Cho hàm số \(y=f\left( x \right)\) có bảng biến th...
Câu hỏi: Cho hàm số \(y=f\left( x \right)\) có bảng biến thiên như hình vẽ dưới đây. Hỏi đồ thị hàm số đã cho có bao nhiêu đường tiệm cận?![](data:image/jpeg;base64,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)
A 1
B 3
C 2
D 4
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử nghiệm THPT Quốc Gia môn Toán của Bộ GD&ĐT lần 3 - năm 2017