Generate Bode magnitude and phase plots (straight-line approximations) for the following voltage transfer functions j100ω 0.4(50+ju)...
For the following transfer function, sketch approximate
straight-line Bode plots, including magnitude and phase plots. Show
all steps clearly
10 4 (A)G(s)-7 s (s 2s +100)
For the following closed-loop transfer functions, sketch the bode plots (magnitude and phase), iden- tifying the zero gain, the slopes (in Decibels) and the high-frequency cutt-off rate. Then verify with Matlab C()101 100) s 0.1) (s 10) 100 s(s +10)2 G(s) = (56) G(s) = s+10(s+100)
For the following closed-loop transfer functions, sketch the bode plots (magnitude and phase), iden- tifying the zero gain, the slopes (in Decibels) and the high-frequency cutt-off rate. Then verify with Matlab C()101 100) s...
Sketch the approximate Bode magnitude and phase plots for the following transfer functions by hand. a. G(s) b. G(s)- 200 (s2 +2s)(0.1s +1) s+1 s2 +2s +100
For the following closed-loop transfer functions, sketch the bode plots (magnitude and phase), iden- tifying the zero gain, the slopes (in Decibels) and the high-frequency cutt-off rate. Then verify with Matlab (6) wn = 1, 〈 0.0.1, and 0.707. (8) Assuming the system of Problem 6 above, and an input of r(t) = 30sin(1000 t), use your bode plot to obtain the steady-state response
For the following closed-loop transfer functions, sketch the bode plots (magnitude and phase), iden- tifying the...
2. Sketch the Bode straight line plots for magnitude and phase. a) H60) = a[i*3 (veja) b)H(s) og 10 (14 j k loo) (j +5.000) jw
Problem 5: For the following transfer functions, sketch the bode asymptotic magnitude and phase plots, find the Gain margin and Phase margin, find the system type and the corresponding error constant for each case. G(A) (s +3)(s +5) s(s +2) (s+4) S+5 2)b).
Problem 5: For the following transfer functions, sketch the bode asymptotic magnitude and phase plots, find the Gain margin and Phase margin, find the system type and the corresponding error constant for each case. G(A) (s +3)(s...
Sketch the Bode magnitude and phase plots for the following transfer function: G(s)=- a fimction: G(9)= (s+2016+4) (s + 2)(+4)
QUESTION 2 Consider this 2" order transfer function which was discussed in lecture G(s) 10s+9 The Bode plots (magnitude, phase) for this G(s) are provided in this handout. For the following frequency (i.e."o") values, do complex number calculations as performed in lecture, to verify that this magnitude curve (in decibels) and phase curve (in degrees) are correct “o',-0.03, 0.2, 1, 6, 20, and 60 rad/sec Be sure to show your work CLEARLY, and indicate on the Bode plots the magnitude/phase...
Bode Plots Sketch the Bode plot magnitude and phase for each of the three open-loop transfer functions listed below. Verify your results using the bode m function in MATLAB.(a) \(G(s)=\frac{100}{s(0.1 s+1)(0.01 s+1)}\)(b) \(G(s)=\frac{1}{(s+1)^{2}\left(s^{2}+s+9\right)}\)(c) \(G(s)=\frac{16000 s}{(s+1)(s+100)\left(s^{2}+5 s+1600\right)}\)
16.1 For the following systems, sketch the Bode diagram, and from the straight-line approximations to the gain and phase plots, estimate the maximum value of K for which the system is stable: a. GH(s) = s(s + 1) (s + 4) b. GH(s) = = s(1 + s) KS c. GH() = 6 *21 к d. GH(s) = s(s? + 2s + 16) 5K(1 + s) e. GH(S) = f'( + s/352