![](data:image/png;base64,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)
A)Ortamın kırılma indisi büyüdükçe ışığın ortamdaki hızı azalır.
B) Gelen ışığın yüzeyin normal çizgisi ile yaptığı açı artarsa hızı azalır.
C) Işık ışınları ortam değiştirdikçe frekansı değişmez.
D) Işık hızı ortama bağlıdır.
E) Ortamın kırılma indisi artarsa ortamdaki dalga boyu azalır.