how to plot exponential pdf over a distributed data ?
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in order to find the best fit model
I want to produce this figure (a data & best fit over it):
so I try:
v=1:25;
n=[10;7;6;21;14;18;23;33;28;31;34;30;32;48;43;46;39;47;40;45;51;47;45;45;23];
plot(v,n,'*b')
ex=expfit(n);
E=exppdf(n,ex);
hold on
plot(v,E,'-r')
but it produce this figure:
how to modify the code to get the first figure?
1 Comment
Amr Hashem
on 24 Oct 2015
Accepted Answer
Star Strider
on 24 Oct 2015
Fourteen hours ago I was asleep here in GMT-7 land.
I believe you are mistaking the exponential distribution for the exponential function.
This produces a good fit to your data:
v=1:25;
n=[10;7;6;21;14;18;23;33;28;31;34;30;32;48;43;46;39;47;40;45;51;47;45;45;23];
plot(v,n,'bp')
expfcn = @(b,x) b(1) + b(2).*exp(b(3).*x); % Three-Parameter Exponential Function
B0 = [50; -50; -0.5]; % Initial Parameter Estimates
B = nlinfit(v(:), n(:), expfcn, B0); % Estimate Parameters
E = expfcn(B,v); % Simulate Function
hold on
plot(v,E,'-r')
I used the nlinfit function because I know you have the Statistics Toolbox.
6 Comments
Amr Hashem
on 24 Oct 2015
Star Strider
on 25 Oct 2015
You can fit it to whatever distribution you want (and are appropriate to your data). You simply cannot plot it as the plot you posted. All probablilty distributions to the best of my knowledge have a maximum amplitude of 1. What was plotted in the figure is an exponential function, not an exponential distribution.
The plot of the exponential distribution of your data are:
v=1:25;
n=[10;7;6;21;14;18;23;33;28;31;34;30;32;48;43;46;39;47;40;45;51;47;45;45;23];
ex=expfit(n);
E=exppdf(v,ex);
hold on
plot(E,'-r')
Amr Hashem
on 25 Oct 2015
Edited: Amr Hashem
on 25 Oct 2015
Star Strider
on 26 Oct 2015
My pleasure.
That requires an fzero call to find it, and to create an appropriate vector for ‘v’ that includes it.
The code changes slightly:
v=1:25;
n=[10;7;6;21;14;18;23;33;28;31;34;30;32;48;43;46;39;47;40;45;51;47;45;45;23];
plot(v,n,'*b')
expfcn = @(b,x) b(1) + b(2).*exp(b(3).*x); % Three-Parameter Exponential Function
B0 = [50; -50; -0.5]; % Initial Parameter Estimates
B = nlinfit(v(:), n(:), expfcn, B0); % Estimate Parameters
Y0 = fzero(@(x)expfcn(B,x), 1); % Find ‘v’ At E=0
vrng = linspace(Y0, max(v)); % Create Matching Vector
E = expfcn(B,vrng); % Simulate Function With ‘vrng’
hold on
plot(vrng,E,'-r')
fprintf(1, '\n\tE(%.3f) = 0\n', Y0)
The x-intercept is about 0.432.
Amr Hashem
on 26 Oct 2015
Edited: Amr Hashem
on 26 Oct 2015
Star Strider
on 26 Oct 2015
The x-intercept, such as it is, fzero calculates as -20970.520.
You could probably find the intercept manually, but your code is incorrect when estimating the parameters.
My code here is the correct method:
v=1:25;
n=[10;7;6;21;14;18;23;33;28;31;34;30;32;48;43;46;39;47;40;45;51;47;45;45;23];
plot(v,n,'*b')
expfcn = @(b,x) b(1).*exp(b(2).*x); % Two-Parameter Exponential Function
B0 = [50; 0]; % Initial Parameter Estimates
B = nlinfit(v(:), n(:), expfcn, B0); % Estimate Parameters
Y0 = fzero(@(x)expfcn(B,x), 1); % Find ‘v’ At E=0
vrng = linspace(Y0, max(v)); % Create Matching Vector
E = expfcn(B,vrng); % Simulate Function
hold on
plot(vrng,E,'-r')
fprintf(1, '\n\tE(%.3f) = 0\n', Y0)
You are only fitting two parameters, so you can only specify two in the nlinfit argument list, and you have to refer to them correctly in the ‘expfcn’ objective function. Otherwise, nlinfit will attempt to fit all three of them, even though your function is using only two, and will likely return inaccurate results for the two it does estimate.
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