Cho hàm số \(f(x)\) xác định và liên tục trên R có...
Câu hỏi: Cho hàm số \(f(x)\) xác định và liên tục trên R có đồ thị như hình vẽ.![](data:image/png;base64,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)
A. T = 2
B. T = 0
C. T = - 8
D. T = 14
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