Acoustic wave equation

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In physics, the acoustic wave equation governs the propagation of acoustic waves through a material medium. The form of the equation is a second order partial differential equation. The equation describes the evolution of pressure p or velocity u as a function of space r and time t. The SI unit of measure for pressure is the pascal, and for velocity is the meter per second.

A simplified form of the equation describes acoustic waves in only one spatial dimension (position x), while a more sophisticated form describes waves in three dimensions (displacement vector r = (x,y,z)).

p = p(r,t) = p(x,y,z,t)

AND

u = u(r,t) = u(x,y,z,t)

Contents

[edit] Wave equation

[edit] Acoustic wave equation in one dimension

[edit] Equation

{ \partial^2 p \over \partial x ^2 } - {1 \over c^2} { \partial^2 p \over \partial t ^2 } = 0

[edit] Solution

p=p_0 \sin(\omega t \mp kx)

[edit] Derivation


The wave equation can be developed from the linearized one-dimensional continuity equation, the linearized one-dimensional force equation and the equation of state.

The equation of state (ideal gas law)

PV = nRT

In an adiabatic process pressure P as a function of density ρ can be linearized to

P = C \rho \,

where C is some constant. Breaking the pressure and density into their mean and total components and noting that C=\frac{\partial P}{\partial \rho}:

P - P_0 = \left(\frac{\partial P}{\partial \rho}\right) (\rho - \rho_0).

The adiabatic bulk modulus for a fluid is defined as

B= \rho_0 \left(\frac{\partial P}{\partial \rho}\right)_{adiabatic}

which gives the result

P-P_0=B \frac{\rho - \rho_0}{\rho_0}.

Condensation, s, is defined as the change in density for a given ambient fluid density.

s = \frac{\rho - \rho_0}{\rho_0}

The linearized equation of state becomes

p = B s\, where p is the acoustic pressure.



The continuity equation (conservation of mass) in one dimension is

\frac{\partial \rho}{\partial t} + \frac{\partial }{\partial x} (\rho u) = 0.

Again the equation must be linearized and the variables split into mean and variable components.

\frac{\partial}{\partial t} ( \rho_0 + \rho_0 s) + \frac{\partial }{\partial x} ((\rho_0 u + \rho_0 s u) = 0

Rearranging and noting that ambient density does not change with time or position and that the condensation multiplied by the velocity is a very small number:

\frac{\partial s}{\partial t} + \frac{\partial }{\partial x} u = 0



Euler's Force equation (conservation of momentum) is the last needed component. In one dimension the equation is:

\rho \frac{D u}{D t} + \frac{\partial P}{\partial x} = 0.

Linearizing the variables:

(\rho_0 +\rho_0 s)\left( \frac{\partial }{\partial t} + u \frac{\partial }{\partial x} \right) u + \frac{\partial }{\partial x} (P_0 + p) = 0.

Rearranging and neglecting small terms, the resultant equation is:

\rho_0\frac{\partial u}{\partial t} + \frac{\partial p}{\partial x} = 0.



Taking the time derivative of the continuity equation and the spacial derivative of the force equation results in:

\frac{\partial^2 s}{\partial t^2} + \frac{\partial^2 u}{\partial x \partial t} = 0

\rho_0 \frac{\partial^2 u}{\partial x \partial t} + \frac{\partial^2 p}{\partial x^2} = 0.

Combining and substituting the linearized equation of state,

- \frac{\rho_0 }{B} \frac{\partial^2 p}{\partial t^2} + \frac{\partial^2 p}{\partial x^2} = 0.

The final result is

{ \partial^2 p \over \partial x ^2 } - {1 \over c^2} { \partial^2 p \over \partial t ^2 } = 0

where c = \sqrt{ \frac{B}{\rho_0 }}.

[edit] Acoustic wave equation in N dimensions

[edit] Equation

\nabla ^2 p - {1 \over c^2} { \partial^2 p \over \partial t ^2 } = 0

[edit] Solution

[edit] Derivation

[edit] Acoustic wave equation in non-ideal gas flow

heterogeneity, energy loss and flow speed

  • Equation
  • Solution
  • Derivation

[edit] Acoustic wave equation in solids

[edit] See also

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