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damp
Natural frequencies and damping factors.
Syntax
[wn,z] = damp(sys) [wn,z] = damp(P) [wn,z] = damp(P, dt) [wn,z] = damp(R) [wn,z] = damp(R, dt)
Parameters
- sys
A linear dynamical system, in state space, transfer function or zpk representations, in continuous or discrete time.
- P
An array of polynomials.
- R
An array of real or complex floating point numbers.
- dt
A non negative scalar, with default value 0.
- wn
vector of floating point numbers in increasing order: the natural pulsation in rad/s.
- z
vector of floating point numbers: the damping factors.
Description
The denominator second order continuous time transfer function
with complex poles can be written as s^2 + 2*z*wn*s + wn^2
where z
is the damping factor and wn
the natural pulsation.
If sys
is a continuous time system,
[wn,z] = damp(sys)
returns in wn
the natural
pulsation ωn (in rad/s) and in z
the damping
factors ξ of the poles of the linear dynamical system
sys
. The wn
and
z
arrays are ordered according to the increasing
pulsation order.
If sys
is a discrete time system
[wn,z] = damp(sys)
returns in
wn
the natural pulsation
ωn (in rad/s) and in z
the
damping factors ξ of the continuous time
equivalent poles of sys
. The
wn
and z
arrays are
ordered according to the increasing pulsation order.
[wn,z] = damp(P)
returns in
wn
the natural pulsation
ωn (in rad/s) and in z
the
damping factors ξ of the set of roots of the polynomials
stored in the P
array. If
dt
is given and non 0, the roots are first
converted to their continuous time equivalents.
The wn
and z
arrays are ordered
according to the increasing pulsation order.
[wn,z] = damp(R)
returns in
wn
the natural pulsation
ωn (in rad/s) and in z
the
damping factors ξ of the set of roots stored in the
R
array.
If dt
is given and non 0, the roots are first
converted to their continuous time equivalents.
wn(i)
and z(i)
are the the
natural pulsation and damping factor of R(i)
.
Examples
s = %s; num = 22801 + 4406.18*s + 382.37*s^2 + 21.02*s^3 + s^4; den = 22952.25 + 4117.77*s + 490.63*s^2 + 33.06*s^3 + s^4 h = syslin('c', num/den); [wn,z] = damp(h)
The following example illustrates the effect of the damping factor on the frequency response of a second order system.
s = %s; wn = 1; clf(); Z = [0.95 0.7 0.5 0.3 0.13 0.0001]; for k=1:size(Z,'*') z = Z(k) H = syslin('c', 1 + 5*s + 10*s^2, s^2 + 2*z*wn*s + wn^2); gainplot(H, 0.01, 1) p = gce(); p = p.children; p.foreground = k; end title("$\frac{1+5 s+10 s^2}{\omega_n^2+2\omega_n\xi s+s^2}, \quad \omega_n=1$") legend('$\xi = '+string(Z)+'$') plot(wn/(2*%pi)*[1 1], [0 70], 'r') // Natural pulsation
Computing the natural pulsations and damping ratio for a set of roots:
[wn,z] = damp((1:5)+%i)
History
Version | Description |
6.0 | handling zpk representation |
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