青书学堂: (问答题) 试利用影响线求图示结构在给定荷载作用下截面C的弯矩Mc值。 data:image/png;base64,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
青书学堂: (问答题) 试利用影响线求图示结构在给定荷载作用下截面C的弯矩Mc值。 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