Cho hàm số \(y=f(x)\) liên tục trên R có đồ thị \(...
Câu hỏi: Cho hàm số \(y=f(x)\) liên tục trên R có đồ thị \(y=f'(x)\) như hình vẽ. Đặt \(g\left( x \right) = 2f\left( x \right) - {\left( {x - 1} \right)^2}\). Khi đó giá trị nhỏ nhất của hàm số \(y=g(x)\) trên đoạn [- 3;3] bằng:![](data:image/png;base64,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)
A. g(0)
B. g(1)
C. g(-3)
D. g(3)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Sở GD & ĐT Hà Nội