Tìm số mặt của hình đa diện ở hình vẽ bên:
Câu hỏi: Tìm số mặt của hình đa diện ở hình vẽ bên:![](data:image/png;base64,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)
A 11
B 10
C 12
D 9
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán trường THPT Chuyên Lam Sơn - Thanh Hóa - lần 1 - năm 2018 (có lời giải chi tiết)