There is only one combination of length n in which the number of heads is exactly k.
Your code does not appear to be dealing in combinations: it appears to be dealing in permutations.
It is possible to write the cases more efficiently, by considering the partitions of an integer https://www.mathworks.com/matlabcentral/fileexchange/12009-partitions-of-an-integer . The basic idea is that you break up into k 1's and n-k 0's, and you need to partition as patterns of
some non-zero number of 1's, followed by some non-zero number of 0's, followed by 1's, etc,
such that the total number of 1's is k and the total number of 0's is n-k .
If you arrange any one partition of k in non-decreasing order, then you can permute those sizes to get a different overall permutation.
... To be honest, it isn't always worth the trouble. Sometimes a "moving peg" approach is simplier. And in my experience, the dec2bin approach is the most efficient up to total length 29.
