Cho hàm số có bảng biến thiên như sau:
Câu hỏi: Cho hàm số có bảng biến thiên như sau:![](data:image/png;base64,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)
A. 4
B. 1
C. 3
D. 2
Câu hỏi trên thuộc đề trắc nghiệm
Đề kiểm tra 1 tiết Chương 1 Giải tích 12 năm 2019 Trường THPT Chà CangA. 4
B. 1
C. 3
D. 2
Câu hỏi trên thuộc đề trắc nghiệm
Đề kiểm tra 1 tiết Chương 1 Giải tích 12 năm 2019 Trường THPT Chà Cang