955 B
955 B
Luckily there is a simple formula to generate Pythagorean triples.
a = k * (m*m - n*n);
b = k * (2*m*n);
c = k * (m*m + n*n);
We have a cache of the size 1500001 the we go through all the values for m and n where 2*m*m + 2*m*n <= LIMIT.
When we have found a triple we look in the cache at position a+b+c:
- If the value is not set (0) we write the the triple-hash (
(a*7 + b)*5 + c) at the position and increment the result. - If there is already an hash that equals with our current triple we do nothing
- If there is already an different hash we write
-1in the cache and decrement the result. - If there is an
-1in the cache we do nothing
So at the end we have the amount of sum's with exactly one solution in our result-value.
We have to test for equal hashes because its possible to find the same tuple multiple times (with different k values).