# Bisection method lost of precision

I've been absent from this very nice forum for a while. I'm taking a Numerical Analysis course and I was asked to program the bisection method, here's my code

``````/*
* Bisection.cpp
*
*  Created on: 08/10/2012
*  Author: BRabbit27
*  École Polytechnique Fédérale de Lausanne - M.Sc. CSE
*/

#include <cmath>
#include <iostream>

using namespace std;

double functionA(double x) {
return sin(2.0 * x) - 1.0 + x;
}

double functionB(double x) {
return 2.0 * x / (1.0 + x / 1.5);
}

double bisectionMethod(double (*function)(double), double a, double b, double tolerance) {
double x;
double f;
double error = tolerance + 1;
int step = 0;
double fa = (*function)(a);
double fb = (*function)(b);
//Check the conditions of a root in the given interval
if (a < b) {
if (fa * fb < 0) {
while (error > tolerance) {
step++;

x = (a + b) / 2.0;
f = (*function)(x);

if (f == 0) {
cout << "Root found in x = " << x;
return x;
} else if (f * fa > 0) {
a = x;
} else if (f * fa < 0) {
b = x;
}
error = (b - a) / pow(2.0, (double) step + 1);
}
cout << "Root found in x = " << x;
return x;
} else {
cout << "There not exist a root in that interval." << endl;
return -1;
}
} else {
cout << "Mandatory \"a < b\", verify." << endl;
return -1;
}
}

int main(int argc, char *argv[]){
bisectionMethod(functionA, -3.0, 3.0, 10.0e-7);
}
``````

The only problem I have is that the root is found when x = 0.354492 and the real root is in x=1/3 so actually either I have something bad with double precision or with my tolerance. I don't know how can I improve this code to have a better result. Any idea?

-
Doesn't work at all for me, since `functionB(3) == 2` and `functionB(-3) == 6`, and both are greater than 0. –  Eric Oct 8 '12 at 18:22
@Eric I've just run it and it works... what's the message? Oh I see, just change functionB for functionA in the main function. That should work. –  BRabbit27 Oct 8 '12 at 18:25
Yep, that works as you describe –  Eric Oct 8 '12 at 18:28
Any idea on how to have more precision on the result? –  BRabbit27 Oct 8 '12 at 18:30

The real root is not x = 1/3! It's 3.52288

sin(2.0 * x) - 1.0 + x = 0

sin(2.0 * x) = 1 - x

1 - 1/3 = 2/3

sin(2/3) != 2/3

Your definition of tolerance strikes me as odd. Tolerance should be the range in `x` you're will to accept, right? Well that's easy: `b - a > tolerance`.

``````double bisectionMethod(double (*function)(double), double a, double b, double tolerance) {
if (a > b) {
cout << "Mandatory \"a < b\", verify." << endl;
return -1;
}
double fa = function(a);
double fb = function(b);
if (fa * fb > 0) {
cout << "No change of sign - bijection not possible" << endl;
return -1;
}

do {
double x = (a + b) / 2.0;
double f = (*function)(x);

if (f * fa > 0) {
a = x;
} else {
b = x;
}
} while (b - a > tolerance);

cout << "Root found in x = " << x;
return x;
}
``````
-
So sorry ! I didn't check that by myself just believe in the result a friend gave me. Next time I'll check it twice everything ! Thanks ! –  BRabbit27 Oct 8 '12 at 18:46
@BRabbit27: You're still off by a fair amount - see my update –  Eric Oct 8 '12 at 18:56