– коэффициент передачи по напряжению оконечного каскада. Входное сопротивление усилителя определяется входным сопротивлением входного каскада, а выходное – выходным сопротивлением оконечного каскада.
Нижняя и верхняя граничные частоты определяются по формулам, приведенным в таблицах 2.4 и 2.5. Таблица 2.4 – Расчетные соотношения для определения нижней и верхней частоты среза каскада
Параметр
| Расчётное соотношение
| Нижняя частота среза
|
,
где – эквивалентная постоянная времени каскада в области нижних частот
| Эквивалентная постоянная времени каскада в области нижних частот
|
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)
где и – эквивалентные постоянные времени каскада в области нижних частот связанные с i-м разделительным и j-м блокировочным и конденсаторами соответственно
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