# Rounding error in c integration program

im making a program that finds the integral of a function for different values of a power n, and constant a. my program seems to be working correctly but im getting a small rounding error in my results and i cant figure out why. i know i have an error as a friend of mine is also making the same program and his results are slightly different to mine, and his a definitely the right ones as doing the integration on a calculator gives values much closer to his. below are my results and his for a=2 and n=1.

His result: 0.189070
my result: 0.189053

ive tried going through and casting just about everything i can think of but still cant work out where im getting my error from, any help in pointing out where im being an idiot would be greatly appreciated! :p

My Program:

#include <stdlib.h>
#include <stdio.h>
#include <math.h>

#define debug 0
#define N (double)10000

double Integrand(double x, int a, int n);
double Integral(double *x, double dx, int a, int n);

int main (int argc, char* argv[])
{
int j,a,n=0,count=0,size=(int)N;
double dx=1/N, x[size];

sscanf(argv[1], "%d", &a);
for(j=0;j<N;j++) {
x[j]=(double)(j)*dx;
}
for(n=1;n<=10;n++) {
printf("n is %d integral is %lf\n",n,Integral(x,dx,a,n));
}
return(EXIT_SUCCESS);
}

double Integral(double *x, double dx, int a, int n)
{
int i;
double result=0;

for(i=0;i<N;i++) {
result +=(double)((Integrand((double)x[i],a,n))*dx);
}
return(result);
}

double Integrand(double x, int a, int n)
{
double result;
result=(double)(((pow(x,(double)n))/(x+(double)a)));
return(result);
}
-
Are you using the same compilation platform? Have you read stackoverflow.com/q/13571073/139746 ? – Pascal Cuoq Dec 1 '12 at 10:58
Is your friends code identical to your own? – mathematician1975 Dec 1 '12 at 10:59
rather than using dx = 1/N in the calculation 1/N straight. I think the when you are taking the value of 1/N in dx there is some precision loss. and it is propagating. – Debobroto Das Dec 1 '12 at 10:59
“ive tried going through and casting just about everything i can think of” … and you have learned a valuable lesson there: casting just everything you can think of does not fix problems, and it makes the program look horrible. – Pascal Cuoq Dec 1 '12 at 11:05

It's not a rounding error, you just don't pick the best choice for integration points. Change the initialisation to

x[j]=(j+0.5)*dx;

so that you take the midpoint of each integration strip to calculate the value of the integrand. If you always take the left or right endpoint, you will get a systematically too large error for monotonic functions.

If you approximate the integral of a sufficiently smooth function f by a Riemann sum,

b           n
∫ f(x) dx ≈ ∑ f(y_k)*(b-a)/n
a          k=1

the choice of y_k in the interval [x_(k-1), x_k] = [a+(k-1)*(b-a)/n, a+k*(b-a)/n] influences the error and the speed of convergence. Writing

f(x) = f(y_k) + f'(y_k)*(x-y_k) + 1/2*f''(y_k)*(x-y_k)² + O((x-y_k)³)

in that interval, you find that

x_k                                   x_k                            x_k
∫ f(x) dx = f(y_k)*(b-a)/n + f'(y_k)* ∫ (x-y_k) dx + 1/2*f''(y_k) * ∫ (x-y_k)² dx + O(1/n^4)
x_(k-1)                               x_(k-1)                       x_(k-1)

= f(y_k)*(b-a)/n + 1/2*f'(y_k)*(b-a)/n*((x_k-y_k)-(y_k-x_(k-1))) + O(1/n³)

and the first and largest error term with respect to the approximation f(y_k)*(b-a)/n vanishes for

y_k = (x_k + x_(k-1))/2

giving you an overall O(1/n³) error for that strip, and a total O(1/n²) error for the entire Riemann sum.

If you choose y_k = x_(k-1) (or y_k = x_k), the first error term becomes

±1/2*f'(y_k)*[(b-a)/n]²

leading to an O(1/n) total error.

-
Thanks that fixed it :) – user1831711 Dec 1 '12 at 11:08
Do you have a tool to create that formatted equations you pasted there or is that handmade? – Jonas Wielicki Dec 1 '12 at 11:42
@JonasWielicki All handwork. I type the HTML entity name &sum; for example, copy the displayed glyph and paste that into the code blocks. (Boy, how I wish this site supported LaTeX rendering.) – Daniel Fischer Dec 1 '12 at 11:45
Thanks for the explanation, i feel like a bit if an idiot now as i should have realised that myself as i can remeber doing the midpoint vs ends reimann sums a couple of years ago at college now that youve said it – user1831711 Dec 1 '12 at 11:59
@user1831711 If forgetting something one has once learned made one an idiot, I'd compete for the world title. Now you've had a refresher, so for the next couple of years, you'll remember. – Daniel Fischer Dec 1 '12 at 12:11

At a Linux terminal prompt, type:

man fegetenv
-
Most operating systems specify that new processes are started with round-to-nearest. There is even a recommendation in IEEE 754 to that effect, I believe. – Pascal Cuoq Dec 1 '12 at 11:00