Cho hàm số y = f(x) liên tục trên R và có đồ thị...
Câu hỏi: Cho hàm số y = f(x) liên tục trên R và có đồ thị như hình vẽ dưới. Xét hàm số \(g\left( x \right) = f\left( {2{x^3} + x - 1} \right) + m\). Tìm m để \(\mathop {{\rm{max}}}\limits_{\left[ {0;1} \right]} g\left( x \right) = - 10\)![](data:image/png;base64,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)
A. m = -13
B. m = 5
C. m = 3
D. m = -1
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán lần 1 Trường THPT Ngô Quyền - Hải Phòng