Answer:
damping natural frequency = 28.76 rad/s
Explanation:
given data
mass = 12 kg
stiffness = 10000 n/m
damping ratio = 0.08
displacement = 8 mm
initial velocity = 1 mm
to find out
damped natural frequency of the system
solution
we first find the natural frequency that is express as
natural frequency ω = [tex]\sqrt{\frac{k}{m} }[/tex] ..............1
here k is stiffness and m is mass
so ω = [tex]\sqrt{\frac{10000}{12} }[/tex]
ω = 28.86 rad/s
so
damping frequency will be
damping frequency = ω × [tex]\sqrt{1- r^2}[/tex] .....................2
here r is damping ration
damping frequency = 28.86 × [tex]\sqrt{1- 0.08^2}[/tex]
damping natural frequency = 28.76 rad/s
