Proofs About Angles Practice

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Proofs About Angles Practice
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Two parallel, inclined lines labeled as m and n are separated by a distance. A diagonal line labeled as t intersects m and n at a bottom left to top right incline.

In the diagram, given  m∥n
 ,  m∠5=117°
 . Investigate the patterns of angles created when parallel lines are cut by a transversal to identify  m∠2
 .

(1 point)
m∠2=
°

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GPT-4o mini · Answer

To find $ m∠2 $ given that $ m∠5 = 117° $ and that lines $ m $ and $ n $ are parallel (denoted as $ m∥n $), we can use the properties of angles formed when parallel lines are intersected by a transversal. In this case, angle $ 5 $ and angle $ 2 $ are alternate interior angles. When two parallel lines are cut by a transversal, alternate interior angles are equal. Therefore, we can say: $$ m∠2 = m∠5 $$ Since $ m∠5 = 117° $, we have: $$ m∠2 = 117° $$ Thus, the answer is: $$ m∠2 = 117° $$