Trong hình vẽ dưới đây có đồ thị của các hàm số\(y...
Câu hỏi: Trong hình vẽ dưới đây có đồ thị của các hàm số\(y = {a^x}\), \(y = {b^x}\), \(y = {\log _c}x\).![](data:image/png;base64,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)
A. \(c < a < b.\)
B. \(a < c < b.\)
C. \(b < c < a.\)
D. \(a < b = c.\)
Câu hỏi trên thuộc đề trắc nghiệm
25 bài Trắc nghiệm Mũ và Logarit vận dụng cao Toán 12 năm học 2016 - 2017