Suppose a black body as an enclosure of volume $V$ with a hole of section $A$. In the interior there is a photon gas, whose energy density $u$ is, at temperature $T$.
$$ u=cT^4$$
How can I show that the energy emitted per second is
$$E=\sigma A T^4$$
You just have to use the Stefan-Boltzmann Law. S-B Law is
$j=\sigma T^{4}$
the irradiance $j$ has dimensions of energy per area per time. So, to find the power (energy per time) you just have to multiply it with its surface area of emission, $A$.
$P=j A= A\sigma T^{4}$
Consider a volume of section $A$ and height $L=c_0\Delta t$ next to the hole. Here, $\Delta t$ is an arbitrarily small time.
In this volume $AL$, there is a photon energy $ALu\propto Au$
During $\Delta t$, all the photons in this volume which have a velocities aligned with the section normal will go through the hole. So their flux will also be $\propto Au$. You can then repeat this for all photons directions, meaning that there is always proportionality with $Au$. Hence your result. Now, if you want to find exactly the coefficient, then you have to carry out the integral over angles ...
