Looking for speed using the wave equation

AI Thread Summary
The discussion focuses on determining the speed of a wave described by the equation phi(x,t) = A e^[-a(bx+ct)^2]. The user identifies that the wave is traveling in the negative x-direction and references the relationship between speed, angular frequency, and wave number (v = w/k). They express difficulty in solving the problem due to a lack of numerical values, aside from the speed of light (c). The user seeks alternative methods to find the speed without using partial fractions, emphasizing the need to maintain the wave's maximum amplitude over time. The conversation highlights the challenge of applying theoretical concepts to practical calculations in wave mechanics.
Ashley1nOnly
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Homework Statement


phi(x,t) = A e *[-a(bx+ct)*2]
I'm trying to find the speed of the equation

Homework Equations


f(x+vt) +vt which means it is in the negative x-direction
f(x)= e^-ax^2
plugging in x'=x+vt
A e *[-a(bx+ct)*2]
where a= constant A= amplitude v=c= speed of light

The Attempt at a Solution


I know that is speed = w(angular frequency)/K
This issue that I am having is that I don't have any number besides c which is the speed of light
I know that I can use partial fractions [partial phi/ partial t]divided by [partial phi/ partial x] but I'm not allowed to use that way. What is another way I can solve this problem
 
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V=W/K
V=B/A
SINCE IT IS GOING IN THE -X DIRECTION
 
Last edited:
ANY function f(x + vt) is a wave traveling in the -x direction with speed v.
Consider: at t=x=0 the function is max = A. For t>0 what values of x maintain the value f=A?
 

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