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Khách
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![](https://rs.olm.vn/images/avt/0.png?1311)
14 tháng 12 2016
Hình ảnh minh họa
Vì i = i' ( góc phản xạ bằng góc tới )
RIN = SIN = 90* : 2
=> RIN = SIN = 45*
Vậy góc tới bằng 90*
![](https://rs.olm.vn/images/avt/0.png?1311)
24 tháng 12 2021
Góc tới : \(90^o-30^o=60^o\)
Do góc tới bằng góc phản xạ nên :
Góc phản xạ = góc tới = \(60^o\)
Cách vẽ :
Đầu tiên vẽ gương phẳng ; vẽ tia tới SI hợp vói gương 30o . Vẽ tia phản xạ cũng hợp với gương 30o
TL
1
Đầu tiên, bạn vẽ tia pháp tuyến IN của gương. Đo xem góc SIN bằng bao nhiêu độ, sau đó vẽ góc RIN ( góc phản xạ) sao cho góc SIN = góc RIN. Khi đó bạn vẽ đc tia phản xạ.
V![](data:image/png;base64,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)
Vẽ ảnh S' Của S qua Gương
Vẽ pháp tuyến N vuông góc với gương tại L
Nối S' với L ta Được tia phản xạ IR
Mình Vẽ Hơi Xấu Thông Cảm Nhé