Multiple integral
integral over a multi-dimensional region of a function of several variables From Wikipedia, the free encyclopedia
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In calculus and mathematical analysis, an integral is a way to calculate the limiting value a function with one variable will tend towards. Graphically, this can then be shown as the area under the graph of the function. In multivariate calculus, It is also possible to calculate integrals for functions with more than one variable. These integrals are commonly referred to as multiple integrals.
An integral for a function with two variables over a two-dimensional region, called double integral, can be shown as a surface in three dimensional space. Similarly, an integral for a function with three variables over a three-dimensional region, called triple integral, can be thought of as a hypervolume.
A double integral can also be used to define an integral over an arbitrary surface (surface integral), just like a triple integral can be used to define an integral over an arbitrary volume (volume integral).[1][2][3]
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Related pages
- Fubini's theorem
References
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