Physics equations/Magnetic field calculations

Let J be the current density vector, and let dA be a vector that denotes direction and a small (differential) area. (The direction of dA is normal to the area element). Since the vectors parallel, the inner (dot) product J·dA equals the scalar product JdA. Also parallel to both J and dA is dL, an element of length along the wire. Since the normal to the area is parallel to the length, dAdL equals dV, which is the volume element. Hence IdL equals JdV, where dL and J both have direction. Thus the line integral over current becomes a volume integral:

${\displaystyle \mathbf {B} ={\frac {\mu _{0}}{4\pi }}\iiint _{V}\ {\frac {(\mathbf {J} \,dV)\times \mathbf {\hat {r}} }{r^{2}}}}$ 

The distance from the source current, ${\displaystyle Id{\vec {\ell }}}$ , to the field point (at the center) is always ${\displaystyle a\;d{\vec {\ell }}}$ . Since ${\displaystyle {\hat {r}}}$  is perpendicular to ${\displaystyle Id{\vec {\ell }}}$ , and since their cross product always points along the axis of the loop, we have

${\displaystyle d{\vec {B}}={\frac {\mu _{0}}{4\pi }}{\frac {Id{\vec {\ell }}\times {\hat {r}}}{|r|^{2}}}={\frac {\mu _{0}}{4\pi }}{\frac {Id\ell }{a^{2}}}{\hat {n}}}$ 

where ${\displaystyle {\hat {n}}}$  is a unit vector pointing along the axis. Since ${\displaystyle \oint d\ell =2\pi a}$ , we have our result.

An element of the magnetic field due to an element of current is shown in the figure above and to the right. Here, ${\displaystyle d{\vec {B}}}$  points downward because the element at the top of the loop was chosen. We seek only the ${\displaystyle z}$  component, so we multiply by the cosine of the acute angle in the right triangle shown: ${\displaystyle dB_{\text{z}}=dBsin(\theta )}$ , where

${\displaystyle \sin(\theta )={\frac {a}{\left(z^{2}+a^{2}\right)^{1/2}}}}$ 

where z is the distance from the center of the loop. The rest of solution resembles the calculation of the magnetic field at the center of a loop.

The equation says that the integral of the magnetic field ${\displaystyle \mathbf {B} \,}$  around a loop ${\displaystyle \partial S\,}$  is equal to the current ${\displaystyle \mathbf {J} \,}$  through any surface spanning the loop, plus a term depending on the rate of change of the electric field ${\displaystyle \mathbf {E} \,}$  through the surface. This term, the second term on the right, is the displacement current. For applications with no time varying electric fields (unchanging charge density) it is zero and is ignored. However in applications with time varying fields, such as circuits with capacitors, it is needed, as shown below. Any surface intersecting the wire, such as ${\displaystyle S_{1}\,}$ , has current ${\displaystyle I\,}$  passing through it so Ampere's law gives the correct magnetic field:

${\displaystyle B={\frac {\mu _{0}I}{2\pi r}}\,}$ 

But surface ${\displaystyle S_{2}\,}$  spanning the same loop that passes between the capacitor's plates has no current flowing through it, so without the displacement current term Ampere's law gives:

${\displaystyle B=0\,}$ 

So without the displacement current term Ampere's law fails; it gives different results depending on which surface is used, which is inconsistent. The 'displacement current' term provides a second source for the magnetic field besides current; the rate of change of the electric field ${\displaystyle \mathbf {E} \,}$ . Between the capacitor's plates, the electric field is increasing, so the rate of change of electric field through the surface ${\displaystyle S_{2}\,}$  is positive, and its magnitude gives the correct value for the field field ${\displaystyle \mathbf {B} \,}$  found above.

Do the line integral around on a circle centered around the loop. ${\displaystyle \oint _{C}{\vec {B}}\cdot \mathrm {d} {\boldsymbol {\ell }}=2\pi rB}$ 

Do the line integral shown. Of the four paths,only l₁ is non-zero. If _/ell is the length of that path, then the total current enclosed is _n'/ell