Scilab/C2/Matrix-Operations/English-timed
From Script | Spoken-Tutorial
Time | Narration |
00.03 | Welcome to the spoken tutorial on Matrix Operations. |
00.07 | At the end of this spoken tutorial, you will be able to: |
00.10 | Access the elements of Matrix |
00.13 | Determine the determinant, inverse and eigen values of a matrix. |
00.19 | Define special matrices. |
00.23 | Perform elementary row operations. |
00.25 | Solve the system of “linear equations”. |
00.29 | The preequisites are |
00.31 | Scilab should be installed on your system. |
00.34 | You should have listened to the Spoken Tutorial: Getting started with Scilab and 'Vector Operations. |
00.42 | I am using Windows 7 operating system and Scilab 5.2.2 for demonstration. |
00.50 | Start Scilab by double-clicking on the Scilab icon present on yourDesktop. |
00.59 | It is suggested that the user should practice this tutorial in Scilab simultaneously while pausing the video at regular intervals of time. |
01.09 | Recall that in the Spoken Tutorial, 'Vector Operations', |
01.12 | matrix E was defined as E = [5 19 15;8 22 36]and press enter |
01.37 | Let us now see how to address individual elements of a matrix, separately. |
01.42 | To access the element in the first row and second column, type: E(1,2) and press enter |
01.56 | It is easy to extract an entire row or an entire column of a matrix in Scilab . |
02.03 | For example, first row of E can be obtained using the following command: E1 = E(1,:) and press enter |
02.24 | The command returns all the elements of the first row in the order of their appearance in the row. |
02.30 | Colon, when used alone, refers to all the elements of row or column, depending upon whether it appears as a first or a second entry respectively inside the bracket. |
02.44 | Also, any subset of a matrix can be extracted using a colon (“:”). |
02.49 | For example, the set of elements starting from second to third columns of E can be obtained using the following command: |
03.01 | -->E2 = E(:,2:3) close the bracket and press enter |
03.18 | In the above, the second entry in the bracket, that is, "2 colon 3" makes a reference to elements from column 2 to column 3. |
03.28 | If the size of the matrix is not known $ symbol can be used to extarct the last row or column of that matrix. |
03.38 | For example to extract all rows of the last column of the matrix E, we will type |
03.46 | --->E last column = E(:,$) close the bracket and press enter |
04.06 | Now, let us learn how to calculate the determinant of a square matrix using the command “det” |
04.13 | Recall that in the Spoken Tutorial, Vector Operations, we had defined A as |
04.20 | A=[1 2 - 1; - 2 - 6 4; - 1 - 3 3] close the square bracket and press enter |
04.50 | Let us calculate the determinant of A by the command det(A) and press Enter. |
05.00 | To calculate the inverse and the eigenvalues of a matrix, the commands, “inv” and “spec” respectively, can be used. |
05.09 | For example: inv(A) gives the inverse of A and spec(A) gives the eigen values of A |
05.29 | See 'help spec' to see how eigenvectors can also be obtained using this command. |
05.35 | Square or cube of a square matrix A can be calculated by simply typing A^2 or A^3 respectively. |
05.52 | A caret symbol is used to raise a matrix to power, like in ordinary arithmetic operations. In our keyboard, it is obtained by pressing shift+6. |
06.05 | Please pause the tutorial now and attempt exercise number one given with the video. |
06.18 | Certain special matrices can also be created in Scilab: |
06.24 | For example a matrix of zeros with 3 rows and 4 columns can be created using “zeros” command |
06.36 | zeros(3,4) and press enter |
06.48 | A matrix of all ones can be created with “ones” command as follows |
06.53 | ones(2,4) gives a matrix of all ones |
07.02 | It is easy to create an identity matrix using “eye” command: |
07.07 | eye(4,4) gives a 4 by 4 identity matrix |
07.17 | A user may need a matrix consisting of pseudo random numbers. It can be generated using the “rand” command as follows: |
07.25 | p=rand(2,3) and press enter |
07.39 | In linear systems, one of the important sets of operations a user carries out on matrices are the elementary row and column operations. |
07.55 | These operations involve executing row operations on a matrix to make entries below a nonzero number, zero. This can be done easily in Scilab. |
08.08 | Recall that in the Spoken Tutorial,Vector Operations, we had defined the matrix P as follows. |
08.18 | P = [1 2 3;4 11 6]close the square bracket and press enter |
08.34 | Let us consider an example where the element in the second row, first column is to be transformed to zero using elementary row and column operation. |
08.45 | The operation can be executed by multiplying the first row by 4 and subtracting it from the second row as in the following command: |
08.57 | P(2,:) = P(2,:) - 4*P(1,:) and press enter |
09.29 | The procedure can be extended to larger systems and to other forms of elementary column operations. |
09.35 | Rows and columns can be easily appended to matrices. |
09.39 | For example, to append a row containing [5 5 -2] to P, the following command is used: |
09.49 | T = [P; [5 5 -2]] close both the square bracket and press enter |
10.15 | The semicolon after P states that the anything after it should go to the next row. ' |
10.20 | This is expected in the way a matrix is defined. |
10.24 | As an exercise, please pause here and check if the brackets around the new row, in the command just executed, are really required. |
10.34 | Matrix notations are used while solving equations. |
10.41 | Let us solve the following set of linear equations: |
10.44 | x1 + 2 x2 − x3 = 1 |
10.48 | − 2 x1 − 6 x2 + 4 x3 = − 2 |
10.54 | − x1 − 3 x2 + 3 x3 = 1 |
11.00 | The above set of equations can be written in the Ax = b form. |
11.05 | The solution is then given as inverse of A times b |
11.11 | Let us solve the set of equations. |
11.15 | A is defined as A = [1 2 -1;-2 -6 4;-1 -3 3] close the square bracket and press enter |
11.46 | B can be defined as b = [1;-2;1]close the square bracket and press enter |
12.04 | The solution, x, can be obtained using x = inv(A)*b |
12.20 | It is worth noting that it is a small letter 'i' in the command, 'inv'. |
12.27 | Alternatively, the same result can be achieved using a backslash operation in Scilab. |
12.33 | Lets do this in Scilab x = A\b and press enter. |
12.45 | It gives the same result. Type "help backslash" and "help inv" in Scilab to know more about individual advantages and disadvantages. |
12.55 | The integrity of the solution can be verified by back substitution, that is, by calculating Ax-b: |
13.05 | A*x-b |
13.10 | The above exercise verifies the result achieved earlier. |
13.14 | It is possible that in some systems the above verification exercise may not yield a matrix with *exact* zeros as its elements due to intermediate floating point operations. |
13.27 | However, one will indeed get a very small number, typically of the order of 10 raised to -16 |
13.35 | Please pause the tutorial now and attempt exercise number two given with the video. |
13.49 | This brings us to the end of this spoken tutorial on Matrix Operation. |
13.54 | There are many other functions in Scilab which will be covered in other spoken tutorials. |
13.59 | Keep watching the Scilab links. |
14.02 | In this tutorial we have learnt |
14.04 | To access the element of the matrix using the colon operator |
14.08 | Calculate the inverse of a matrix using the 'inv' command or by backslash |
14.14 | Calculate the derterminant of matrix using 'det' command. |
14.19 | Calculate eigen values of a matrix using 'spec' command. |
14.24 | Define a matrix having all the elements one, Null Matrix, |
14.29 | Identity matrix and a matrix with random elements by using functions ones(), zeros(), eye(), rand() respectively |
14.39 | Solve the system of linear equations. |
14.43 | This spoken tutorial has been created by the Free and Open Source Software in Science and Engineering Education(FOSSEE). |
14.51 | More information on the FOSSEE project could be obtained from http://fossee.in or [1] |
14.59 | Supported by the National Mission on Eduction through ICT, MHRD, Government of India. |
15.05 | For more information, visit: http://spoken-tutorial.org/NMEICT-Intro |
15.15 | This is Anuradha Amrutkar from IIT Bombay signing off. |
Thank you for joining. Goodbye. |
Contributors and Content Editors
Gaurav, Jyotisolanki, PoojaMoolya, Ranjana, Sandhya.np14, Sneha