a) Please show all your steps. For the magnitude and phase angle plots, approximate bode diagrams...
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)
Problem: A. For every Bode magnitude plot, do the following: (a)Find the Bode gain, K. (b)List the corner frequency for each factor. (c)Draw the straight line Bode magnitude plot for each factor, using the correct slope. (d) Carefully combine the plots into a composite straight line plot, using graphical addition at (e) (f) the corner frequencies. Use a heavy line for this composite plot. Go back and add the appropriate corrections at corners (±3 dB for simple poles/zeros) By hand,...
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...
I need help with this Bode Plots assignment (5 points) Follow the steps (a-c) described below for the following transfer function. Do the steps in order! 5. H50 H(s) 2000 a. On a 'blank Bode plot' grid, plot the Bode plot straight line hand sketch approximation for magnitude for the frequency range from 1000 to ω.*1000. Be sure, though, that the corner frequency aligns with an appropriate vertical line on the grid. b. On graph paper, directly below the magnitude...
I need help with this Bode Plots assignment 2. (5 points) Follow the steps (a-c) described below for the following transfer function. Do the steps in order! 1+ 10 1+ 10 a. On a 'blank Bode plot' grid, plot the Bode plot straight line hand sketch approximation for magnitude for the frequency range from 1000 to ω.*1000. Be sure, though, that the corner frequency aligns with an appropriate vertical line on the grid. b. On graph paper, directly below the...
please answer thoroughly ahow each step.. please provide detail bode plots.. please answer complelty Consider the following transfer function: G(8) = Tstl 1. Write the polar form of hand 1+jWT 2. Write the magnitude and phase of G(jw). 3. Write the magnitude in dB of G(jw). 4. What is the approximate magnitude of Gw) in dBs for the low and high frequencies w, respectively? 5. What is the approximate phase of G(w) for the low and high frequencies w, respec-...
Please plot on semi-log scale for both magnitude and phase separately B. Sketch the Bode plots for the magnitude and the phase for the transfer function: 10(S + 1) H(S) = S(S + 10)(8 + 100)
Sketch the straight-line approximation Bode plot diagrams (magnitude and phase) 110s for H[s] You might want to examine Examples E.1 and E.2 in (s+10)(s+100)´ the textbook. Based on your straight-line Bode plot sketch, answer the following questions. The questions are: a. Identify the transfer function written in time constant form. b. The phase of H[s] at low frequencies is? c. The magnitude plot has what slope at low frequencies? d. The magnitude plot has what slope at high frequencies? e....
For the transfer function, construct the bode plots for magnitude and phase. Use copies of the semi-log paper on the second page of this assignment. Also, a printable copy of the semi-log paper can be found below. Use one sheet per problem. Indicate the contributions from the factors of the transfer function with light lines in pencil. These are called “guidelines”. Indicate the graphical sum of the guidelines (the final bode plot) with heavier lines in ink. You will find...
For all problems -given a transfer function G(s) sketch the magnitude and phase characteristics in the logarithmic scale (i.e. Bode-plots) of the system using the following rules-of-thumb: i. "Normalize" the G(s) by extracting poles/zeros, substituting s-jw and writing the TF using DC-gain KO and time-constants i. Arange break-points (poles, zeros or on for complex-conjugate poles) in ascending order ii Based on the term Ko(ju)Fk, determine: initial slope of the magnitude-response asymptote for low frequencies as F k 20 dB/dec (e.g....