Problem 55330. Convert Periodic Continued Fraction to Fractional Radical Representation
Every periodic continued fraction can be prepresented by a number of the form 
where p, q, and d are all integers with d>0, 
, and d not a perfect square. Given the cointued fraction sequence, both the beginning sequence and cyclic part of the sequence [front, cyclic], output the unique p, q, and d (in reduced form). p and q can both be negative.
where p, q, and d are all integers with d>0, , and d not a perfect square. Given the cointued fraction sequence, both the beginning sequence and cyclic part of the sequence [front, cyclic], output the unique p, q, and d (in reduced form). p and q can both be negative.Solution Stats
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2 Comments
Tim
on 1 Sep 2022
Tests 8 and 9 have Z(1) three times instead of, presumably, Z(1), Z(2), and Z(3) (not that it's going to help me any).
David Hill
on 1 Sep 2022
Thanks, that was not my intent. I corrected the test suite.
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