Đường cong trong hình bên là đồ thị của một hàm số...
Câu hỏi: Đường cong trong hình 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. Hỏi hàm số đó là hàm số nào?![](data:image/png;base64,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)
A. \(y = - {x^4} + 2{x^2} + 1\)
B. \(y = {x^4} - 3{x^2} + 1\)
C. \(y = {x^4} - 2{x^2} + 1\)
D. \(y = - {x^4} - 2{x^2} + 1\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi giữa học kì 1 Toán 12 THPT Việt Đức Hà Nội năm học 2017 - 2018