Given: ∠TUW ≅ ∠SRW; RS ≅ TU Prove: ∠RST ≅ ∠UTS Complete the paragraph proof: It is given that ∠TUW ≅ ∠SRW and RS ≅ TU. Because ∠RWS and ∠UWT are vertical angles and vertical angles are congruent, ∠RWS ≅ ∠UWT. Then, by AAS, △TUW ≅ △SRW. Because CPCTC, SW ≅ TW and WU ≅ RW. Because of the definition of congruence, SW = TW and WU = RW. If we add those equations together, SW + WU = TW + RW. Because of segment addition, SW + WU = SU and TW + RW = TR. Then by substitution, SU = TR. If segments are equal, then they are congruent, so SU ≅ TR. Because of , △TRS ≅ △SUT, and because of , ∠RST ≅ ∠UTS.
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Answer: The paragraph proof is mentioned below.Step-by-step explanation:Here, Given: ∠TUW ≅ ∠SRWAnd, RS ≅ TUWhere W is the intersection point of line segments TS and RU.We have to prove that: ∠RST ≅ ∠UTSSince, In triangles TUW and SRW∠RWS ≅ ∠UWT ( Because they are vertical angles)RS ≅ TU ( given) ∠TUW ≅ ∠SRW ( given) Then, by AAS, △TUW ≅ △SRW.Because of CPCTC, ∠RST ≅ ∠UTS
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