Hình vẽ bên là đồ thị các hàm số \(y = {x^a},y = {...
Câu hỏi: Hình vẽ bên là đồ thị các hàm số \(y = {x^a},y = {x^b},y = {x^c}\) trên miền \((0; + \infty )\) . Hỏi trong các số a, b, c số nào nhận giá trị trong khoảng (0;1)?![](data:image/jpeg;base64,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)
A Số a
B Số a và số c
C Số b
D Số c
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán trường THPT Chuyên Hưng Yên - Hưng Yên - năm 2017 ( có lời giải chi tiết)