Cho hàm số \(y=f(x)\) xác định và liên tục trên đo...
Câu hỏi: Cho hàm số \(y=f(x)\) xác định và liên tục trên đoạn \(\left[ {0;\frac{7}{2}} \right]\) có đồ thị hàm số \(y=f'(x)\) như hình vẽ. Hỏi hàm số \(y=f(x)\) đạt giá trị nhỏ nhất trên đoạn \(\left[ {0;\frac{7}{2}} \right]\) tại điểm x0 nào dưới đây?![](data:image/png;base64,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)
A. \(x_0=3\)
B. \(x_0=1\)
C. \(x_0=0\)
D. Đáp án khác
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi giữa HK1 môn Toán 12 năm 2019 Trường THPT Nam Trực