ \) and \( \angle MLO \) are vertical angles, but \( \angle MLO \) and \( \angle NOL \): Wait, \( KM \parallel NP \), so consecutive interior angles are supplementary. Wait, \( \angle KLJ \) and \( \angle NOL \): Let's check the positions. \( \angle KLJ \) is at \( L \) between \( KL \) and \( LJ \), \( \angle NOL \) is at \( O \) between \( NO \) and \( OL \). Since \( KM \parallel NP \), and \( JQ \) is a transversal, \( \angle KLJ \) and \( \angle NOL \) are same - side interior angles? No, wait, \( \angle KLJ \) and \( \angle MLO \) are vertical angles, so \( m\angle MLO=m\angle KLJ = 130^{\circ}\). Then, since \( KM\parallel NP \), \( \angle MLO \) and \( \angle NOL \) are same - side interior angles, so they are supplementary. Wait, no, maybe I got the direction wrong. Wait, actually, \( \angle KLJ \) and \( \angle NOL \): Let's think about corresponding angles or alternate interior angles. Wait, \( KL \) and \( NO \) are parts of the parallel lines \( KM \) and \( NP \). \( LJ \) and \( OQ \) are parts of the transversal \( JQ \). So \( \angle KLJ \) and \( \angle NOL \): Let's see, \( \angle KLJ \) and \( \angle NOL \) are actually same - side interior angles? Wait, no, \( \angle KLJ \) and \( \angle NOL \): If we consider the parallel lines \( KM \) and \( NP \), and transversal \( JQ \), then \( \angle KLJ \) and \( \angle NOL \) are same - side interior angles? Wait, no, \( \angle KLJ \) is above \( KM \), and \( \angle NOL \) is above \( NP \)? Wait, no, \( NO \) is part of \( NP \), going from \( N \) to \( P \), so \( NO \) is left - to - right, same as \( KM \). \( LJ \) is going up - right, \( OQ \) is going down - left. So \( \angle KLJ \) is the angle between \( KL \) (left - to - right) and \( LJ \) (up - right), and \( \angle NOL \) is the angle between \( NO \) (left - to - right) and \( OL \) (up - right, since \( OL \) is part of \( LJ \) extended? Wait, no, \( O \) is on \( NP \) and \( JQ \), so \( OL \) is the same line as \( LJ \), just extended. So \( \angle KLJ \) and \( \angle NOL \): Wait, actually, \( \angle KLJ \) and \( \angle NOL \) are alternate interior angles? No, alternate interior angles would be on opposite sides of the transversal. Wait, maybe I made a mistake. Let's recall that when two parallel lines are cut by a transversal, consecutive interior angles are supplementary. \( \angle KLJ \) and \( \angle MLO \) are vertical angles, so \( m\angle MLO = 130^{\circ}\). Then, \( KM\parallel NP \), so \( \angle MLO \) and \( \angle NOL \) are consecutive interior angles, so \( m\angle MLO+m\angle NOL = 180^{\circ}\). Wait, no, that would be if they are on the same side. Wait, maybe \( \angle KLJ \) and \( \angle NOL \) are actually same - side interior angles? Wait, no, let's look at the diagram again. \( KM \) is parallel to \( NP \), \( JQ \) is the transversal. \( \angle KLJ \) is at \( L \), between \( KL \) and \( LJ \). \( \angle NOL \) is at \( O \), between \( NO \) and \( OL \). Since \( KL \parallel NO \) (because \( KM \parallel NP \)), and \( LJ \) is the transversal, then \( \angle KLJ \) and \( \angle NOL \) are same - side interior angles? Wait, no, same - side interior angles are on the same side of the transversal. Wait, \( KL \) and \( NO \) are parallel, \( LJ \) is the transversal. So \( \angle KLJ \) and \( \angle NOL \): \( KL \) is above \( NO \)? No, \( KM \) and \( NP \) are two parallel lines, \( KM \) is the upper one, \( NP \) is the lower one. So \( KL \) is part of \( KM \), going left from \( L \), \( NO \) is part of \( NP \), going left from \( O \). \( LJ \) is going up - right from \( L \), \( OQ \) is going down - left from \( O \), so \( OL \) is going up - right from \( O \), same direction as \( LJ \). So \( \angle KLJ \) is the angle between \( KL \) (left) and \( LJ \) (up - right), and \( \angle NOL \) is the angle between \( NO \) (left) and \( OL \) (up - right). So these two angles are actually corresponding angles? Wait, corresponding angles are equal. But \( \angle KLJ \) is \( 130^{\circ}\), that can't be. Wait, no, maybe \( \angle KLJ \) and \( \angle NOL \) are supplementary. Wait, let's use the linear pair or supplementary angles. Wait, \( \angle KLJ \) and \( \angle MLJ \) are supplementary, because they form a linear pair. So \( m\angle KLJ + m\angle MLJ=180^{\circ}\), so \( m\angle MLJ = 180 - 130=50^{\circ}\). Then, since \( KM \parallel NP \), \( \angle MLJ \) and \( \angle NOL \) are corresponding angles, so \( m\angle NOL=m\angle MLJ = 50^{\circ}\). Ah, that makes sense. So first, find the supplementary angle of \( \angle KLJ \) (since they form a linear pair), then use the corresponding angles postulate (since \( KM \parallel NP \)) to find \( \angle NOL \).

Step1: Find the supplementary angle of \( \angle KLJ \)

\( \angle KLJ \) and \( \angle MLJ \) form a linear pair, so they are supplementary. The sum of supplementary angles is \( 180^{\circ}\).
Given \( m\angle KLJ = 130^{\circ}\), then \( m\angle MLJ=180^{\circ}-m\angle KLJ \)
\( m\angle MLJ = 180 - 130=50^{\circ}\)

Step2: Use corresponding angles postulate

Since \( KM\parallel NP \) and \( JQ \) is a transversal, \( \angle MLJ \) and \( \angle NOL \) are corresponding angles. Corresponding angles are equal when two parallel lines are cut by a transversal.
So \( m\angle NOL=m\angle MLJ = 50^{\circ}\)

Answer:

\( 50 \)