Đường cong trong hình vẽ bên là đồ thị của một hàm...
Câu hỏi: Đường cong trong hình vẽ bên là đồ thị của một hàm số trong bốn hàm số được liệt kê ở bốn phương án A, B, C, D dưới đây.![](data:image/png;base64,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)
A \(y={{x}^{4}}-3{{x}^{2}}\)
B \(y=-{{x}^{4}}-2{{x}^{2}}\)
C \(y=-\frac{1}{4}{{x}^{4}}+3{{x}^{2}}\)
D \(y=-{{x}^{4}}+4{{x}^{2}}\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán trường THPT Chuyên Lê Quý Đôn - Điện Biên - lần 1 - năm 2018 (có lời giải chi tiết)