Cho hàm số \(y = f\left( x \right)\) có đồ thị như...
Câu hỏi: Cho hàm số \(y = f\left( x \right)\) có đồ thị như hình vẽ bên. Hàm số đã cho đồng biến trên khoảng nào sau đây?![](data:image/jpeg;base64,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)
A \(\left( { - \infty ;1} \right)\)
B \(\left( { - 1;3} \right)\)
C \(\left( {1; + \infty } \right)\)
D \(\left( {0;1} \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán THPT Thăng Long - Hà Nội - Lần 1 - Năm 2019 - Có lời giải chi tiết