QUESTION IMAGE
Question
given: $overline{be}paralleloverline{cd}$, $overline{be}congoverline{cd}$, $overline{ae}congoverline{ed}$
prove: $overline{ab}paralleloverline{ce}$
- $overline{be}paralleloverline{cd}$, $overline{be}congoverline{cd}$, $overline{ae}congoverline{ed}$ 1. given
- click here to insert 2. if two parallel lines are cut by a trans - versal, then their corresponding angles are congruent.
- $\triangle abecong\triangle ecd$ 3. click here to insert
Step1: Identify corresponding angles
Since $\overline{BE}\parallel\overline{CD}$, when cut by transversal $\overline{AD}$, $\angle AEB$ and $\angle DEC$ are corresponding angles, so $\angle AEB\cong\angle DEC$.
Step2: Prove triangle congruence
We have $\overline{BE}\cong\overline{CD}$, $\angle AEB\cong\angle DEC$, and $\overline{AE}\cong\overline{ED}$ (given). By the Side - Angle - Side (SAS) congruence postulate, $\triangle ABE\cong\triangle ECD$.
Step3: Use CPCTC and parallel - line criteria
Since $\triangle ABE\cong\triangle ECD$, by CPCTC, $\angle BAE\cong\angle CED$. These are alternate - interior angles for lines $\overline{AB}$ and $\overline{CE}$ with transversal $\overline{AD}$. If alternate - interior angles are congruent, then $\overline{AB}\parallel\overline{CE}$.
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- $\angle AEB\cong\angle DEC$ (Corresponding - angles from $\overline{BE}\parallel\overline{CD}$)
- Side - Angle - Side (SAS) Congruence Postulate (Since $\overline{BE}\cong\overline{CD}$, $\angle AEB\cong\angle DEC$, $\overline{AE}\cong\overline{ED}$)
- $\angle BAE\cong\angle CED$; If two triangles are congruent, then their corresponding parts are congruent (CPCTC); $\overline{AB}\parallel\overline{CE}$; Alternate - interior angles are congruent, then the lines are parallel