Н![](data:image/png;base64,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) а больших частотах и для сигналов с большой скоростью нарастания напряжения присущи так называемые переходные искажения (типа ступенька). То есть, пока выходное напряжение не превысит порогового напряжения транзисторы будут закрыты. Для синусоидального входного напряжения выходной сигнал будет иметь вид. Н |