Cho các số thực dương a khác 1. Biết rằng...
Câu hỏi: Cho các số thực dương a khác 1. Biết rằng bất kỳ đường thẳng nào song song với trục Ox mà cắt các đường \(y = {4^x},y = {a^x}\), trục tung lần lượt tại M, N và A thì AN = 2AM (hình vẽ bên). Giá trị của a bằng![](data:image/png;base64,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)
A. 1/3
B. \(\frac{{\sqrt 2 }}{2}\)
C. 1/4
D. 1/2
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG môn Toán năm 2019 cụm 8 Trường Chuyên ĐB Sông Hồng