Cho hàm số y = f(x) liên tục trên đoạn [-3; 4] và...
Câu hỏi: Cho hàm số y = f(x) liên tục trên đoạn [-3; 4] và có đồ thị như hình vẽ bên. Gọi M và m lần lượt là các giá trị lớn nhất và nhỏ nhất của hàm số đã cho trên đoạn [-3; 4]. Tính M+n![](data:image/png;base64,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)
A. 5
B. 8
C. 7
D. 1
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 Trường THPT Kim Liên- Hà Nội