The correct option is B 3:2
Given that, equation of incident wave
y=0.01cos(20x−100t)
Comparing with the general equation,
y=Asin(kx−ωt+ϕ)
we get,
A=0.01 m , k=20 m−1 , ω=100 rad/s
Let, the linear mass density of string −1 be μ1 and that of string −2 be 16μ1.
Wave speed on 1st string is given by (v1)=√Tμ1
Wave speed on 2nd string is given by (v2)=√T16μ1
⇒v2=v14 .......(1)
Frequency of the wave depends on the vibrating source only
∴ω=ω′ .....(2)
Angular wave number of the wave on 1st string (k)=ωv1
Angular wave number of the wave on 2nd string (k′)=ωv2
∴k′=4k
Speed of incident wave on stretched string−1 is
v1=ωk=10020=5 m/s
From (1), speed of wave in the stretched string−2 is given by
v2=v14=54 m/s
Now, Amplitude of the reflected wave
Ar=∣∣∣v2−v1v1+v2∣∣∣Ai
Amplitude of transmitted wave
At=(2v2v1+v2)Ai
⇒ArAt=∣∣∣v2−v12v2∣∣∣
From the given data,
ArAt=∣∣
∣
∣
∣∣54−554×2∣∣
∣
∣
∣∣=∣∣
∣
∣
∣∣154104∣∣
∣
∣
∣∣
⇒Ar:At=3:2
Thus, option (b) is the correct answer.