A cylidrical wooden piece of cork floats in a liquid of density `sigma`. The cork is depressed slightly and released. Show that the cork will oscillate up and down simple harmonicaly with a period.
`T=2pisqrt((rhoh)/(sigmag))`, where `rho` is the density of the cork.

A cylindrical piece of cork of density of base area Aand height h floats in a liquid of density rho_l . The cork is depressed slightly and then released. Show that the cork oscillates up and down simple harmonically with a period T= 2pisqrt((hrho)/(rho_1g)) where p is the density of cork. (Ignore damping due to viscosity of the liquid)

A cylindrical piece of cork of density of base area A and height h floats in a liquid of density p_(l) . The cork is depressed slightly and then released. Show that the cork oscillates up and down simple harmonically with a period T=2pisqrt((hp)/(p_(1)g)) where p is the density of cork. (Ignore damping due to viscosity of the liquid).

A cylindrical piece of cork of density of base area A and height h floats in a liquid of density p_(l) . The cork is depressed slightly and then released. Show that the cork oscillates up and down simple harmonically with a period T=2pisqrt((hp)/(p_(1)g)) where p is the density of cork. (Ignore damping due to viscosity of the liquid).

A cylindrical piece of cork of base area A and height h floats in a liquid of density rho_(1) . The cork is depressed slightly and then released. Show that the cork oscillates up and down simple harmonically with a period T=2pisqrt((hrho)/(rho_(1)g))