A set of about 800 pseudo-random unsigned 64-bit integers.
2910088619203924111, 8611579852607706360, 10743563285097812384, 6712886796489718596, 17298387234720051377, 12467698534877227789, 3782074590599432740, 1419307814092336225, 7951308495700413025, ...
A target integer
17358988457627394926of the same kind, in most cases not in the set.
It is guaranteed that the target integer was made by XORing a subset of up to 50 (or less) integers of the set together.
What is the most efficient algorithm to find a subset (any, not nescessarily the smallest) of integers that make the target integer when XORed?
If NP-hard, what would be a basic idea to prove it?