Cho hàm số y = f(x) xác định, liên tục trên R và...
Câu hỏi: Cho hàm số y = f(x) xác định, liên tục trên R và có đồ thị như hình vẽ dưới đây. Mệnh đề nào sau đây đúng?![](data:image/png;base64,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)
A. Hàm số đồng biến trên khoảng \(\left( { - \infty ; 1} \right)\)
B. Hàm số đồng biến trên khoảng \(\left( { - \infty ; - 1} \right)\)
C. Hàm số đồng biến trên khoảng \(\left( {0; + \infty } \right)\)
D. Hàm số đồng biến trên khoảng \(\left( { - 3; + \infty } \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán lần 1 Trường THPT Ngô Quyền - Hải Phòng