\sect{Baruch's A22.} Consider a one-dimensional classical gas of ${N}$ particles in a length ${L}$ at temperature ${T}$. The particles have mass $m$ and interact via a 2-body "hard sphere" interaction (${x_{i}}$ is the position of the $i$-th particle): \begin{eqnarray} V(x_{i}- x_{j}) &=& \infty \qquad \qquad |x_{i}-x_{j}|a \nonumber \end{eqnarray} \begin{itemize} \item [(a)] Evaluate the exact free energy F(T,L,N). \item [(b)] Find the equation of state and identify the first virial coefficient; compare with its direct definition. \item [(c)] Show that the energy is ${E=Nk_{B}T/2}$. Why is there no effect of the interactions on ${E}$ ?\\ \end{itemize} %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%