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.![](data:image/png;base64,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)
A. M = 0
B. M = 6
C. M = 5
D. M = 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