$$\textbf{F}=\textbf{r}\times\frac{\partial\textbf{B}}{\partial t}=-\textbf{r}\times(\nabla\times\textbf{E})$$
Réflexions
Alireza Jamali's Blog
Monday, 13 July 2026
Thursday, 9 July 2026
Wave equation of a material particle
$$E=\frac{1}{2}m\textbf{v}^2 + \frac{1}{2}I\boldsymbol{\omega}^2$$
If we assume
$$\textbf{v}=\textbf{v}(x,t),$$ $$\boldsymbol{\omega}=\boldsymbol{\omega}(x,t),$$
then
$$A\frac{\partial\textbf{v}}{\partial x}=-I\frac{\partial\boldsymbol{\omega}}{\partial t},$$ and $$B\frac{\partial\boldsymbol{\omega}}{\partial x}=-m\frac{\partial\textbf{v}}{\partial t},$$ we arrive at
$$\boxed{\frac{mI}{AB}\frac{\partial^2\textbf{v}}{\partial t^2}= \frac{\partial^2\textbf{v}}{\partial x^2}}$$
$$\boxed{\textbf{F}=m(\textbf{a}+\textbf{v}\times\boldsymbol{\omega})}$$
Capacitor - Inductor duality
We must look for a new effect in which, the energy of a capacitor/inductor, instead of
$$E=\frac{1}{2}CV^2,$$ $$E=\frac{1}{2}LI^2,$$
is given by
$$E \propto \dot{I},$$ $$E \propto \dot{V}.$$
This can only happen with AC currents.