решать такое уравнение затруднительно. В то же время, можно отметить, что рассматриваемой точке соответствует и другое условие: U(1) = 0Поэтому уравнение для определения может быть получено и другим способом – на основе выражения для ВЧХ. Получим выражения для ВЧХ и МЧХ:
![](data:image/png;base64,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)
;
, |