Consider the following:

```
%# number of states
N = 11;
%# some random transition matrix
trans = rand(N,N);
trans = bsxfun(@rdivide, trans, sum(trans,2));
%# fake emission matrix (only one symbol)
emis = ones(N,1);
%# get a sample of length = 10
[~,states] = hmmgenerate(10, trans, emis)
```

The sequence of states generated:

```
>> states
states =
10 1 3 11 9 4 11 1 4 6
```

## EDIT:

In fact working with a Markov chain is relatively easy, that we can do it ourselves. Here is another example without using HMM functions from the stats toolbox.

```
%# number of states
N = 3;
%# transition matrix
trans = rand(N,N);
trans = bsxfun(@rdivide, trans, sum(trans,2));
%# probability of being in state i at time t=0
prior = rand(1,N);
prior = prior ./ sum(prior);
%# generate a sequence of states
len = 100; %# length of sequence
states = zeros(1,len);
states(1) = randsample(N, 1, true, prior);
for t=2:len
states(t) = randsample(N, 1, true, trans(states(t-1),:));
end
%# show sequence
stairs(states, 'LineWidth',2)
set(gca, 'YGrid','on', 'YLim',[0 N+1])
xlabel('time'), ylabel('states')
title('sequence of states')
```

I am using RANDSAMPLE function to sample at each iteration. If you want to use only core functions (no toolboxes), see Weighted random numbers in MATLAB for an alternative.