A 1kg hollow sphere of volume .00419m^3 is released from rest at the bottom of a 2m deep pool of water (density of water is 1000kg/m^3). The sphere accelerates upwards and flies out of the pool. How high does it get above the pool before coming down. Ignore the brief time when the sphere is only partially submerged and assume there is no air or water resistance.
The Attempt at a Solution
When I drew the free body diagram, I have Buoyant force pushing up and mg pulling down.
B - mg = ma
I know B = Density_water * Volume displaced * g
I know m, so I solved for a, getting approximately 31.2 m/s^2
However, I don't know what to do now. I know that velocity is zero when it stops going up, but I can't find anything with v = v_0 - gt since I also starts from rest. y = y_0 + v_o*t + (1/2)gt^2 wasn't helpful either.
When I attempted energy conservation,
(1/2)mv^2 + mgh = (1/2)mv_f^2 + mgh_f
(1/2)mv^2 = mgh_f
However, my initial velocity is zero so it's not helpful either.
What should I do?