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Шпаргалка по физике. Закон сохранения электрического заряда. Закон Кулона. Алгебраическая сумма электрических зарядов всех частиц изолированной системы не меняется при происходящих в ней процессах
25) Закон электромагнитной индукции. Вихревые токи (токи Фуко). Эл. ток в цепи возможен, если на свободные заряды проводника действуют сторонние силы. Работа этих сил по перемещению единичного положительного заряда вдоль замкнутого контура называется ЭДС. При изменении магнитного потока через поверхность, ограниченную контуром, в контуре появляются сторонние силы, действие которых характеризуется ЭДС индукции. Учитывая направление индукционного тока, согласно правилу Ленца:
![](data:image/jpeg;base64,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) ![](data:image/jpeg;base64,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)
ЭДС индукции в замкнутом контуре равна скорости изменения магнитного потока через поверхность, ограниченную контуром, взятой с противоположным знаком.
Минус- т.к. индукционный ток противодействует изменению магнитного потока, ЭДС индукции и скорость изменения магнитного потока имеют разные знаки Если рассматривать не единичный контур, а катушку, где N- число витков в катушке:
![](data:image/jpeg;base64,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)
Величину индукционного тока можно рассчитать по закону Ома для замкнутой цепи
, где R - сопротивление проводника.
Вихревые токи
Индукционные токи в массивных проводниках называюттоками Фуко. Токи Фуко могут достигать очень больших значений, т.к. сопротивление массивных проводников мало.Поэтому сердечники трансформаторов делают из изолированных пластин. В ферритах - магнитных изоляторах вихревые токи практически не возникают. Использование вихревых токов
- нагрев и плавка металлов в вакууме, демпферы в электроизмерительных приборах. Вредное действие вихревых токов
- это потери энергии в сердечниках трансформаторов и генераторов из-за выделения большого количества тепла.
28) Общая характеристика теории Максвелла. Вихревое электрическое поле. Ток смещения. Изменяющееся во времени магнитное поле вызывает появление электрического поля напряженностью , циркуляция которого по замкнутому контуру равна ЭДС индукции:
По закону Фарадея i равна скорости изменения магнитного потока
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) То есть : | |
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