Cho hàm số \(f(x)\) liên tục trên đoạn [- 1;3] và...
Câu hỏi: Cho hàm số \(f(x)\) liên tục trên đoạn [- 1;3] và có đồ thị như hình vẽ bên. Gọi M và m lần lượt là GTLN và GTNN của hàm số đã cho trên [- 1;3]. Giá trị của P = m.M bằng? 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)
A. 3
B. - 4
C. 6
D. - 6
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Nguyễn Quang Diệu