P-Q-R L(PQ)=5√3 L(QR)√12 And L(QR)
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Step-by-step explanation:
SOLUTION
GIVEN
P-Q-R and l(PQ) = 3√2, l(PR) = 5√2
TO DETERMINE
l(QR)
EVALUATION
Here I is representing d
Here it is given that : P-Q-R
So Q is the point between P and R
Here it is also given that
l(PQ) = 3√2, l(PR) = 5√2
Hence
\sf{I(QR) = I(PR) -I(PQ) \: \: }I(QR)=I(PR)−I(PQ)
\implies \sf{I(QR) = 5 \sqrt{2} -3 \sqrt{2} \: \: }⟹I(QR)=5
2
−3
2
\implies \sf{I(QR) = 2 \sqrt{2} \: \: }⟹I(QR)=2
2
FINAL ANSWER
\sf{I(QR) = 2 \sqrt{2} \: \: }I(QR)=2
2
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