Đồ thị dưới đây là của hàm số nào?
Câu hỏi: Đồ thị dưới đây là của hàm số nào? 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)
A. \(y = - {x^3} + 2{x^2} + 1.\)
B. \(y = - {x^4} + 2{x^2} + 1.\)
C. \(y = - {x^4} + 1.\)
D. \(y = {x^4} + 2{x^2} + 1.\)
Câu hỏi trên thuộc đề trắc nghiệm
Thi Online Đề thi thử THPT Quốc gia 2018 môn Toán số 1