Cho hàm số y = f(x) , \(x \in \left[ { - 2;3} \rig...
Câu hỏi: Cho hàm số y = f(x) , \(x \in \left[ { - 2;3} \right]\) có đồ thị như hình vẽ. Gọi M, m lần lượt là giá trị lớn nhất và giá trị nhỏ nhất của hàm số f(x) trên đoạn [-2; 3]. Giá trị của S = M +m là![](data:image/png;base64,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)
A. 6
B. 1
C. 5
D. 3
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 cụm 8 Trường Chuyên ĐB Sông Hồng