![]() ![]() similar result can be obtained for with the roles of and interchanged Microwave Technique.the above equation written in the form represents a circle on a complex plane with the center at and a radius with.in deriving the above result, we make use of and Microwave Technique.If we set, the above equation for can be written as Microwave Technique.to simplify our discussion, let us consider the expression that.our goal here is to derive an expression for Microwave Technique.if we square both sides of the above equation Microwave Technique.here D is the determinant of the scattering matrix Microwave Technique.let us consider the first condition that Microwave Technique.for a unilateral device, these conditions reduces to and.we need to find the range that these conditions are satisfied and Microwave Technique.Note that both and depends on and, respectively. ![]()
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