I've just recently stumbled upon a C++ bug/feature, that I can't fully understand and was hoping someone with a better knowledge of C++ here could point me in the right direction.

Below you will find my attempt at finding out the area under the Gaussian curve using Monte Carlo integration. The recipe is:

- Generate a large number of normally distributed random variables (with mean of zero and standard deviation of one).
- Square these numbers.
- Take the average of all the squares. The average will be a very close estimation of the area under the curve (in the case of the Gaussian, it is 1.0).

The code below consists of two simple functions: `rand_uni`

, which returns a random variable, uniformly distributed between zero and one, and `rand_norm`

, which is a (rather poor, but 'good enough for government work') approximation of a normally distributed random variable.

`main`

runs through a loop one billion times, calling `rand_norm`

each time, squaring it with `pow`

and adding to the accumulating variable. After this loop the accumulated result is just divided by the number of runs and printed to the terminal as `Result=<SOME NUMBER>`

.

The problem lies in very quirky behaviour of the code below: when each generated random variable is printed to `cout`

(yes, one billion times), then the end result is correct regardless of the compiler used (1.0015, which is pretty close, to what I want). If I don't print the random variable in each loop iteration, I get `inf`

under `gcc`

and 448314 under `clang`

.

Frankly, this just boggles the mind and since it is my first(-ish) encounter with C++, I don't really know, what the problem might be: is it something with `pow`

? Does `cout`

act weird?

Any hint would be much appreciated!

# The Source

```
// Monte Carlo integration of the Gaussian curve
#include <iostream>
#include <cstdlib>
#include <cmath>
using namespace std;
enum {
no_of_runs = 1000000
};
// uniform random variable
double rand_uni() {
return ((double) rand() / (RAND_MAX));
};
// approximation of a normaly distributed random variable
double rand_norm() {
double result;
for(int i=12; i > 0; --i) {
result += rand_uni();
}
return result - 6;
};
int main(const int argc,
const char** argv) {
double result = 0;
double x;
for (long i=no_of_runs; i > 0; --i) {
x = pow(rand_norm(), 2);
#ifdef DO_THE_WEIRD_THING
cout << x << endl; // MAGIC?!
#endif
result += x;
}
// Prints the end result
cout << "Result="
<< result / no_of_runs
<< endl << endl;
}
```

# The Makefile

```
CLANG=clang++
GCC=g++
OUT=normal_mc
default: *.cpp
$(CLANG) -o $(OUT).clang.a *.cpp
$(CLANG) -o $(OUT).clang.b -DDO_THE_WEIRD_THING *.cpp
$(GCC) -o $(OUT).gcc.a *.cpp
$(GCC) -o $(OUT).gcc.b -DDO_THE_WEIRD_THING *.cpp
```