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I am trying to solve a MATLAB problem to generate a vector like 1,2,2,3,3,3,4,4,4,4...

So if n = 3, then return

[1 2 2 3 3 3] And if n = 5, then return

[1 2 2 3 3 3 4 4 4 4 5 5 5 5 5]

This is what I came up with:

ans=1
for n=2:n
ans=[ans n*ones(1,n)]
end

But I'm trying to minimize the code length. Anyone have any ideas?

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1  
Are you after better efficiency, or shorter code length? Dont use ans , it's a matlab generated variable name. –  bla Nov 22 '13 at 18:57

6 Answers 6

still a few lines:

n = 5;     %number of elements

A(cumsum(0:n)+1) = 1;
B = cumsum(A(1:end-1))

returns

1   2   2   3   3   3   4   4   4   4   5   5   5   5   5 
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1  
I guess he would like a one that occupies the least computing nodes in matlab....mathworks.com/matlabcentral/cody/problems/… –  lennon310 Nov 22 '13 at 19:54
    
@lennon310 what is a "computing node"? If it's what I think, I count 4, which would be the shortest ;) –  thewaywewalk Nov 22 '13 at 20:04
1  
check this out mathworks.com/matlabcentral/about/cody/#solutionsize an interesting competition, but it will not be once you get the trick of that –  lennon310 Nov 22 '13 at 20:07

In the same spirit, here's my one liner:

nonzeros(triu(meshgrid(1:n)))'
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+1. It's weird that meshgrid is faster than repmat –  Luis Mendo Nov 23 '13 at 0:29
    
... however, ones(1,n).'*(1:n) is much faster than meshgrid –  Luis Mendo Nov 23 '13 at 0:30
    
If I understood the question correctly, the goal is to get the minimum # of matlab nodes according to mtree, for the use in the Cody game. see mathworks.com/matlabcentral/fileexchange/34754-calculate-size/… and the comments above. –  bla Nov 23 '13 at 0:31
    
@ Luis Mendo, in my check repmat is faster than meshgrid... compare f=@() repmat(1:n,n,1); to g=@()meshgrid(1:n)using timeitm for n=10,100,1000 ... –  bla Nov 23 '13 at 0:40
    
You're right. repmat is faster except for very small n –  Luis Mendo Nov 23 '13 at 9:22
n = 5;
A = triu(ones(n,1)*(1:n));
A(A==0) = [];
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1  
which is in terms of the "competetion" the shortest (27 nodes), but still much longer than other already submitted solutions ;) –  thewaywewalk Nov 22 '13 at 22:01
    
@thewaywewalk I didn't know about these MATLAB solutions competitions. Interesting. –  chappjc Nov 22 '13 at 22:17

This is similar to jkshah's answer, but I would approach it slightly differently,

n=5;
M = ones(n,1)*(1:n)
B = M(triu(ones(n))>0)';
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Here's another one-liner. Unlike solutions based on triu, this one doesn't generate extra elements as intermediate results (that doesn't mean it's faster, though):

fliplr(cumsum([n full(sparse(ones(1,n-1),cumsum(n:-1:2),-1))]))
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A little 'magic' solution:

ceil(sqrt(2*(1:(n^2+n)/2))-0.5)

See visualisation: enter image description here This is the plot of function sqrt(2*(1:(n^2+n)/2))-0.5:

plot(1:(n^2+n)/2,sqrt(2*(1:(n^2+n)/2))-0.5,'.')

where xticklabels were changed according the following code:

set(gca,'xtick',cumsum(0:n),'xticklabel',0:n)
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