Difference between revisions of "Gnuplot/C2/Error-bars-and-data-fitting/English"
From Script | Spoken-Tutorial
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'''Pre-requisites''' | '''Pre-requisites''' | ||
[https://spoken-tutorials.org https://spoken-tutorials.org] | [https://spoken-tutorials.org https://spoken-tutorials.org] | ||
| − | || To follow this tutorial, * Learner must be familiar with the basics of '''gnuplot'''. | + | || To follow this tutorial, |
| + | * Learner must be familiar with the basics of '''gnuplot'''. | ||
* For the prerequisite tutorials, please visit this site. | * For the prerequisite tutorials, please visit this site. | ||
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|| '''Slide Number 5''' | || '''Slide Number 5''' | ||
'''Code files''' | '''Code files''' | ||
| − | || The input file used in this tutorial is provided in the '''code file''' link. | + | || |
| − | Please download and extract the files. | + | * The input file used in this tutorial is provided in the '''code file''' link. |
| + | * Please download and extract the files. | ||
|- | |- | ||
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|| Hover mouse over '''x''', '''y''' and '''dy''' columns on the screen for the file. | || Hover mouse over '''x''', '''y''' and '''dy''' columns on the screen for the file. | ||
|| The first column is x data. | || The first column is x data. | ||
| + | |||
The second column is '''y''' data. | The second column is '''y''' data. | ||
| + | |||
The third column is error in the '''y''' data. | The third column is error in the '''y''' data. | ||
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|| Enter the command '''cd Desktop '''. | || Enter the command '''cd Desktop '''. | ||
Enter the command '''gnuplot'''. | Enter the command '''gnuplot'''. | ||
| + | |||
|| Change the directory to '''Desktop''' and open '''gnuplot'''. | || Change the directory to '''Desktop''' and open '''gnuplot'''. | ||
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|| Hover mouse over '''yerrorbars'''. | || Hover mouse over '''yerrorbars'''. | ||
|| If error limits are on the '''x''' data, we have to use, '''x''' errorbars term for plotting. | || If error limits are on the '''x''' data, we have to use, '''x''' errorbars term for plotting. | ||
| + | |||
The graphic window opens. | The graphic window opens. | ||
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|| Hover mouse on the graph. | || Hover mouse on the graph. | ||
|| The points may deviate from an accurate exponential decay. | || The points may deviate from an accurate exponential decay. | ||
| + | |||
This could be due to measurement errors. | This could be due to measurement errors. | ||
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* Make initial guess values for the coefficients in the equation. | * Make initial guess values for the coefficients in the equation. | ||
* Optimal values for the coefficients is found by an iterative process. | * Optimal values for the coefficients is found by an iterative process. | ||
| − | |||
|- | |- | ||
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|| | || | ||
* Check for goodness of the fit | * Check for goodness of the fit | ||
| − | * A good fitting is measured by a low value of chi square | + | * A good fitting is measured by a low value of chi square and |
| − | + | * Display the fitted data with the starting dataset | |
| − | + | ||
| − | + | ||
| − | + | ||
|- | |- | ||
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and press '''Enter'''. | and press '''Enter'''. | ||
|| First, let's define the function. | || First, let's define the function. | ||
| + | |||
In the '''gnuplot''' prompt, type f of x is equal to a times e to the power minus k x. | In the '''gnuplot''' prompt, type f of x is equal to a times e to the power minus k x. | ||
| Line 155: | Line 159: | ||
'''k=0.5''' | '''k=0.5''' | ||
|| Enter commands to set initial guess values. | || Enter commands to set initial guess values. | ||
| + | |||
Set '''a''' to 150 thousand and '''k''' to 0.5 . | Set '''a''' to 150 thousand and '''k''' to 0.5 . | ||
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and press '''Enter'''. | and press '''Enter'''. | ||
|| To fit the data type the command, | || To fit the data type the command, | ||
| + | |||
'''fit f of x''' in single quotes the file name. | '''fit f of x''' in single quotes the file name. | ||
| + | |||
Here it is '''error dash bar dot txt'''. | Here it is '''error dash bar dot txt'''. | ||
| + | |||
Then '''using 1 colon 2 colon 3''' via a comma k . | Then '''using 1 colon 2 colon 3''' via a comma k . | ||
| + | |||
Here '''a''' and '''k''' are the '''coefficients'''. | Here '''a''' and '''k''' are the '''coefficients'''. | ||
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Data fitting is seen on the screen. | Data fitting is seen on the screen. | ||
|| Press '''Enter''' to run the data fitting algorithm. | || Press '''Enter''' to run the data fitting algorithm. | ||
| − | The coefficients in the equation are optimized by an iterative process. | + | |
| + | The coefficients in the equation are optimized by an iterative process. | ||
| + | |||
The output is generated on the screen. | The output is generated on the screen. | ||
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|| Enter the command, '''plot f(x) lw 2 title 'fitted data', "xydy.txt" using 1:2:3 with yerrorbars pt 7 ps 1.5 notitle''' . | || Enter the command, '''plot f(x) lw 2 title 'fitted data', "xydy.txt" using 1:2:3 with yerrorbars pt 7 ps 1.5 notitle''' . | ||
|| Enter the command as seen on the screen, to plot both data together. | || Enter the command as seen on the screen, to plot both data together. | ||
| + | |||
We are plotting the fitted equation fit along with the initial data points. | We are plotting the fitted equation fit along with the initial data points. | ||
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|| The fitted data is represented by a line with a line. | || The fitted data is represented by a line with a line. | ||
I am specifying the legend for '''f of x''' as '''fitted data'''. | I am specifying the legend for '''f of x''' as '''fitted data'''. | ||
| + | |||
No legend title is added for the starting data set as no '''notitle''' is | No legend title is added for the starting data set as no '''notitle''' is | ||
mentioned. | mentioned. | ||
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Show symbol with error bar. | Show symbol with error bar. | ||
|| Data points are represented by symbols with '''error bar''' and without a line style. | || Data points are represented by symbols with '''error bar''' and without a line style. | ||
| + | |||
I have specified a filled circle '''symbol''' and 1.5 for point size. | I have specified a filled circle '''symbol''' and 1.5 for point size. | ||
Revision as of 13:44, 14 January 2020
| Visual Cue | Narration |
| Slide Number 1
Title Slide |
Welcome to the tutorial on
Error bars and data fitting in gnuplot. |
| Slide Number 2
Learning Objectives |
In this tutorial, we will,
|
| Slide Number 3
System and Software Requirement |
To record this tutorial, I am using,
|
| Slide Number 4
Pre-requisites https://spoken-tutorials.org |
To follow this tutorial,
|
| Slide Number 5
Code files |
|
| Go to Desktop. | Go to Desktop.
I have a, x, y, y-error type data, in a text file. |
| Hover mouse over x, y and dy columns on the screen for the file. | The first column is x data.
The second column is y data. The third column is error in the y data. |
| Close gedit.
Press Ctrl+Alt+T. |
Close the file.
Open a terminal. |
| Enter the command cd Desktop .
Enter the command gnuplot. |
Change the directory to Desktop and open gnuplot. |
| Press Ctrl+L. | I will clear the screen. |
| Cursor on the terminal. | Let's plot the data to see the trend. |
| Enter the command plot 'error-bar.txt' using 1:2:3 with yerrorbars . | Enter the plot command as seen on the screen. |
| Hover mouse over :3 . | The command, colon 3 with y error bars adds the error to the plot. |
| Hover mouse over yerrorbars. | If error limits are on the x data, we have to use, x errorbars term for plotting.
The graphic window opens. |
| Hover mouse over decay curve. | Let's fit this graph to an equation. |
| Cursor on the graph. | Here, the data points are likely to follow an exponential decay. |
| Hover mouse on the graph. | The points may deviate from an accurate exponential decay.
This could be due to measurement errors. |
| Point mouse next to data. | We will fit the given data points to an exponential decay function. |
| Cursor on the screen. | Let's see a few steps involved in fitting data points with an equation. |
| Slide Number 6
Steps for Fitting Data |
|
| Slide Number 7
Steps for Fitting Data |
|
| Type, f(x) = a * exp(-k*x)
and press Enter. |
First, let's define the function.
In the gnuplot prompt, type f of x is equal to a times e to the power minus k x. |
| Go to graphical window. | Make an educated initial guess for the values of a and k.
Go to the graphical window. |
| Hover mouse near top of y axis. | From the graph, I will place the initial value of a at 1,50,000. |
| Hover mouse to show ½ decay. | For an exponential decay, I will place the initial guess of k around 0.5 . |
| Close the graphical window. | Close the graphical window and go to the gnuplot terminal prompt. |
| Enter the commands,
a=150000 k=0.5 |
Enter commands to set initial guess values.
Set a to 150 thousand and k to 0.5 . |
| Type, fit f(x) ‘xydy.txt’ using 1:2:3 via a,k
and press Enter. |
To fit the data type the command,
fit f of x in single quotes the file name. Here it is error dash bar dot txt. Then using 1 colon 2 colon 3 via a comma k . Here a and k are the coefficients. |
| Hover mouse over :3 . | We could leave out the colon 3 in the command.
Then, errors in the y data are not considered during the data fitting process. |
| Press Enter.
Data fitting is seen on the screen. |
Press Enter to run the data fitting algorithm.
The coefficients in the equation are optimized by an iterative process. The output is generated on the screen. |
| Scroll up. | Let's scroll up the screen. |
| I see an error warning message on the top. | |
| Hover mouse over the chi square table. | Notice a table with chi square and new values of a and k after each iteration. |
| Incorporate the number of iterations. | The program reports that, the fitting process converged after 10 iterations. |
| Hover mouse over final sum of square of residuals. | Many fitting parameters are reported in the output.
Program reports, final sum of square of residuals. |
| Hover mouse over iteration value. | Notice, relative change in values after the last iteration.
|
| Hover mouse over Degrees of freedom. | Degrees of freedom is 9. |
| Hover mouse over RMS. | RMS of residuals is around 0.17. |
| Show a and k values on the screen. | Updated values of a and k and their error in estimation is also shown. |
| Hover mouse over the correlation matrix. | The correlation matrix of variables is at the end of the output. |
| Cursor on the terminal. | Now we have a function that fits the given data points.
Let's plot the data points and function together. |
| Press Ctrl+L . | I will clear the screen. |
| Enter the command, plot f(x) lw 2 title 'fitted data', "xydy.txt" using 1:2:3 with yerrorbars pt 7 ps 1.5 notitle . | Enter the command as seen on the screen, to plot both data together.
We are plotting the fitted equation fit along with the initial data points. |
| Hover mouse near the legend. | The fitted data is represented by a line with a line.
I am specifying the legend for f of x as fitted data. No legend title is added for the starting data set as no notitle is mentioned. |
| Show the line on the graphics window.
Show symbol with error bar. |
Data points are represented by symbols with error bar and without a line style.
I have specified a filled circle symbol and 1.5 for point size. |
| Enter the command, set xrange [0.95:5.05] . | Let's also set x axis limits with set xrange command as seen. |
| Type replot and press Enter to see the graphics window. | Replot to see the results. |
| Show this web site address screen shot. | Check the gnuplot website for example scripts on data fitting. |
| Cursor on the screen, around the (1.3,6000) region. | Let’s draw an arrow object in the graph.
I want to draw an arrow next to a point in the graph to highlight it. |
| Move the mouse on the screen to show the arrow placement around (1.63,77200 to 1.7, 62000). | In the graph, I want to add an arrow between these two points. |
| Highlight in video, the co-ordinates seen on the graph window.
(1.63,77200 to 1.7, 62000). |
I will note down the coordinates as seen in the graphics window. |
| Go to the terminal. | Go to the terminal. |
| Type, set arrow 1 from 1.63,77200 to 1.7, 62000 and press Enter. | Enter the commands as seen on the screen.
Here, one is the name I have given for the arrow object. |
| Type replot and press Enter. | Replot to see the updated result. |
| Cursor on the graphics window. | I will also add a second arrow in another direction. |
| Type,
set arrow 2 from 1.63,77200 to 1.4, 62000 and press Enter. |
Go to the terminal and enter the command as seen on the screen.
I will name this arrow as second. |
| Type replot and press Enter. | Replot to see the updated result. |
| Cursor on the graphics window. | Now we see two arrows in the graphics window.
To remove the object, we have to unset the object. |
| Type unset arrow first and press Enter. | Go to the terminal.
Enter the command, unset arrow first to remove the first arrow. |
| Type replot and press Enter. | Replot to see the updated result. |
| Cursor on the graphics window. | The arrow that was named first is now removed from the graphics window, |
| Close the graphics window.
Type quit and press Enter. |
Close the graphics window and quit gnuplot. |
| Slide Number 8
Summary |
To summarize, in this tutorial, we learned to
|
| Slide Number 9
Assignment 1 |
For the assignment activity, please do the following.
|
| Slide Number 9
Assignment 2 |
|
| Slide Number 10
Spoken Tutorial Project |
This video summarises the Spoken Tutorial Project .
Please download and watch it. |
| Slide Number 11
Spoken Tutorial workshops |
We conduct workshops and give certificates.
For more details, please write to us. |
| Slide Number 12
Forum for specific questions: |
Post your timed queries in the forum. |
| Slide Number 13
Acknowledgement |
Spoken Tutorial Project is funded by MHRD, Government of India. |
| This is Rani, from IIT, Bombay.
Thank you for joining. |
