The four component values of the network provide four
degrees of freedom in the design. It is required from
image theory (see
Zobel network) that the L/C branch and the L'/C' branch are the
dual of each other (ignoring the transformer action) which provides two parameters for calculating component values. These are :C' = \frac{4L}{R^2} and L' = CR^2 Equivalently, every transmission
pole,
sp in the
s-domain left
half-plane must have a matching zero,
sz in the right half-plane such that
sp=−
sz. A third parameter is set by choosing a resonant frequency, this is set to (at least) the maximum frequency the network is required to operate at. :\omega_0 = \frac{1}{\sqrt{4LC}} = \frac{1}{\sqrt{L'C'}} There is one remaining degree of freedom that the designer can use to maximally linearise the phase/frequency response. This parameter is usually stated as the L/C ratio. As stated above, it is not practical to linearise the phase response above 180°, i.e. half a cycle, so once a maximum frequency of operation,
fm is chosen, this sets the maximum delay that can be designed in to the circuit and is given by, :T_{D(max)} = \frac{1}{2f_m} For broadcast sound purposes, 15 kHz is often chosen as the maximum usable frequency on landlines. A delay equaliser designed to this specification can, therefore, insert a delay of 33μs. In reality, the differential delay that might be required to equalise may be many hundreds of microseconds. A chain of many sections in tandem will be required. For television purposes, a maximum frequency of 6 MHz might be chosen, which corresponds to a delay of 83ns. Again, many sections may be required to fully equalise. In general, much greater attention is paid to the routing and exact length of television cables because many more equaliser sections are required to remove the same delay difference as compared to audio. ==Superconductor planar implementation==