Photo Curl

This page evaluates the curl of a 2D or 3D vector field. That is, \(\nabla \times f = \left(\dfrac{\partial f_{z}}{\partial y} - \dfrac{\partial f_{y}}{\partial z}\right) \hat{\mathbf{i}} + \left(\dfrac{\partial f_{x}}{\partial z} - \dfrac{\partial f_{z}}{\partial x}\right) \hat{\mathbf{j}} + \left(\dfrac{\partial f_{y}}{\partial x} - \dfrac{\partial f_{x}}{\partial y}\right) \hat{\mathbf{k}}\)

Label Description / Your input
1
Coefficient of \(i\) i.e. vector in the direction of \(x\).
2
Coefficient of \(j\) i.e. vector in the direction of \(y\).
3
Coefficient of \(k\) i.e. vector in the direction of \(z\).

Photo Curl

Enter your valid inputs then click to display results.

Our applications use latest technologies to bring computational power to the web, and are the result of 10+ years of lecturing, training, research, programming and development.

Photo Curl

Enter your valid inputs then click to display Python syntax.

Our applications use latest technologies to bring computational power to the web, and are the result of 10+ years of lecturing, training, research, programming and development.