Induction
Electromagnetic Induction
Faraday’s Law
Whenever the flux of magnetic field through the area bounded by a closed conducting loop changes, and emf in produced in the loop.
EMF induced $(\mathcal{E})$:
$\mathcal{E} = -\dfrac{d\Phi}{dt}$Flux ($\Phi$):
$\Phi = \int{\vec{B}\cdot \vec{dS}} = BA \cos \theta$
Lenz’s Law
- The direction of induced current is such theat it opposes the change that has induced it.
Motional EMF
- EMF in a conductor moving with velocity $v$ in magnetic field $B$:
$\mathcal{E} = vBl$
Induced Electric Field
- Induced electric field $E$ around a loop: $\oint E \, dl = -\dfrac{d\Phi}{dt}$
Eddy Current
- Electromagnetic damping.
- Circular currents induced in conductors due to changing magnetic flux.
- $i \propto \left|\dfrac{d\Phi}{dt}\right|$.
Self-Induction
$\Phi = Li$
Induced EMF $(\mathcal{E})$ in coil due to its own current $I$:
$\mathcal{E} = -L \dfrac{di}{dt}$
Inductors
Self-Inductance of a Long Solenoid
$L = \mu_0\:n^2Al$
$n$: Turns per unit length,
$A$: Cross-sectional area,
$l$: Length of solenoid.
Growth and Decay of Current in an LR Circuit
- Growth:
$i = i_0 \biggr(1 - e^{-t/\tau} \biggr)$ - Decay:
$i = i_0\: e^{-t/\tau}$ - Time constant ($\tau$):
$\tau = \dfrac{L}{R}$
At $t = \tau$,
Growth: $i = i_0 (1-\dfrac{1}{e}) = 0.63 i_0$
Decay: $i = i_0 \dfrac{1}{e} = 0.37 i_0$
Energy Stored in an Inductor
- Energy $(U)$: $U = \dfrac{1}{2} L i^2$
Energy Density in a Magnetic Field
$B = \mu_0\:ni$
$u = \dfrac{B^2}{2 \mu_0}$
Mutual Induction
Mutual Inductance $(M)$:
$M = \dfrac{\mu_0 N_1 N_2 A}{l}$Induced EMF $\mathcal{E}_2$ in $\text{coil}_2$ due to change in current $i_1$ in $\text{coil}_1$:
$\mathcal{E}_2 = -M \dfrac{di_1}{dt}$