Summary of Directional Derivatives and the Gradient

A directional derivative represents a rate of change of a function in any given direction.
The gradient can be used in a formula to calculate the directional derivative.
The gradient indicates the direction of greatest change of a function of more than one variable.

Key Equations

Directional derivative (two dimensions)
$D_{\bf{u}} f(a,b)=\underset{h \to {0}}{\lim} \frac{f(a+h\cos{\theta}, b+h\sin{\theta})-f(a,b)}{h}$ or $D_{\bf{u}} f(x,y)=f_{x}(x,y)\cos{\theta}+f_{y}(x,y)\sin{\theta}$
Gradient (two dimensions)
$\nabla f(x,y)=f_{x}(x,y){\bf{i}}+f_{y}(x,y){\bf{j}}$
Gradient (three dimensions)
$\nabla f(x,y,z)=f_{x}(x,y,z){\bf{i}}+f_{y}(x,y,z){\bf{j}}+f_{z}(x,y,z){\bf{k}}$
Directional derivative (three dimensions)
$\begin{array}{c} D_{\bf{u}} f(x,y,z) &=\nabla f(x,y,z)\cdot{\bf{u}} \hfill \\ \hfill &=f_{x}(x,y,z)\cos{\alpha}+f_{y}(x,y,z)\cos{\beta}+f_{z}(x,y,z)\cos{\gamma}\end{array}$

directional derivative: the derivative of a function in the direction of a given unit vector

gradient: the gradient of the function $f(x,y)$ is defined to be $\nabla f(x,y)=(\partial{f}{/}\partial{x}){\bf{i}}+(\partial{f}{/}\partial{y}){\bf{j}}$ which can be generalized to a function of any number of independent variables