Cho hàm số \(y=f(x)\) liên tục trên R và có đồ thị...
Câu hỏi: Cho hàm số \(y=f(x)\) liên tục trên R và có đồ thị như hình vẽ dưới đây.![](data:image/png;base64,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)
A. 5
B. 4
C. 3
D. 2
Câu hỏi trên thuộc đề trắc nghiệm
40 câu trắc nghiệm Các dạng toán về hàm ẩn liên quan đến GTLN, GTNN của hàm số