Inspired by problem 660.
Given n return two disjoint sets of integers A and B with same cardinality having following property:
for i = 1:n
Try to minimize sets cardinality.
assert(isequal(sum(A(:).^(1:n)), sum(A(:).^(1:n)))), makes it too basic.
I have no idea what I was thinking of when I wrote this. Thanks for pointing that out so quickly.
This solution is correct. The only reason it fails at test 4 is because the test suite can' t deal correctly with any sets that have elements that are bigger than 250.
This solution has an error that will only manifest when n >= 13. The corrected version is Solution 1200230.
Swap the input arguments
Sum of first n terms of a harmonic progression
arrangement of symbols
Sum of series VII
Disappear in 3, 2, 1 ...
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