Cho các tập hợp A, B, C được minh họa bằng biểu đồ...
Câu hỏi: Cho các tập hợp A, B, C được minh họa bằng biểu đồ Ven như hình bên. Phần tô màu xám trong hình là biểu diễn của tập hợp nào sau đây?![](data:image/png;base64,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)
A. \(A \cap B \cap C\)
B. \(\left( {A\backslash C} \right) \cup \left( {A\backslash B} \right)\)
C. \(\left( {A \cup B} \right)\backslash C\)
D. \(\left( {A \cap B} \right)\backslash C\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK1 môn Toán 10 năm 2020 trường THPT Hoàng Hoa Thám