Begin2.DVI

partial derivative ∂u∂
r .Similarly, the curves
r =
r (c 1 , v, c 3 )and
r =
r (c 1 , c 2 , w )are coor-

dinate curves and have the respective tangent vectors ∂
r∂v and ∂w∂
r .One can calculate

the magnitude of these tangent vectors by defining the scalar magnitudes as

h 1 =hu=|

∂
r

∂u |, h^2 =hv=|

∂
r

∂v |, h^3 =hw=|

∂
r

∂w |. (8 .75)

The unit tangent vectors to the coordinate curves are given by the relations

ˆeu=^1

h 1

∂
r

∂u

, ˆev=^1

h 2

∂
r

∂v

, eˆw=^1

h 3

∂
r

∂w

. (8 .76)

The coordinate surfaces and coordinate curves may be formed from the equations

(8.68) and are illustrated in figure 8-15

Figure 8-15. Coordinate curves and surfaces.

Consider the point u=c 1 , v =c 2 , w =c 3 in the curvilinear coordinate system. This

point can be viewed as being created from the intersection of the three surfaces

u=u(x, y, z) = c 1

v=v(x, y, z ) = c 2

w=w(x, y, z) = c 3

obtained from the inverse transformation equations (8.69).

For example, the figure 8-15 illustrates the surfaces u=c 1 and v=c 2 intersecting

in the curve
r =
r (c 1 , c 2 , w ).The point where this curve intersects the surface w=c 3 ,

is (c 1 , c 2 , c 3 ).