1 point
8) If the particle is moving in a
potential then the solution of the
wave equation are described as a
stationary states
O
Time-independent
Energy independent
0
Time-dependent
O
None of the above
Answers
WAVE EQUATIONS
If the particle is moving in a potential then the solution of the wave equation are described as a stationary states TIME INDEPENDENT
KNOWING MORE ABOUT WAVE EQUATIONS:
* The wave equation is a second-order linear partial differential equation that describes mechanical waves (e.g., water waves, sound waves, and seismic waves) and light waves as they arise in classical physics. It may be found in acoustics, electromagnetics, and fluid dynamics, among other domains.
* In relation to vector wave equations, the scalar wave equation is the equation to be met by each component (for each coordinate axis, such as the x-component for the x-axis) of a vector wave without sources of waves in the investigated domain in the Cartesian coordinate system (i.e., a space and time).