What Is the Equation of a Wave Reflected from a Rigid Boundary?

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The equation of a wave reflected from a rigid boundary is derived from the original wave equation y = A[sin(wt – kx)]. The reflected wave is represented as y = A1[sin(wt + kx)], and there is a phase change of π when reflecting off a denser medium. The amplitude A1 is influenced by boundary conditions, which determine if a negative sign is necessary in the equation. It is confirmed that a negative sign is not required; the phase change occurs due to the properties of the rigid wall. Understanding these principles is crucial for accurately describing wave behavior at boundaries.
Amith2006
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Sir,
Consider a progressive wave represented by the equation,
y = A[sin(wt – kx)]
If it is reflected from a wall, what will probably be the equation of the reflected wave?
I think it is y = A1[sin(wt + kx)]
Is it right? Should a negative sign be given to the expression? Will there be a phase change of pi assuming the wall to be rigid boundary?
 
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Amith2006 said:
Sir,
Consider a progressive wave represented by the equation,
y = A[sin(wt – kx)]
If it is reflected from a wall, what will probably be the equation of the reflected wave?
I think it is y = A1[sin(wt + kx)]
Is it right? Should a negative sign be given to the expression? Will there be a phase change of pi assuming the wall to be rigid boundary?

There will be a phase change of \pi if the wall is of a denser medium than the incident medium. Since the wall is rigid, this is correct. A_{1} is determined from considerations of boundary conditions. That will tell you whether there should be a minus sign or not. You don't have to "give" it a negative sign.
 

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