Đường cong như hình vẽ là đồ thị của hàm số nào?
Câu hỏi: Đường cong như hình vẽ là đồ thị của hàm số nào?![](data:image/png;base64,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)
A. \(y = - {x^3} + 3{x^2} + 5.\)
B. \(y = 2{x^3} - 6{x^2} + 5\)
C. \(y = {x^3} - 3{x^2} + 5\)
D. \(y = {x^3} - 3x + 5\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Sở GD & ĐT Bắc Ninh lần 2