Phần tô đậm trong biểu đồ Ven dưới đây biểu diễn m...
Câu hỏi: Phần tô đậm trong biểu đồ Ven dưới đây biểu diễn mối quan hệ nào giữa các tập hợp A, B, C?![](data:image/png;base64,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)
A. \(A \cap B \cap C.\)
B. \(A \cup \left( {B \cap C} \right).\)
C. \(\left( {A \cap B} \right) \cup C.\)
D. \(A \cup B \cup C.\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK1 môn Toán 10 năm học 2019 - 2020 Trường THPT Vinh Lộc