Đường cong trong hình vẽ sau đây là đồ thị của hàm...
Câu hỏi: Đường cong trong hình vẽ sau đây là đồ thị của hàm số nào?![](data:image/png;base64,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)
A. \(y = - {x^3} + 3x + 1\)
B. \(y = {x^4} - 2{x^2} + 1\)
C. \(y = {x^3} - 3x + 1\)
D. \(y = {x^3} - 3{x^2} + 1\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Sở GD & ĐT Bạc Liêu lần 2