complete the proofs using the most appropriate method. some may require cpctc.
7. given: $\angle bac \cong \angle edc$, $\overline{bc} \cong \overline{ec}$
prove: $\delta abc \cong \delta dec$
\begin{tabular}{|l|l|}
\hline statements & reasons \\
\hline 1. $\angle bac \cong \angle edc$ & 1. given \\
\hline 2. $\overline{bc} \cong \overline{ec}$ & 2. given \\
\hline 3. & 3. \\
\hline 4. & 4. \\
\hline \end{tabular}

Question

complete the proofs using the most appropriate method. some may require cpctc.
7. given: $\angle bac \cong \angle edc$, $\overline{bc} \cong \overline{ec}$
prove: $\delta abc \cong \delta dec$
\begin{tabular}{|l|l|}
\hline statements & reasons \\
\hline 1. $\angle bac \cong \angle edc$ & 1. given \\
\hline 2. $\overline{bc} \cong \overline{ec}$ & 2. given \\
\hline 3.  & 3.  \\
\hline 4.  & 4.  \\
\hline \end{tabular}

Accepted Answer

# Explanation:
## Step1: Identify vertical angles
$\angle ACB \cong \angle DCE$
## Step2: State vertical angles theorem
Vertical angles are congruent.
## Step3: State triangle congruence
$	riangle ABC \cong 	riangle DEC$
## Step4: Apply AAS congruence rule
Two angles and a non-included side of one triangle are congruent to the corresponding parts of the other triangle.

# Answer:
| Statements | Reasons |
|------------|---------|
| 1. $\angle BAC \cong \angle EDC$ | 1. Given |
| 2. $\overline{BC} \cong \overline{EC}$ | 2. Given |
| 3. $\angle ACB \cong \angle DCE$ | 3. Vertical Angles Theorem |
| 4. $	riangle ABC \cong 	riangle DEC$ | 4. AAS Congruence Rule |

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QUESTION IMAGE

Question

Explanation:

Step1: Identify vertical angles

Step2: State vertical angles theorem

Step3: State triangle congruence

Step4: Apply AAS congruence rule

Answer:

Statements	Reasons
2. $\overline{BC} \cong \overline{EC}$	2. Given
3. $\angle ACB \cong \angle DCE$	3. Vertical Angles Theorem
4. $\triangle ABC \cong \triangle DEC$	4. AAS Congruence Rule