2.5: Exact and Inexact Differentials

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Many important thermochemical quantities can be expressed in terms of partial derivatives. Two important examples are the molar heat capacities \(C_p\) and \(C_V\) which can be expressed as

\[ C_p = \left(\dfrac{\partial H}{\partial T}\right)_p \nonumber \]

and

\[ C_V = \left(\dfrac{\partial U}{\partial T}\right)_V \nonumber \]

These are properties that can be measured experimentally and tabulated for many substances. These quantities can be used to calculate changes in quantities since they represent the slope of a surface (\(H\) or \(U\)) in the direction of the specified path (constant \(p\) or \(V\)). This allows us to use the following kinds of relationships:

\[ dH = \left(\dfrac{\partial H}{\partial T}\right)_p dT \nonumber \]

and

\[ \Delta H = \int \left(\dfrac{\partial H}{\partial T}\right)_p dT \nonumber \]

Because thermodynamics is kind enough to deal in a number of state variables, the functions that define how those variable change must behave according to some very well determined mathematics. This is the true power of thermodynamics!

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