Line integrals are always simpler than surface integrals.

Line integrals use two parameters, while surface integrals use one.

Line integrals are in 3D, while surface integrals are in 2D.

Line integrals are over curves, while surface integrals are over surfaces.

It simplifies the integral to a single variable.

It allows expressing the surface in terms of new variables u and v.

It eliminates the need for integration.

It converts the surface into a line.

Root of u squared minus v squared

Root of 1 plus u squared

Root of 1 plus v squared

Root of u squared plus v squared

Root of dz/dx squared plus dz/dy squared dx dy

Root of dz/dx plus dz/dy dx dy

Root of dz/dx squared minus dz/dy squared plus 1 dx dy

Root of dz/dx squared plus dz/dy squared plus 1 dx dy

It is perpendicular to the surface.

It is parallel to the surface.

It is tangent to the surface.

It is inside the surface.

The length of the surface.

The flux of the vector field through the surface.

The volume under the surface.

The area of the surface.

x, y, z

x squared, xy, z

x plus y, y squared, z

x minus y, y plus z, z