Đường cong ở hình vẽ là đồ thị của một trong các h...
Câu hỏi: Đường cong ở hình vẽ là đồ thị của một trong các hàm số dưới đây. Hàm số đó là hàm số nào?![](data:image/png;base64,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)
A. \(y = (x - 1){(x - 2)^2}.\)
B. \(y = {(x + 1)^2}(x + 2).\)
C. \(y = (x - 1){(x + 2)^2}.\)
D. \(y = {(x - 1)^2}(x + 2).\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi học kì 1 môn Toán lớp 12 Trường THPT Kim Liên năm học 2017 - 2018