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Surface Integrals of Vector Fields, Flux Integral |
A B C D E F G H I J K L M N O P Q R S T U V W X Y Z | overview |
Let be a surface in parametrized by
Then the surface integral of is defined as
Here denotes the unit normal into the direction of The integral depends on the direction of the normal and in this sense from the parametrization. For the other unit normal of the surface one gets
If and are parametrizations of such that the normal vectors and have the same direction then the corresponding surface integrals are equal (this justifies the used notation).
Physical interpretation: The surface integral gives the amount of fluid passing through the surface per unit time.
This explains why a surface integral of a vector field is also called the flux of the vector field through the surface or why surface integrals are simply called flux integrals.
The conditions on the smoothness of und may be weakened using suitable limit considerations.
Example:
automatically generated 7/ 5/2005 |