Omnp is a square a circle drawn with center of cut the square in x and y prove that triangle oxm is congruent to triangle oyp
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Join OX and OY
In ΔORX & ΔDPY
∠ORX=∠OPY=90
∘
OX=OY (radii)
OR=OP (side of square)
∴ΔORX≅ΔOPY by RHS
Hence, RX=PY (side of square)
Now QR=QP
QX+RX=QY+PY
⇒QX=QY
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