Cho hàm số \(f(x)\) có đồ thị của hàm số \(y=f'(x)...
Câu hỏi: Cho hàm số \(f(x)\) có đồ thị của hàm số \(y=f'(x)\) như hình vẽ![](data:image/png;base64,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)
A. (-1;0)
B. (-6;-3)
C. (3;6)
D. \(\left( {6; + \infty } \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Quang Trung - Bình Phước lần 3