QUESTION IMAGE
Question
look at this diagram: if $overleftrightarrow{pr}$ and $overleftrightarrow{su}$ are parallel lines and $mangle rqo = 63^{circ}$, what is $mangle rqt$?
Step1: Identify linear - pair angles
$\angle RQO$ and $\angle RQT$ form a linear - pair.
Step2: Use linear - pair property
The sum of angles in a linear - pair is $180^{\circ}$. So, $m\angle RQO + m\angle RQT=180^{\circ}$.
Step3: Solve for $m\angle RQT$
Given $m\angle RQO = 63^{\circ}$, then $m\angle RQT=180^{\circ}-m\angle RQO$. Substitute $m\angle RQO = 63^{\circ}$ into the equation: $m\angle RQT = 180 - 63=117^{\circ}$.
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$117^{\circ}$