If you know k at design time it is easy to generate all the k-combinations using k loops, i.e. if you want all 4-combination, you can do it using 4 loops :

```
for c1=0 to 1
for c2=0 to 1
for c3=0 to 1
for c4=0 to 1
print c1,c2,c3,c4
```

If you don't know k at design time, you will need a way to emulate k-loops. This is easy, create an array of size k and store at index i the current value of ci (loop number i index).

```
c : array[1..k]
fill(c,0) // initialize all the cells with 0
do
for i=1 to k
print c[i]
while increment(c) // get next values
```

`increment`

get the next value and return false if all the values have been used, true otherwise.

```
increment(c : array[1..k])
begin
i=k
do
c[i]=c[i]+1;
if c[i]=2 // i.e. MAX+1
c[i]=0
i=i-1 // incerment previous position
else
return true // increment done
end if
while (i>1)
// here we need to increment the first position
c[i]=c[i]+1
if c[i]=2 // we looped thru all the values
c[i]=0
return false
end if
return true
end
```

This method can be generalized to any loop in any *base* (=different max values for each loop) or with different start values, steps etc ...
This method can also be generalized for generating lexicographical combination with repetition, etc ... google for odometer or take a look at TAOCP Knuth Volume 3 fascicle 2 and 3.

`010`

– triclosan Sep 18 '12 at 10:36