changes.mady.by.user Arthur Aslanyan (Nafta College)
Saved on Jul 25, 2020
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c(p) = \frac{1}{p} - \frac{1}{Z} \frac{dZ}{dp}
Z(p) = \frac{Z_0}{p_0} \cdot p \cdot \exp \left[ - \int_{p_0}^p c(p) dp \right]
qwe
c = - \frac{1}{V} \frac{dV}{dp} = - \frac{d}{dp} \left( \ln V \right) \rightarrow \ln \frac{V}{V_0} = - \int_{p_0}^p c(p) dp
Substituting