Đẳng thức nào sau đây mô tả đúng hình vẽ bên:
Câu hỏi: Đẳng thức nào sau đây mô tả đúng hình vẽ bên:![](data:image/png;base64,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)
A. \(3\overrightarrow {AI} + \overrightarrow {AB} = \overrightarrow 0 \)
B. \(3\overrightarrow {IA} + \overrightarrow {IB} = \overrightarrow 0 \)
C. \(\overrightarrow {BI} + 3\overrightarrow {BA} = \overrightarrow 0 \)
D. \(\overrightarrow {AI} + 3\overrightarrow {AB} = \overrightarrow 0 \)
Câu hỏi trên thuộc đề trắc nghiệm
Đề kiểm tra 1 tiết Chương 1 Hình học 10 năm 2019 Trường THPT Lê Hữu Trác