File:Surface integral - definition.svg
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Summary
| Description |
English: Diagram illustrating how a surface integral of a vector field over a surface is defined. It shows an arbitrary surface S with a vector field F, (red arrows) passing through it. The surface is divided into small (infinitesimal) regions dS. The surface integral is the sum of the perpendicular component of the field passing through each region multiplied by the area dS. The perpendicular component of the field is equal to the dot product of the field F(x) with the unit normal vector n(x) at the point dS:
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| Date | |
| Source | Own work |
| Author | Chetvorno |
| SVG development |  This diagram was created with Inkscape.  This diagram uses embedded text that can be easily translated using a text editor. |
Licensing
I, the copyright holder of this work, hereby publish it under the following license:
 
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This file is made available under the Creative Commons CC0 1.0 Universal Public Domain Dedication. |
| The person who associated a work with this deed has dedicated the work to the public domain by waiving all of their rights to the work worldwide under copyright law, including all related and neighboring rights, to the extent allowed by law. You can copy, modify, distribute and perform the work, even for commercial purposes, all without asking permission.
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| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 00:20, 26 July 2023 | | 814 × 368 (115 KB) | wikimediacommons>Chetvorno | Modified SVG markup by hand so it passes W3C validator |
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