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The SWR is usually defined as a voltage ratio called the VSWR, for voltage standing wave ratio. It is also possible to define the SWR in terms of current, resulting in the ISWR, which has the same numerical value. The power standing wave ratio (PSWR) is defined as the square of the SWR.
The voltage component of a standing wave in a uniform transmission line consists of the forward wave (with amplitude ) superimposed on the reflected wave (with amplitude ).
Reflections occur as a result of discontinuities, such as an imperfection in an otherwise uniform transmission line, or when a transmission line is terminated with other than its characteristic impedance. The reflection coefficient ρ is defined thus:
ρ is a complex number that describes both the magnitude and the phase shift of the reflection. The simplest cases, when the imaginary part of ρ is zero, are:
For the calculation of VSWR, only the magnitude of ρ, denoted by |ρ|, is of interest.
At some points along the line the two waves interfere constructively, and the resulting amplitude is the sum of their amplitudes:
At other points, the waves interfere destructively, and the resulting amplitude is the difference between their amplitudes:
The voltage standing wave ratio is then equal to:
, the absolute value of , is used so that the VSWR is always greater than +1.
The SWR can also be defined as the ratio of the maximum amplitude of the electric field strength to its minimum amplitude, i.e. .
To understand the standing wave ratio in detail, we need to calculate the voltage (or, equivalently, the electrical field strength) at any point along the transmission line at any moment in time. We can begin with the forward wave, whose voltage as a function of time t and of distance x along the transmission line is:
where A is the amplitude of the forward wave, ω is its angular frequency and k is a constant (equal to ω divided by the speed of the wave). The voltage of the reflected wave is a similar function, but spatially reversed (the sign of x is inverted) and attenuated by the reflection coefficient ρ:
The total voltage on the transmission line is given by the principle of superposition, which is just a matter of adding the two waves:
Using standard trigonometric identities, this equation can be converted to the following form:
where .
This form of the equation shows, if we ignore some of the details, that the maximum voltage over time at a distance x from the transmitter is the periodic function
This varies with x from a minimum of to a maximum of , as we saw in the earlier, simplified discussion. A graph of against x, in the case when ρ = 0.5, is shown below. and are the values used to calculate the SWR.
It is important to note that this graph does not show the instantaneous voltage profile along the transmission line. It only shows the amplitude of the oscillation at each point. The instantaneous voltage is a function of both time and distance, so could only be shown fully by a three-dimensional or animated graph.
SWR has a number of implications that are directly applicable to radio use.