The given pairs of congruent angles can be matched with their reasons as follows:
- [tex]5 \angle \cong \angle 13[/tex] is: corresponding angles for lines r and s that is cut by traversal q
- [tex]10 \angle \cong \angle 14[/tex] is: corresponding angles for lines p and q that is cut by traversal s
- [tex]13 \angle \cong \angle 16[/tex] is: vertical angles theorem.
- [tex]1 \angle \cong \angle 5[/tex] is: corresponding angles for lines p and q that is cut by traversal r.
Given:
[tex]r \parallel s\\\\p \parallel q[/tex]
From the image,
1. [tex]\angle 5 $ and \angle 13[/tex] share the same corner along transversal q that cuts across lines r and s. Hence, both angles correspond to each other.
- The reason for [tex]5 \angle \cong \angle 13[/tex] is: corresponding angles for lines r and s that is cut by traversal q
2. [tex]\angle 10 $ and \angle 14[/tex] share the same corner along transversal s that cuts across lines p and q. Hence, both angles correspond to each other.
- The reason for [tex]10 \angle \cong \angle 14[/tex] is: corresponding angles for lines p and q that is cut by traversal s
3. [tex]\angle 13 $ and \angle 16[/tex] share the same vertex angle and are just directly opposite each other. Thus, they are vertically opposite each other and are therefore equal by the vertical angles theorem.
- The reason for [tex]13 \angle \cong \angle 16[/tex] is: vertical angles theorem.
4. [tex]\angle 1 $ and \angle 5[/tex] share the same corner along transversal r that cuts across lines p and q. Hence, both angles correspond to each other.
- The reason for [tex]1 \angle \cong \angle 5[/tex] is: corresponding angles for lines p and q that is cut by traversal r.
In summary, the given pairs of congruent angles can be matched with their reasons as follows:
- [tex]5 \angle \cong \angle 13[/tex] is: corresponding angles for lines r and s that is cut by traversal q
- [tex]10 \angle \cong \angle 14[/tex] is: corresponding angles for lines p and q that is cut by traversal s
- [tex]13 \angle \cong \angle 16[/tex] is: vertical angles theorem.
- [tex]1 \angle \cong \angle 5[/tex] is: corresponding angles for lines p and q that is cut by traversal r.
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