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Question
given: $overline{ab}paralleloverline{cd}$ and $overline{bd}$ bisects $overline{ac}$. prove: $\triangle abecong\triangle cde$. notes: quadrilateral properties are not permitted in this proof. step 1 statement $overline{ab}paralleloverline{cd}$, $overline{bd}$ bisects $overline{ac}$ reason given
Step1: Identify vertical angles
$\angle AEB=\angle CED$ (Vertical - angles are equal)
Step2: Use parallel - line property for alternate interior angles
Since $\overline{AB}\parallel\overline{CD}$, $\angle BAE=\angle DCE$ (Alternate interior angles are equal for parallel lines $\overline{AB}$ and $\overline{CD}$ with transversal $\overline{AC}$)
Step3: Use bisection property
Since $\overline{BD}$ bisects $\overline{AC}$, $AE = CE$ (Definition of a bisector)
Step4: Apply ASA congruence criterion
In $\triangle ABE$ and $\triangle CDE$, we have $\angle BAE=\angle DCE$, $AE = CE$, and $\angle AEB=\angle CED$. So, $\triangle ABE\cong\triangle CDE$ by the Angle - Side - Angle (ASA) congruence criterion.
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$\triangle ABE\cong\triangle CDE$ (by ASA)