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 là hình bên và hàm số \(y = g\left( t \right) = {t^3} - 3{t^2} + 5\). Gọi M, m theo thứ tự là GTLN – GTNN của \(y = g\left( {\left| {f\left( x \right) - 2} \right|} \right)\) trên đoạn [-1;3]. Tích M.m bằng![](data:image/png;base64,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)
A. 55
B. 53
C. 54
D. 52
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