Cho đồ thị hàm số \(y = f\left( x \right)\left( C...
Câu hỏi: Cho đồ thị hàm số \(y = f\left( x \right)\left( C \right)\) có bảng biến thiên. Đồ thị \(\left( C \right)\) của hàm số có bao nhiêu đường tiệm cận![](data:image/jpeg;base64,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)
A 2
B 1
C 3
D 0
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 - Thầy Chí - Đề số 7