I have a following C expression (variables are 32-bit floats)
float result = (x1 - x0) * (y2 - y0) - (x2 - x0) * (y1 - y0)
y0==y1, (and with
== I mean binary representation identity), can I rely on the fact that the expression will necessarily evaluate to zero (as in, all bits of the float are set to 0)? In another words, can I assume that following invariants always hold?
memcmp(&a, &b, sizeof(float) == 0 => memcmp(a-b, (uint32_t)0, sizeof(float)) == 0 0*a == 0.0
It is safe to assume that all values are finite numbers (no INFINITY or NaN).
Edit: As pointed out in the answers, multiplications with 0 can produce signed zeros. Can I still rely on the fact that the result of the expression will be equal to 0.0 using FP-comparison rules, i.e.:
(result == 0.0)
Edit 1: Replaced type casts by memcmp calls to illustrate the question better.
P.S. I am limiting my code to compliant C11 compilers only, in case it makes any difference. I am also willing to rely on STDC_IEC_559 support if that will help my case.