QUESTION IMAGE
Question
lines e and f are parallel. the m∠9 = 80° and m∠5 = 55°. which angle measures are correct? select three options. \\( m\angle 2 = 125^\circ \\) \\( m\angle 3 = 55^\circ \\) \\( m\angle 8 = 55^\circ \\) \\( m\angle 12 = 100^\circ \\) \\( m\angle 14 = 100^\circ \\)
Step1: Analyze \( m\angle2 \)
\( \angle2 \) and \( \angle5 \) are same - side interior angles? No, wait, \( \angle2 \) and \( \angle3 \) are supplementary? Wait, \( \angle5 \) and \( \angle2 \): since lines \( e\) and \( f\) are parallel, and the transversal \( c\), \( \angle2 \) and \( \angle5 \) are same - side interior angles? No, \( \angle5 \) and \( \angle3 \) are alternate interior angles, so \( m\angle3 = m\angle5=55^{\circ}\). Then \( \angle2 \) and \( \angle3 \) are supplementary (linear pair), so \( m\angle2 = 180^{\circ}-m\angle3=180 - 55=125^{\circ}\).
Step2: Analyze \( m\angle3 \)
\( \angle3 \) and \( \angle5 \) are alternate interior angles (because lines \( e\parallel f\) and transversal \( c\) cuts them). By the alternate interior angles theorem, \( m\angle3=m\angle5 = 55^{\circ}\).
Step3: Analyze \( m\angle8 \)
\( \angle5 \) and \( \angle8 \): \( \angle5 \) and \( \angle7 \) are vertical angles? No, \( \angle5 \) and \( \angle8 \) are same - side interior angles? Wait, \( \angle5 \) and \( \angle6 \) are supplementary, \( \angle6 \) and \( \angle8 \) are vertical angles? No, \( \angle5 \) and \( \angle8 \): actually, \( \angle5 \) and \( \angle7 \) are vertical angles, \( \angle7 \) and \( \angle8 \) are supplementary. Wait, \( m\angle5 = 55^{\circ}\), \( \angle5 \) and \( \angle8 \): \( \angle5 \) and \( \angle8 \) are same - side interior angles? No, let's correct. \( \angle5 \) and \( \angle3 \) are alternate interior, \( \angle3 \) and \( \angle1 \) are vertical, \( \angle2 \) and \( \angle4 \) are vertical. For \( \angle8 \): \( \angle5 \) and \( \angle8 \): since \( \angle5 \) and \( \angle7 \) are vertical (\( m\angle7 = 55^{\circ}\)), and \( \angle7+\angle8 = 180^{\circ}\) (linear pair), so \( m\angle8=180 - 55 = 125^{\circ}\), so \( m\angle8 = 55^{\circ}\) is wrong.
Step4: Analyze \( m\angle12 \)
\( \angle9 = 80^{\circ}\), \( \angle9 \) and \( \angle12 \): \( \angle9 \) and \( \angle11 \) are supplementary (linear pair), \( \angle11 \) and \( \angle12 \) are vertical? No, \( \angle9 \) and \( \angle12 \): since lines \( e\parallel f\) and transversal \( d\), \( \angle9 \) and \( \angle13 \) are alternate interior, \( \angle13 \) and \( \angle14 \) are supplementary? Wait, \( \angle9 \) and \( \angle12 \): \( \angle9 \) and \( \angle12 \) are same - side interior? No, \( \angle9 \) and \( \angle10 \) are supplementary, \( \angle10 \) and \( \angle12 \) are vertical? No, \( \angle9 = 80^{\circ}\), \( \angle9 \) and \( \angle12 \): actually, \( \angle9 \) and \( \angle12 \) are same - side interior? No, \( \angle9 \) and \( \angle11 \) are supplementary (\( m\angle11=180 - 80 = 100^{\circ}\)), and \( \angle11 \) and \( \angle12 \) are vertical? No, \( \angle11 \) and \( \angle12 \) are adjacent supplementary? Wait, no, \( \angle9 \) and \( \angle12 \): since \( \angle9 \) and \( \angle13 \) are alternate interior (\( m\angle13 = 80^{\circ}\)), \( \angle13 \) and \( \angle14 \) are supplementary (\( m\angle14 = 100^{\circ}\)), \( \angle12 \) and \( \angle14 \) are vertical? No, \( \angle12 \) and \( \angle10 \) are vertical, \( \angle9 \) and \( \angle10 \) are supplementary, so \( m\angle10 = 100^{\circ}\), \( m\angle12=m\angle10 = 100^{\circ}\)? Wait, no, \( \angle9 \) and \( \angle12 \): \( \angle9 \) and \( \angle12 \) are corresponding angles? No, transversal \( d\), lines \( e\) and \( f\) are parallel. \( \angle9 \) is on line \( e\), \( \angle12 \) is on line \( e\), \( \angle9 \) and \( \angle12 \): \( \angle9 \) and \( \angle11 \) are supplementary (\( m\angle11 = 100^{\circ}\)), \( \angle1…
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A. \( m\angle2 = 125^{\circ}\)
B. \( m\angle3 = 55^{\circ}\)
E. \( m\angle14 = 100^{\circ}\)