Cho số phức z thỏa mãn \(|z| = \frac{{\sqrt 2 }}{2...
Câu hỏi: Cho số phức z thỏa mãn \(|z| = \frac{{\sqrt 2 }}{2}\) và điểm A trong hình vẽ bên là điểm biểu diễn của z. Biết rằng trong hình vẽ bên, điểm biểu diễn của số phức \(w = \frac{1}{{iz}}\) là một trong bốn điểm M, N, P, Q. Khi đó điểm biểu diễn của số phức w là:![](data:image/png;base64,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)
A. Điểm Q
B. Điểm N
C. Điểm P
D. Điểm M
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi HK2 môn Toán 12 Trường THPT Trần Đại Nghĩa - ĐắkLắk năm học 2017 - 2018