Given a list of complex numbers z, return a list zSorted such that the numbers that are farthest from the origin (0+0i) appear first.
So if z is
z = [-4 6 3+4i 1+i 0]
then the output zSorted would be
zSorted = [6 3+4i -4 1+i 0]
It is useful to mention sort in 'descending' order of distance from origin.
Writing a solution whose size is so close to Leading solution is such a happy thing.
which leading solutions size is always 7 :S
Interesting. If you leave the 'ComparisonMethod','abs' it's still correct (size is 13).
Though, I believe this is the shortest, universally correct solution.
I keep receiving 'Matrix dimensions must agree' when using c(c==-d)... it seems to work fine in matlab, but not on here. Any ideas?
Note that "c(c==-d) = d" means that c and d must be same size or d is scalar. Moreover if d is not a scalar, then all "c==-d" must be true. This code seems to work in rare case, when one value is negative real number, and the rest are positive real numbers, but I have not tested it.
This is like the 'War & Peace' solution. I like it!
where is the problem here? it works on matlab
The function has to be named "complexSort".
Thanks for sharing
i have ran this solution in my MATLAB 2012Ra it's showing the desired result. then , why it is considerd incorrect here?
It looks like the function name has to have a capital S in it.
Simple and elegant, i like it
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