Green's Theorem: Difference between revisions
imported>Emil Gustafsson No edit summary |
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\oint\limits_{\partial \Omega}\mathbf{F}\cdot d\mathbf{S}=\iint\limits_\Omega (\nabla\times\mathbf{F})d\mathbf{A} | \oint\limits_{\partial \Omega}\mathbf{F}\cdot d\mathbf{S}=\iint\limits_\Omega (\nabla\times\mathbf{F})d\mathbf{A} | ||
</math> | |||
== Applications == | |||
=== Area Calculation === | |||
Green's theorem is very useful when it comes to calculating the area of a region. If we take <math>f(x,y)=y</math> and <math>g(x,y)=x</math>, the area of the region <math>\Omega\,</math>, with boundary <math>\partial\Omega</math> can be calculated by | |||
: <math> | |||
A=\frac{1}{2}\oint\limits_{\partial \Omega} xdy-ydx | |||
</math> | |||
This formula gives a relationship between the area of a region and the line integral around its boundary. | |||
If the curve is parametrisized as <math>\left(x(t),y(t)\right)</math>, the area formula becomes | |||
: <math> | |||
A=\frac{1}{2}\oint\limits_{\partial \Omega}(xy'-x'y)dt | |||
</math> | </math> |
Revision as of 01:26, 16 July 2008
Green's Theorem is a vector identity that is equivalent to the curl theorem in two dimensions. It relates the line integral around a simple closed curve with the doubble integral over the plane region .
The theorem is named after the british mathematician George Green. It can be applied to variuos fields in physics, among others flow integrals.
Mathematical Statement
Let be a region in with a positively oriented, piecewise smooth, simple closed boundary . and are functions defined on a open region containing and have continuous partial derivatives in that region. Then Green's Theorem states that
The theorem is equivalent to the curl theorem in the plane and can be written in a more compact form as
Applications
Area Calculation
Green's theorem is very useful when it comes to calculating the area of a region. If we take and , the area of the region , with boundary can be calculated by
This formula gives a relationship between the area of a region and the line integral around its boundary.
If the curve is parametrisized as , the area formula becomes