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OpenStudy (anonymous):
A student made the table shown below to prove that PQ is equal to RQ:Statements Justifications SQ = TQ Given m∠SQP = m∠TQR Given m∠RSQ = m∠PTQ Given m∠SQR = m∠SQP + m∠PQR Angle Addition Postulate m∠TQP = m∠TQR + m∠PQR Angle Addition Postulate m∠TQP = m∠SQP + m∠PQR Substitution m∠SQR = m∠TQP Transitive Property PQ = RQ CPCTC Provide the missing statement and justification in the proof. Using complete sentences, explain why the proof would not work without the missing step.
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OpenStudy (anonymous):
can you help mke
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