Cho hàm số \(y=f(x)\) xác định, liên tục trên R và...
Câu hỏi: Cho hàm số \(y=f(x)\) xác định, liên tục trên R và có bảng biến thiên:![](data:image/png;base64,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)
A. Hàm số có điểm cực tiểu là \(x=-1\)
B. Hàm số có đúng một cực trị
C. Hàm số có điểm cực đại là \(x=0\)
D. Hàm số có 2 điểm cực trị
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi học kì 1 môn Toán lớp 12 Sở GD & ĐT Khánh Hòa năm 2017 - 2018 (VIP)