Simpson's Rule Integration

Computes an integral "I" via Simpson's rule in the interval [a,b] with n+1 equally spaced points
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Mise à jour 29 avr. 2011

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This function computes the integral "I" via Simpson's rule in the interval [a,b] with n+1 equally spaced points

Syntax: I = simpsons(f,a,b,n)

Where,
f= can either be an anonymous function (e.g. f=@(x) sin(x)) or a vector containing equally spaced values of the function to be integrated
a= Initial point of interval
b= Last point of interval
n= # of sub-intervals (panels), must be integer

Written by Juan Camilo Medina - The University of Notre Dame
09/2010 (copyright Dr. Simpson)

Example 1:

Suppose you want to integrate a function f(x) in the interval [-1,1].
You also want 3 integration points (2 panels) evenly distributed through the
domain (you can select more point for better accuracy).
Thus:
f=@(x) ((x-1).*x./2).*((x-1).*x./2);
I=simpsons(f,-1,1,2)

Example 2:

Suppose you want to integrate a function f(x) in the interval [-1,1].
You know some values of the function f(x) between the given interval,
those are fi= {1,0.518,0.230,0.078,0.014,0,0.006,0.014,0.014,0.006,0}
Thus:
fi= [1 0.518 0.230 0.078 0.014 0 0.006 0.014 0.014 0.006 0];
I=simpsons(fi,-1,1,[])
note that there is no need to provide the number of intervals (panels) "n",
since they are implicitly specified by the number of elements in the vector fi

Citation pour cette source

Juan Camilo Medina (2025). Simpson's Rule Integration (https://fr.mathworks.com/matlabcentral/fileexchange/28726-simpson-s-rule-integration), MATLAB Central File Exchange. Extrait(e) le .

Compatibilité avec les versions de MATLAB
Créé avec R2010a
Compatible avec toutes les versions
Plateformes compatibles
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Catégories
En savoir plus sur Numerical Integration and Differential Equations dans Help Center et MATLAB Answers
Remerciements

A inspiré : simpsonQuadrature, Simpson's 1/3 and 3/8 rules

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Version Publié le Notes de version
1.6.0.0

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1.5.0.0

Added an extension to handle vectors as well and anonymous function.

1.4.0.0

I added an example

1.3.0.0

.

1.2.0.0

.

1.1.0.0

n/a

1.0.0.0