Mathematics-Online lexicon: Total Derivative

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	Mathematics-Online lexicon:
	Total Derivative

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overview

A real function $f:\mathbb{R}^n\to\mathbb{R}^m$ is called differentiable in

, if

$\displaystyle f(x+h) = f(x)+f^\prime(x)h + o(\vert h\vert)$

for $\vert h\vert\to0$ .

The total derivative $f^{\prime}$ is the Jacobi matrix consisting of the partial derivatives of :

$\begin{displaymath} f^\prime=\operatorname{J}f= \frac{\partial(f_1,\ldots,f_n)... ...tial_1 f_m & \dots & \partial_n f_m \end{array} \right) \,. \end{displaymath}$

If is a scalar function (i.e. ) the total derivative is called the gradient of ,

$\displaystyle f^\prime = \left(\operatorname{grad}\,f\right)^{\operatorname t}\,.$

For the parametrization of a curve (

) it is called the tangent vector.

()

Annotation:

Beweis: Zusammenhang mit partiellen Ableitungen (german)

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automatically generated 5/30/2011