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Prove: AQRS ATRUSTATEMENTS1. T is the midpoint of QRU is the midpoint of RSTROT TR+QT-QR2.I3.RUUS, RU+US-RSQR=QT+TR=TR+TR=2TRRS=RU+US= RU+RU=2RUQR 2RT RT=4. RS 2RU RUQR RT5, RSRU6.?P ATRU7.AQRS← PREVIOUS3QTUREASONSGivenDefinition of a midpointSubstitution and simplificationDivision property of equality,simplificationProperty of proportion frominterchangeabilityReflexive propertySAS similarity postulateS

Prove: AQRS ATRUSTATEMENTS1. T is the midpoint of QRU is the midpoint of RSTROT TR-example-1
User Chococroqueta
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1 Answer

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Given: Two similar triangles QRS and TRU

To Determine: The reflexive property to prove the similar triangles

Solution

We have been all that could lead to proving the similar triangles QRS and TRU

The space given has a the reason reflexive property

The reflexive property of equality states that a number is always equal to itself

From the image


\angle QRS\cong\angle TRU

Hence, the correct option is ∠QRS ≅ ∠ TRU, OPTION D

Prove: AQRS ATRUSTATEMENTS1. T is the midpoint of QRU is the midpoint of RSTROT TR-example-1
User Allen Hamilton
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