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Question

Question 1
In a ΔPQR, PR2PQ2=QR2 and M is a point on side PR such that QMPR. Prove that QM2=PM×MR .

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Solution

Given, in ΔPQR,
PR2PQ2=QR2 and QMPR
We need to prove that QM2=PM×MR

Proof
Since, PR2PQ2=QR2
PR2=PQ2+QR2


So, ΔPQR is right angled triangle at Q.
In ΔQMR and ΔPMQ,
M=M [Equal90]
MQR=QPM [ equal equal to 90R]
ΔQMRΔPMQ [by AAA similarity criterion ]
Now, using property of area of similar triangles, we get
ar(ΔQMR)ar(ΔPMQ)=(QM)2(PM)2
12×RM×QM12×PM×QM=(QM)2(PM)2 [area of triangle=12×base×height]
QM2=PM×RM

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