Hình vẽ sau là đồ thị của ba hàm số \(y = {x^\alph...
Câu hỏi: Hình vẽ sau là đồ thị của ba hàm số \(y = {x^\alpha },y = {x^\beta },y = {x^\gamma }{\rm{ }}\) (với ) và là các số thực cho trước. Mệnh đề nào dưới đây đúng?![](data:image/png;base64,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)
A. \(\gamma > \beta > \alpha \)
B. \(\beta > \alpha > \gamma \)
C. \(\alpha > \beta > \gamma \)
D. \(\beta > \gamma > \alpha \)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi học kì 1 môn Toán lớp 12 Trường THPT Kim Liên năm học 2017 - 2018