1

00:00:00,570 --> 00:00:09,240

Now for McAdoo's Tenex, we will go the same route as we went for electrostatic, so we will start by



2

00:00:09,240 --> 00:00:11,490

considering the Maxwell's equations.



3

00:00:12,360 --> 00:00:18,180

So here you can see them again in general, but we want to consider Magneto Static's.



4

00:00:18,780 --> 00:00:26,730

So we will use here only the actual equations that are concerned with the magnetic fields and we will



5

00:00:26,730 --> 00:00:28,970

set all the time derivatives.



6

00:00:29,250 --> 00:00:34,230

So for example, here, just partial derivative of E with respect to T to zero.



7

00:00:35,240 --> 00:00:42,780

So this means we consider here to equation in this differential formulation and two equations in this



8

00:00:42,780 --> 00:00:44,140

integral formulation.



9

00:00:45,030 --> 00:00:48,360

So this is somewhat similar to electrostatic.



10

00:00:49,620 --> 00:00:56,460

However, the main difference if we compare these equations here to the equations of electrostatic is



11

00:00:56,460 --> 00:01:03,780

that now we have no divergences in the magnetic field while we had divergences in the electric field.



12

00:01:04,620 --> 00:01:11,580

But we have instead rotations in the magnetic field while the rotations in the electric field where



13

00:01:11,580 --> 00:01:13,540

zero for electrostatic.



14

00:01:14,460 --> 00:01:20,100

So this means our equations are in some way similar, but also kind of different.



15

00:01:20,610 --> 00:01:27,810

And we will now continue and investigate what this means for the solution of these equations.