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Question
triangle proofs
complete the proof above by ordering the reasons below:
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Step1: Alternate - interior angles
Since \(ABDC\) is a parallelogram, \(AB\parallel CD\), so \(\angle BAC=\angle DCE\) (alternate - interior angles).
Step2: Opposite sides of parallelogram
In parallelogram \(ABDC\), \(AB = CD\) (opposite sides of a parallelogram are equal).
Step3: Definition of mid - point
\(C\) is the mid - point of \(AE\), so \(AC=EC\).
Step4: Side - Angle - Side (SAS)
With \(AB = CD\), \(\angle BAC=\angle DCE\), and \(AC = EC\), \(\triangle ABC\cong\triangle CDE\) by SAS congruence criterion.
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- Alternate - interior angles; 2. Opposite sides of parallelogram; 3. Definition of mid - point; 4. Side - Angle - Side (SAS)