Understanding Stokes' Theorem

It must be entirely smooth.

It must be piecewise-smooth.

It must have no edges.

It must be transparent.

It allows for the use of more complex surfaces.

It only applies to flat surfaces.

It simplifies the theorem.

It eliminates the need for boundaries.

The surface has no edges.

The slope changes gradually.

The surface is transparent.

The surface is flat.

It remains constant.

It changes gradually.

It jumps dramatically.

It becomes zero.

They ensure the surface is flat.

They make the surface transparent.

They allow for gradual slope changes.

They eliminate the need for boundaries.

It must intersect itself.

It must be entirely smooth.

It must be open.

It must be simple and closed.

It does not cross itself.

It is a straight line.

It is a square.

It is a circle.

It is always a straight line.

It has no edges.

It can be broken into smooth sections.

It is entirely smooth.

By ignoring the non-smooth parts.

By making it entirely smooth.

By breaking it into smooth segments.

By using only the smooth parts.

It allows for easier computation of line integrals.

It reduces the number of segments.

It eliminates the need for derivatives.

It makes the path longer.