Cho hàm số \(y = f\left( x \right)\) xác định, liê...
Câu hỏi: Cho hàm số \(y = f\left( x \right)\) xác định, liên tục trên \(\mathbb{R}\backslash \left\{ 1 \right\}\) và có bảng biến thiên như sau:![](data:image/png;base64,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)
A. \(m < 0\)
B. \(m > 0\)
C. \(0 < m < \frac{{27}}{4}\)
D. \(m > \frac{{27}}{4}\)
Câu hỏi trên thuộc đề trắc nghiệm
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