The **derivative** of a function is a second function showing the rate of change of the dependent variable compared to the independent variable. It can be thought of as a graph of the slope of the function from which it is derived. The process of finding a derivative is called **differentiation**. The derivative of *y* with respect to *x* (denoted as *y*') is equal to

- $ y' = \lim _{\Delta x \rightarrow 0} \frac{\Delta y}{\Delta x} = \frac{\mathrm{d}x}{\mathrm{d}y}\, $

The inverse of differentiation is integration.

## Multivariable extensionsEdit

For multivariable scalar fields, either a gradient (a vector field representing the direction of greatest change) or directional derivative (a scalar representing the rate of change in a particular direction) can be taken. The two equivalents to derivation over a scalar field are divergence and curl.

## Derivatives in physicsEdit

- $ x'(t) = v(t) $
- $ v'(t) = a(t) $
- $ W'(d) = F(d) $
- $ W'(t) = P(t) $
- $ \nabla \cdot V = \vec{E} $
- f(x)=f'(X)

## See alsoEdit

- Table of derivatives
- Integration
- Derivative on Math wiki

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