I am trying to write an applied math program that will compute contour integrals in the complex plane. For starters, I wanted to write up an algorithm for the trapezoidal method, but I'm somewhat stuck on understand what that would look like. After all - we normally think of the trapezoidal method as for 2D graphs, and here we have f: C -> C so we're talking 4D.

Eventually I'm hoping to compute residues with this algorithm, but when I try the simplest of simple f(z) = 1/z with a contour as a circle of radius 1 around the origin I get nothing near 1 (which is what I should get). Here's my code for the trapezoidal method:

```
complexCartesian trapezoid(complexCartesian *c1, complexCartesian *c2)
{
complexCartesian difference = *c1 - *c2;
complexCartesian ans(0.5 * (function(c1).real + function(c2).real) *
difference.mag(),
0.5 * (function(c1).imag + function(c2).imag) *
difference.mag());
return ans;
}
```

Here, 'function' just computes f(z) = 1/z (I'm sure that this is done correctly) and complexCartesian is my class for complex points in the a + bi format:

```
class complexCartesian
{
public:
double real;
double imag;
complexCartesian operator+ (const complexCartesian& c) const;
complexCartesian operator- (const complexCartesian& c) const;
complexCartesian(double realLocal, double imagLocal);
double mag(); //magnitude
string toString();
complexPolar toPolar();
};
```

I'm feeling pretty confident that each of these functions is doing what it should be. (I know that there is a standard class for complex numbers but I figured I'd write my own for practice). To actually integrate, I use the following:

```
double increment = .00001;
double radius = 1.0;
complexCartesian res(0,0); //result
complexCartesian previous(1, 0); //start the point 1 + 0i
for (double i = increment; i <= 2*PI; i+=increment)
{
counter++;
complex cur(radius * cos(i), radius * sin(i));
res = res + trapezoid(&cur, &previous);
previous = cur;
}
cout << "computed at " << counter << " values " << endl;
cout << "the integral evaluates to " << res.toString() << endl;
```

When I integrate along the real axis only, or when I replace my function with a constant, I get correct results. Otherwise, I tend to get numbers on the order of 10^(-10) to 10^(-15). If you have any suggestions, I would much appreciate them.

Thanks.