# How to solve an Integral in Java?

I need to develop a program in Java to solve some integrals. Integrals like this:

I've looked for some functions to do this, in java.Math but I didn't find anything.

Has anyone an idea to get a solution for this? (maybe some extra libraries or something like that)

Thanks a lot!!

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Do you seek a numeric (an approximate number) or a symbolic (a formula exactly representing the result) solution? –  meriton Aug 1 '10 at 11:36
For symbolic integration you may want to consider integrals.wolfram.com/index.jsp –  Thorbjørn Ravn Andersen Aug 1 '10 at 11:38

You should have no problem implementing the "trapezoidal" or "rectangle" rule.

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also this docs helps to you, usage and error tolerances of formulas mpia-hd.mpg.de/~mordasini/UKNUM/integration.pdf –  mehmet Nov 1 '14 at 7:42

The Apache Commons Math library contains, in the Numerical Analysis section, four different numerical integrators:

• Romberg's method
• Simpson's method
• trapezoid method
• Legendre-Gauss method
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Hi, I download apache math .jar and I add to my project libraries. But for example when I attempt to use a function for example erfc, when I call Erf erf=new Erf(); (it is inside math on special package) Android studio throws me an error which says "Erf() has a private access in org.apaches.coommon.math.special.erf". Why this? –  Txispas May 21 '14 at 17:53
@Txispas: If you have a new question, please use the Ask Question button. Nobody except me will ever see this comment, and I don't know the answer :) –  Greg Hewgill May 21 '14 at 17:59

Take a look at JScience

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Check out Simpson's Rule on Wikipedia.

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Thanks for your answer!!! –  dafero Aug 1 '10 at 17:40

Also look at the SCaVis Java computing program. It has numeric integral calculations (for the F1D Java class) and also a number of approaches for symbolic integration

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``````/*   Petit programme qui calcul numériquement une intégrale selon l'algorithme de Simpson.
Avant de l'executer, il faut entrer:
- l'expression de la fonction f: ligne 12;
- les bornes inférieure a et supérieure b de l'intégrale: lignes 39 et 40;
- le nombre de mesures n (n est entier!!!): ligne 41.

------------------------------------------------------------------------------------------------------ */
class Fonction{                                                        //Classe fonction: definit fonction et Simpson

double f (double x) {                                              //DEFINIR la fonction à intégrer.
return Math.Cos(x);
}

double IntSimpson(double a, double b,int n){                       //Methode de Simpson pour calcul intégrale
int i,z;                                                       //a= borne inférieure et b, borne supérieure d'intégration
double h,s;                                                    //n = nombre de pas

n=n+n;
s = f(a)*f(b);
h = (b-a)/n;
z = 4;

for(i = 1; i<n; i++){
s = s + z * f(a+i*h);
z = 6 - z;
}
return (s * h)/3;
}
}

class integration{                                                    //Class resultat: calcul l'integrale et affiche le resultat.

public static void main(String args[]){

Fonction fonction;                                         //Appel class fonction
fonction = new Fonction();

double a = ???? ;                                          //RENTRER les valeurs souhaitées de a, b et n !!!
double b = ???? ;
int n = ???? ;
double resultat = fonction.IntSimpson(a,b,n);              //Applique méthode simpson à fonction

System.out.println("Integrale vaut: " + resultat);         //Affiche les résultats
}
}
``````
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