Cho hàm số \(y=f(x)\) có bảng biến thiên như sau.
Câu hỏi: Cho hàm số \(y=f(x)\) có bảng biến thiên như sau.![](data:image/png;base64,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)
A. 1
B. 2
C. 0
D. 5
Câu hỏi trên thuộc đề trắc nghiệm
Đề kiểm tra 1 tiết Chương 1 Giải tích 12 năm 2019 Trường THPT Chà CangA. 1
B. 2
C. 0
D. 5
Câu hỏi trên thuộc đề trắc nghiệm
Đề kiểm tra 1 tiết Chương 1 Giải tích 12 năm 2019 Trường THPT Chà Cang