Let \( \mathrm{M}\left(2, \frac{13}{8}\right) \) is the circumcentr...

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Let \( \mathrm{M}\left(2, \frac{13}{8}\right) \) is the circumcentre of \( \triangle \mathrm{PQR} \) whose sides \( \mathrm{PQ} \) and \( \mathrm{PR} \) are represented
W by the straight lines \( 4 x-3 y=0 \) and \( 4 x+y=16 \) respectively.
If \( \mathrm{A}, \mathrm{B} \) and \( \mathrm{C} \) are the midpoint of the sides \( \mathrm{PQ}, \mathrm{QR} \) and \( \mathrm{PR} \) of \( \triangle \mathrm{PQR} \) respectively, then the area of \( \triangle \mathrm{ABC} \) equals
(A) 1
(B) 2
(C) 3
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