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. \(y = - \frac{1}{4}{x^4} - 2{x^2} - 1\)
B. \(y = - \frac{1}{4}{x^4} + 2{x^2}\)
C. \(y = \frac{1}{4}{x^4} - 2{x^2} + 1\)
D. \(y = \frac{1}{4}{x^4} - 2{x^2}\)
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)