Math  /  Geometry

QuestionVV is the midpoint of RT\overline{R T} and SU\overline{S U}. Complete the proof that STVURV\triangle S T V \cong \triangle U R V. \begin{tabular}{|l|l|l|} \hline & Statement & Reason \\ \hline 1 & VV is the midpoint of RT\overline{R T} & Given \\ 2 & VV is the midpoint of SU\overline{S U} & Given \\ 3 & RUST\overline{R U} \cong \overline{S T} & Given \\ 4 & RVTV\overline{R V} \cong \overline{T V} & \\ 5 & SVUV\overline{S V} \cong \overline{U V} & \\ 6 & STVURV\triangle S T V \cong \triangle U R V & \\ \hline \end{tabular}

Studdy Solution
Using the Side-Side-Side (SSS) Congruence Postulate, we can conclude that STVURV \triangle S T V \cong \triangle U R V because all corresponding sides are congruent.
The proof is complete, and we have shown that STVURV \triangle S T V \cong \triangle U R V .

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