**System mass-spring**
Simulations of the differential equation that represents a vibratory system mass-spring
-Vibration Free.
-Damped vibration.
Vibration-damping with Sub;
With Super-Vibration damping;
-Forced Mechanical Vibrations.
The effect Batting;
The effect of resonance
The system mass-spring:
$\displaystyle m \frac{d^2(x)}{dt^2} + \gamma \frac{d(x)}{dt} + kx = F_o cos(wt)$
In vibration free not have:
Friction Force
External force
$\displaystyle m \frac{d^2(x)}{dt^2} + kx = 0$
I correct ?
*
Last edited by werehk; Dec 18th 2009 at 06:08 PM.
* |