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DNT 354 - Control Principle Root Locus Techniques DNT 354 - Control Principle.

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Presentation on theme: "DNT 354 - Control Principle Root Locus Techniques DNT 354 - Control Principle."— Presentation transcript:

1 DNT 354 - Control Principle
Root Locus Techniques DNT Control Principle

2 Contents Introduction The Control System Problem
Complex Numbers as Vector Defining Root Locus

3 Introduction Root locus is a graphical representation of the closed-loop poles as a system parameter is varied. Provides a qualitative description of systems performance. The advantage of this technique is in its ability to provide solution for systems of order higher than two. Also provide a graphical representation of system’s stability. Ranges of stability Ranges of instability Conditions that cause a system to break into oscillation Two concepts that will be reviewed beforehand: Control system problem Complex numbers and representation as vectors

4 The Control System Problem
Poles of open-loop transfer function: Easy to obtain via inspection of the denominator Not affected by changes in system gain Poles of closed-loop transfer function: More difficult to obtain which needs factorization of closed-loop system characteristic polynomial Affected by changes in system gain With KG(s) as the forward transfer function and H(s) as the feedback transfer function, the closed-loop transfer function T(s) are reduced to:

5 The Control System Problem
(a) Closed-loop system (b) Equivalent transfer function

6 The Control System Problem
Letting, Then, If given, Poles of G(s) = -2, 0 Zeros of G(s) = -1 Poles of H(s) = -4 Zeros of H(s) = -3

7 The Control System Problem
It is observed: The zeros of T(s) consist of the zeros of G(s) and the poles of H(s). The poles of T(s) are not immediately known without factoring the denominator and are a function of K. Since the system’s transient response and stability are dependant upon the poles of T(s), root locus enables monitoring of the poles as the parameter K is varied.

8 Complex Numbers as Vector
Any complex number, σ + jω, described in Cartesian coordinates can be graphically represented by a vector. (a) s =  + j (b) F(s) = s + a (c) Alternate representation of F(s) = s + a (d) F(s) = s + 7|s5 + j2

9 Complex Numbers as Vector
It can be concluded that (s + a) is a complex number and can be represented by a vector drawn from the zero of the function to the point s. The complex number can also be represented in polar form with magnitude M and angle θ. Exercise: Plot and convert the following complex number into polar form. s = 3 + j4 s = -3 + j5 s = -2 – j7

10 Complex Numbers as Vector
Assume a function, Each factor in the numerator and denominator is a complex number that can be represented as a vector. The function defines the complex arithmetic to be performed to evaluate F(s) at any point, s. Where, Π : Product m : Number of zeros n : Number of poles

11 Complex Numbers as Vector
Since each complex factor can be thought of as a vector, the magnitude M, of F(s) at any point s is, Where, │(s + zi)│ is magnitude of the vector drawn from the zero of F(s) at –zi to the point s. │(s + pj)│ is magnitude of the vector drawn from the pole of F(s) at –pj to the point s.

12 Complex Numbers as Vector
The angle θ, of F(s) at any point s is, Where, Zero angle is the angle measured from the positive extension of the real axis, of a vector drawn from the zero of F(s) at –zi to point s. Pole angle is the angle measured from the positive extension of the real axis, of a vector drawn from the pole of F(s) at –pj to point s.

13 Complex Numbers as Vector
Example: Find F(s) at the point s = -3 + j4. Vector originating at zero at -1 Vector originating at pole at the origin Vector originating at pole at -2

14 Complex Numbers as Vector
Example: Find F(s) at the point s = -3 + j4. The result for evaluating F(s) at the point -3 + j4

15 Complex Numbers as Vector
Example: Find F(s) at the point s = -7 + j9 using the following ways. Directly substituting the point into F(s). Calculating the result using vectors. Answer:

16 Defining Root Locus Root locus are used to analyze and design the effect of loop gain upon the system’s transient response and stability. By taking the CameraMan system as an example, the video camera system are designed to automatically follow the subject. The tracking system consists of a dual sensor and a transmitter, where one component is mounted on the camera, and the other worn by the subject. An imbalance between the outputs of the two sensors receiving energy from the transmitted causes the system to rotate the camera to balance out the difference and seek the source of energy.

17 Defining Root Locus (a) CameraMan® Presenter Camera System
automatically follows a subject who wears infrared sensors on their front and back tracking commands and audio are relayed to CameraMan via a radio frequency link from a unit worn by the subject. (b) Block diagram (c) Closed-loop transfer function

18 Defining Root Locus Pole location as a function of gain for the CameraMan system.

19 Defining Root Locus (a) Pole plot (b) Root locus

20 Defining Root Locus It is observed:
At K = 0, poles exists at -10 and 0. As K increases, both poles move towards each other and meet at -5. The poles break away into the complex plane as K increases further. One pole moves upward while the other downwards. The individual closed-loop poles plotted are removed and replaced with solid lines. Thus, root locus is a representation of the paths of the closed-loop poles as the gain is varied.

21 Defining Root Locus With regards to transient response:
The poles are real for gains less than 25. Thus, the system is overdamped. At a gain of 25, the poles are real and repeated. Thus, the system is critically damped. As gain increases above 25, the poles are complex conjugate. Thus, the system is underdamped. With regards to the underdamped portion of the root locus The settling time remains the same. Damping ratio diminishes and percent overshoot increases. Damped frequency of oscillation increases. With regards to stability, the system is always stable because the root locus never crosses into the RHP.


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