Wave function and Partial derivative: Difference between pages
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imported>TheForgotten5 m (Reworded "not invalid" into "valid", after the notation image.) |
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In [[ | In [[calculus]], an advanced branch of [[mathematics]], the '''partial derivative''' of a [[Function (mathematics)|function]] is basically the derivative of one named variable, and the unnamed variable of the function is held constant. In other words, the partial derivative takes the [[derivative]] of certain indicated variables of a function and doesn't differentiate the other variable(s). The notation | ||
<math>\frac{\partial f}{\partial x}</math> | |||
is usually used, although other notations are valid. Usually, although not in all cases, the partial derivative is taken in a multivariable function, (i.e., the function has three or more variables, whether independent or dependent variables). | |||
== Examples == | |||
If we have a function <math>f(x, y)=x^2+y</math>, then there are several partial derivatives of ''f(x, y)'' that are all equally valid. For example, | |||
:<math>\frac{\partial }{\partial y}[f(x, y)]=1</math> | |||
[[Category: | Or, we can do the following | ||
:<math>\frac{\partial}{\partial x}[f(x, y)]=2x</math> | |||
==Related pages== | |||
*[[Derivative (mathematics)]] | |||
*[[Calculus]] | |||
*[[Difference quotient]] | |||
[[Category:Calculus]] |
Latest revision as of 03:54, 28 March 2017
In calculus, an advanced branch of mathematics, the partial derivative of a function is basically the derivative of one named variable, and the unnamed variable of the function is held constant. In other words, the partial derivative takes the derivative of certain indicated variables of a function and doesn't differentiate the other variable(s). The notation
[math]\displaystyle{ \frac{\partial f}{\partial x} }[/math]
is usually used, although other notations are valid. Usually, although not in all cases, the partial derivative is taken in a multivariable function, (i.e., the function has three or more variables, whether independent or dependent variables).
Examples
If we have a function [math]\displaystyle{ f(x, y)=x^2+y }[/math], then there are several partial derivatives of f(x, y) that are all equally valid. For example,
- [math]\displaystyle{ \frac{\partial }{\partial y}[f(x, y)]=1 }[/math]
Or, we can do the following
- [math]\displaystyle{ \frac{\partial}{\partial x}[f(x, y)]=2x }[/math]