Trên bề mặt chất lỏng có hai nguồn phát sóng kết hợp S1, S2 cách nhau 13 cm dao động cùng pha. Biết sóng đó do mỗi nguồn phát ra có tần số f = 50 Hz, vận tốc truyền sóng v = 2 m/s. Một đường tròn bán kính R = 3 cm có tâm tại trung điểm của S1S2, nằm trong mặt phẳng chứa các vân giao thoa. Số điểm dao động cực đại trên đường tròn là
A.5.
B.8.
C.10.
D.12.
\(\lambda = v/f = 0,04m=4cm.\)
\(\triangle \varphi =0\)![](data:image/png;base64,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)
Số điểm dao động cực đại trên đoạn thẳng đường kính 2R là:
\(-2R\leq d_2-d_1\leq 2R \Rightarrow -2R\leq (k+\frac{\triangle\varphi)}{2 \pi}\lambda\leq 2R \Rightarrow -2R \leq k.\lambda \leq 2R \\ \Rightarrow \frac{-2R}{\lambda}\leq k \leq \frac{2R}{\lambda} \Rightarrow -1,5 \leq k \leq 1,5 \Rightarrow k=-1,0,1\)
=> trên đường tròn bán kính R có 6 điểm dao động với biên độ cực đại.