10.7 VECTOR OPERATORS
φ=constant∇φaP
Q
dφ
dsin the directionaθFigure 10.5 Geometrical properties of∇φ.PQgives the value ofdφ/dsin
the directiona.then the total derivative ofφwith respect toualong the curve is simply
dφ
du=∇φ·dr
du. (10.28)
In the particular case where the parameteruis the arc lengthsalong the curve,
the total derivative ofφwith respect tosalong the curve is given by
dφ
ds=∇φ·ˆt, (10.29)where ˆtis the unit tangent to the curve at the given point, as discussed in
section 10.3.
In general, the rate of change ofφwith respect to the distancesin a particulardirectionais given by
dφ
ds=∇φ·aˆ (10.30)and is called the directional derivative. Sinceaˆis a unit vector we have
dφ
ds=|∇φ|cosθwhereθis the angle betweenˆaand∇φas shown in figure 10.5. Clearly∇φlies
in the direction of the fastest increase inφ,and|∇φ|is the largest possible value
ofdφ/ds. Similarly, the largest rate of decrease ofφisdφ/ds=−|∇φ|in the
direction of−∇φ.