Cho hàm số \(y = \frac{{ax + bx}}{{cx + d}}\) có đ...
Câu hỏi: Cho hàm số \(y = \frac{{ax + bx}}{{cx + d}}\) có đồ thị như hình vẽ. Khi đó![](data:image/jpeg;base64,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)
A. ab > 0, ad > 0
B. ab > 0, ad > 0
C. ab < 0, ad < 0
D. ab < 0, ad > 0
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trung tâm luyện thi ĐH KHTN