HP 50g Graphing Calculator User Manual

Page 15-7

produces the vector potential function

Φ

2

= [0, ZYX-2YX, Y-(2ZX-X)], which is

different from

Φ

1

. The last command in the screen shot shows that indeed F =

∇× Φ

2

. Thus, a vector potential function is not uniquely determined.

The components of the given vector field, F(x,y,z) = f(x,y,z)i+g(x,y,z)j
+h(x,y,z)k, and those of the vector potential function,

Φ(x,y,z) =

φ(x,y,z)i+ψ(x,y,z)j+η(x,y,z)k, are related by f = ∂η/∂y - ∂ψ/∂x, g = ∂φ/∂z - ∂η/

∂x, and h = ∂ψ/∂x - ∂φ/∂y.

A condition for function

Φ(x,y,z) to exists is that div F = ∇•F = 0, i.e., ∂f/∂x +

∂g/∂y + ∂f/∂z = 0. Thus, if this condition is not satisfied, the vector potential
function

Φ(x,y,z) does not exist. For example, given F = [X+Y,X-Y,Z^2], function

VPOTENTIAL returns an error message, since function F does not satisfy the
condition

∇•F = 0:

The condition

∇•F ≠ 0 is verified in the following screen shot: