Cho hàm số \(y = f(x)\) có bảng biến thiên như hì...
Câu hỏi: Cho hàm số \(y = f(x)\) có bảng biến thiên như hình vẽ. Mệnh đề nào dưới đây sai?![](data:image/png;base64,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)
A. Đồ thị hàm số không có đường tiệm cận ngang.
B. Hàm số đồng biến trên khoảng \(( - 3; - 1)\).
C. Hàm số nghịch biến trên \((0;1) \cup (1;2)\).
D. Đồ thị hàm số có một đường tiệm cận đứng.
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi học kì 1 môn Toán lớp 12 Trường THPT Kim Liên năm học 2017 - 2018