A parabola on the yz-plane

A circle on the xy-plane

A straight line on the x-axis

The intersection of a plane and a cylinder

To find the divergence of the vector field

To determine the potential function

To evaluate the line integral over path C

To calculate the gradient of the vector field

It converts a surface integral into a line integral

It converts a line integral into a surface integral

It provides a method to find the potential function

It simplifies the calculation of divergence

A paraboloid above the path C

A cylinder enclosing the path C

A sphere surrounding the path C

A portion of the plane bounded by C

It is irrelevant to the problem

It determines the direction of the line integral

It affects the calculation of the curl

It ensures the correct application of Stokes' Theorem

A spinning top

A twisting bottle cap

A rolling ball

A swinging pendulum

It affects the direction of the normal vector

It changes the vector field's properties

It determines the surface's shape

It is irrelevant to the surface integral

Finding the parameterization of the surface

Determining the potential function

Solving the line integral directly

Calculating the divergence of the vector field

The potential function

The divergence of the vector field

The curl of the vector field

The gradient of the vector field

Finding the divergence

Calculating the line integral

Evaluating the double integral

Determining the potential function