the value of maximum amplitude produced due to interference of two wave is given by
12Rishiraj1:
hiii dear
Answers
Answered by
11
ans: maximum amplitude produced due to interference of two waves is the sum of amplitude of given two waves
Let first wave is Y₁ = A₁sinωt
second wave is Y₂ = A₂sin(ωt + Φ)
then after interference amplitude of new wave is A = √{A₁² + A₂² + 2A₁.A₂cosΦ}
hence, amplitude will be maximum when
cosΦ = 1 , A = |A₁ + A₂|
hence maximum value of amplitude is the sum of amplitudes of given two waves.
Let first wave is Y₁ = A₁sinωt
second wave is Y₂ = A₂sin(ωt + Φ)
then after interference amplitude of new wave is A = √{A₁² + A₂² + 2A₁.A₂cosΦ}
hence, amplitude will be maximum when
cosΦ = 1 , A = |A₁ + A₂|
hence maximum value of amplitude is the sum of amplitudes of given two waves.
Similar questions