n/The magnetic field of the
wave. The electric field, not
shown, is perpendicular to the
page.second, the zero-point is located atx=−(1 s)v. The distance it
travels in one second is therefore numerically equal tov, and this
is exactly the concept of velocity: how far something goes per unit
time.
The wave has to satisfy Maxwell’s equations for ΓE and ΓB
regardless of what Amp`erian surfaces we pick, and by applying them
to any surface, we could determine the speed of the wave. The
surface shown in figure n turns out to result in an easy calculation:
a narrow strip of width 2`and heighth, coinciding with the position
of the zero-point of the field att= 0.
Now let’s apply the equationc^2 ΓB =∂ΦE/∂tatt= 0. Since
the strip is narrow, we can approximate the magnetic field using
sinx≈x, which is valid for smallx. The magnetic field on the right
edge of the strip, atx=`, is thenB` ̃ , so the right edge of the strip
contributesB`h ̃ to the circulation. The left edge contributes the
same amount, so the left side of Maxwell’s equation isc^2 ΓB=c^2 · 2 B`h ̃.The other side of the equation is
∂ΦE
∂t=
∂
∂t(EA)
= 2`h∂E
∂t,
where we can dispense with the usual sum because the strip is nar-
row and there is no variation in the field as we go up and down
the strip. The derivative equalsvE ̃cos(x+vt), and evaluating the
cosine atx= 0,t= 0 gives
∂ΦE
∂t
= 2vE`h ̃Maxwell’s equation for ΓBtherefore results in2 c^2 B`h ̃ = 2E`hv ̃
c^2 B ̃=vE ̃.An application of ΓE=−∂ΦB/∂tgives a similar result, except
that there is no factor ofc^2E ̃=vB ̃.(The minus sign simply represents the right-handed relationship of
the fields relative to their direction of propagation.)Section 11.6 Maxwell’s equations 729