[Answer] Which statement proves that the diagonals of square PQRS are perpendicular bisectors of each other?

Answer: d. The midpoint of both diagonals is (4 1/2 5 1/2) the slope of RP is 7 and the slope of SQ is -1/7

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Which statement proves that the diagonals of square PQRS are perpendicular bisectors of each other? The length of SP PQ RQ and SR are each 5. The slope of SP and RQ is and the slope of SR and PQ is . The length of SQ and RP are both . The midpoint of both diagonals is the slope of RP is 7 and the slope of SQ is . Follow. The midpoint of both diagonals is the slope of RP is 7 and the slope of SQ is . Answer by ikleyn(28186) ( Show Source ): You can put this solution on YOUR website! Tue Nov 19 2019 · Which statement proves that the diagonals of square PQRS are perpendicular bisectors of each other ? The length of SP PQ RQ and SR are each 5. The slope of SP and ... d. The midpoint of both diagonals is ( 4 1/2 5 1/ 2 ) the slope of RP is 7 and the slope of SQ is -1/7 Prove the diagonals of the square with vertices P(0 4) Q(4 4) R(0 0) and S(4 0) are perpendicular bisectors of each other . Step 1: Calculate the slope of the diagonals . The slope of diagonal PS is __. The slope of diagonal QR is __. Step 2: Calculate the midpoint of the diagonals . The midpoint of PS is __. The midpoint of QR is __. If you are talking a...

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