Definition:Derivative/Higher Derivatives/Third Derivative

Definition
Let $f$ be a real function which is twice differentiable on an open interval $I$.

Let $f''$ denote the second derivate.

Then the third derivative $f'''$ is defined as:
 * $f' := \dfrac {\mathrm d} {\mathrm d x} f = \dfrac {\mathrm d} {\mathrm d x} \left({\dfrac{\mathrm d^2}{\mathrm d x^2} f}\right)$

Thus the third derivative is defined as the derivative of the second derivative.

If $f''$ is differentiable, then it is said that $f$ is triply differentiable, or thrice differentiable.

Also see

 * Definition:Differentiability Class
 * Definition:Order of Derivative