68.Приведите схему механической характеристики многодвигательного электропривода при работе одной машины в режиме торможения противовключением
(Посмотри в инете если вдруг что,это если не отвечу на другие вопросы)
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Рисуем оси на 4 квадрата. Рисуем во втором квадрате 3 линии волнистых Перевернутая механическая характеристика АД. И чуть выше начало Механической характеристики АДкоторая продолжается в 1 квадратеи рисуется как механическая характеристика АД. Прямая линия которая начинается во 2 квадрате и Прямая линия с закорючкой.
| 69Назначение бесконтактных логических элементов в электроприводе. Основные логические операции, выполняемые логическими элементами.
Логические элементы — устройства, осуществляющие определенную связь между входными и выходными величинами. Бесконтактные логические элементы используются при реализации различных логических законов управления и для осуществления блокировок и защит в ЭП
Логическое сложение(дизъюнкция) реализуется логическим элементом ИЛИ. Элемент, выполняющий функцию ИЛИ, имеет несколько входов и один выход. Сигнал логической единицы появляется на выходе такого устройства, если хотя бы на один из входов подана логическая единица
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)
Логическое умножение (конъюнкция) реализуется логическим элементом И. Сигнал логической единицы появляется на выходе такого устройства, если на все входы подана логическая единица
![](data:image/png;base64,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)
Логическое отрицание (инверсия) реализуется логическим элементом НЕ, который называют инвертором. Сигнал логической единицы появляется на выходе такого устройства, если на вход подан логический ноль.
![](data:image/png;base64,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)
| 70.Как при помощи логических элементов реализовать в схемах управления электроприводом типовый узел «Память»?
функцию памяти можно осуществить с помощью триггера. Если на вход подать сигнал х1 = 1, то на выходе появится сигнал у = 1 и будет оставаться неизменным до тех пор, пока не нажмем кнопку КнС. Тогда триггер переключается и на выходе появляется сигнал у = 0. Он будет оставаться без изменения до тех пор, пока снова не нажмем кнопку КнП.
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