- #36
EnergyHobo
- 13
- 0
@Lavabug I believe you are correct with both statements. Laplace's equation only works for non-moving waves (time independent).
I believe the wave equation is something like:
[itex]\nabla[/itex][itex]^{2}[/itex] [itex]\varphi[/itex] = k[itex]\frac{\partial^{2}\varphi}{\partial^{2}t}[/itex]
Then the derivative with respect to time would equal 0, which is Laplace's equation.
Also, rotational fields are non-conservative. I can't answer the second part of that question. Hope that helps.
I believe the wave equation is something like:
[itex]\nabla[/itex][itex]^{2}[/itex] [itex]\varphi[/itex] = k[itex]\frac{\partial^{2}\varphi}{\partial^{2}t}[/itex]
Then the derivative with respect to time would equal 0, which is Laplace's equation.
Also, rotational fields are non-conservative. I can't answer the second part of that question. Hope that helps.