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PAGE 1

Wave Equation (d'Alembert solution)

the waves we've looked at are standing waves (not going anywhere)

A diagram showing a standing wave as a solid arc above and a dashed arc below, with a vertical double-headed arrow in the center indicating oscillation. — Figure: Standing wave oscillation

but it's actually made of two traveling waves that move away from each other

A diagram showing two separate wave pulses moving in opposite directions. The left pulse has an arrow pointing right, and the right pulse has arrows pointing both left and right, illustrating wave propagation. — Figure: Traveling wave components

this is also "visible" from the Fourier series solution

Problem A: \[ y(x,t) = \sum_{n=1}^{\infty} A_n \cos\left(\frac{n\pi at}{L}\right) \sin\left(\frac{n\pi x}{L}\right) \]

we know \[ 2 \sin A \cos B = \sin(A+B) + \sin(A-B) \]

\[ y(x,t) = \underbrace{\frac{1}{2} \sum_{n=1}^{\infty} A_n \sin\left(\frac{n\pi}{L}(x+at)\right)}_{\substack{\uparrow \\ \text{each wave} \\ \text{is half magnitude} \\ \text{wave traveling LEFT}}} + \underbrace{\frac{1}{2} \sum_{n=1}^{\infty} A_n \sin\left(\frac{n\pi}{L}(x-at)\right)}_{\substack{\uparrow \\ \text{wave traveling RIGHT}}} \]

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d'Alembert solved the wave equation in 1747 (60 years before Fourier)

\[ y_{tt} = a^2 y_{xx} \]

\[ -\infty < x < \infty, \quad t > 0 \]

\( \underbrace{\quad}_{\text{no BCs}} \)

\( a \): speed of wave propagation

IC: \( y(x,0) = f(x) \) initial displacement

\( y_t(x,0) = g(x) \) " velocity

d'Alembert realized that an observer moving with one of the traveling waves would see a wave with constant magnitude

\( \rightarrow \) use as coordinate system

right-moving wave: wave speed is \( a \)

\[ \frac{dx}{dt} = a \quad \rightarrow \quad x - at = \text{constant} \]

for left-moving wave: \( x + at = \text{constant} \)

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Solving the Wave Equation via Change of Variables

let

\( \xi = x + at \)
\( \eta = x - at \)

\[ y_{tt} = a^2 y_{xx} \quad y(x,t) \]

\[ y_x = y_{\xi} + y_{\eta} \]

because \[ \frac{\partial y}{\partial x} = \frac{\partial y}{\partial \xi} \frac{\partial \xi}{\partial x} + \frac{\partial y}{\partial \eta} \frac{\partial \eta}{\partial x} \]

\[ y_t = a(y_{\xi} - y_{\eta}) \]

\[ y_{xx} = y_{\xi\xi} + 2y_{\xi\eta} + y_{\eta\eta} \]

\[ y_{tt} = a^2(y_{\xi\xi} - 2y_{\xi\eta} + y_{\eta\eta}) \]

the wave becomes:

\[ y_{\xi\eta} = 0 \]

integrate:

\[ y_{\eta}(\xi, \eta) = \phi(\eta) \]

(with respect \( \xi \))

again:

\[ y(\xi, \eta) = \phi(\eta) + \psi(\xi) \]

back to \( x \) and \( t \):

\[ y(x,t) = \underbrace{\phi(x-at)}_{\text{wave moving RIGHT}} + \underbrace{\psi(x+at)}_{\text{wave moving LEFT}} \]

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Applying Initial Conditions

initial conditions:

\( y(x,0) = f(x) \)
\( y_t(x,0) = g(x) \)

\[ y(x,t) = \phi(x-at) + \psi(x+at) \]

\[ f(x) = \phi(x) + \psi(x) \]

\[ y_t(x,t) = \frac{\partial \phi}{\partial (x-at)} \frac{\partial (x-at)}{\partial t} + \frac{\partial \psi}{\partial (x+at)} \frac{\partial (x+at)}{\partial t} \]

at \( t = 0 \)

\[ g(x) = \phi'(x) \cdot -a + \psi'(x) \cdot a \]

\[ g(x) = -a \phi'(x) + a \psi'(x) \]

integrate this from \( x_0 \) to \( x \)

\[ -a \phi(x) + a \psi(x) = \int_{x_0}^{x} g(s) ds \]

Solve 1st and 3rd eqs simultaneously

\( \vdots \)

\[ \phi(x) = \frac{1}{2} f(x) - \frac{1}{2a} \int_{x_0}^{x} g(s) ds \]

\[ \psi(x) = \frac{1}{2} f(x) + \frac{1}{2a} \int_{x_0}^{x} g(s) ds \]

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Sub into \( y(x,t) = \phi(x-at) + \psi(x+at) \)

\[ y(x,t) = \frac{1}{2} \left[ f(x-at) + f(x+at) \right] + \frac{1}{2a} \int_{x-at}^{x+at} g(s) ds \]