Một con lắc lò xo treo thẳng đứng, dao động điều h...
Câu hỏi: Một con lắc lò xo treo thẳng đứng, dao động điều hòa tại nơi có $g=10 {~m} / {s}^{2}$. Hinh bên là đồ thị biểu diễn sự phụ thuộc của độ lớn lực kéo về $F_{{kv}}$ tác dụng lên vật và độ lớn lực đàn hồi $F_{\text {db }}$ của lò xo theo thời gian $t$. Biết $t_{2}-t_{1}=\frac{7 \pi}{120}$ (s). Khi lò xo dãn $6,5 {~cm}$ thì tốc độ của vật là
![Một con lắc lò xo treo thẳng đứng, dao động điều hòa tại nơi có g=10 m / s2. hình ảnh](data:image/jpeg;base64,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)
A. 80{cm/s
B. 60 cm/s
C. 51 cm/s
D. 110 cm/s
Câu hỏi trên thuộc đề trắc nghiệm
Đề minh họa tốt nghiệp THPT 2021 môn Lý có đáp án chi tiết từng câu