how to randomly shuffle the row elements of a predefined matrix??
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i have a matrix , a= [1 2 4 6; 5 8 6 3;4 7 9 1] i want to randomly shuffle the elements of each row. how to do it?? please help
Accepted Answer
KSSV
on 14 Feb 2017
a= [1 2 4 6; 5 8 6 3;4 7 9 1] ;
[m,n] = size(a) ;
idx = randperm(n) ;
b = a ;
b(1,idx) = a(1,:) % first row arranged randomly
8 Comments
Suvra Vijay
on 14 Feb 2017
KSSV
on 14 Feb 2017
b=a ; for i=1:m idx = randperm(n) ; b(i,idx) = a(1,:) ; end
N/A
on 24 Oct 2017
nice !
zeu
on 17 Mar 2018
I try to make the answer of KSSV work on a 3d array. I only want to randomly permute one dimension of that array. But it doesnt work. Can someone help?
jaah navi
on 18 Jun 2019
Could you please help me to randomly arrange the elements in each column.
The code above to do this for all rows will not work due to what I expect to be a typo. https://www.mathworks.com/matlabcentral/answers/324891-how-to-randomly-shuffle-the-row-elements-of-a-predefined-matrix#comment_428742
It will just create a permutation of the first row three times and stack them on top of eachother. Regadless, a for loop is not needed in the first place. A modified and more succinct example is created below.
Lastly, for those who want to do this for columns, a lazy way would be to just transpose a before all of this and then at the end. More properly, you set idx = randperm(m) and do b(idx,:) = a
for i=1:m
idx = randperm(n) ;
%b(i,idx) = a(1,:) ; % This returns error.
b(i,idx) = a(i,:) ; %corrected
end
Achieve result without a for loop. I replaced the original matrix a with a matrix whose indices' values correspond to their linera index, so it's a bit easier to track what is going on.
a= NaN(3,4);
a(1:end) = 1:numel(a);
[m,n] = size(a) ;
idx = randperm(n) ;
b(:,idx) = a
Bruno Luong
on 24 Apr 2022
@Hamza Shami it shuffle randomly assignmet of columns of a to b
Hamza Shami
on 24 Apr 2022
@Bruno Luong yea got it, thanks
More Answers (5)
Tony Richardson
on 22 Jan 2020
4 votes
Perhaps not very efficient, but uses only built-in functions and randomizes all elements of all columns:
a = [1 2 4 6; 5 8 6 3;4 7 9 1]
[m, n] = size(a);
[~, idx] = sort(rand(m,n));
b = a(sub2ind([m, n], idx, ones(m,1)*(1:n)))
3 Comments
munazah lyle
on 11 Jan 2021
How can we get the original sequence back for this.
Tony Richardson
on 11 Jan 2021
You can recover the original a matrix with (here c will equal a):
c = ones(size(b));
c(sub2ind([m, n], idx, ones(m,1)*(1:n))) = b
I expect that you want the reverse indexing to go back from b to a, though. This seems to do that (here d will be equal to a):
[~, rdx] = sort(idx);
d = b(sub2ind([m, n], rdx, ones(m,1)*(1:n)))
munazah lyle
on 8 Feb 2021
Thank you
Jan
on 14 Feb 2017
If you have a C compliler installed, you can try https://www.mathworks.com/matlabcentral/fileexchange/27076-shuffle:
a = [1, 2, 4, 6; 5, 8, 6, 3; 4, 7, 9, 1];
b = Shuffle(a, 2)
2 Comments
Suvra Vijay
on 14 Feb 2017
Jan
on 14 Feb 2017
While I'm sure, that this Shuffle is working (I've tried it some minutes ago), it requires to be compiled at first.
Nikolay Petrov
on 22 Feb 2022
Edited: Nikolay Petrov
on 22 Feb 2022
Not sure why this was more complicated to find that it should have been.
a = [1, 2, 4, 6; 5, 8, 6, 3; 4, 7, 9, 1];
a(:, randperm(size(a, 2)))
shuffles the elements of each row in the matrix, while
a = [1, 2, 4, 6; 5, 8, 6, 3; 4, 7, 9, 1];
a(randperm(size(a, 1)), :)
shuffle the elements of each column in the matrix.
1 Comment
Tony Richardson
on 22 Feb 2022
These do the same rearrangement in all rows or columns. Perhaps that is what the original poster wanted. I am not sure. I interpret it as asking for each column (or row) to be shuffled independently of the others.
Tony Richardson
on 24 Jan 2020
1 vote
As a variation of my answer above, I'll note that if you want to generate M permutations of N objects (where the N objects are represented by the integers 1-N) you can use:
[~, x] = sort(rand(N, M));
I can generate 100,000 permutations of 52 objects in 0.3 seconds on my machine.
The probability of drawing 3 aces in a 5 card draw can be estimated (using 100,000 dealt hands):
%%%%%%%%%%%%%%%%%
M = 100000; % Number of trials
N = 52; % Number of cards in deck
[~, x] = sort(rand(N, M)); % columns of x are shuffled decks (100,000 shuffled decks)
y = x(1:5,:); % columns of y are the 5 card hands
% N3a is the number of hands containing three Aces out of M (100,000) deals
% I let Aces be cards 1, 14, 27, and 40 (1-13 is one suit, 14-26 is another, etc)
N3a = sum(sum(or(y == 1, y == 14, y == 27, y == 40)) == 3);
P3a = N3a/M
%%%%%%%%%%%%%%%%%
Successive runs of the script gives values of 0.00181, 0.00185, 0.00189, 0.00171.
The theoretical value is 0.001736
3 Comments
munazah lyle
on 11 Jan 2021
How can we get the original sequence back?
Tony Richardson
on 11 Jan 2021
To go from the shuffled decks (x) back to the unshuffled decks (z):
z = sort(x)
This would just give a matrix whose columns go from 1-52 in order.
Again, I expect what you want is really the reverse index matrix (rdx), to get that and then recover the unshuffled decks from the shuffled ones:
[~, rdx] = sort(idx);
o = idx(sub2ind([m, n], rdx, ones(m,1)*(1:n)))
rdx would be the reverse indexing matrix. The matrix o would be the unshuffled deck (the same as the matrix z above).
munazah lyle
on 8 Feb 2021
@Tony Richardson Thank you
Sandip
on 15 Oct 2023
0 votes
a_random = a(randperm(size(a, 1)), :);
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