QUESTION IMAGE
Question
tu ≅ qv, st ≅ qr, and uv ≅ rs. complete the proof that δstu ≅ δrqv.
Step1: Identify given congruences
Given: $\overline{TU} \cong \overline{QV}$, $\overline{ST} \cong \overline{QR}$, $\overline{UV} \cong \overline{RS}$
Step2: Segment addition postulate for $\overline{RV}$
$\overline{RV} = \overline{UV} + \overline{RU}$ (Segment Addition Postulate)
Step3: Segment addition postulate for $\overline{SU}$
$\overline{SU} = \overline{RS} + \overline{RU}$ (Segment Addition Postulate)
Step4: Substitute congruent segments
Since $\overline{UV} \cong \overline{RS}$, substitute $\overline{UV}$ with $\overline{RS}$: $\overline{RV} = \overline{RS} + \overline{RU}$ (Substitution Property of Equality)
Step5: Transitive property for segments
$\overline{SU} = \overline{RV}$ (Transitive Property of Equality, from Steps 3 and 4)
Step6: SSS congruence criterion
$\triangle STU \cong \triangle RQV$ (SSS Congruence: $\overline{ST} \cong \overline{QR}$, $\overline{TU} \cong \overline{QV}$, $\overline{SU} \cong \overline{RV}$)
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| Statement | Reason |
|---|---|
| $\overline{ST} \cong \overline{QR}$ | Given |
| $\overline{UV} \cong \overline{RS}$ | Given |
| $\overline{RV} = \overline{UV} + \overline{RU}$ | Segment Addition Postulate |
| $\overline{SU} = \overline{RS} + \overline{RU}$ | Segment Addition Postulate |
| $\overline{RV} = \overline{RS} + \overline{RU}$ | Substitution Property of Equality |
| $\overline{SU} = \overline{RV}$ | Transitive Property of Equality |
| $\triangle STU \cong \triangle RQV$ | SSS Triangle Congruence Postulate |