Cho hàm số \(y = f(x)\) có bảng biến thiên như hìn...
Câu hỏi: Cho hàm số \(y = f(x)\) có bảng biến thiên như hình vẽ dưới đây![](data:image/png;base64,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)
A. \(\left( {2; + \infty } \right)\)
B. \(\left( { - 2;2} \right)\)
C. \(\left( { - \infty ;3} \right)\)
D. \(\left( {0; + \infty } \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Thoại Ngọc Hầu lần 1