Question 2.11.5: Consider a piston sliding without friction in a cylinder of ...

1. In the equilibrium state α, where α ∈ {i, f}, the volume of the ideal gas is given by,

V_α=Ax_α.

and the pressure of the ideal gas is given by

pα=-\frac{F_α}{A} =\frac{k}{A} (x_α-x_0).

where F_α is the projection on the x-axis of the elastic force acting on the spring. Given that the process is reversible, relation (2.35)

\dot{V}=-A.ν.

implies that the pressure of the ideal gas is equal to the pressure exerted by the spring. The temperature of the ideal gas is given by,

T_α=\frac{p_αVα}{NR}=\frac{k}{NR} (x_α-x_0)x_α.

2. The equations for the volume and the pressure imply,

dp=-\frac{1}{A}dF=\frac{k}{A}dx=\frac{k}{A^2}dV .

Thus,

\frac{dp}{dV}=\frac{k}{A^2}=const.

3. Hence, the pressure p is expressed in terms of the volume V as,

p=\frac{k}{A^2}(V-V_0).

The work −W_{if} performed by the ideal gas on the spring is given in terms of V_i and V_f by,

-W_{if}=\int_{V_i}^{V_f}{pdV} =\frac{k}{A^2} \int_{V_i}^{V_f}{(V-V_0)dV}=\frac{k}{2A^2} (V^{2}_{f}-V^{2}_{i} )-\frac{k}{A^2} V_0(V_{f}-V_{i} ).

This result can be recast in terms of x as,

-W_{if}=\frac{k}{2} (x^{2}_{f}-x^{2}_{i} )-kx_0(x_f-x_i)=\frac{k}{2}\Biggl((x_f-x_0)^2-(x_i-x_0)^2\Biggr).

The work performed by the ideal gas on the spring is equal to the variation of the elastic energy of the spring during the compression. In other words, the work of the spring is entirely used to compress the gas. This is a consequence of the fact that the thermal expansion of the gas is a reversible process.

4. The internal energy variation ΔU_{if} is given by,

ΔU_{if}=cNR(T_f-T_i)=ck \Biggl((x_f-x_0)x_f-(x_i-x_0)x_i\Biggr).