Đây là đồ thị của hàm số nào trong các hàm số sau...
Câu hỏi: Đây là đồ thị của hàm số nào trong các hàm số sau đây?![](data:image/png;base64,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)
A. \(y=-x^3-3x^2-1\)
B. \(y=x^3-3x+1\)
C. \(y=-x^3+3x^2+1\)
D. \(y=x^3-3x-1\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi học kì 1 môn Toán lớp 12 Sở GD & ĐT Khánh Hòa năm 2017 - 2018 (VIP)