Symbols:Greek/Delta/Arbitrarily Small Change

Arbitrarily Small Change

 * $\delta x$

$\delta x$ is often used to mean an arbitrarily small change or difference in the value of the (real) variable $x$.

For example, for the definition of derivative:


 * $\ds \dfrac {\d y} {\d x} = \lim_{\delta x \mathop \to 0} \dfrac {\delta y} {\delta x} = \lim_{x_2 - x_1 \mathop \to 0} \dfrac {y_2 - y_1} {x_2 - x_1} = \lim_{\text{change in } x \mathop \to 0} \dfrac {\text{change in } y} {\text{change in } x}$