Difference between revisions of "Scilab/C2/Vector-Operations/English-timed"
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|| Welcome to the spoken tutorial on Vector Operations | || Welcome to the spoken tutorial on Vector Operations | ||
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| 00.07 | | 00.07 | ||
| − | + | |At the end of this spoken tutorial you will be able to, | |
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| 00.23 | | 00.23 | ||
| − | + | | Define a matrix. | |
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| 00.25 | | 00.25 | ||
| − | + | |Calculate size of a matrix. | |
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| 00.28 | | 00.28 | ||
| − | + | | Perform mathematical operations on Matrices such as addition, subtraction and multiplication. | |
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| 00.36 | | 00.36 | ||
| − | + | | The Pre-requisites are Scilab should be installed on your system. | |
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| 00.46 | | 00.46 | ||
| − | | | + | | You should have Basic knowledge about Vectors and Matrices. |
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| 00.50 | | 00.50 | ||
| − | + | | I am using Windows 7 operating system and Scilab 5.2.2 for demonstration. | |
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| 01.03 | | 01.03 | ||
| − | | | This will open the Scilab console window | + | | | This will open the Scilab console window. |
|- | |- | ||
| − | | 01. | + | | 01.06 |
| − | | | + | | Notice that the cursor is on the command prompt. |
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| − | | 01. | + | | 01.10 |
| + | |||
| + | | I suggest that you practice this tutorial in Scilab simultaneously while pausing the video at regular intervals of time. | ||
| + | |||
| + | |- | ||
| + | |||
| + | | 01.19 | ||
| | Let us start by defining a vector. | | | Let us start by defining a vector. | ||
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| 01.24 | | 01.24 | ||
| − | | | + | | By using spaces as p is equal to open square bracket one space 2 space 3 close the square bracket and press enter. |
|- | |- | ||
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| 01.37 | | 01.37 | ||
| − | + | | or using commas as q is equal to open square bracket two comma three comma four close the square bracket and press enter. | |
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| − | | 01. | + | | 01.53 |
| | We can find the length of a vector p by the command length of p and press enter | | | We can find the length of a vector p by the command length of p and press enter | ||
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| 02.08 | | 02.08 | ||
| − | | | Addition of two vectors | + | | | Addition of two vectors |
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| − | | 02. | + | | 02.14 |
| | Transpose of a vector can be found by using apostrophe (also known as single-quote). | | | Transpose of a vector can be found by using apostrophe (also known as single-quote). | ||
| − | + | ||
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| − | | 02. | + | | 02.21 |
| + | |||
| + | | p transpose is as shown | ||
| + | |||
| + | |- | ||
| + | |||
| + | | 02.27 | ||
| | We can calculate p-transpose times q: | | | We can calculate p-transpose times q: | ||
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| − | | 02. | + | | 02.34 |
| | The command p times q-transpose gives a scalar: | | | The command p times q-transpose gives a scalar: | ||
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| − | | 02. | + | | 02.43 |
| | Please pause the tutorial now and attempt exercise number one given with the video | | | Please pause the tutorial now and attempt exercise number one given with the video | ||
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| − | | 02. | + | | 02.50 |
| | Now we will see how to define a matrix. | | | Now we will see how to define a matrix. | ||
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| 03.04 | | 03.04 | ||
| − | + | |For example,let us define a 2 by 3 matrix P by typing captital P is equal to open square bracket 1 space 2 space 3 semicolon | |
| + | |||
| + | |- | ||
| + | |||
| + | | 03.20 | ||
| + | |||
| + | |4 space five space 6 close the square bracket and press enter. | ||
| + | |||
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| 03.27 | | 03.27 | ||
| − | + | | Note that Semicolon is used for defining the next row of the matrix. | |
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| − | | 03. | + | | 03.34 |
| | Here variable P used to define matrix is in upper case. | | | Here variable P used to define matrix is in upper case. | ||
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| 03.48 | | 03.48 | ||
| − | + | | We will now see how to find the size of a Matrix using the “size” command. | |
|- | |- | ||
| − | | 03. | + | | 03.53 |
| − | + | | for this type open square bracket row comma column close the sqaure bracket is equal to size of capital p which is matrix and press enter. | |
|- | |- | ||
| − | | 04. | + | | 04.10 |
| − | | | + | | You get the following output. |
|- | |- | ||
| − | | 04. | + | | 04.17 |
| − | | | + | | Note that the length command will give the total number of elements in the matrix as you see. |
|- | |- | ||
| − | | 04. | + | | 04.27 |
| − | | | | + | | | The transpose command works for the matrices as well as shown here : |
|- | |- | ||
| − | | 04. | + | | 04.34 |
| − | | | Let us now define a 2 by 3 matrix Q: | + | | p transpose gives the transpose of matrix p. |
| + | |||
| + | |- | ||
| + | |||
| + | | 04.41 | ||
| + | |||
| + | | Let us now define a 2 by 3 matrix Q: | ||
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| 04.45 | | 04.45 | ||
| − | | | + | | Capital q is equal to open square bracket one space five space three semicolon to enter into the next row |
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| 04.56 | | 04.56 | ||
| − | | | + | | Two space four space eight close the square bracket and press enter. |
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| − | | 05. | + | | 05.03 |
| | Let us also recall P once more: | | | Let us also recall P once more: | ||
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| − | | 05. | + | | 05.08 |
| | We can carry out calculations involving P and Q, just as we do in mathematics. | | | We can carry out calculations involving P and Q, just as we do in mathematics. | ||
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| − | | 05. | + | | 05.14 |
| | For example, let us calculate E is equal to 2 times p plus 3 times q and press enter: | | | For example, let us calculate E is equal to 2 times p plus 3 times q and press enter: | ||
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| − | | 05. | + | | 05.33 |
| | Please pause the tutorial now and attempt exercise number two given with the video | | | Please pause the tutorial now and attempt exercise number two given with the video | ||
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| − | |05. | + | |05.44 |
|In this tutorial, we have learnt to | |In this tutorial, we have learnt to | ||
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| 05.59 | | 05.59 | ||
| − | | | Define a matrix by using space or comma to separate the | + | | | Define a matrix by using space or comma to separate the columns and semicolon to separate the rows. |
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| − | | 06. | + | | 06.33 |
| − | | | For more information, visit:spoken hyphen tutorial dot | + | | | For more information, visit:spoken hyphen tutorial dot org slash NMEICT hyphen intro. |
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Revision as of 11:24, 6 March 2014
| Visual Clue | Narration |
|---|---|
| 00.01 | Welcome to the spoken tutorial on Vector Operations |
| 00.07 | At the end of this spoken tutorial you will be able to, |
| 00.11 | Define a vector. |
| 00.13 | Calculate length of a vector. |
| 00.15 | Perform mathematical operations on Vectors such as addition,subtraction and multiplication. |
| 00.23 | Define a matrix. |
| 00.25 | Calculate size of a matrix. |
| 00.28 | Perform mathematical operations on Matrices such as addition, subtraction and multiplication. |
| 00.36 | The Pre-requisites are Scilab should be installed on your system. |
| 00.41 | You should have listened to the Spoken Tutorial on Getting started with Scilab. |
| 00.46 | You should have Basic knowledge about Vectors and Matrices. |
| 00.50 | I am using Windows 7 operating system and Scilab 5.2.2 for demonstration. |
| 00.58 | Click on Scilab shortcut icon on your Desktop to launch Scilab. |
| 01.03 | This will open the Scilab console window. |
| 01.06 | Notice that the cursor is on the command prompt. |
| 01.10 | I suggest that you practice this tutorial in Scilab simultaneously while pausing the video at regular intervals of time. |
| 01.19 | Let us start by defining a vector. |
| 01.22 | This can be done in two ways: |
| 01.24 | By using spaces as p is equal to open square bracket one space 2 space 3 close the square bracket and press enter. |
| 01.37 | or using commas as q is equal to open square bracket two comma three comma four close the square bracket and press enter. |
| 01.53 | We can find the length of a vector p by the command length of p and press enter |
| 02.03 | We can perform various mathematical operations on vectors such as |
| 02.08 | Addition of two vectors |
| 02.11 | Substraction of two vectors and so on. |
| 02.14 | Transpose of a vector can be found by using apostrophe (also known as single-quote).
|
| 02.21 | p transpose is as shown |
| 02.27 | We can calculate p-transpose times q: |
| 02.34 | The command p times q-transpose gives a scalar: |
| 02.43 | Please pause the tutorial now and attempt exercise number one given with the video |
| 02.50 | Now we will see how to define a matrix. |
| 02.56 | Elements of a row of a matrix, can be defined using spaces or commas similar to that shown for a vector |
| 03.04 | For example,let us define a 2 by 3 matrix P by typing captital P is equal to open square bracket 1 space 2 space 3 semicolon |
| 03.20 | 4 space five space 6 close the square bracket and press enter.
|
| 03.27 | Note that Semicolon is used for defining the next row of the matrix. |
| 03.32 | Recall that Scilab is case sensitive. |
| 03.34 | Here variable P used to define matrix is in upper case. |
| 03.40 | Which is different from small p that was a vector. |
| 03.44 | Would you want to check what small p is at this point? |
| 03.48 | We will now see how to find the size of a Matrix using the “size” command. |
| 03.53 | for this type open square bracket row comma column close the sqaure bracket is equal to size of capital p which is matrix and press enter. |
| 04.10 | You get the following output. |
| 04.17 | Note that the length command will give the total number of elements in the matrix as you see. |
| 04.27 | The transpose command works for the matrices as well as shown here : |
| 04.34 | p transpose gives the transpose of matrix p. |
| 04.41 | Let us now define a 2 by 3 matrix Q: |
| 04.45 | Capital q is equal to open square bracket one space five space three semicolon to enter into the next row |
| 04.56 | Two space four space eight close the square bracket and press enter. |
| 05.03 | Let us also recall P once more: |
| 05.08 | We can carry out calculations involving P and Q, just as we do in mathematics. |
| 05.14 | For example, let us calculate E is equal to 2 times p plus 3 times q and press enter: |
| 05.29 | You may want to verify whether these calculations are correct. |
| 05.33 | Please pause the tutorial now and attempt exercise number two given with the video |
| 05.44 | In this tutorial, we have learnt to |
| 05.47 | Define a vector using spaces or commas. |
| 05.50 | Calculate length of a vector using the length() function. |
| 05.54 | Find the transpose of vector or matrix using apostrophe. |
| 05.59 | Define a matrix by using space or comma to separate the columns and semicolon to separate the rows.
|
| 06.07 | Find size of a matrix using size() function. |
| 06.11 | This spoken tutorial has been created by the Free and Open Source Software in Science and Engineering Education (FOSSEE). |
| 06.18 | More information on the FOSSEE project could be obtained from fossee.in or scilab.in |
| 06.28 | Supported by the National Mission on Eduction through ICT, MHRD, Government of India. |
| 06.33 | For more information, visit:spoken hyphen tutorial dot org slash NMEICT hyphen intro. |
| 06.43 | This is Anuradha Amrutkar signing off. |
| 06.46 | Thank you for joining us. Good bye |
Contributors and Content Editors
Gaurav, Jyotisolanki, Krupali, PoojaMoolya, Sandhya.np14, Sneha
