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 + m = 4
B. M + m = 7
C. M + m = 5
D. M + m = 6
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