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1 1 Frequency Response Analysis Sinusoidal Forcing of a First-Order Process For a first-order transfer function with gain K and time constant τ, the response to a general sinusoidal input, xt = A tis: sin ω KA () ( t / τ yt = ωτe ωτ cos ωt+ sin ω t) (5-25) ωτ + 1 Note that y(t) and x(t) are in deviation form. The long-time response, y l (t), can be written as: KA y () t = sin( ωt+ φ) for t (13-1) ωτ + 1 where: 1 φ = tan ωτ

2 2 Figure 13.1 Attenuation and time shift between input and output sine waves (K= 1). The phase angle φ of the output signal is given by φ = Time shift / P 360, where t is the (period) shift and P is the period of oscillation.

3 Frequency Response Characteristics of a First-Order Process ˆ For xt = Asin ωt, y t = Asin ωt+ φ as t where : ˆ KA A = and φ = tan ωτ ωτ The output signal is a sinusoid that has the same frequency, ω, as the input.signal, x(t) =Asinωt. 2. The amplitude of the output signal, Â, is a function of the frequency ω and the input amplitude, A: ˆ KA A = (13-2) ωτ The output has a phase shift, φ, relative to the input. The amount of phase shift depends on ω. 3

4 4 Dividing both sides of (13-2) by the input signal amplitude A yields the amplitude ratio (AR) AR Aˆ = = A K ωτ + 1 (13-3a) which can, in turn, be divided by the process gain to yield the normalized amplitude ratio (AR N ) AR N = 1 ωτ + 1 (13-3b)

5 Shortcut Method for Finding the Frequency Response The shortcut method consists of the following steps: Step 1. Set s=jω in G(s) to obtain G jω. Step 2. Rationalize G(jω); We want to express it in the form. G(jω)=R + ji where R and I are functions of ω. Simplify G(jω) by multiplying the numerator and denominator by the complex conjugate of the denominator. Step 3. The amplitude ratio and phase angle of G(s) are given by: AR = R + I Memorize ϕ = 1 tan ( R / I) 5

6 Example 13.1 Find the frequency response of a first-order system, with Solution G s = 1 τs + 1 First, substitute s = jω in the transfer function (13-16) 1 1 G( jω ) = = (13-17) τω j + 1 jωτ + 1 Then multiply both numerator and denominator by the complex conjugate of the denominator, that is, jωτ + 1 ( ω) G j jωτ + 1 jωτ + 1 = = ωτ + 1 ωτ + 1 ωτ + 1 ( j )( j ) 1 ( ωτ) = + j = R+ ji ωτ + 1 ωτ + 1 (13-18) 6

7 7 where: I R = = 1 ωτ + 1 ωτ ωτ + 1 (13-19a) (13-19b) From Step 3 of the Shortcut Method, ( ωτ + 1) 1 ωτ AR = R + I = + ωτ + 1 ωτ + 1 or ( 1+ ωτ ) 1 AR = = (13-20a) 2 ωτ + 1 Also, 1 I 1 1 φ = tan = tan ( ωτ) = tan ( ωτ ) (13-20b) R

8 Complex Transfer Functions Consider a complex transfer G(s), Ga s Gb s Gc s G( s) = G s G s G s ( ω) ( ω) ( ω) ( ω) ( ω) ( ω) (13-22) Substitute s=jω, Ga j Gb j Gc j G( jω ) = (13-23) G j G j G j From complex variable theory, we can express the magnitude and angle of G jω as follows: ( ω ) G j = ( ω) ( ω) ( ω) ( ω) ( ω) ( ω) G j G j G j a b c G j G j G j ( ω) a( ω) b( ω) c( ω) G ( j ) G ( j ) G ( j ) G j = G j + G j + G j (13-24a) [ ω + ω + ω + ] (13-24b) 8

9 Bode Diagrams A special graph, called the Bode diagram or Bode plot, provides a convenient display of the frequency response characteristics of a transfer function model. It consists of plots of AR and φ as a function of ω. Ordinarily, ω is expressed in units of radians/time. Bode Plot of A First-order System Recall: 1 AR N = and φ = tan ωτ ωτ At low frequencies ( ω 0andωτ 1) : AR N = 1 and ϕ=0 At high frequencies ( ω 0andωτ 1) : AR = 1/ ωτ and ϕ= 90 N 9

10 Figure 13.2 Bode diagram for a first-order process. 10

11 11 Note that the asymptotes intersect at ω= ωb = 1/ τ, known as the break frequency or corner frequency. Here the value of AR N from (13-21) is: 1 AR N ( ω= ωb ) = = (13-30) 1+ 1 Some books and software defined AR differently, in terms of decibels. The amplitude ratio in decibels AR d is defined as AR d = 20 log AR (13-33)

12 Integrating Elements The transfer function for an integrating element was given in Chapter 5: Y( s) K G( s) = = (5-34) U s s K K AR = G( jω ) = = (13-34) jω ω K φ= G jω = = 90 (13-35) Second-Order Process A general transfer function that describes any underdamped, critically damped, or overdamped second-order system is K G( s) = (13-40) τ s + 2ζτs+ 1 12

13 Substituting s = jω and rearranging yields: AR = K ( 1 ωτ) + ( 2ωτζ) (13-41a) 1 2ωτζ φ = tan (13-41b) 1 ωτ Figure 13.3 Bode diagrams for second-order processes. 13

14 14 Time Delay Its frequency response characteristics can be obtained by substituting s = jω, ωθ = G jω e j (13-53) which can be written in rational form by substitution of the Euler identity, From (13-54) or jωθ G jω = e = cos ωθ jsin ωθ (13-54) AR = G jω = cos ωθ + sin ωθ = 1 (13-55) 1 φ= G( jω) = tan sin ωθ cosωθ φ= ωθ (13-56)

15 Figure 13.6 Bode diagram for a time delay, e θs. 15

16 16 Figure 13.7 Phase angle plots for e θs and for the 1/1 and 2/2 Padé approximations (G 1 is 1/1; G 2 is 2/2).

17 17 Process Zeros Consider a process zero term, = K( sτ + 1) G s Substituting s=jω gives Thus: G jω = K( jωτ + 1) AR = G jω = K ω τ φ= G jω =+ tan ωτ Note: In general, a multiplicative constant (e.g., K) changes the AR by a factor of K without affecting φ.

18 18 Frequency Response Characteristics of Feedback Controllers Proportional Controller. Consider a proportional controller with positive gain c = (13-57) G s K In this case Gc jω = Kc, which is independent of ω. Therefore, and c AR = K (13-58) c c φc = 0 (13-59)

19 19 Proportional-Integral Controller. A proportional-integral (PI) controller has the transfer function (cf. Eq. 8-9), 1 τ 1 1 I s + Gc s = Kc + = Kc (13-60) τis τis Substitute s=jω: 1 jω τ G ( ω ) = 1+ = I c j Kc Kc = Kc 1 j τi jω jωτi τiω Thus, the amplitude ratio and phase angle are: c c c 2 c ( ωτi ) 2 1 ωτi + 1 AR = G ( jω) = K 1 + = K (13-62) ωτ 1 1 ( j ) φ = G ω = tan 1/ ωτ = tan ωτ 90 (13-63) c c I I I

20 20 Figure 13.9 Bode plot of a PI controller, G c ( s) 10s + 1 = 2 10s

21 21 Ideal Proportional-Derivative Controller. For the ideal proportional-derivative (PD) controller (cf. Eq. 8-11) = ( + ) G s K 1 τ s (13-64) c c D The frequency response characteristics are similar to those of a LHP zero: 2 AR = K ωτ + 1 (13-65) c c D 1 φ = tan ωτ (13-66) Proportional-Derivative Controller with Filter. The PD controller is most often realized by the transfer function D τds + 1 Gc( s) = Kc ατds + 1 (13-67)

22 22 Figure Bode plots of an ideal PD controller and a PD controller with derivative filter. Idea: G c ( s) = 24 ( s+ 1) With Derivative Filter: 4s + 1 Gc ( s) = s + 1

23 PID Controller Forms Parallel PID Controller. The simplest form in Ch. 8 is 1 G c s = K c 1+ + τ τ D s 1s Series PID Controller. The simplest version of the series PID controller is τ1s + 1 Gc( s) = Kc ( τ Ds+ 1 ) (13-73) τ1s Series PID Controller with a Derivative Filter. τ1s+ 1 τ s+ 1 Gc( s) = K D c τ1s ατds+ 1 23

24 Figure Bode plots of ideal parallel PID controller and series PID controller with derivative filter (α = 1). Idea parallel: 1 Gc ( s) = s 10s G c ( s) Series with Derivative Filter: 10s+ 1 4s+ 1 = 2 10s 0.4s+ 1 24

25 25 Nyquist Diagrams Consider the transfer function with and G s 1 = (13-76) 2s AR = G( jω ) = (13-77a) 2ω φ= G jω = tan 2ω (13-77b)

26 Figure The Nyquist diagram for G(s) = 1/(2s + 1) plotting Re ω and Im G jω. G( j ) 26

27 Figure The Nyquist diagram for the transfer function in Example 13.5: Gs () = 6s 5(8s+ 1) e (20s+ 1)(4s+ 1) 27

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