Trên một sợi dây dài đang có sóng ngang hình sin t...
Câu hỏi: Trên một sợi dây dài đang có sóng ngang hình sin truyền theo chiều dương của trục Ox. Tại thời điểm t0, một đoạn của sợi dây có hình dạng như hình bên. Hai phần tử M và Q dao động lệch pha nhau![sóng ngang hình sin](data:image/png;base64,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)
A. π rad.
B. π/3 rad.
C. π/6 rad.
D. 2π rad.
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi THPT QG 2018 môn Vật lý- Chuyên Hạ Long- Quảng Ninh