# Wolfram Language & System 10.0 (2014)|Legacy Documentation

This is documentation for an earlier version of the Wolfram Language.
BUILT-IN WOLFRAM LANGUAGE SYMBOL

# Derivative

f'
represents the derivative of a function f of one argument.

Derivative[n1,n2,][f]
is the general form, representing a function obtained from f by differentiating times with respect to the first argument, times with respect to the second argument, and so on.

## DetailsDetails

• f' is equivalent to Derivative[1][f].
• f'' evaluates to Derivative[2][f].
• You can think of Derivative as a functional operator which acts on functions to give derivative functions.
• Derivative is generated when you apply D to functions whose derivatives the Wolfram Language does not know.
• The Wolfram Language attempts to convert Derivative[n][f] and so on to pure functions. Whenever Derivative[n][f] is generated, the Wolfram Language rewrites it as D[f[#],{#,n}]&. If the Wolfram Language finds an explicit value for this derivative, it returns this value. Otherwise, it returns the original Derivative form.
• Derivative[-n][f] represents the indefinite integral of f.
• Derivative[{n1,n2,}][f] represents the derivative of taken times with respect to . In general, arguments given in lists in f can be handled by using a corresponding list structure in Derivative.
• N[f'[x]] will give a numerical approximation to a derivative.

## ExamplesExamplesopen allclose all

### Basic Examples  (1)Basic Examples  (1)

Derivative of a defined function:

 Out[2]=

This is equivalent to :

 Out[3]=

Derivative at a particular value:

 Out[4]=

This is equivalent to :

 Out[5]=

The second derivative:

 Out[6]=

## TutorialsTutorials

Introduced in 1988
(1.0)
| Updated in 1999
(4.0)