Abstract
Through an extension of Richards' theorem, an RLC driving-point impedance function, Z , is synthesized by a prescribed, realizable, four-terminal network terminated with another drivingpoint impedance function, \zeta , four less in rank than Z . Z is completely arbitrary except that it may not have a pole or a zero at the origin or infinity. The initial four-terminal network consists of a capacitor, a perfectly-coupled transformer, and an ideal gyrator. Other equivalent networks are derived which do not require transformers and gyrators but in which the cascade nature of the synthesis is lost.
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