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jrm2002
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I have been reading Equations of Motion pertaining to "Damped Single Degree of Freedom Systems"
There, the critical damping coefficient wherein the oscillation is completely eliminated from the system is defined by:
Critical Damping Coefficient = 2 x m x (omega)
where,
m=mass
omega=natural frequency of the system
Natural frequency of the system= square root(k/m)
k=stiffness of the system
I want to know how the expression for critical damping coefficient obtained as 2 x m x (omega).
Is it obtained through experiments/statistics??
Please help
There, the critical damping coefficient wherein the oscillation is completely eliminated from the system is defined by:
Critical Damping Coefficient = 2 x m x (omega)
where,
m=mass
omega=natural frequency of the system
Natural frequency of the system= square root(k/m)
k=stiffness of the system
I want to know how the expression for critical damping coefficient obtained as 2 x m x (omega).
Is it obtained through experiments/statistics??
Please help