QUESTION IMAGE
Question
- given $overline{ab}paralleloverline{cd}$, prove that $mangle1 + mangle2 + mangle3=180$.
Step1: Use alternate - interior angles
Since $\overline{AB}\parallel\overline{CD}$, $\angle2$ and $\angle4$ are alternate - interior angles. So, $m\angle2 = m\angle4$.
Step2: Consider the straight - line angle
$\angle1$, $\angle3$, and $\angle4$ form a straight - line. The sum of angles on a straight - line is $180^{\circ}$. So, $m\angle1 + m\angle3+m\angle4=180^{\circ}$.
Step3: Substitute $\angle4$ with $\angle2$
Substitute $m\angle4$ with $m\angle2$ in the equation $m\angle1 + m\angle3+m\angle4=180^{\circ}$. We get $m\angle1 + m\angle2 + m\angle3=180^{\circ}$.
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The proof is completed as shown above, and $m\angle1 + m\angle2 + m\angle3 = 180^{\circ}$.