The following calculations are for EM radiation, for which the internal energy U=Vu, where u=u(T)is the total energy density. a) Show that (∂S/∂T)_v=V/T(du/dT), and and (∂S/∂V)T=(u+P)/T Note: use the answers in part a in part b and c b) Using Stefan-Bnoltzman law, u=aT^4, where a is a constant, integrate the expression for (∂S/∂T)_v, and obtain an expression for S in terms of a,T and V. Hint: use Planck’s statement of the 3rd law of thermodynamics: lim_T→0 S=0 to evaluate the constant of integration. c) Assumming P=bT^n, where b and n are constants, use the equality ∂^2S/∂T∂V=∂^2S/∂V∂T to obtain values for b and n. Note: b has the same units as a
