Cho hàm số \(f(x)\) liên tục trên R và có đồ thị n...
Câu hỏi: Cho hàm số \(f(x)\) liên tục trên R và có đồ thị như hình vẽ. Mệnh đề nào sau đây SAI?![](data:image/png;base64,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)
A. Hàm số \(y=f(x)\) có hai điểm cực trị.
B. Nếu \(\left| m \right| > 2\) thì phương trình \(f(x)=m\) có nghiệm duy nhất.
C. Hàm số \(y=f(x)\) có cực tiểu bằng - 1.
D. Giá trị lớn nhất của hàm số \(y=f(x)\) trên đoạn [- 2;2] bằng 2.
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Sở GD & ĐT Bắc Ninh lần 2