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