Cho hàm số y = f(x) xác định trên đoạn [- 3;3] và...
Câu hỏi: Cho hàm số y = f(x) xác định trên đoạn [- 3;3] và có đồthị như hình vẽ bên. Khẳng định nào sau đây đúng?![](data:image/jpeg;base64,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)
A. Hàm số đồng biến trên khoảng (-3;1) và (1;4).
B. Hàm số nghịch biến trên khoảng (-2;1).
C. Hàm số đồng biến trên khoảng (-3;-1) và (1;3).
D. Đồ thị hàm số cắt trục hoành tại 3 điểm phân biệt.
Câu hỏi trên thuộc đề trắc nghiệm
Đề kiểm tra 1 tiết Chương 2 Đại số 10 năm học 2019 - 2020 Trường THPT Triệu Quang Phục