The volume $V$ of a sperical cap of height $h$ in a sphere of radius $r$ is $$V=\pi \left(h^2r-\frac{h^3}{3}\right).$$ The flow satisfies the differential equation $$\frac{dV}{dt}=-S\cdot v(t)$$ where $S$ is the area of the hole at the bottom and $v(t)=0.6 \sqrt{2gh(t)}$ the velocity of the flow through the hole. Hence, we obtain $$\frac{dV}{dt}=\pi \left(h^2r-\frac{h^3}{3}\right)'=\pi(2hr-h^2)h'=-0.6 S\sqrt{2gh}.$$ Now we separate the variables and integrate $$\pi\int_0^{r} \frac{2hr-h^2}{\sqrt{h}}\,dh=0.6 S\sqrt{2g}\cdot T \Rightarrow T=\frac{14\pi r^{5/2}}{15\cdot 0.6 S\sqrt{2g}}$$ where we used the conditions $h(0)=r$ (the hemisphere is full) and $h(T)=0$ (the hemisphere is empty).