Question

Consider the following root locus form

Consider the following root locus form 

image.png

(a) With hand calculations, sketch the root locus plot. Please calculate the asymptotes, centrode, break in/break-away point(s), and locus departure angles and identify where on the real axis the locus exists Investigate whether the locus intersects the imaginary axis, and if it does, calculate the K value and the location on the imaginary axis where this inersection occurs. 

(b) Obtain the root locus in Matlab and show how your calculations in (a) are validated.

5 0
Add a comment Improve this question Transcribed image text
Know the answer?
Add Answer to:
Consider the following root locus form
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for? Ask your own homework help question. Our experts will answer your question WITHIN MINUTES for Free.
Similar Homework Help Questions
  • Plot the root locus for a system with the following characteristic equation: s2 +8s 25 s2(s...

    Plot the root locus for a system with the following characteristic equation: s2 +8s 25 s2(s 4) Be sure to calculate (and clearly label) any asymptotes, break-in/break-away points, and arrival/departure angles. If there are any imaginary axis crossings, clearly identify the frequency () and gain (K) associated with such crossings.

  • Hand sketch the root locus with respect to K for the equation 1+KL(s) = 0 where L(s) is shown below.

    Hand sketch the root locus with respect to K for the equation 1+KL(s) = 0 where L(s) is shown below. Your sketch should clearly indicate the locations of the poles (X) and the zeros (0) of the L(s). If necessary, show the location and angle of the asymptotes, location of the break-in/breakaway points, and the location at which the root locus intersects imaginary axis. After completing each hand sketch, verify your results using MATLAB. You do not submit to submit the...

  • Sketch the root locus of the given system above with respect to k

    Sketch the root locus of the given system above with respect to k [Find the asymptotes and their angles, the break-away or break-in points, the angle of arrival or departure for the complex poles and zeros imaginary axis crossing points, respectively (if any).]

  • Y(s) s216 s 128 (s212 s 52) (s +1) (s + 4) (s +8) R(s) For the given system above, Sketch the root locus. Procedures Sh...

    Y(s) s216 s 128 (s212 s 52) (s +1) (s + 4) (s +8) R(s) For the given system above, Sketch the root locus. Procedures Show all the steps of calculation manually Show the imaginary axis intersection points if they exist Show the break away and entry points if they exist. Show the departure and arrival angles if they exist Check by MATLAB the root locus sketch Use MATLAB to simplify your calculations o + Y(s) s216 s 128 (s212...

  • For the following system, R(s) Y(s) s(s +4) a)Sketch its root locus. Be sure to calculate...

    For the following system, R(s) Y(s) s(s +4) a)Sketch its root locus. Be sure to calculate (and clearly label) all asymptotes, break- away/break-in points, departure/arrival angles, and imaginary axis crossings (if any) Include arrows showing the direction of closed-loop pole traversal. b) Find the smallest time constant the system will have.

  • Root Locus: Consider the following system

    Root Locus: Consider the following system (a) What are the poles of the open loop system (locations of the open loop poles)? What are zeros of the open loop system (locations of the zeros)?  (b) What is the origin of the asymptotes?  (c) What are the angles of asymptotes?  (d) Find the break-away and break-in points.  (e) Find the angles of departure for all the poles.  (f) Draw the root locus plot of G(s).  (g) For what values of K is the closed loop system stable? 

  • The characteristic equation (denominator of the closed-loop transfer function set equal to zero) is given s3 + 2s2 + (20K +7)s+ 100K Sketch the root locus of the given system above with respect to...

    The characteristic equation (denominator of the closed-loop transfer function set equal to zero) is given s3 + 2s2 + (20K +7)s+ 100K Sketch the root locus of the given system above with respect to K. [ Find the asymptotes and their angles, the break-away or break-in points, the angle of arrival or departure for the complex poles and zeros, imaginary axis crossing points, respectively (if any). The characteristic equation (denominator of the closed-loop transfer function set equal to zero) is...

  • Lectures 15-18: Root-locus method 5.1 Sketch the root locus for a unity feedback system with the ...

    help on #5.2 L(s) is loop transfer function 1+L(s) = 0 lecture notes: Lectures 15-18: Root-locus method 5.1 Sketch the root locus for a unity feedback system with the loop transfer function (8+5(+10) .2 +10+20 where K, T, and a are nonnegative parameters. For each case summarize your results in a table similar to the one provided below. Root locus parameters Open loop poles Open loop zeros Number of zeros at infinity Number of branches Number of asymptotes Center of...

  • create a class name tennisGame Problem 1: Sketch by hand the root locus of the following...

    create a class name tennisGame Problem 1: Sketch by hand the root locus of the following closed-loop systems. Students are welcome to verify their results by using Matlab function rlocus0. But they should hand-sketch the root locus without copying the Matlab figure. . Label the directions of the trajectories. . Label the names of the real-axis break-in/break-away point and ja-axis crossings, if applicable. Find the asymptotes, if applicable. System Root Locus s-6 S+ 2 (s + 2)(6 +3) s2-4s 5...

  • Problem 3: (30) Consider the following systen where K is a proportional gain (K>0). s-2 (a) Sketch the root locus us...

    Problem 3: (30) Consider the following systen where K is a proportional gain (K>0). s-2 (a) Sketch the root locus using the below procedures. (1) find poles and zeros and locate on complex domain (2) find number of branches (3) find asymptotes including centroid and angles of asymptotes (4) intersection at imaginary axis (5) find the angle of departure (6) draw the root migration (b) Find the range of K for which the feedback system is asymptotically stable. Problem 3:...

ADVERTISEMENT
Free Homework Help App
Download From Google Play
Scan Your Homework
to Get Instant Free Answers
Need Online Homework Help?
Ask a Question
Get Answers For Free
Most questions answered within 3 hours.
ADVERTISEMENT
ADVERTISEMENT