Riassunto delle leggi di Maxwell

Prima	$\displaystyle \ensuremath{\left( \ensuremath{\frac{\partial{T}}{\partial{V}}} \right)_{\!S}}$	=	$\displaystyle -\ensuremath{\left( \ensuremath{\frac{\partial{P}}{\partial{S}}} \right)_{\!V}}$	vedere eq.	8
Seconda	$\displaystyle \ensuremath{\left( \ensuremath{\frac{\partial{T}}{\partial{P}}} \right)_{\!S}}$	=	$\displaystyle \ensuremath{\left( \ensuremath{\frac{\partial{V}}{\partial{S}}} \right)_{\!P}}$	vedere eq.	10
Terza	$\displaystyle \ensuremath{\left( \ensuremath{\frac{\partial{S}}{\partial{V}}} \right)_{\!T}}$	=	$\displaystyle \ensuremath{\left( \ensuremath{\frac{\partial{P}}{\partial{T}}} \right)_{\!V}}$	vedere eq.	11
Quarta	$\displaystyle \ensuremath{\left( \ensuremath{\frac{\partial{S}}{\partial{P}}} \right)_{\!T}}$	=	$\displaystyle -\ensuremath{\left( \ensuremath{\frac{\partial{V}}{\partial{T}}} \right)_{\!P}}$	vedere eq.	12