Your question is horribly ill-posed. This almost certainly isn't your fault since your instructor should have pointed out to you that a proper implementation of Brownian motion requires lots and lots of pretty sophisticated specification and analysis of the problem domain even before you get to coding.
The precise definition of Brownian motion is probably going to be opaque to you unless you've taken the relevant courses in measure theory. However, there are plenty of resources on the net that give adequate descriptions of Ito processes (of which Brownian motion is an example).
If you're interested in coding such a process up, here's a decent tip. At some stage you're going to need to generate random numbers. Almost certainly, you're going to be interested in generating draws from a normal distribution. Thankfully, there are some great ways of doing this available to a C++ programmer. My favourite is to use the Boost.Random library (or the relevant libraries in C++11). The smartest strategy is to use a function object to generate the random variates, probably by using a variate_generator:
using namespace std;
// Some typedefs to help keep the code clean
// Always a good idea when using Boost!
typedef boost::mt19937 T_base_prng;
typedef boost::normal_distribution<> T_norm_varg;
typedef boost::variate_generator<T_base_prng&, T_norm_dist> T_norm_varg;
unsigned int base_seed = 42; // Seed for the base pseudo-random number generator
double mean = 0.0; // Mean of the normal distribution
double stdev = 1.0; // Standard deviation of the normal distribution
T_base_prng base_prng(base_seed); // Base PRNG
T_norm_dist norm_dist(mean, stdev); // Normal distribution
T_norm_varg norm_varg(base_prng, norm_dist); // Variate generator
// Generate 1000 draws from a standard normal distribution
for (vector<double>::iterator iter = drawVec.begin();
iter != drawVec.end(); ++iter)
*iter = norm_varg();
// More stuff...
Once you get a handle on what a Brownian motion is, it should then be trivial to construct some examples using the functionality in Boost.Random.