What is the damping factor of an RLC circuit?

Damping FactorEdit

Circuit Type	Series RLC
Damping Factor	ζ = R 2 C L {\displaystyle \zeta ={R \over 2}{\sqrt {C \over L}}}
Resonance Frequency	ω o = 1 L C {\displaystyle \omega _{o}={1 \over {\sqrt {LC}}}}

When damping factor & 0 then condition is?

The constant ζ is known as the damping ratio or factor and ωn as the undamped natural angular frequency. If the input y is not changing with time, i.e. we have steady-state conditions, then d2y/dt2 = 0 and dy/dt = 0 and so we have output y = kx and k is the steady-state gain.

When the damping factor is in between 0 and 1 then the system is classified as?

If ζ = 1, then both poles are equal, negative, and real (s = -ωn). The system is critically damped. If 0 < ζ < 1, then poles are complex conjugates with negative real part. . The system is underdamped.

When the damping factor is equal to 1 it is called?

If the value of the damping factor is equal to one then it is called as critical damping. If the value of the damping factor is greater than ‘one’, it is called over damping.

What is the value of damping factor for Underdamped system?

ζ < 1
The damping ratio is a system parameter, denoted by ζ (zeta), that can vary from undamped (ζ = 0), underdamped (ζ < 1) through critically damped (ζ = 1) to overdamped (ζ > 1).

When the damping factor is in between 0 and 1 then the system is classified as Mcq?

The type of system is determined by the value of the damping factor (ζ), i.e. 1) If 0 < ζ < 1, the system is underdamped. 2) If ζ = 1, the system is critically damped. 3) If ζ > 1, the system is overdamped….

Nature of Poles	Damping Condition
Real & distinct	Over damped (ζ >1)

When the damping ratio () of a second order system is equal to 1 then the system is?

4.6

System	Damping ratio	Roots of the Characte-ristic equine.
Un-damped	ξ =0	ξ = 0 Imaginary; s = ±jωn
Under-damped (Practical system)	0 ≤ ξ ≤ 1	Complex Conjugate
Critically damped	ξ = 1	-ωn Real and equal
Over-damped	ξ > 1	Real and unequal

When damping factor is zero system is called MCQ?

Explanation: The generalized time response of a second order control system reduces to a purely sinusoidal function when the damping factor is zero. This is because the damping ratio becomes 0. Hence, the correct option is purely sinusoidal. 10.

What is damping on what factor damping depends?

The damping force is known as the ratio of impedance due to load to the impedance due to the amplifier. It depends upon the stress, number of cycles, and the structure of the object k.