A curve in the first quadrant is such th...

A curve in the first quadrant is such that the slope of OP is twice the slope of the tangent drawn at P to the curve, where O is the origin and P is any general point on the curve. If the curve passes through (4, 2), then its equation is

`y=x^(2)-14`

`y^(2)=x`

`y=x^(3)-62`

`y=sin(x-4)+2`

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