Scilab/C4/ODE-Euler-methods/English-timed
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| Time | Narration |
| 00.01 | Dear Friends, |
| 00.02 | Welcome to the Spoken Tutorial on “Solving ODEs using Euler Methods” |
| 00.09 | At the end of this tutorial, you will learn how to: |
| 00.12 | Solve ODEs using Euler and Modified Euler methods in Scilab |
| 00.18 | Develop Scilab code to solve ODEs |
| 00.22 | To record this tutorial, I am using |
| 00.25 | Ubuntu 12.04 as the operating system
|
| 00.28 | and Scilab 5.3.3 version |
| 00.32 | To practise this tutorial, a learner |
| 00.34 | should have basic knowledge of Scilab |
| 00.37 | and should know how to solve ODEs. |
| 00.40 | To learn Scilab, please refer to the relevant tutorials available on the Spoken Tutorial website. |
| 00.48 | In Euler method, we get an accurately approximate solution of the ODE. |
| 00.55 | It is used to solve initial value problems where initial values of the differential equation are given. |
| 01.03 | It can be used to solve continuous functions. |
| 01.08 | Let us solve an example using Euler method. |
| 01.12 | We are given an initial value problem - |
| 01.15 | y dash is equal to minus two t minus y.
|
| 01.20 | The initial value of y is given as minus one |
| 01.25 | and the step length is given as zero point one.
|
| 01.29 | We have to find the value of y at time t equal to zero point five. |
| 01.36 | Let us look at the code for Euler method.
|
| 01.39 | Open Euler underscore o d e dot sci on Scilab editor. |
| 01.47
|
We define the function Euler underscore o d e with arguments f, t init, y init, h and n
|
| 01.58 | 'where f denotes the function to be solved,
|
| 02.01 | t init is the initial value of time t, |
| 02.05 | y init is the initial value of y |
| 02.09 | h is the step length, and n is the number of iterations. |
| 02.14 | Then we initialize the values of t and y to vectors of zeros. |
| 02.21 | We place the initial values of t and y in t of one and y of one respectively. |
| 02.29 | Then we iterate from one to N to find the value of y. |
| 02.33 | Here we apply Euler method to find the value of y. |
| 02.39 | Finally we end the function. |
| 02.42 | Save and execute the file Euler underscore o d e dot sci
|
| 02.49 | Switch to Scilab console to solve the example problem.
|
| 02.54 | We define the function by typing
|
| 02.56 | d e f f open paranthesis open single quote open square bracket y dot close square bracket equal to f of t comma y close single quote comma open single quote y dot equal to open paranthesis minus two asterisk t close paranthesis minus y close single quote close paranthesis
|
| 03.26 | Press Enter. |
| 03.28 | Then type t init is equal to zero.
|
| 03.31 | Press Enter.
|
| 03.33 | Type y init is equal to minus one.
'
|
| 03.38 | Press Enter
|
| 03.40 | Type step length h is equal to zero point one.
|
| 03.44 | Press Enter
|
| 03.46 | The step length is zero point one, and we have to find the value of y at zero point five.
|
| 03.53 | So, the number of iterations should be five.
|
| 03.59 | At each iteration, the value of t will be increased by zero point one.
|
| 04.05 | So type capital N is equal to five.
|
| 04.09 | And press Enter.
|
| 04.11 | To call the function, type |
| 04.14 | open square bracket t comma y close square bracket equal to Euler underscore o d e open paranthesis f comma t init comma y init comma h comma capital N close paranthesis |
| 04.33 | Press Enter.
|
| 04.35 | The value of y at t equal to zero point five is shown. |
| 04.41 | Now let us look at Modified Euler method. |
| 04.45 | It is a second order method and is a stable two step method.
|
| 04.51 | We find the average of the function at the beginning and end of time step.
|
| 04.56 | Let us solve this example using Modified Euler method.
|
| 05.02 | We are given a function y dash is equal to t plus y plus t y.
|
| 05.08 | The initial value of y is one |
| 05.12 | and the step length is zero point zero one. |
| 05.16 | We have to find the value of y at time t equal to zero point one using Modified Euler's method.
|
| 05.25 | Let us look at the code for Modified Euler method on Scilab Editor |
| 05.31 | We define the function with arguments f, t init, y init, h and n |
| 05.39 | where f is the function to be solved
|
| 05.42 | t init is the intial time value, |
| 05.45 | y init is the inital value of y |
| 05.49 | h is the step length and
|
| 05.51 | n is the number of iterations. |
| 05.54 | Then we initialize the arrays for y and t. |
| 05.58 | We place the initial values of t and y in t of one and y of one respectively. |
| 06.07 | We implement Modified Euler Method here.
|
| 06.11 | Here we find the average value of y at the beginning and end of time step. |
| 06.17 | Save and execute the file Modi Euler underscore o d e dot sci. |
| 06.23 | Switch to Scilab console. |
| 06.26 | Clear the screen by typing c l c. |
| 06.30 | Press Enter.
|
| 06.32 | Define the function by typing d e f f open paranthesis open single quote open square bracket y dot close square bracket equal to f of t comma y close single quote comma open single quote y dot equal to t plus y plus t asterisk y close single quote close paranthesis |
| 07.01 | Press Enter.
|
| 07.03 | Then type t init equal to zero, press Enter
|
| 07.08 | Type y init equal to one and press Enter.
|
| 07.12 | Then type h equal to zero point zero one press Enter. |
| 07.19 | Type capital N equal to ten.
|
| 07.22 | Since the number of iterations should be ten to time t equal to zero point one with step length of zero point zero one. |
| 07.34 | Press Enter. |
| 07.36 | Then call the function modi euler underscore o d e by typing. |
| 07.41 | open square bracket t comma y close square bracket equal to modi euler underscore o d e open paranthesis f comma t init comma y init comma h comma capital N close paranthesis
|
| 08.03 | Press Enter.
|
| 08.05 | The value of y at t equal to zero point one is shown. |
| 08.10 | Let us summarize this tutorial. |
| 08.14 | In this tutorial we have learnt to develop Scilab code for Euler and modified Euler methods. |
| 08.21 | We have also learnt to solve ODEs using these methods in Scilab.
|
| 08.28 | Watch the video available at the link shown below |
| 08.32 | It summarises the Spoken Tutorial project
|
| 08.35 | If you do not have good bandwidth, you can download and watch it |
| 08.40 | The spoken tutorial project Team |
| 08.42 | Conducts workshops using spoken tutorials
|
| 08.45 | Gives certificates to those who pass an online test
|
| 08.49 | For more details, please write to contact@spoken-tutorial.org
|
| 08.55 | Spoken Tutorial Project is a part of the Talk to a Teacher project
|
| 09.00 | It is supported by the National Mission on Eduction through ICT, MHRD, Government of India. |
| 09.07 | More information on this mission is available at the link shown below |
| 09.13 | This is Ashwini Patil signing off. |
| 09.15 | Thank you for joining. |
