Đường cong ở hình bên dưới là đồ thị của hàm số nà...
Câu hỏi: Đường cong ở hình bên dưới là đồ thị của hàm số nào trong bốn hàm số cho dưới đây.![](data:image/png;base64,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)
A. \(y = {x^4} - 2{x^2} + 1\)
B. \(y = {x^3} - 3x + 1\)
C. \(y = {x^3} - 3{x^2} + 1\)
D. \(y = - {x^3} + 3x + 1\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 cụm 8 Trường Chuyên ĐB Sông Hồng