Begin2.DVI

v =dr dt

=ρdˆeρ dt

+dρ dt

ˆeρ

=ρ

( dθ dt

ˆeθ+ sin θdφ dt

ˆeφ

) +dρ dt

ˆeρ

= ̇ρêρ+ρθ ̇êθ+ρφ ̇sin θêφ

(9 .38)

Here vρ= ̇ρis the radial component of the velocity ,vθ=ρθ ̇is the polar component of

velocity and vφ=ρφ ̇sin θis the azimuthal component of velocity.

Differentiating the velocity with respect to time gives the acceleration vector

a =dv dt

=d

(^2) r
dt^2
=d
dt
(
ρ ̇êρ+ρθ ̇êθ+ρφ ̇sin θêφ
)
= ̇ρd
êρ
dt

̈ρeˆρ+ (ρθ ̇)d
êθ
dt
+d
dt
(ρθ ̇)êθ+ (ρφ ̇sin θ)d
eˆφ
dt
+d
dt
(ρφ ̇sin θ)êφ
(9 .38)

Substitute the derivatives from equation (9.36) into the equation (9.38) and simplify

the results to show the acceleration vector in spherical coordinates is represented

a =dv dt

=d

(^2) r
dt^2
=( ̈ρ−ρ(θ ̇)^2 −ρ(φ ̇)^2 sin^2 θ)ˆeρ

(ρθ ̈+ 2 ̇ρθ ̇−ρ(φ ̇)^2 sin θcos θ)ˆeθ

(ρφ ̈sin θ+ 2 ̇ρφ ̇sin θ+ 2ρθ ̇φ ̇cos θ)eˆφ
(9 .39)

where ̇= dtd and ̈= dtd^22 is the dot notation for the first and second time derivatives.

In spherical coordinates an element of volume is given by dV =r^2 sin θ dr dθ dφ

Introduction to Potential Theory

In this section some properties of irrotational and/or solenoidal vector fields are

derived. Recall that a vector field F=F(x, y, z )which is continuous and differentiable

in a region Ris called irrotational if curl F =∇× F = 0 at all points of Rand it is

called solenoidal if div F=∇·F = 0 at all points of R.

Some properties of irrotational vector fields are now considered. If a vector field

F is an irrotational vector field, then ∇× F = 0 and under these conditions the

vector field F is derivable from a scalar field φ=φ(x, y, z) and can be calculated by

the operation^4

F=F(x, y, z ) = F 1 (x, y, z)ê 1 +F 2 (x, y, z )ê 2 +F 3 (x, y, z )ê 3 =∇φ= grad φ=∂φ
∂x

ˆe 1 +∂φ ∂y

eˆ 2 +∂φ ∂z

ˆe 3

Note that it you have a choice to solve for three quantities

F 1 (x, y, z ), F 2 (x, y, z ), F 3 (x, y, z )

(^4) Sometimes F =−grad φ. The selection of either a + or - sign in front of the gradient depends upon how
the vector field is being used.