Electrodynamics and the Poynting theorem

AHSAN MUJTABA
Messages
87
Reaction score
4
Homework Statement
In static fields, why there exists a field momentum? And if it exists then what's the meaning of it?
Relevant Equations
##S=\frac{1}{\mu_o}(\vec E\times\vec B)##
In my opinion the field momentum is the field's intrinsic momentum which it will give to charges(if any present)...
 
Physics news on Phys.org
Hi. Feynman shows us an interesting example of a point charge sitting near the center of a bar magnet, as shown in Fig. 27–6. Here rotating Poynting vector generates EM field angular momentum. I will explain it.

Let us prepare the system by carrying the charge from infinite distance to the center where the magnetic bar is laid. Lorentz force jams the charge to come to the center by deflection so we apply force on charge sideway. Momentum is transferred to EM field. Thus accumulated momentum in EM field generates the angular momentum.

So it shows that Poynting vector is applicable in static EM field as well as cases of circuit currents and EM waves.
 
Last edited:
  • Like
Likes vanhees71
Thanks it's very deep and helped a lot.
 

Thread 'Please tell me where I am going wrong in this integral'

##|\Psi|^2=\frac{1}{\sqrt{\pi b^2}}\exp(\frac{-(x-x_0)^2}{b^2}).## ##\braket{x}=\frac{1}{\sqrt{\pi b^2}}\int_{-\infty}^{\infty}dx\,x\exp(-\frac{(x-x_0)^2}{b^2}).## ##y=x-x_0 \quad x=y+x_0 \quad dy=dx.## The boundaries remain infinite, I believe. ##\frac{1}{\sqrt{\pi b^2}}\int_{-\infty}^{\infty}dy(y+x_0)\exp(\frac{-y^2}{b^2}).## ##\frac{2}{\sqrt{\pi b^2}}\int_0^{\infty}dy\,y\exp(\frac{-y^2}{b^2})+\frac{2x_0}{\sqrt{\pi b^2}}\int_0^{\infty}dy\,\exp(-\frac{y^2}{b^2}).## I then resolved the two...
View full post »

Thread 'Direction of the magnetic field of an oscillating charge'

Hello everyone, I’m considering a point charge q that oscillates harmonically about the origin along the z-axis, e.g. $$z_{q}(t)= A\sin(wt)$$ In a strongly simplified / quasi-instantaneous approximation I ignore retardation and take the electric field at the position ##r=(x,y,z)## simply to be the “Coulomb field at the charge’s instantaneous position”: $$E(r,t)=\frac{q}{4\pi\varepsilon_{0}}\frac{r-r_{q}(t)}{||r-r_{q}(t)||^{3}}$$ with $$r_{q}(t)=(0,0,z_{q}(t))$$ (I’m aware this isn’t...
View full post »

Thread 'Initial conditions for orbits around a wormhole'

Hi, I had an exam and I completely messed up a problem. Especially one part which was necessary for the rest of the problem. Basically, I have a wormhole metric: $$(ds)^2 = -(dt)^2 + (dr)^2 + (r^2 + b^2)( (d\theta)^2 + sin^2 \theta (d\phi)^2 )$$ Where ##b=1## with an orbit only in the equatorial plane. We also know from the question that the orbit must satisfy this relationship: $$\varepsilon = \frac{1}{2} (\frac{dr}{d\tau})^2 + V_{eff}(r)$$ Ultimately, I was tasked to find the initial...
View full post »

Similar threads

Average Energy density and the Poynting vector of an EM wave
Replies
1
Views
1K
Electric field of a neutral conductor just at the surface
Replies
4
Views
1K
Magnetic Field of Uniformly Magnetized Infinite Slab
Replies
6
Views
2K
Electric Field due to a disk of radius R in the xy-plane
Replies
7
Views
2K
Electrodynamics: Conducting sphere of radius R cut in half
Replies
49
Views
6K
I Poynting's Theorem in Griffiths' Electrodynamics
Replies
3
Views
1K
Electrodynamics: Dirac Delta function and Gauss' divergence theorem
Replies
6
Views
1K
LRC equation using Poynting theorem and conservation laws
Replies
3
Views
3K
Electromagnetic linear momentum for a system of two moving charges
Replies
3
Views
1K
Deriving Maxwell's equation from Poynting Theorem
Replies
12
Views
2K

Hot Threads

Recent Insights

Back
Top