Contour Integral/Examples/Circulation of Fluid

Example of Contour Integral
Let $\mathbf v$ be the velocity within a body $B$ of fluid as a point-function.

Let $\Gamma$ be a closed contour in $B$.

Let $\d \mathbf l$ be a small element of length of $\Gamma$ at a point $P$.

Then the circulation of $B$ over $\Gamma$ is given by the contour integral:
 * $\ds \int_\Gamma \mathbf v \cdot \d \mathbf l$