Cho hàm số \(y = a{x^3} + b{x^2} + cx + d\) có đồ...
Câu hỏi: Cho hàm số \(y = a{x^3} + b{x^2} + cx + d\) có đồ thị như hình vẽ. Tìm mệnh đề đúng.![](data:image/png;base64,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)
A. \(a < 0,\,b > 0,\,c > 0,\,d < 0\)
B. \(a < 0,\,b < 0,\,c > 0,\,d < 0\)
C. \(a > 0,\,b > 0,\,c > 0,\,d < 0\)
D. \(a < 0,\,b < 0,\,c < 0,\,d < 0\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT Quốc Gia năm 2019 môn Toán Trường THPT Đồng Đậu lần 1