Exercise 100320

Problem

Find an expression for the oscillation frequency of an electric dipole of dipole moment ${\displaystyle {\vec {p}}}$ and rotational inertia ${\displaystyle I}$ for small amplitudes of oscillation about its equilibrium position in a uniform electric field of magnitude ${\displaystyle E}$.

Solution

${\displaystyle \tau =pE\sin \theta }$

is a restoring torque, trying to bring the tilted dipole back to its aligned equilibrium position.

small angle approximation:

${\displaystyle \sin \theta \rightarrow \theta }$.

Thus,

${\displaystyle \tau \approx -pE\theta }$.

Since this exhibits a simple negative proportionality to the angle of rotation, the dipole oscillates in simple harmonic motion, like a torsional pendulum with torsion constant ${\displaystyle \kappa =pE}$. The angular frequency ${\displaystyle \omega }$ is given by

${\displaystyle \omega ^{2}={\frac {\kappa }{I}}={\frac {pE}{I}}}$

where I is the rotational inertia of the dipole. The frequency of oscillation is

${\displaystyle {\mathcal {f}}={\frac {\omega }{2\pi }}={\frac {1}{2\pi }}{\sqrt {\frac {pE}{I}}}}$