Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

VECTOR CALCULUS


For the functionφ=x^2 y+yzat the point(1, 2 ,−1), find its rate of change with distance
in the directiona=i+2j+3k. At this same point, what is the greatest possible rate of
change with distance and in which direction does it occur?

The gradient ofφis given by (10.26):


∇φ=2xyi+(x^2 +z)j+yk,
=4i+2k at the point (1, 2 ,−1).

The unit vector in the direction ofaisˆa=√ 141 (i+2j+3k), so the rate of change ofφ
with distancesin this direction is, using (10.30),



ds

=∇φ·aˆ=

1



14


(4+6)=


10



14


.


From the above discussion, at the point (1, 2 ,−1)dφ/dswill be greatest in the direction
of∇φ=4i+2kand has the value|∇φ|=



20 in this direction.

We can extend the above analysis to find the rate of change of a vector

field (rather than a scalar field as above) in a particular direction. The scalar


differential operatorˆa·∇can be shown to give the rate of change with distance


in the directionaˆof the quantity (vector or scalar) on which it acts. In Cartesian


coordinates it may be written as


ˆa·∇=ax


∂x

+ay


∂y

+az


∂z

. (10.31)


Thus we can write the infinitesimal change in an electric field in moving fromr


tor+drgiven in (10.20) asdE=(dr·∇)E.


A second interesting geometrical property of∇φmay be found by considering

the surface defined byφ(x, y, z)=c,wherecis some constant. Ifˆtis a unit


tangent to this surface at some point then clearlydφ/ds= 0 in this direction


and from (10.29) we have∇φ·ˆt= 0. In other words,∇φis a vector normal to


the surfaceφ(x, y, z)=cat every point, as shown in figure 10.5. Ifnˆis a unit


normal to the surface in the direction of increasingφ(x, y, z), then the gradient is


sometimes written


∇φ≡

∂φ
∂n

nˆ, (10.32)

where∂φ/∂n≡|∇φ|is the rate of change ofφin the directionˆnand is called


thenormal derivative.


Find expressions for the equations of the tangent plane and the line normal to the surface
φ(x, y, z)=cat the pointPwith coordinatesx 0 ,y 0 ,z 0. Use the results to find the equations
of the tangent plane and the line normal to the surface of the sphereφ=x^2 +y^2 +z^2 =a^2
at the point(0, 0 ,a).

A vector normal to the surfaceφ(x, y, z)=cat the pointPis simply∇φevaluated at that
point; we denote it byn 0 .Ifr 0 is the position vector of the pointPrelative to the origin,

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