s is the midpoint of $\overline{rt}$, $\overline{ru} \cong \overline{sv}$, and $\overline{tv} \cong \overline{su}$. complete the proof that $\triangle rsu \cong \triangle stv$.

| statement | reason |
| --- | --- |
| 1. s is the midpoint of $\overline{rt}$ | given |
| 2. $\overline{ru} \cong \overline{sv}$ | given |
| 3. $\overline{tv} \cong \overline{su}$ | given |
| 4. $\overline{rs} \cong \overline{st}$ | definition of midpoint |
| 5 | |

Question

s is the midpoint of $\overline{rt}$, $\overline{ru} \cong \overline{sv}$, and $\overline{tv} \cong \overline{su}$. complete the proof that $\triangle rsu \cong \triangle stv$.

| statement | reason |
| --- | --- |
| 1. s is the midpoint of $\overline{rt}$ | given |
| 2. $\overline{ru} \cong \overline{sv}$ | given |
| 3. $\overline{tv} \cong \overline{su}$ | given |
| 4. $\overline{rs} \cong \overline{st}$ | definition of midpoint |
| 5 |  |

Accepted Answer

# Answer:
$	riangle RSU \cong 	riangle STV$
# Explanation:
## Step1: List given side congruences
1.  $\overline{RU} \cong \overline{SV}$ (Given)
2.  $\overline{TV} \cong \overline{SU}$ (Given)
3.  $\overline{RS} \cong \overline{ST}$ (Definition of midpoint)
## Step2: Apply SSS congruence rule
If all three pairs of corresponding sides of two triangles are congruent, the triangles are congruent by the Side-Side-Side (SSS) Congruence Postulate.
So, $	riangle RSU \cong 	riangle STV$ by SSS.

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QUESTION IMAGE

Question

Explanation:

Step1: List given side congruences

Step2: Apply SSS congruence rule

Answer:

statement	reason
2. \\(\overline{ru} \cong \overline{sv}\\)	given
3. \\(\overline{tv} \cong \overline{su}\\)	given
4. \\(\overline{rs} \cong \overline{st}\\)	definition of midpoint
5