Thể tích lớn nhất của khối trụ nội tiếp hình cầu c...
Câu hỏi: Thể tích lớn nhất của khối trụ nội tiếp hình cầu có bán kính R bằng![](data:image/png;base64,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)
A. \(\frac{{8\pi {R^3}\sqrt 3 }}{3}\)
B. \(\frac{{4\pi {R^3}\sqrt 3 }}{9}\)
C. \(\frac{{8\pi {R^3}}}{{27}}\)
D. \(\frac{{8\pi {R^3}\sqrt 3 }}{9}\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Quang Trung - Bình Phước lần 3