Doing project in Java. I use Gauss Jordain algorithm to find which rows and columns of a matrix are linearly independent and which are linear combinations of the independent ones. I can find rank by rows and columns.

But what I really need, and am lost on how to do, is find coefficients that generate dependent rows and columns as linear combination of independent ones.

I guess answer is in some modification of Gauss Jordain and/or tracking all the multiplication and division coefficients, but my brain is locking up on how to do it.

Basic function is reduction to row echelon form and then I build others on it.

```
public static void toRREF(double[][] M) {
int rowCount = M.length;
if (rowCount == 0)
return;
int columnCount = M[0].length;
int lead = 0;
for (int r = 0; r < rowCount; r++) {
if (lead >= columnCount)
break;
{
int i = r;
while (M[i][lead] == 0) {
i++;
if (i == rowCount) {
i = r;
lead++;
if (lead == columnCount)
return;
}
}
double[] temp = M[r];
M[r] = M[i];
M[i] = temp;
}
{
double lv = M[r][lead];
for (int j = 0; j < columnCount; j++)
M[r][j] /= lv;
}
for (int i = 0; i < rowCount; i++) {
if (i != r) {
double lv = M[i][lead];
for (int j = 0; j < columnCount; j++)
M[i][j] -= lv * M[r][j];
}
}
lead++;
}
}
```