Cho hàm số y = f(x) có TXĐ là [-3; 3] và có đồ thị...
Câu hỏi: Cho hàm số y = f(x) có TXĐ là [-3; 3] và có đồ thị như hình vẽ. Khẳng định nào sau đây đúng?![](data:image/png;base64,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)
A. Đồ thị hàm số cắt trục hoành tại 3 điểm phân biệt
B. Hàm số đồng biến trên khoảng (-3; 1) và (1; 4)
C. Hàm số nghịch biến trên khoảng (-2; 1)
D. Hàm số đồng biến trên khoảng (-3; -1) và (1; 3)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi giữa HK1 môn Toán Đại 10 năm 2020 Trường THPT Nguyễn Hiền