Given: \overline{SV} is the angle bisector of \angle TSR and \angle STR \cong \angle SRT Prove: \overline{TS} \cong \overline{RS} STATEMENT REASON 1. \overline{SV} is the angle bisector of \angle TSR (26) 2. \angle STR \cong \angle SRT (27) 3. \overline{SV} \cong \overline{SV} (28) 4. \triangle TSV \cong \triangle RSV (29) 5. \overline{TS} \cong \overline{RS} (30) CHOICES A. Given B. Definition of angle bisector C. AAS Congruence Postulate D. SAS Congruence Postulate E. LL Theorem F. HA Theorem G. CPCTC H. Reflexive Property I. Symmetric Property
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∠LSTR = ∠ZSRT (Given: SV is the angle bisector of ∠TSR) Show more…
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