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2024-11-23 20:03:22 +07:00 · 2022-09-12 23:39:09 +07:00 · 2022-09-12 23:39:09 +07:00 · 1366d8014b
commit 1366d8014b
parent 335927a157
5 changed files with 239 additions and 127 deletions
--- a/Table/442385_Nanda_Sisken_Assign_3.ipynb
+++ b/Table/442385_Nanda_Sisken_Assign_3.ipynb
--- a/Table/README.md
+++ b/Table/README.md
@ -0,0 +1,134 @@
 # routh_table
 This dir is belong to Control System class contains with Automated Routh Table Calculator based on Python. This code 100% original made by my hand :), please leave some notes if you're going to use it. Thanks!
 ## Libraries
 Libraries that used in this program is ```numpy``` and ```pandas```. ```numpy``` works to define and perform array while ```pandas``` is the final form after ```numpy.array``` to simplify the presentation. They imported by write..
 ```
 import numpy as np
 import pandas as pd
 ```
 ## RouthStability Class
 This class contains lots of procedures to simplify our Routh Stability Table Generator process. 
 ```
 def __init__(self, den):
    self.den = np.array([float(item) for item in den.split()])
    self.deg = len(self.den)
 ```
 The constructor ```__init__``` takes string of coefficiens from polynomial, extract the number, and load into class variable. It also define ```self.deg``` variable to save array's length, reducing number to calling ```len()``` function
 ```
 def set_k(self, k):
    self.den = np.append(self.den, float(k))
    self.deg += 1
 ```
 This function only takes one number from user and append it to ```self.den``` which defined as gain (constant). Also ```self.deg``` will increase by one
 ```
 def calc_routh(self):
    height = (self.deg+1)//2
    arr = np.zeros((height + 2,height))
    for index in range(self.deg):
        if index % 2 == 0:
        arr[0][index//2] = self.den[index]
        else:
        arr[1][(index-1)//2] = self.den[index]
    for i in range(2, height+2):
        for j in range(height-1):
        arr[i][j] = (arr[i-1][0]*arr[i-2][j+1] - arr[i-2][0]*arr[i-1][j+1])/arr[i-1][0]
        arr[i][j] += 0
    self.df = pd.DataFrame(arr)
    self.show_tab()
    if self.is_stable() == True:
        print("SYSTEM IS STABLE")
    else:
        print("SYSTEM IS UNSTABLE")
 ```
 ```calc_routh(self)``` as the core process of this class contains initialization and process about Routh Stability Process. Firstly, it define an empty zero (basically it filled with zeros) and iteratively being inserted by ```self.den``` (refering to Routh Table principle). After that, each cell will be updated by calculating Routh Table formula. Routh Table defined as ```numpy.ndarray``` and converted to ```pandas.DataFrame``` to simplify the presentation of table. ```self.show_tab()``` is called to print the Routh Table and ```self.is_stable()``` to check system's stability.
 ```
 def show_tab(self):
    print(self.df)
 ```
 This function print the Routh Table, should be called only if Routh Table is generated by ```calc_routh```
 ```
 def get_table(self):
    return self.df
 ```
 This function return ```pandas.DataFrame``` contained by Routh Table
 ```
 def is_stable(self):
    flag = True
    for item in self.df[0]:
        if item < 0: flag = False
    return flag
 ```
 This function check the first column's value from Routh Table. The system is define as stable if and only if all the value is positive, else it's unstable
 ```
 def get_poly(self, x):
    total = 0
    for i in range(self.deg):
        total += self.den[self.deg-i-1]*(x**i)
        print(total)
    return total
 ```
 This function initialize ```x``` value as variable on ```self.den``` polynomial and return the total
 ## Testing 1
 The testing can follow below example:
 ```
 # First Testing
 den = input("Enter your polynomial: ")
 k_in = input("Enter your K: ")
 rs = RouthStability(den)
 rs.set_k(k_in)
 rs.calc_routh()
 ```
 It takes coefficient of polynomial and K from user, insert it into ```RouthStability``` class as constructor parameter, insert the K value, and generate Routh Table. The result can be found below:
 ```
 Enter your polynomial: 1 3 5 7
 Enter your K: 9
          0    1    2
 0  1.000000  5.0  9.0
 1  3.000000  7.0  0.0
 2  2.666667  9.0  0.0
 3 -3.125000  0.0  0.0
 4  9.000000 -0.0  0.0
 SYSTEM IS UNSTABLE
 ```
 ## Testing 2
 ```
 Enter your polynomial: 11 15 19 21
 Enter your K: 29
           0     1     2
 0  11.000000  19.0  29.0
 1  15.000000  21.0   0.0
 2   3.600000  29.0   0.0
 3 -99.833333   0.0   0.0
 4  29.000000  -0.0   0.0
 SYSTEM IS UNSTABLE
 ```
 ## Testing 3
 ```
 Enter your polynomial: 1.2 6.78 11.11
 Enter your K: 3.141
           0       1
 0   1.200000  11.110
 1   6.780000   3.141
 2  10.554071   0.000
 3   3.141000   0.000
 SYSTEM IS STABLE
 ```
 ### Notes
 Contact nanda.r.d@mail.ugm.ac.id for more information
 ### Links
 You can access the source code here
 [github.com/nandard/routh_table.git](https://github.com/nandard/routh_table.git)
--- a/PI/README.md
+++ b/PI/README.md
@ -0,0 +1,69 @@
 # Integral Effect on Control System
 This dir is belong to Control System class contains with Integral Effect on Control System. This code 100% original made by my hand :), please leave some notes if you're going to use it. Thanks!
 ## Software
 This program run in Matlab
 ## Variables
 `s = tf('s');` defines s as 'frequency domain' for transfer function and will be used further. 
 ```
 J = 0.01;
 b = 0.1;
 K = 0.01;
 R = 1;
 L = 0.5;
 ```
 Those variable comes from BLDC control system.
 ```
 Kp = 1;
 % Ki = 1;
 % Ki = 3;
 % Ki = 5;
 Ki = 7;
 % Ki = 9;
 ```
 Variable above is the constant from PI control, we're trying to varies the constant to analyze integral effect on control system
 ## Process
 The BLDC motor control system should be defined as transfer function by initialize its numerator-denumerator and *tf()* function.
 ```
 num_motor = [K];
 den_motor = [J*L J*R+b*L R*b+K*K];
 motor = tf(num_motor,den_motor)
 ```
 Besides the plant function, the PI-control system defined by `C = tf([Kp Ki],[1 0])`. The vector is set according to PI formula which `PI = Kp * Ki/s`. After that, both of system are multiplied each others without feedback by `complete = feedback(motor*C,1);`
 That system will be test with step, ramp, and impulse input by call below lines
 ```
 subplot(311), impulse(complete);   % Impulse reponse
 subplot(312), step(complete);      % Step Response
 subplot(313), step(complete / s);  % Ramp response
 stepinfo(complete)
 ```
 Since Matlab doesn't provide any steady-state error calculation, we process it by call below lines
 ```
 [y,t] = step(complete); % Calculate Steady-State error
 sse = abs(1 - y(end))
 ```
 Last line works to limit the graph
 ```
 xlim([0 50])
 ylim([0 3])
 ```
 ## Testing 
 |   Kp = 1	|   Ki = 1	|   Ki = 3	|   Ki = 5	|   Ki = 7	|   Ki = 9	|
 |---	|---	|---	|---	|---	|---	|
 |   Rise Time	|   22.7723	|   6.7782	|   3.5914	|   2.3175	|   2.3175	|
 |   Settling Time	|   40.3716	|   12.1907	|   6.3158	|   3.6779	|  3.6779 	|
 |   Overshoot	|   0	|   0	|   0	|   0.3523	|   0	|
 |   SSE	|   1.7396e-06	|   0.0034	|   0.0033	|   0.0034	|   6.6536e-05	|
 ### Notes
 Contact nanda.r.d@mail.ugm.ac.id for more information
 ### Links
 You can access the source code here
 [github.com/nandard/routh_table.git](https://github.com/nandard/routh_table.git)
--- a/PI/integral_tf.m
+++ b/PI/integral_tf.m
@ -0,0 +1,35 @@
 % Variable
 s = tf('s');
 J = 0.01;
 b = 0.1;
 K = 0.01;
 R = 1;
 L = 0.5;
 Kp = 1;
 % Ki = 1;
 % Ki = 3;
 % Ki = 5;
 Ki = 7;
 % Ki = 9;
 % Define Transfer Function
 num_motor = [K];
 den_motor = [J*L J*R+b*L R*b+K*K];
 motor = tf(num_motor,den_motor)
 % Define Control Function
 C = tf([Kp Ki],[1 0])
 % Define Closed-Loop function
 complete = feedback(motor*C,1);
 % Process system responses
 subplot(311), impulse(complete);   % Impulse reponse
 subplot(312), step(complete);      % Step Response
 subplot(313), step(complete / s);  % Ramp response
 stepinfo(complete)
 % Calculate the Stead-State Error
 [y,t] = step(complete); % Calculate Steady-State error
 sse = abs(1 - y(end))
 % Limit the graph
 xlim([0 50])
 ylim([0 3])
--- a/README.md
+++ b/README.md
@ -1,132 +1,6 @@
 # routh_table
-This repo is belong to Control System class contains with Automated Routh Table Calculator based on Python. This code 100% original made by my hand :), please leave some notes if you're going to use it. Thanks!
+This repo is belong to Control System class and Mr. Muhammad Auzan as lecturer. This code 100% original made by my hand :), please leave some notes if you're going to use it. Thanks!
 ## Libraries
 Libraries that used in this program is ```numpy``` and ```pandas```. ```numpy``` works to define and perform array while ```pandas``` is the final form after ```numpy.array``` to simplify the presentation. They imported by write..
 ```
 import numpy as np
 import pandas as pd
 ```
 ## RouthStability Class
 This class contains lots of procedures to simplify our Routh Stability Table Generator process. 
 ```
 def __init__(self, den):
    self.den = np.array([float(item) for item in den.split()])
    self.deg = len(self.den)
 ```
 The constructor ```__init__``` takes string of coefficiens from polynomial, extract the number, and load into class variable. It also define ```self.deg``` variable to save array's length, reducing number to calling ```len()``` function
 ```
 def set_k(self, k):
    self.den = np.append(self.den, float(k))
    self.deg += 1
 ```
 This function only takes one number from user and append it to ```self.den``` which defined as gain (constant). Also ```self.deg``` will increase by one
 ```
 def calc_routh(self):
    height = (self.deg+1)//2
    arr = np.zeros((height + 2,height))
    for index in range(self.deg):
        if index % 2 == 0:
        arr[0][index//2] = self.den[index]
        else:
        arr[1][(index-1)//2] = self.den[index]
    for i in range(2, height+2):
        for j in range(height-1):
        arr[i][j] = (arr[i-1][0]*arr[i-2][j+1] - arr[i-2][0]*arr[i-1][j+1])/arr[i-1][0]
        arr[i][j] += 0
    self.df = pd.DataFrame(arr)
    self.show_tab()
    if self.is_stable() == True:
        print("SYSTEM IS STABLE")
    else:
        print("SYSTEM IS UNSTABLE")
 ```
 ```calc_routh(self)``` as the core process of this class contains initialization and process about Routh Stability Process. Firstly, it define an empty zero (basically it filled with zeros) and iteratively being inserted by ```self.den``` (refering to Routh Table principle). After that, each cell will be updated by calculating Routh Table formula. Routh Table defined as ```numpy.ndarray``` and converted to ```pandas.DataFrame``` to simplify the presentation of table. ```self.show_tab()``` is called to print the Routh Table and ```self.is_stable()``` to check system's stability.
 ```
 def show_tab(self):
    print(self.df)
 ```
 This function print the Routh Table, should be called only if Routh Table is generated by ```calc_routh```
 ```
 def get_table(self):
    return self.df
 ```
 This function return ```pandas.DataFrame``` contained by Routh Table
 ```
 def is_stable(self):
    flag = True
    for item in self.df[0]:
        if item < 0: flag = False
    return flag
 ```
 This function check the first column's value from Routh Table. The system is define as stable if and only if all the value is positive, else it's unstable
 ```
 def get_poly(self, x):
    total = 0
    for i in range(self.deg):
        total += self.den[self.deg-i-1]*(x**i)
        print(total)
    return total
 ```
 This function initialize ```x``` value as variable on ```self.den``` polynomial and return the total
 ## Testing 1
 The testing can follow below example:
 ```
 # First Testing
 den = input("Enter your polynomial: ")
 k_in = input("Enter your K: ")
 rs = RouthStability(den)
 rs.set_k(k_in)
 rs.calc_routh()
 ```
 It takes coefficient of polynomial and K from user, insert it into ```RouthStability``` class as constructor parameter, insert the K value, and generate Routh Table. The result can be found below:
 ```
 Enter your polynomial: 1 3 5 7
 Enter your K: 9
          0    1    2
 0  1.000000  5.0  9.0
 1  3.000000  7.0  0.0
 2  2.666667  9.0  0.0
 3 -3.125000  0.0  0.0
 4  9.000000 -0.0  0.0
 SYSTEM IS UNSTABLE
 ```
 ## Testing 2
 ```
 Enter your polynomial: 11 15 19 21
 Enter your K: 29
           0     1     2
 0  11.000000  19.0  29.0
 1  15.000000  21.0   0.0
 2   3.600000  29.0   0.0
 3 -99.833333   0.0   0.0
 4  29.000000  -0.0   0.0
 SYSTEM IS UNSTABLE
 ```
 ## Testing 3
 ```
 Enter your polynomial: 1.2 6.78 11.11
 Enter your K: 3.141
           0       1
 0   1.200000  11.110
 1   6.780000   3.141
 2  10.554071   0.000
 3   3.141000   0.000
 SYSTEM IS STABLE
 ```
 ### Notes
 Contact nanda.r.d@mail.ugm.ac.id for more information
 ### Links