Cho hàm số \(y=f(x)\) xác định và liên tục trên R,...
Câu hỏi: Cho hàm số \(y=f(x)\) xác định và liên tục trên R, có đồ thị \(f'(x)\) như hình vẽ.![](data:image/png;base64,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)
A. 6
B. 7
C. 17
D. 18
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HSG môn Toán 12 năm 2019 Trường THPT Thuận Thành 2