complex frequency उदाहरण वाक्य
उदाहरण वाक्य
- The method allows the designer to implement a delay characteristic by locating poles and zero on the complex frequency plane intuitively, without the need for complicated mathematics or the recourse to reference tables.
- In mathematics and signal processing, the "'Z-transform "'converts a discrete-time signal, which is a sequence of real or complex numbers, into a complex frequency domain representation.
- If the amplifier output resistance is included in the analysis, the output voltage exhibits a more complex frequency response and the impact of the frequency-dependent current source on the output side must be taken into account.
- where " s " is the complex frequency ( s = j \ omega ), \ omega _ s is the series resonant angular frequency, and \ omega _ p is the parallel resonant angular frequency.
- In electrical network analysis, " Z " ( " s " ) represents an impedance expression and " s " is the complex frequency variable, often expressed as its real and imaginary parts;
- The transfer function \ H ( s ) of a filter is the ratio of the output signal \ Y ( s ) to that of the input signal \ X ( s ) as a function of the complex frequency \ s:
- If the complex frequency \ mathit { s } \, and all circuit variables are symbolic ( fully symbolic analysis ), the voltage transmittance is given by ( here G _ i = 1 / R _ i \, ):
- In this example, polynomials in the complex frequency domain ( typically occurring in the denominator ) correspond to power series in the time domain, while axial shifts in the complex frequency domain correspond to damping by decaying exponentials in the time domain.
- In this example, polynomials in the complex frequency domain ( typically occurring in the denominator ) correspond to power series in the time domain, while axial shifts in the complex frequency domain correspond to damping by decaying exponentials in the time domain.
- Generally, for insertion-loss filters where the transmission zeroes and infinite losses are all on the real axis of the complex frequency plane ( which they usually are for minimum component count ), the insertion-loss function can be written as;