Cauchy Mean Value Theorem/Also presented as

Cauchy Mean Value Theorem: Also presented as
The Cauchy Mean Value Theorem can also be found presented as:


 * $\exists \xi \in \openint a b: \map {f'} \xi \paren {\map g b - \map g a} = \map {g'} \xi \paren {\map f b - \map f a}$

where:
 * $f$ and $g$ are continuous real functions on $\closedint a b$ and differentiable on $\openint a b$
 * $\forall x \in \openint a b: \map {g'} x \ne 0$.