ModusPwnd said:The same thinking can clue you into other geometries. Consider the infinite cylinder. In this case field lines can only diverge in one direction, not in two. So with this geometry we get a 1/r dependence. Consider the infinite sheet. In this case field lines cannot diverge in any direction. Here we get no drop off with distance.
litup said:But a sheet is by definition a two dimensional plane. If you have a field starting somewhere in it the field does drop of with distance because a circle of radius 1 has X amount of energy in it but a circle of radius 2X still has the same amount of energy so it has to diminish by the difference of the areas. The area of radius 1 has 3.14 (Pi) units but the area of radius 2 has 12.56 area, 4 times so it goes up by radius squared and so the energy density goes down by the same amount, conservation of energy holds up.
Attenuation refers to the decrease in the intensity of a signal or wave as it travels through a medium. This can happen due to various factors such as absorption, scattering, and reflection.
Attenuation plays a crucial role in many scientific fields, including telecommunications, optics, and acoustics. Understanding and controlling attenuation is essential for the successful transmission and detection of signals and waves.
Square attenuation refers to the phenomenon where the attenuation of a signal or wave is proportional to the square of the distance it has traveled. This is often observed in free-space propagation of electromagnetic waves.
Square attenuation is caused by the spreading of a signal or wave as it travels through space. As the signal expands in all directions, the energy is distributed over a larger area, resulting in a decrease in intensity that is proportional to the square of the distance.
The square attenuation can be calculated by taking the square of the distance traveled by the signal and multiplying it by the attenuation coefficient, which is a measure of how much the signal is attenuated per unit distance.