Một cái tục lăn sơn nước có dạng một hình trụ. Đườ...
Câu hỏi: Một cái tục lăn sơn nước có dạng một hình trụ. Đường kính của đường tròn đáy là 5 cm, chiều dài lăn là 23 cm (hình dưới). Sau khi lăn trọn 15 vòng thì trục lăn tạo trên sân phẳng một diện diện tích là![](data:image/png;base64,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)
A. \(1725\pi {\rm{c}}{{\rm{m}}^3}.\)
B. \(3450\pi {\rm{c}}{{\rm{m}}^2}.\)
C. \(1725\pi {\rm{c}}{{\rm{m}}^2}.\)
D. \(862,5\pi {\rm{c}}{{\rm{m}}^2}.\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề trắc nghiệm ôn thi học kì 1 môn Toán lớp 12 năm 2018 - 2019 có lời giải - Đề số 5