I'm having difficulty proving that the percentage of the volume of an object above the surface of a liquid is
$$\frac{100(p_f-p_o)}{p_f}$$
given that buoyant force exerted by the liquid on the object is
$$F=p_fg\int_{-h}^0A(y)dy$$
where $A(y)$ is the cross sectional area of the object and the weight of the object is
$$W=p_og\int_{-h}^{L-h}A(y)dy$$
where $L$ is the height of the object and $h$ is the distance the object is submerged into the liquid.
I tried comparing the ratio of two volume of revolution integrals but didn't manage to get anywhere. Any help?