Cho hàm số \( y = f\left( x \right)\) có đồ thị hà...
Câu hỏi: Cho hàm số \( y = f\left( x \right)\) có đồ thị hàm số \( y = f’\left( x \right)\) được cho như hình vẽ. Hàm số \(g\left( x \right) = - 2f\left( {2 - x} \right) + {x^2}\) nghịch biến trên khoảng nào?![](data:image/png;base64,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)
A \((0; 2)\)
B \((-3; 1)\)
C \((2; 3)\)
D \((-1; 0)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK1 môn Toán lớp 12 Sở GD & ĐT Bạc Liêu - Năm 2018 - 2019 (có lời giải chi tiết)