Let $O(0,0), P(3,4), Q(6,0)$ be the vertices of the triangle $OPQ$. The point $R$ inside the triangle $OPQ$ is such that the triangles $OPR, PQR, OQR$ are of equal area. The coordinates of $R$ are
- A$\left(\frac{4}{3}, 3\right)$
- B$\left(3, \frac{2}{3}\right)$
- C$\left(3, \frac{4}{3}\right)$
- D$\left(\frac{4}{3}, 2\right)$
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