Cho hàm số \(y=f(x)\). Đồ thị hàm số \(y = f'\left...
Câu hỏi: Cho hàm số \(y=f(x)\). Đồ thị hàm số \(y = f'\left( x \right)\) như hình vẽ. Đặt \(g\left( x \right) = 3f\left( x \right) - {x^3} + 3x - m\), với m là tham số thực. Điều kiện cần và đủ để bất phương trình \(g\left( x \right) \ge 0\) nghiệm đúng với \(\forall x \in \left[ { - \sqrt 3 ;\sqrt 3 } \right]\) là![](data:image/png;base64,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)
A. \(m \le 3f\left( {\sqrt 3 } \right)\)
B. \(m \le 3f\left( 0 \right)\)
C. \(m \ge 3f\left( 1 \right)\)
D. \(m \ge 3f\left( { - \sqrt 3 } \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Sở GD & ĐT Bạc Liêu lần 2