11.5 SURFACE INTEGRALS
Find the vector area of the surface of the hemispherex^2 +y^2 +z^2 =a^2 ,z≥ 0 ,by
evaluating the line integralS=^12∮
Cr×draround its perimeter.The perimeterCof the hemisphere is the circlex^2 +y^2 =a^2 , on which we have
r=acosφi+asinφj,dr=−asinφdφi+acosφdφj.Therefore the cross productr×dris given by
r×dr=∣
∣
∣∣
∣
∣
ijk
acosφasinφ 0
−asinφdφ acosφdφ 0∣
∣
∣∣
∣
∣
=a^2 (cos^2 φ+sin^2 φ)dφk=a^2 dφk,and the vector area becomes
S=^12 a^2 k∫ 2 π0dφ=πa^2 k.11.5.3 Physical examples of surface integralsThere are many examples of surface integrals in the physical sciences. Surface
integrals of the form (11.8) occur in computing the total electric charge on a
surface or the mass of a shell,
∫
Sρ(r)dS, given the charge or mass densityρ(r).
For surface integrals involving vectors, the second form in (11.9) is the most
common. For a vector fielda, the surface integral
∫
Sa·dSis called theflux
ofathroughS. Examples of physically important flux integrals are numerous.
For example, let us consider a surfaceSin a fluid with densityρ(r) that has a
velocity fieldv(r). The mass of fluid crossing an element of surface areadSin
timedtisdM=ρv·dSdt. Therefore thenettotal mass flux of fluid crossingS
isM=
∫
Sρ(r)v(r)·dS. As a another example, the electromagnetic flux of energy
out of a given volumeVbounded by a surfaceSis
∮
S(E×H)·dS.
The solid angle, to be defined below, subtended at a pointOby a surface (closedor otherwise) can also be represented by an integral of this form, although it is
not strictly a flux integral (unless we imagine isotropic rays radiating fromO).
The integral
Ω=∫Sr·dS
r^3=∫Sˆr·dS
r^2, (11.11)gives thesolid angleΩsubtended atOby a surfaceSifris the position vector
measured fromOof an element of the surface. A little thought will show that
(11.11) takes account of all three relevant factors: the size of the element of
surface, its inclination to the line joining the element toOand the distance from
O. Such a general expression is often useful for computing solid angles when the
three-dimensional geometry is complicated. Note that (11.11) remains valid when
the surfaceSis not convex and when a single ray fromOin certain directions
would cutSin more than one place (but we exclude multiply connected regions).