npub1pa02ng8s6anjswmh90mygthd6m7se937kx8d3dd6esas3n8juwsqvjpfyr (npub1pa0…pfyr) npub10fp3ehl8utp98zgk6lx87uwkfxm9zq6z9varapeuluz9cdf3zfvs94qqev (npub10fp…qqev) npub1ln5q8np5aezhtt7ztv6tah86xk4t3smjuchdvxp0u6uta056204q45xyw6 (npub1ln5…xyw6) npub1jtm4dxvu3ccgk60wvvt0uw9j9vz7nuc80f7agrv0vgkkushxk5zq0rrxtn (npub1jtm…rxtn)
Normalizing splits isn't that difficult.
Split A = 505
Split B = 495
Therefore 50.5% to A
(A / [A+B])
and 49.5% to B
(B / [A+B])
However, the fees is where it gets confusing.
A = 505
B = 495
C = 5 (fee)
D= 2 (fee)
Is A 50.5%
(A / [A+B]),
or is it 50.15%
(A / [A+B+C+D])
Is C, the 5 (fee), a 5% fee,
or is it a 0.5% fee
(C / [A + B])
or is it a .0496% fee
(C / [A+B+C+D])