Curl, Irrotational fields and potential function – HP 49g+ User Manual

Page 15-5

Curl

The curl of a vector field F(x,y,z) = f(x,y,z)i+g(x,y,z)j+h(x,y,z)k, is defined by
a “cross-product” of the del operator with the vector field, i.e.,

[ ]

[ ]

[ ]

)

,

,

(

)

,

,

(

)

,

,

(

z

y

x

h

z

y

x

g

z

y

x

f

z

y

x

curl

∂

∂

∂

∂

∂

∂

=

×

∇

=

k

j

i

F

F









∂

∂

−

∂

∂

+













∂

∂

−

∂

∂

+









∂

∂

−

∂

∂

=

z

g

y

h

x

h

z

f

z

g

y

h

k

j

i

The curl of vector field can be calculated with function CURL. For example,
for the function F(X,Y,Z) = [XY,X

2

+Y

2

+Z

2

,YZ], the curl is calculated as follows:

Irrotational fields and potential function

In an earlier section in this chapter we introduced function POTENTIAL to
calculate the potential function

φ(x,y,z) for a vector field, F(x,y,z) = f(x,y,z)i+

g(x,y,z)j+ h(x,y,z)k, such that F = grad

φ = ∇φ. We also indicated that the

conditions for the existence of

φ, were: ∂f/∂y = ∂g/∂x, ∂f/∂z = ∂h/∂x, and

∂g/∂z = ∂h/∂y. These conditions are equivalent to the vector expression

curl F =

∇×F = 0.

A vector field F(x,y,z), with zero curl, is known as an irrotational field. Thus,
we conclude that a potential function

φ(x,y,z) always exists for an irrotational

field F(x,y,z).