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Правила выполнения операций с архитектурными элементами

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Правила выполнения операций с архитектурными элементами
 
Всем доброго дня!
Не могу решить задачу:

Есть два взаимно перпендикулярных пластинчатых архитектурных элемента. Они пересекаются. Мне необходимо "отсечь" часть одного из элементов по линии их пересечения. как это сделать?

в разделе Редактирование кнопка "разность" никаких результатов не дает...
Изменено: - 09.09.2018 21:49:03
 
Добрый день! Это можно сделать командой Пересечение КЭ, вкладка Пересечение плоскостью.
 
Я говорю про архитектурные элементы, а не КЭ.
И мне необходимо их взаимно пересеч, без привязки к каким-либо плоскостям. Пересечь друг другом.
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[/img]

Не могу вставить картинку корректно...
Изменено: - 11.09.2018 22:49:51
 
Денис, именно указанным инструментом можно сделать то, что Вы хотите. Я не ошибся.
Выделяете архитектурный элемент, выбираете команду "Пересечение плоскостью" в качестве плоскости задаете архитектурный элемент, с которым необходимо выполнить пересечение.
 
Так, здорово. Будем пробовать.
Благодарю!
Изменено: - 12.09.2018 10:05:17
Страницы:1


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