A surface with multiple points for each xy

A surface defined as a function of x and y

A surface with no defined function

A surface defined by a sphere

To simplify the calculation of the curl

To ensure the surface is a sphere

To allow the interchange of partial derivatives

To make the surface integral zero

It is a zero field

It is a constant field

It has continuous second-order derivatives

It has continuous first-order derivatives

The surface integral of F with the volume integral

The line integral of F with the gradient of F

The line integral of F with the surface integral of the curl of F

The line integral of F with the surface area

It is the center of the surface

It is the lowest point on the surface

It is the boundary of the surface

It is the highest point on the surface

To simplify the proof

To express the surface integral

To calculate the line integral

To find the volume of the surface

It adds the components of F

It multiplies the components of F

It crosses with the vector field F

It subtracts the components of F