Difference between revisions of "Forest UCM Osc Resonance"

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then for a given forced amplitude <math>(f_0)</math>   
 
then for a given forced amplitude <math>(f_0)</math>   
  
you can maximuze the oscillation by minimizing the denominator term  
+
you can maximize the oscillation by minimizing the denominator term  
  
 
:<math>(\omega_0^2 - \omega^2)^2 + 4  \beta^2 \omega^2 </math>
 
:<math>(\omega_0^2 - \omega^2)^2 + 4  \beta^2 \omega^2 </math>
 +
 +
since <math>\beta</math> is the amount of friction being applied remove energy from the system
 +
and <math>\omega_0</math> is the natural oscilaltion frequency (constants that characterize the system)
 +
 +
the only term you can change is the drive frequency <math>\omega</math> of your applied sinusoidal force.
 +
 +
if your set your sinusoidal force to a frequncy
 +
 +
:<math>\omega = \omega_0</math>
 +
 +
then the denominator is minimazed thereby maximizing the amplitude of the forced oscillation.
 +
 +
Resonance occurs when your applied sinusoidal force matches the natural frequency of the oscillaor.
 +
 +
This amplude is
 +
 +
:<math>A= \frac{f_0}{2\beta \omega_0}</math>
  
 
==Quality factor (Q) ==
 
==Quality factor (Q) ==
  
 
[[Forest_UCM_Osc#Resonance]]
 
[[Forest_UCM_Osc#Resonance]]

Revision as of 12:30, 8 October 2014

Oscillators driven by a source in resonance

[math] \ddot x + 2 \beta \dot x + \omega^2_0x = f(t)[/math]


Complete Solution for the Sinusoidally Driven Damped oscillator

[math]x(t) =x_h + x_p = C_1 e^{r_1 t} + C_2 e^{r_2 t} + A \cos(\omega t-\delta)[/math]

where

[math]r_1 = - \beta + \sqrt{\beta^2 - \omega_0^2}[/math]
[math]r_2 = - \beta + \sqrt{\beta^2 + \omega_0^2}[/math]
[math]A=\frac{f_0} { \sqrt{(\omega_0^2 - \omega^2)^2 + 4 \beta^2 \omega^2 }}[/math]
[math]\delta = \tan^{-1}\left ( \frac{2 \beta \omega}{(\omega_0^2- \omega^2)} \right )[/math]


The first two terms in the solution are exponentially decaying and tend to damp the oscillation.

The last term in the solution is the response of the system to a sinusoidal driving force.

Thus you can apply a force to prevent the oscillations from dying out.

Resonance

Resonance is the condition that your applied sinusoidal force is set to a frequency that will maximize the damped oscillations.

This means that the amplitude [math]A[/math] is maximized.

since

[math]A=\frac{f_0} { \sqrt{(\omega_0^2 - \omega^2)^2 + 4 \beta^2 \omega^2 }}[/math]

then for a given forced amplitude [math](f_0)[/math]

you can maximize the oscillation by minimizing the denominator term

[math](\omega_0^2 - \omega^2)^2 + 4 \beta^2 \omega^2 [/math]

since [math]\beta[/math] is the amount of friction being applied remove energy from the system and [math]\omega_0[/math] is the natural oscilaltion frequency (constants that characterize the system)

the only term you can change is the drive frequency [math]\omega[/math] of your applied sinusoidal force.

if your set your sinusoidal force to a frequncy

[math]\omega = \omega_0[/math]

then the denominator is minimazed thereby maximizing the amplitude of the forced oscillation.

Resonance occurs when your applied sinusoidal force matches the natural frequency of the oscillaor.

This amplude is

[math]A= \frac{f_0}{2\beta \omega_0}[/math]

Quality factor (Q)

Forest_UCM_Osc#Resonance